Execution Chart

We display below the execution chart for this examination (boot time has been removed).

Trace from the execution

Waiting for the VM to be ready (probing ssh)
..........................................................
/home/mcc/execution
total 19M
-rw-r--r-- 1 mcc users 185K May 15 18:54 CTLCardinality.txt
-rw-r--r-- 1 mcc users 476K May 15 18:54 CTLCardinality.xml
-rw-r--r-- 1 mcc users 766K May 15 18:54 CTLFireability.txt
-rw-r--r-- 1 mcc users 2.1M May 15 18:54 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.0K May 15 18:50 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 6.1K May 15 18:50 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 74K May 15 18:54 LTLCardinality.txt
-rw-r--r-- 1 mcc users 170K May 15 18:54 LTLCardinality.xml
-rw-r--r-- 1 mcc users 41K May 15 18:54 LTLFireability.txt
-rw-r--r-- 1 mcc users 112K May 15 18:54 LTLFireability.xml
-rw-r--r-- 1 mcc users 337K May 15 18:54 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 786K May 15 18:54 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 107 May 15 18:54 ReachabilityDeadlock.txt
-rw-r--r-- 1 mcc users 345 May 15 18:54 ReachabilityDeadlock.xml
-rw-r--r-- 1 mcc users 441K May 15 18:54 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 1.2M May 15 18:54 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 24K May 15 18:54 UpperBounds.txt
-rw-r--r-- 1 mcc users 48K May 15 18:54 UpperBounds.xml
-rw-r--r-- 1 mcc users 5 May 15 18:50 equiv_col
-rw-r--r-- 1 mcc users 2 May 15 18:50 instance
-rw-r--r-- 1 mcc users 6 May 15 18:50 iscolored
-rw-r--r-- 1 mcc users 13M May 15 18:50 model.pnml
=====================================================================
Generated by BenchKit 2-3637
Executing tool lola
Input is NeoElection-PT-7, examination is ReachabilityCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r112-csrt-152666469300327
=====================================================================

--------------------
content from stdout:

=== Data for post analysis generated by BenchKit (invocation template)

The expected result is a vector of booleans
BOOL_VECTOR

here is the order used to build the result vector(from text file)
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-00
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-01
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-02
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-03
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-04
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-05
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-06
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-07
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-08
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-09
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-10
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-11
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-12
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-13
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-14
FORMULA_NAME NeoElection-PT-7-ReachabilityCardinality-15

=== Now, execution of the tool begins

BK_START 1527028890321

info: Time: 3600 - MCC
===========================================================================================
prep: translating NeoElection-PT-7 Petri net model.pnml into LoLA format
===========================================================================================
prep: translating PT Petri net complete
prep: added safe information to the net based on GenericPropertiesVerdict
prep: check for too many tokens
===========================================================================================
prep: translating NeoElection-PT-7 formula ReachabilityCardinality into LoLA format
===========================================================================================
prep: translating PT formula complete
vrfy: Checking ReachabilityCardinality @ NeoElection-PT-7 @ 3569 seconds
lola: LoLA will run for 3569 seconds at most (--timelimit)
lola: NET
lola: reading net from model.pnml.lola
lola: finished parsing
lola: closed net file model.pnml.lola
lola: 21240/65536 symbol table entries, 3557 collisions
lola: preprocessing...
lola: Size of bit vector: 7128
lola: finding significant places
lola: 7128 places, 14112 transitions, 1688 significant places
lola: computing forward-conflicting sets
lola: computing back-conflicting sets
lola: 3568 transition conflict sets
lola: TASK
lola: reading formula from NeoElection-PT-7-ReachabilityCardinality.task
lola: LP says that atomic proposition is always true: (P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: place invariant simplifies atomic proposition
lola: before: (P-stage_2_SEC + P-stage_3_NEG + P-stage_5_SEC + P-stage_4_PRIM + P-stage_1_SEC + P-stage_6_SEC + P-stage_3_SEC + P-stage_0_SEC + P-stage_7_PRIM + P-stage_1_NEG + P-stage_2_PRIM + P-stage_6_NEG + P-stage_4_NEG + P-stage_5_PRIM + P-stage_7_NEG + P-stage_0_PRIM + P-stage_2_NEG + P-stage_3_PRIM + P-stage_4_SEC + P-stage_5_NEG + P-stage_7_SEC + P-stage_6_PRIM + P-stage_0_NEG + P-stage_1_PRIM <= P-poll__handlingMessage_1 + P-poll__handlingMessage_0 + P-poll__handlingMessage_2 + P-poll__handlingMessage_3 + P-poll__handlingMessage_4 + P-poll__handlingMessage_5 + P-poll__handlingMessage_6 + P-poll__handlingMessage_7)
lola: after: (7 <= P-poll__handlingMessage_1 + P-poll__handlingMessage_0 + P-poll__handlingMessage_2 + P-poll__handlingMessage_3 + P-poll__handlingMessage_4 + P-poll__handlingMessage_5 + P-poll__handlingMessage_6 + P-poll__handlingMessage_7)
lola: place invariant simplifies atomic proposition
lola: before: (P-masterState_6_F_6 + P-masterState_6_F_5 + P-masterState_6_F_4 + P-masterState_6_F_3 + P-masterState_6_F_2 + P-masterState_6_F_1 + P-masterState_6_F_0 + P-masterState_1_T_6 + P-masterState_1_T_5 + P-masterState_1_T_4 + P-masterState_1_T_3 + P-masterState_1_T_2 + P-masterState_1_T_1 + P-masterState_1_T_0 + P-masterState_3_F_6 + P-masterState_3_F_5 + P-masterState_3_F_4 + P-masterState_3_F_3 + P-masterState_3_F_2 + P-masterState_3_F_1 + P-masterState_3_F_0 + P-masterState_4_T_0 + P-masterState_4_T_1 + P-masterState_4_T_2 + P-masterState_4_T_3 + P-masterState_4_T_4 + P-masterState_4_T_5 + P-masterState_4_T_6 + P-masterState_4_T_7 + P-masterState_6_T_7 + P-masterState_6_T_6 + P-masterState_6_T_5 + P-masterState_6_T_4 + P-masterState_6_T_3 + P-masterState_6_T_2 + P-masterState_6_T_1 + P-masterState_6_T_0 + P-masterState_0_F_6 + P-masterState_0_F_5 + P-masterState_0_F_4 + P-masterState_0_F_3 + P-masterState_0_F_2 + P-masterState_0_F_1 + P-masterState_0_F_0 + P-masterState_3_T_7 + P-masterState_3_T_6 + P-masterState_3_T_5 + P-masterState_3_T_4 + P-masterState_3_T_3 + P-masterState_3_T_2 + P-masterState_3_T_1 + P-masterState_3_T_0 + P-masterState_1_F_0 + P-masterState_1_F_1 + P-masterState_1_F_2 + P-masterState_1_F_3 + P-masterState_1_F_4 + P-masterState_1_F_5 + P-masterState_1_F_6 + P-masterState_1_F_7 + P-masterState_5_F_6 + P-masterState_5_F_5 + P-masterState_5_F_4 + P-masterState_5_F_3 + P-masterState_5_F_2 + P-masterState_5_F_1 + P-masterState_5_F_0 + P-masterState_0_T_7 + P-masterState_0_T_6 + P-masterState_0_T_5 + P-masterState_0_T_4 + P-masterState_0_T_3 + P-masterState_0_T_2 + P-masterState_0_T_1 + P-masterState_0_T_0 + P-masterState_2_F_6 + P-masterState_2_F_5 + P-masterState_2_F_4 + P-masterState_2_F_3 + P-masterState_2_F_2 + P-masterState_2_F_1 + P-masterState_2_F_0 + P-masterState_7_T_0 + P-masterState_7_T_1 + P-masterState_7_T_2 + P-masterState_7_T_3 + P-masterState_7_T_4 + P-masterState_7_T_5 + P-masterState_7_T_6 + P-masterState_7_T_7 + P-masterState_5_T_7 + P-masterState_5_T_6 + P-masterState_5_T_5 + P-masterState_5_T_4 + P-masterState_5_T_3 + P-masterState_5_T_2 + P-masterState_5_T_1 + P-masterState_5_T_0 + P-masterState_7_F_6 + P-masterState_7_F_5 + P-masterState_7_F_4 + P-masterState_7_F_3 + P-masterState_7_F_2 + P-masterState_7_F_1 + P-masterState_7_F_0 + P-masterState_4_F_0 + P-masterState_4_F_1 + P-masterState_4_F_2 + P-masterState_4_F_3 + P-masterState_4_F_4 + P-masterState_4_F_5 + P-masterState_4_F_6 + P-masterState_2_T_7 + P-masterState_2_T_6 + P-masterState_2_T_5 + P-masterState_2_T_4 + P-masterState_2_T_3 + P-masterState_2_T_2 + P-masterState_2_T_1 + P-masterState_2_T_0 + P-masterState_4_F_7 + P-masterState_7_F_7 + P-masterState_2_F_7 + P-masterState_5_F_7 + P-masterState_0_F_7 + P-masterState_3_F_7 + P-masterState_1_T_7 + P-masterState_6_F_7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: after: (7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: LP says that atomic proposition is always false: (2 <= P-electedSecondary_7 + P-electedSecondary_6 + P-electedSecondary_5 + P-electedSecondary_4 + P-electedSecondary_3 + P-electedSecondary_2 + P-electedSecondary_1 + P-electedSecondary_0)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= P-stage_2_SEC + P-stage_3_NEG + P-stage_5_SEC + P-stage_4_PRIM + P-stage_1_SEC + P-stage_6_SEC + P-stage_3_SEC + P-stage_0_SEC + P-stage_7_PRIM + P-stage_1_NEG + P-stage_2_PRIM + P-stage_6_NEG + P-stage_4_NEG + P-stage_5_PRIM + P-stage_7_NEG + P-stage_0_PRIM + P-stage_2_NEG + P-stage_3_PRIM + P-stage_4_SEC + P-stage_5_NEG + P-stage_7_SEC + P-stage_6_PRIM + P-stage_0_NEG + P-stage_1_PRIM)
lola: after: (0 <= 6)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (2 <= P-crashed_7 + P-crashed_6 + P-crashed_5 + P-crashed_4 + P-crashed_3 + P-crashed_2 + P-crashed_1 + P-crashed_0)
lola: after: (2 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (P-crashed_7 + P-crashed_6 + P-crashed_5 + P-crashed_4 + P-crashed_3 + P-crashed_2 + P-crashed_1 + P-crashed_0 <= P-masterState_6_F_6 + P-masterState_6_F_5 + P-masterState_6_F_4 + P-masterState_6_F_3 + P-masterState_6_F_2 + P-masterState_6_F_1 + P-masterState_6_F_0 + P-masterState_1_T_6 + P-masterState_1_T_5 + P-masterState_1_T_4 + P-masterState_1_T_3 + P-masterState_1_T_2 + P-masterState_1_T_1 + P-masterState_1_T_0 + P-masterState_3_F_6 + P-masterState_3_F_5 + P-masterState_3_F_4 + P-masterState_3_F_3 + P-masterState_3_F_2 + P-masterState_3_F_1 + P-masterState_3_F_0 + P-masterState_4_T_0 + P-masterState_4_T_1 + P-masterState_4_T_2 + P-masterState_4_T_3 + P-masterState_4_T_4 + P-masterState_4_T_5 + P-masterState_4_T_6 + P-masterState_4_T_7 + P-masterState_6_T_7 + P-masterState_6_T_6 + P-masterState_6_T_5 + P-masterState_6_T_4 + P-masterState_6_T_3 + P-masterState_6_T_2 + P-masterState_6_T_1 + P-masterState_6_T_0 + P-masterState_0_F_6 + P-masterState_0_F_5 + P-masterState_0_F_4 + P-masterState_0_F_3 + P-masterState_0_F_2 + P-masterState_0_F_1 + P-masterState_0_F_0 + P-masterState_3_T_7 + P-masterState_3_T_6 + P-masterState_3_T_5 + P-masterState_3_T_4 + P-masterState_3_T_3 + P-masterState_3_T_2 + P-masterState_3_T_1 + P-masterState_3_T_0 + P-masterState_1_F_0 + P-masterState_1_F_1 + P-masterState_1_F_2 + P-masterState_1_F_3 + P-masterState_1_F_4 + P-masterState_1_F_5 + P-masterState_1_F_6 + P-masterState_1_F_7 + P-masterState_5_F_6 + P-masterState_5_F_5 + P-masterState_5_F_4 + P-masterState_5_F_3 + P-masterState_5_F_2 + P-masterState_5_F_1 + P-masterState_5_F_0 + P-masterState_0_T_7 + P-masterState_0_T_6 + P-masterState_0_T_5 + P-masterState_0_T_4 + P-masterState_0_T_3 + P-masterState_0_T_2 + P-masterState_0_T_1 + P-masterState_0_T_0 + P-masterState_2_F_6 + P-masterState_2_F_5 + P-masterState_2_F_4 + P-masterState_2_F_3 + P-masterState_2_F_2 + P-masterState_2_F_1 + P-masterState_2_F_0 + P-masterState_7_T_0 + P-masterState_7_T_1 + P-masterState_7_T_2 + P-masterState_7_T_3 + P-masterState_7_T_4 + P-masterState_7_T_5 + P-masterState_7_T_6 + P-masterState_7_T_7 + P-masterState_5_T_7 + P-masterState_5_T_6 + P-masterState_5_T_5 + P-masterState_5_T_4 + P-masterState_5_T_3 + P-masterState_5_T_2 + P-masterState_5_T_1 + P-masterState_5_T_0 + P-masterState_7_F_6 + P-masterState_7_F_5 + P-masterState_7_F_4 + P-masterState_7_F_3 + P-masterState_7_F_2 + P-masterState_7_F_1 + P-masterState_7_F_0 + P-masterState_4_F_0 + P-masterState_4_F_1 + P-masterState_4_F_2 + P-masterState_4_F_3 + P-masterState_4_F_4 + P-masterState_4_F_5 + P-masterState_4_F_6 + P-masterState_2_T_7 + P-masterState_2_T_6 + P-masterState_2_T_5 + P-masterState_2_T_4 + P-masterState_2_T_3 + P-masterState_2_T_2 + P-masterState_2_T_1 + P-masterState_2_T_0 + P-masterState_4_F_7 + P-masterState_7_F_7 + P-masterState_2_F_7 + P-masterState_5_F_7 + P-masterState_0_F_7 + P-masterState_3_F_7 + P-masterState_1_T_7 + P-masterState_6_F_7)
lola: after: (0 <= 7)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-network_2_2_AnnP_0 + P-network_0_7_RP_0 + P-network_3_0_RI_0 + P-network_2_6_RP_0 + P-network_5_1_AskP_0 + P-network_4_7_AnnP_0 + P-network_1_1_RI_0 + P-network_4_4_AnsP_7 + P-network_4_4_AnsP_6 + P-network_4_4_AnsP_5 + P-network_4_4_AnsP_4 + P-network_4_4_AnsP_3 + P-network_4_4_AnsP_2 + P-network_4_4_AnsP_1 + P-network_4_4_AnsP_0 + P-network_7_6_AskP_0 + P-network_6_5_RI_0 + P-network_0_5_AskP_0 + P-network_6_2_AI_0 + P-network_5_3_AnnP_0 + P-network_4_6_RI_0 + P-network_4_5_AskP_0 + P-network_4_3_AI_0 + P-network_5_0_AnsP_7 + P-network_5_0_AnsP_6 + P-network_5_0_AnsP_5 + P-network_5_0_AnsP_4 + P-network_5_0_AnsP_3 + P-network_5_0_AnsP_2 + P-network_4_5_RP_0 + P-network_5_0_AnsP_1 + P-network_5_0_AnsP_0 + P-network_2_7_RI_0 + P-network_2_4_AI_0 + P-network_1_1_AskP_0 + P-network_7_2_RP_0 + P-network_0_7_AnnP_0 + P-network_7_5_AnsP_7 + P-network_7_5_AnsP_6 + P-network_7_5_AnsP_5 + P-network_7_5_AnsP_4 + P-network_7_5_AnsP_3 + P-network_7_5_AnsP_2 + P-network_7_5_AnsP_1 + P-network_7_5_AnsP_0 + P-network_1_3_AnsP_0 + P-network_1_3_AnsP_1 + P-network_1_3_AnsP_2 + P-network_1_3_AnsP_3 + P-network_1_3_AnsP_4 + P-network_1_3_AnsP_5 + P-network_1_3_AnsP_6 + P-network_1_3_AnsP_7 + P-network_0_4_AnsP_7 + P-network_0_4_AnsP_6 + P-network_0_4_AnsP_5 + P-network_0_4_AnsP_4 + P-network_0_4_AnsP_3 + P-network_0_4_AnsP_2 + P-network_0_4_AnsP_1 + P-network_0_4_AnsP_0 + P-network_0_5_AI_0 + P-network_5_3_RP_0 + P-network_3_6_AskP_0 + P-network_1_6_AnnP_0 + P-network_3_4_RP_0 + P-network_1_3_AnnP_0 + P-network_1_0_AnsP_7 + P-network_1_0_AnsP_6 + P-network_1_0_AnsP_5 + P-network_1_0_AnsP_4 + P-network_1_0_AnsP_3 + P-network_1_0_AnsP_2 + P-network_6_4_RP_0 + P-network_1_0_AnsP_1 + P-network_1_0_AnsP_0 + P-network_1_5_RP_0 + P-network_4_2_AskP_0 + P-network_3_5_AnsP_7 + P-network_3_5_AnsP_6 + P-network_3_5_AnsP_5 + P-network_2_0_AskP_0 + P-network_3_5_AnsP_4 + P-network_3_5_AnsP_3 + P-network_3_5_AnsP_2 + P-network_3_5_AnsP_1 + P-network_3_5_AnsP_0 + P-network_6_7_AskP_0 + P-network_0_0_RI_0 + P-network_7_3_RI_0 + P-network_1_6_AI_0 + P-network_7_0_AI_0 + P-network_4_4_AnnP_0 + P-network_1_0_RP_0 + P-network_5_4_RI_0 + P-network_4_1_AnsP_7 + P-network_4_1_AnsP_6 + P-network_4_1_AnsP_5 + P-network_4_1_AnsP_4 + P-network_4_1_AnsP_3 + P-network_4_1_AnsP_2 + P-network_4_1_AnsP_1 + P-network_3_5_AI_0 + P-network_4_1_AnsP_0 + P-network_5_1_AI_0 + P-network_0_7_AnsP_0 + P-network_7_3_AskP_0 + P-network_0_7_AnsP_1 + P-network_3_5_RI_0 + P-network_0_7_AnsP_2 + P-network_0_7_AnsP_3 + P-network_0_7_AnsP_4 + P-network_0_7_AnsP_5 + P-network_0_7_AnsP_6 + P-network_0_7_AnsP_7 + P-network_0_2_AskP_0 + P-network_3_2_AI_0 + P-network_6_6_AnsP_7 + P-network_6_6_AnsP_6 + P-network_6_2_AnnP_0 + P-network_6_6_AnsP_5 + P-network_6_6_AnsP_4 + P-network_6_6_AnsP_3 + P-network_6_6_AnsP_2 + P-network_6_6_AnsP_1 + P-network_6_6_AnsP_0 + P-network_5_0_AnnP_0 + P-network_1_6_RI_0 + P-network_1_3_AI_0 + P-network_2_7_AskP_0 + P-network_6_1_RP_0 + P-network_7_5_AnnP_0 + P-network_1_4_AskP_0 + P-network_6_7_AI_0 + P-network_4_2_RP_0 + P-network_0_4_AnnP_0 + P-network_5_4_AI_0 + P-network_7_2_AnsP_7 + P-network_7_2_AnsP_6 + P-network_7_2_AnsP_5 + P-network_7_2_AnsP_4 + P-network_7_2_AnsP_3 + P-network_7_2_AnsP_2 + P-network_7_2_AnsP_1 + P-network_7_2_AnsP_0 + P-network_0_1_AnsP_7 + P-network_0_1_AnsP_6 + P-network_0_1_AnsP_5 + P-network_0_1_AnsP_4 + P-network_0_1_AnsP_3 + P-network_0_1_AnsP_2 + P-network_0_1_AnsP_1 + P-network_5_7_RI_0 + P-network_0_1_AnsP_0 + P-network_5_3_AnsP_0 + P-network_5_3_AnsP_1 + P-network_5_3_AnsP_2 + P-network_5_3_AnsP_3 + P-network_5_3_AnsP_4 + P-network_5_3_AnsP_5 + P-network_5_3_AnsP_6 + P-network_5_3_AnsP_7 + P-network_2_3_RP_0 + P-network_3_3_AskP_0 + P-network_2_6_AnsP_7 + P-network_2_6_AnsP_6 + P-network_2_6_AnsP_5 + P-network_7_3_AI_0 + P-network_2_6_AnsP_4 + P-network_2_6_AnsP_3 + P-network_2_6_AnsP_2 + P-network_2_6_AnsP_1 + P-network_2_6_AnsP_0 + P-network_0_4_RP_0 + P-network_7_7_RP_0 + P-network_0_0_AI_0 + P-network_1_0_AnnP_0 + P-network_3_5_AnnP_0 + P-network_7_6_RI_0 + P-network_6_2_RI_0 + P-network_3_2_AnsP_7 + P-network_3_2_AnsP_6 + P-network_3_2_AnsP_5 + P-network_3_2_AnsP_4 + P-network_3_2_AnsP_3 + P-network_0_3_RI_0 + P-network_3_2_AnsP_2 + P-network_3_2_AnsP_1 + P-network_3_2_AnsP_0 + P-network_6_4_AskP_0 + P-network_4_3_RI_0 + P-network_4_0_AI_0 + P-network_5_7_AnsP_7 + P-network_5_7_AnsP_6 + P-network_5_6_AnnP_0 + P-network_5_7_AnsP_5 + P-network_5_7_AnsP_4 + P-network_5_7_AnsP_3 + P-network_5_7_AnsP_2 + P-network_5_7_AnsP_1 + P-network_5_7_AnsP_0 + P-network_4_1_AnnP_0 + P-network_6_0_AskP_0 + P-network_2_4_RI_0 + P-network_2_1_AI_0 + P-network_7_0_AskP_0 + P-network_6_6_AnnP_0 + P-network_0_5_RI_0 + P-network_0_2_AI_0 + P-network_7_5_AI_0 + P-network_6_3_AnsP_7 + P-network_6_3_AnsP_6 + P-network_6_3_AnsP_5 + P-network_6_3_AnsP_4 + P-network_6_3_AnsP_3 + P-network_6_3_AnsP_2 + P-network_6_3_AnsP_1 + P-network_6_3_AnsP_0 + P-network_5_0_RP_0 + P-network_5_6_AI_0 + P-network_2_2_RI_0 + P-network_2_4_AskP_0 + P-network_3_1_RP_0 + P-network_7_2_AnnP_0 + P-network_3_7_AI_0 + P-network_1_7_AnsP_7 + P-network_1_7_AnsP_6 + P-network_1_7_AnsP_5 + P-network_1_7_AnsP_4 + P-network_1_7_AnsP_3 + P-network_3_1_AnnP_0 + P-network_1_7_AnsP_2 + P-network_1_7_AnsP_1 + P-network_1_7_AnsP_0 + P-network_1_2_RP_0 + P-network_0_1_AnnP_0 + P-network_4_7_AnsP_0 + P-network_4_7_AnsP_1 + P-network_4_7_AnsP_2 + P-network_4_7_AnsP_3 + P-network_4_7_AnsP_4 + P-network_4_7_AnsP_5 + P-network_4_7_AnsP_6 + P-network_4_7_AnsP_7 + P-network_4_1_RI_0 + P-network_6_6_RP_0 + P-network_3_0_AskP_0 + P-network_2_6_AnnP_0 + P-network_2_3_AnsP_7 + P-network_2_3_AnsP_6 + P-network_2_3_AnsP_5 + P-network_2_3_AnsP_4 + P-network_2_3_AnsP_3 + P-network_2_3_AnsP_2 + P-network_2_3_AnsP_1 + P-network_2_3_AnsP_0 + P-network_4_7_RP_0 + P-network_7_0_RI_0 + P-network_5_5_AskP_0 + P-network_5_1_RI_0 + P-network_3_2_AnnP_0 + P-network_5_4_AskP_0 + P-network_3_2_RI_0 + P-network_6_1_AskP_0 + P-network_5_7_AnnP_0 + P-network_6_0_RI_0 + P-network_3_7_RP_0 + P-network_1_3_RI_0 + P-network_1_0_AI_0 + P-network_5_4_AnsP_7 + P-network_5_4_AnsP_6 + P-network_5_4_AnsP_5 + P-network_5_4_AnsP_4 + P-network_5_4_AnsP_3 + P-network_5_4_AnsP_2 + P-network_5_4_AnsP_1 + P-network_5_4_AnsP_0 + P-network_6_7_RI_0 + P-network_2_2_AnsP_0 + P-network_2_2_AnsP_1 + P-network_2_2_AnsP_2 + P-network_2_2_AnsP_3 + P-network_2_2_AnsP_4 + P-network_2_2_AnsP_5 + P-network_2_2_AnsP_6 + P-network_2_2_AnsP_7 + P-network_6_4_AI_0 + P-network_1_5_AskP_0 + P-network_6_3_AnnP_0 + P-network_4_5_AI_0 + P-network_6_0_AnsP_7 + P-network_6_0_AnsP_6 + P-network_6_0_AnsP_5 + P-network_6_0_AnsP_4 + P-network_6_0_AnsP_3 + P-network_6_0_AnsP_2 + P-network_6_0_AnsP_1 + P-network_6_0_AnsP_0 + P-network_2_0_RP_0 + P-network_2_6_AI_0 + P-network_2_1_AskP_0 + P-network_0_1_RP_0 + P-network_7_4_RP_0 + P-network_2_5_AnnP_0 + P-network_1_7_AnnP_0 + P-network_0_7_AI_0 + P-network_5_6_RP_0 + P-network_1_4_AnsP_7 + P-network_1_4_AnsP_6 + P-network_1_4_AnsP_5 + P-network_1_4_AnsP_4 + P-network_1_4_AnsP_3 + P-network_1_4_AnsP_2 + P-network_1_4_AnsP_1 + P-network_1_4_AnsP_0 + P-network_5_5_RP_0 + P-network_4_6_AskP_0 + P-network_3_6_RP_0 + P-network_0_0_AnnP_0 + P-network_2_3_AnnP_0 + P-network_2_0_AnsP_7 + P-network_2_0_AnsP_6 + P-network_2_0_AnsP_5 + P-network_2_0_AnsP_4 + P-network_7_5_RP_0 + P-network_2_0_AnsP_3 + P-network_2_0_AnsP_2 + P-network_2_0_AnsP_1 + P-network_2_0_AnsP_0 + P-network_1_7_RP_0 + P-network_4_0_RI_0 + P-network_0_2_RP_0 + P-network_1_6_AnsP_0 + P-network_1_6_AnsP_1 + P-network_1_6_AnsP_2 + P-network_1_6_AnsP_3 + P-network_1_6_AnsP_4 + P-network_1_6_AnsP_5 + P-network_1_6_AnsP_6 + P-network_1_6_AnsP_7 + P-network_5_2_AskP_0 + P-network_2_7_AI_0 + P-network_2_1_RI_0 + P-network_4_5_AnsP_7 + P-network_4_5_AnsP_6 + P-network_4_5_AnsP_5 + P-network_4_5_AnsP_4 + P-network_4_5_AnsP_3 + P-network_4_5_AnsP_2 + P-network_4_5_AnsP_1 + P-network_4_5_AnsP_0 + P-network_7_7_AskP_0 + P-network_0_2_RI_0 + P-network_7_5_RI_0 + P-network_0_6_AskP_0 + P-network_7_2_AI_0 + P-network_5_4_AnnP_0 + P-network_7_1_AnnP_0 + P-network_5_6_RI_0 + P-network_5_3_AI_0 + P-network_5_1_AnsP_7 + P-network_5_1_AnsP_6 + P-network_5_1_AnsP_5 + P-network_5_1_AnsP_4 + P-network_5_1_AnsP_3 + P-network_5_1_AnsP_2 + P-network_5_1_AnsP_1 + P-network_5_1_AnsP_0 + P-network_3_7_RI_0 + P-network_2_1_RP_0 + P-network_3_4_AI_0 + P-network_1_2_AskP_0 + P-network_7_6_AnsP_7 + P-network_2_3_AskP_0 + P-network_7_6_AnsP_6 + P-network_7_6_AnsP_5 + P-network_7_6_AnsP_4 + P-network_7_6_AnsP_3 + P-network_7_6_AnsP_2 + P-network_7_6_AnsP_1 + P-network_7_6_AnsP_0 + P-network_4_6_AI_0 + P-network_6_0_AnnP_0 + P-network_0_5_AnsP_7 + P-network_0_5_AnsP_6 + P-network_0_5_AnsP_5 + P-network_0_5_AnsP_4 + P-network_0_5_AnsP_3 + P-network_0_5_AnsP_2 + P-network_0_5_AnsP_1 + P-network_0_5_AnsP_0 + P-network_4_0_RP_0 + P-network_1_5_AI_0 + P-network_6_3_RP_0 + P-network_3_7_AskP_0 + P-network_6_2_AnsP_0 + P-network_6_2_AnsP_1 + P-network_6_2_AnsP_2 + P-network_6_2_AnsP_3 + P-network_6_2_AnsP_4 + P-network_6_2_AnsP_5 + P-network_6_2_AnsP_6 + P-network_6_2_AnsP_7 + P-network_4_4_RP_0 + P-network_6_5_AI_0 + P-network_1_4_AnnP_0 + P-network_1_1_AnsP_7 + P-network_1_1_AnsP_6 + P-network_1_1_AnsP_5 + P-network_1_1_AnsP_4 + P-network_1_1_AnsP_3 + P-network_1_1_AnsP_2 + P-network_1_1_AnsP_1 + P-network_6_5_AnnP_0 + P-network_1_1_AnsP_0 + P-network_2_5_RP_0 + P-network_4_3_AskP_0 + P-network_0_6_RP_0 + P-network_1_7_AskP_0 + P-network_3_6_AnsP_7 + P-network_3_6_AnsP_6 + P-network_3_6_AnsP_5 + P-network_3_6_AnsP_4 + P-network_3_6_AnsP_3 + P-network_3_6_AnsP_2 + P-network_3_6_AnsP_1 + P-network_1_1_AI_0 + P-network_3_6_AnsP_0 + P-network_2_0_AnnP_0 + P-network_1_0_RI_0 + P-network_4_5_AnnP_0 + P-network_1_4_RI_0 + P-network_6_4_RI_0 + P-network_4_2_AnsP_7 + P-network_4_2_AnsP_6 + P-network_4_2_AnsP_5 + P-network_4_2_AnsP_4 + P-network_4_2_AnsP_3 + P-network_4_2_AnsP_2 + P-network_4_2_AnsP_1 + P-network_4_0_AnnP_0 + P-network_4_2_AnsP_0 + P-network_6_1_AI_0 + P-network_7_4_AskP_0 + P-network_4_5_RI_0 + P-network_5_6_AnsP_0 + P-network_5_6_AnsP_1 + P-network_5_6_AnsP_2 + P-network_5_6_AnsP_3 + P-network_5_6_AnsP_4 + P-network_5_6_AnsP_5 + P-network_5_6_AnsP_6 + P-network_5_6_AnsP_7 + P-network_0_3_AskP_0 + P-network_3_0_AI_0 + P-network_4_2_AI_0 + P-network_6_7_AnsP_7 + P-network_6_7_AnsP_6 + P-network_6_7_AnsP_5 + P-network_6_7_AnsP_4 + P-network_6_7_AnsP_3 + P-network_6_7_AnsP_2 + P-network_6_7_AnsP_1 + P-network_6_7_AnsP_0 + P-network_5_1_AnnP_0 + P-network_3_3_RI_0 + P-network_2_6_RI_0 + P-network_2_3_AI_0 + P-network_7_1_RP_0 + P-network_7_6_AnnP_0 + P-network_0_7_RI_0 + P-network_0_4_AI_0 + P-network_7_7_AI_0 + P-network_5_2_RP_0 + P-network_0_5_AnnP_0 + P-network_7_3_AnsP_7 + P-network_7_3_AnsP_6 + P-network_6_3_AskP_0 + P-network_7_3_AnsP_5 + P-network_7_3_AnsP_4 + P-network_7_3_AnsP_3 + P-network_7_3_AnsP_2 + P-network_7_3_AnsP_1 + P-network_7_3_AnsP_0 + P-network_0_2_AnsP_7 + P-network_0_2_AnsP_6 + P-network_0_2_AnsP_5 + P-network_0_2_AnsP_4 + P-network_0_2_AnsP_3 + P-network_0_2_AnsP_2 + P-network_0_2_AnsP_1 + P-network_0_2_AnsP_0 + P-network_3_1_AnsP_0 + P-network_3_1_AnsP_1 + P-network_3_1_AnsP_2 + P-network_3_1_AnsP_3 + P-network_3_1_AnsP_4 + P-network_3_1_AnsP_5 + P-network_3_1_AnsP_6 + P-network_3_1_AnsP_7 + P-network_3_3_RP_0 + P-network_5_2_RI_0 + P-network_3_4_AskP_0 + P-network_2_7_AnsP_7 + P-network_2_7_AnsP_6 + P-network_2_7_AnsP_5 + P-network_2_7_AnsP_4 + P-network_2_7_AnsP_3 + P-network_2_7_AnsP_2 + P-network_2_7_AnsP_1 + P-network_2_7_AnsP_0 + P-network_1_4_RP_0 + P-network_1_1_AnnP_0 + P-network_3_4_AnnP_0 + P-network_4_0_AskP_0 + P-network_3_6_AnnP_0 + P-network_7_2_RI_0 + P-network_3_3_AnsP_7 + P-network_3_3_AnsP_6 + P-network_7_1_RI_0 + P-network_3_3_AnsP_5 + P-network_3_3_AnsP_4 + P-network_3_3_AnsP_3 + P-network_3_3_AnsP_2 + P-network_3_3_AnsP_1 + P-network_3_3_AnsP_0 + P-network_6_5_AskP_0 + P-network_5_3_RI_0 + P-network_5_0_AI_0 + P-network_4_2_AnnP_0 + P-network_3_4_RI_0 + P-network_3_1_AI_0 + P-network_7_1_AskP_0 + P-network_6_7_AnnP_0 + P-network_1_5_RI_0 + P-network_0_0_AskP_0 + P-network_1_2_AI_0 + P-network_6_4_AnsP_7 + P-network_6_4_AnsP_6 + P-network_6_4_AnsP_5 + P-network_6_4_AnsP_4 + P-network_6_4_AnsP_3 + P-network_6_4_AnsP_2 + P-network_6_4_AnsP_1 + P-network_6_4_AnsP_0 + P-network_6_0_RP_0 + P-network_6_6_AI_0 + P-network_2_5_AskP_0 + P-network_4_1_RP_0 + P-network_7_3_AnnP_0 + P-network_4_7_AI_0 + P-network_2_2_RP_0 + P-network_0_2_AnnP_0 + P-network_7_0_AnsP_7 + P-network_7_0_AnsP_6 + P-network_7_0_AnsP_5 + P-network_7_0_AnsP_4 + P-network_7_0_AnsP_3 + P-network_5_7_AskP_0 + P-network_7_0_AnsP_2 + P-network_7_0_AnsP_1 + P-network_7_0_AnsP_0 + P-network_6_7_RP_0 + P-network_0_3_RP_0 + P-network_7_6_RP_0 + P-network_3_1_AskP_0 + P-network_2_5_AnsP_0 + P-network_2_5_AnsP_1 + P-network_2_5_AnsP_2 + P-network_2_5_AnsP_3 + P-network_2_5_AnsP_4 + P-network_2_5_AnsP_5 + P-network_2_5_AnsP_6 + P-network_2_5_AnsP_7 + P-network_2_7_AnnP_0 + P-network_2_4_AnsP_7 + P-network_2_4_AnsP_6 + P-network_2_4_AnsP_5 + P-network_2_4_AnsP_4 + P-network_2_4_AnsP_3 + P-network_2_4_AnsP_2 + P-network_3_2_AskP_0 + P-network_2_4_AnsP_1 + P-network_2_4_AnsP_0 + P-network_5_7_RP_0 + P-network_1_3_RP_0 + P-network_5_6_AskP_0 + P-network_0_0_AnsP_0 + P-network_0_0_AnsP_1 + P-network_0_0_AnsP_2 + P-network_0_0_AnsP_3 + P-network_0_0_AnsP_4 + P-network_0_0_AnsP_5 + P-network_0_0_AnsP_6 + P-network_0_0_AnsP_7 + P-network_6_1_RI_0 + P-network_3_3_AnnP_0 + P-network_7_1_AnsP_0 + P-network_7_1_AnsP_1 + P-network_7_1_AnsP_2 + P-network_7_1_AnsP_3 + P-network_7_1_AnsP_4 + P-network_7_1_AnsP_5 + P-network_7_1_AnsP_6 + P-network_7_1_AnsP_7 + P-network_0_3_AnnP_0 + P-network_4_2_RI_0 + P-network_3_0_AnsP_7 + P-network_3_0_AnsP_6 + P-network_3_0_AnsP_5 + P-network_3_0_AnsP_4 + P-network_3_0_AnsP_3 + P-network_3_0_AnsP_2 + P-network_3_0_AnsP_1 + P-network_3_0_AnsP_0 + P-network_6_2_AskP_0 + P-network_3_2_RP_0 + P-network_2_3_RI_0 + P-network_5_7_AI_0 + P-network_2_0_AI_0 + P-network_5_5_AnsP_7 + P-network_5_5_AnsP_6 + P-network_5_5_AnsP_5 + P-network_5_5_AnsP_4 + P-network_5_5_AnsP_3 + P-network_5_5_AnsP_2 + P-network_5_5_AnsP_1 + P-network_5_5_AnsP_0 + P-network_0_4_RI_0 + P-network_7_7_RI_0 + P-network_0_1_AI_0 + P-network_7_4_AI_0 + P-network_1_6_AskP_0 + P-network_6_4_AnnP_0 + P-network_5_5_AI_0 + P-network_6_1_AnsP_7 + P-network_7_4_AnnP_0 + P-network_6_1_AnsP_6 + P-network_6_1_AnsP_5 + P-network_6_1_AnsP_4 + P-network_6_1_AnsP_3 + P-network_6_1_AnsP_2 + P-network_6_1_AnsP_1 + P-network_6_1_AnsP_0 + P-network_3_0_RP_0 + P-network_3_6_AI_0 + P-network_5_1_RP_0 + P-network_2_2_AskP_0 + P-network_1_1_RP_0 + P-network_7_0_AnnP_0 + P-network_2_6_AskP_0 + P-network_1_7_AI_0 + P-network_1_5_AnsP_7 + P-network_7_6_AI_0 + P-network_1_5_AnsP_6 + P-network_1_5_AnsP_5 + P-network_1_5_AnsP_4 + P-network_1_5_AnsP_3 + P-network_1_5_AnsP_2 + P-network_1_5_AnsP_1 + P-network_1_5_AnsP_0 + P-network_0_3_AI_0 + P-network_6_5_RP_0 + P-network_4_7_AskP_0 + P-network_4_6_RP_0 + P-network_2_4_AnnP_0 + P-network_0_6_RI_0 + P-network_2_1_AnsP_7 + P-network_2_1_AnsP_6 + P-network_2_1_AnsP_5 + P-network_2_1_AnsP_4 + P-network_2_1_AnsP_3 + P-network_2_1_AnsP_2 + P-network_2_1_AnsP_1 + P-network_2_1_AnsP_0 + P-network_2_7_RP_0 + P-network_5_0_RI_0 + P-network_7_0_RP_0 + P-network_5_3_AskP_0 + P-network_6_5_AnsP_0 + P-network_6_5_AnsP_1 + P-network_6_5_AnsP_2 + P-network_6_5_AnsP_3 + P-network_6_5_AnsP_4 + P-network_6_5_AnsP_5 + P-network_6_5_AnsP_6 + P-network_6_5_AnsP_7 + P-network_3_1_RI_0 + P-network_4_6_AnsP_7 + P-network_2_2_AI_0 + P-network_4_6_AnsP_6 + P-network_4_6_AnsP_5 + P-network_4_6_AnsP_4 + P-network_4_6_AnsP_3 + P-network_4_6_AnsP_2 + P-network_4_6_AnsP_1 + P-network_4_6_AnsP_0 + P-network_0_1_AskP_0 + P-network_3_0_AnnP_0 + P-network_1_2_RI_0 + P-network_0_7_AskP_0 + P-network_5_5_AnnP_0 + P-network_6_6_RI_0 + P-network_6_3_AI_0 + P-network_5_2_AnsP_7 + P-network_5_2_AnsP_6 + P-network_5_2_AnsP_5 + P-network_5_2_AnsP_4 + P-network_5_2_AnsP_3 + P-network_5_2_AnsP_2 + P-network_5_2_AnsP_1 + P-network_5_2_AnsP_0 + P-network_2_5_RI_0 + P-network_4_7_RI_0 + P-network_4_4_AI_0 + P-network_1_3_AskP_0 + P-network_7_7_AnsP_7 + P-network_7_7_AnsP_6 + P-network_7_7_AnsP_5 + P-network_7_7_AnsP_4 + P-network_7_7_AnsP_3 + P-network_7_7_AnsP_2 + P-network_7_2_AskP_0 + P-network_7_7_AnsP_1 + P-network_7_7_AnsP_0 + P-network_6_1_AnnP_0 + P-network_0_6_AnsP_7 + P-network_0_6_AnsP_6 + P-network_0_6_AnsP_5 + P-network_0_6_AnsP_4 + P-network_0_6_AnsP_3 + P-network_0_6_AnsP_2 + P-network_0_6_AnsP_1 + P-network_0_6_AnsP_0 + P-network_2_5_AI_0 + P-network_0_0_RP_0 + P-network_7_3_RP_0 + P-network_4_1_AI_0 + P-network_4_0_AnsP_0 + P-network_4_0_AnsP_1 + P-network_4_0_AnsP_2 + P-network_4_0_AnsP_3 + P-network_4_0_AnsP_4 + P-network_4_0_AnsP_5 + P-network_4_0_AnsP_6 + P-network_4_0_AnsP_7 + P-network_0_6_AI_0 + P-network_5_4_RP_0 + P-network_1_5_AnnP_0 + P-network_4_4_RI_0 + P-network_1_2_AnsP_7 + P-network_1_2_AnsP_6 + P-network_1_2_AnsP_5 + P-network_1_2_AnsP_4 + P-network_1_2_AnsP_3 + P-network_1_2_AnsP_2 + P-network_1_2_AnsP_1 + P-network_1_2_AnsP_0 + P-network_3_5_RP_0 + P-network_4_4_AskP_0 + P-network_4_3_AnnP_0 + P-network_1_6_RP_0 + P-network_3_7_AnsP_7 + P-network_3_7_AnsP_6 + P-network_6_0_AI_0 + P-network_3_7_AnsP_5 + P-network_3_7_AnsP_4 + P-network_3_7_AnsP_3 + P-network_3_7_AnsP_2 + P-network_3_7_AnsP_1 + P-network_3_7_AnsP_0 + P-network_2_1_AnnP_0 + P-network_2_0_RI_0 + P-network_5_0_AskP_0 + P-network_4_6_AnnP_0 + P-network_6_3_RI_0 + P-network_0_1_RI_0 + P-network_7_4_RI_0 + P-network_4_3_AnsP_7 + P-network_4_3_AnsP_6 + P-network_4_3_AnsP_5 + P-network_4_3_AnsP_4 + P-network_4_3_AnsP_3 + P-network_4_3_AnsP_2 + P-network_4_3_AnsP_1 + P-network_4_3_AnsP_0 + P-network_7_1_AI_0 + P-network_7_5_AskP_0 + P-network_5_5_RI_0 + P-network_0_4_AskP_0 + P-network_5_2_AI_0 + P-network_5_2_AnnP_0 + P-network_3_6_RI_0 + P-network_6_6_AskP_0 + P-network_3_3_AI_0 + P-network_3_4_AnsP_0 + P-network_3_4_AnsP_1 + P-network_3_4_AnsP_2 + P-network_3_4_AnsP_3 + P-network_3_4_AnsP_4 + P-network_3_4_AnsP_5 + P-network_3_4_AnsP_6 + P-network_3_4_AnsP_7 + P-network_7_7_AnnP_0 + P-network_1_7_RI_0 + P-network_3_7_AnnP_0 + P-network_1_4_AI_0 + P-network_1_0_AskP_0 + P-network_6_2_RP_0 + P-network_0_6_AnnP_0 + P-network_7_4_AnsP_7 + P-network_4_1_AskP_0 + P-network_7_4_AnsP_6 + P-network_7_4_AnsP_5 + P-network_7_4_AnsP_4 + P-network_7_4_AnsP_3 + P-network_7_4_AnsP_2 + P-network_7_4_AnsP_1 + P-network_7_4_AnsP_0 + P-network_0_5_RP_0 + P-network_0_3_AnsP_7 + P-network_0_3_AnsP_6 + P-network_0_3_AnsP_5 + P-network_0_3_AnsP_4 + P-network_0_3_AnsP_3 + P-network_0_3_AnsP_2 + P-network_0_3_AnsP_1 + P-network_0_3_AnsP_0 + P-network_4_3_RP_0 + P-network_3_5_AskP_0 + P-network_2_4_RP_0 + P-network_1_2_AnnP_0 + P-network_1_2_AnnP_1 + P-network_1_2_AnnP_2 + P-network_1_2_AnnP_3 + P-network_1_2_AnnP_4 + P-network_1_2_AnnP_5 + P-network_1_2_AnnP_6 + P-network_1_2_AnnP_7 + P-network_2_4_RP_1 + P-network_2_4_RP_2 + P-network_2_4_RP_3 + P-network_2_4_RP_4 + P-network_2_4_RP_5 + P-network_2_4_RP_6 + P-network_2_4_RP_7 + P-network_3_5_AskP_1 + P-network_3_5_AskP_2 + P-network_3_5_AskP_3 + P-network_3_5_AskP_4 + P-network_3_5_AskP_5 + P-network_3_5_AskP_6 + P-network_3_5_AskP_7 + P-network_4_3_RP_1 + P-network_4_3_RP_2 + P-network_4_3_RP_3 + P-network_4_3_RP_4 + P-network_4_3_RP_5 + P-network_4_3_RP_6 + P-network_4_3_RP_7 + P-network_0_5_RP_7 + P-network_0_5_RP_6 + P-network_0_5_RP_5 + P-network_0_5_RP_4 + P-network_0_5_RP_3 + P-network_0_5_RP_2 + P-network_0_5_RP_1 + P-network_4_1_AskP_7 + P-network_4_1_AskP_6 + P-network_4_1_AskP_5 + P-network_4_1_AskP_4 + P-network_4_1_AskP_3 + P-network_4_1_AskP_2 + P-network_4_1_AskP_1 + P-network_3_7_AnnP_7 + P-network_3_7_AnnP_6 + P-network_0_6_AnnP_1 + P-network_0_6_AnnP_2 + P-network_0_6_AnnP_3 + P-network_0_6_AnnP_4 + P-network_0_6_AnnP_5 + P-network_0_6_AnnP_6 + P-network_0_6_AnnP_7 + P-network_3_7_AnnP_5 + P-network_6_2_RP_1 + P-network_6_2_RP_2 + P-network_6_2_RP_3 + P-network_6_2_RP_4 + P-network_6_2_RP_5 + P-network_6_2_RP_6 + P-network_6_2_RP_7 + P-network_3_7_AnnP_4 + P-network_1_0_AskP_1 + P-network_1_0_AskP_2 + P-network_1_0_AskP_3 + P-network_1_0_AskP_4 + P-network_1_0_AskP_5 + P-network_1_0_AskP_6 + P-network_1_0_AskP_7 + P-network_3_7_AnnP_3 + P-network_3_7_AnnP_2 + P-network_1_4_AI_1 + P-network_3_7_AnnP_1 + P-network_1_4_AI_2 + P-network_1_4_AI_3 + P-network_1_4_AI_4 + P-network_1_4_AI_5 + P-network_1_4_AI_6 + P-network_1_4_AI_7 + P-network_1_7_RI_1 + P-network_1_7_RI_2 + P-network_1_7_RI_3 + P-network_1_7_RI_4 + P-network_1_7_RI_5 + P-network_1_7_RI_6 + P-network_1_7_RI_7 + P-network_7_7_AnnP_1 + P-network_7_7_AnnP_2 + P-network_7_7_AnnP_3 + P-network_7_7_AnnP_4 + P-network_7_7_AnnP_5 + P-network_7_7_AnnP_6 + P-network_7_7_AnnP_7 + P-network_6_6_AskP_7 + P-network_6_6_AskP_6 + P-network_6_6_AskP_5 + P-network_6_6_AskP_4 + P-network_6_6_AskP_3 + P-network_6_6_AskP_2 + P-network_6_6_AskP_1 + P-network_3_3_AI_1 + P-network_3_3_AI_2 + P-network_3_3_AI_3 + P-network_3_3_AI_4 + P-network_3_3_AI_5 + P-network_3_3_AI_6 + P-network_3_3_AI_7 + P-network_3_6_RI_1 + P-network_3_6_RI_2 + P-network_3_6_RI_3 + P-network_3_6_RI_4 + P-network_3_6_RI_5 + P-network_3_6_RI_6 + P-network_3_6_RI_7 + P-network_5_2_AnnP_1 + P-network_5_2_AnnP_2 + P-network_5_2_AnnP_3 + P-network_5_2_AnnP_4 + P-network_5_2_AnnP_5 + P-network_5_2_AnnP_6 + P-network_5_2_AnnP_7 + P-network_5_2_AI_1 + P-network_5_2_AI_2 + P-network_5_2_AI_3 + P-network_5_2_AI_4 + P-network_5_2_AI_5 + P-network_5_2_AI_6 + P-network_5_2_AI_7 + P-network_0_4_AskP_1 + P-network_0_4_AskP_2 + P-network_0_4_AskP_3 + P-network_0_4_AskP_4 + P-network_0_4_AskP_5 + P-network_0_4_AskP_6 + P-network_0_4_AskP_7 + P-network_5_5_RI_1 + P-network_5_5_RI_2 + P-network_5_5_RI_3 + P-network_5_5_RI_4 + P-network_5_5_RI_5 + P-network_5_5_RI_6 + P-network_5_5_RI_7 + P-network_7_5_AskP_1 + P-network_7_5_AskP_2 + P-network_7_5_AskP_3 + P-network_7_5_AskP_4 + P-network_7_5_AskP_5 + P-network_7_5_AskP_6 + P-network_7_5_AskP_7 + P-network_7_1_AI_1 + P-network_7_1_AI_2 + P-network_7_1_AI_3 + P-network_7_1_AI_4 + P-network_7_1_AI_5 + P-network_7_1_AI_6 + P-network_7_1_AI_7 + P-network_7_4_RI_1 + P-network_7_4_RI_2 + P-network_7_4_RI_3 + P-network_7_4_RI_4 + P-network_7_4_RI_5 + P-network_7_4_RI_6 + P-network_7_4_RI_7 + P-network_0_1_RI_1 + P-network_0_1_RI_2 + P-network_0_1_RI_3 + P-network_0_1_RI_4 + P-network_0_1_RI_5 + P-network_0_1_RI_6 + P-network_0_1_RI_7 + P-network_6_3_RI_7 + P-network_6_3_RI_6 + P-network_6_3_RI_5 + P-network_6_3_RI_4 + P-network_6_3_RI_3 + P-network_6_3_RI_2 + P-network_6_3_RI_1 + P-network_4_6_AnnP_1 + P-network_4_6_AnnP_2 + P-network_4_6_AnnP_3 + P-network_4_6_AnnP_4 + P-network_4_6_AnnP_5 + P-network_4_6_AnnP_6 + P-network_4_6_AnnP_7 + P-network_5_0_AskP_1 + P-network_5_0_AskP_2 + P-network_5_0_AskP_3 + P-network_5_0_AskP_4 + P-network_5_0_AskP_5 + P-network_5_0_AskP_6 + P-network_5_0_AskP_7 + P-network_2_0_RI_1 + P-network_2_0_RI_2 + P-network_2_0_RI_3 + P-network_2_0_RI_4 + P-network_2_0_RI_5 + P-network_2_0_RI_6 + P-network_2_0_RI_7 + P-network_6_0_AI_7 + P-network_2_1_AnnP_1 + P-network_2_1_AnnP_2 + P-network_2_1_AnnP_3 + P-network_2_1_AnnP_4 + P-network_2_1_AnnP_5 + P-network_2_1_AnnP_6 + P-network_2_1_AnnP_7 + P-network_6_0_AI_6 + P-network_6_0_AI_5 + P-network_6_0_AI_4 + P-network_6_0_AI_3 + P-network_6_0_AI_2 + P-network_6_0_AI_1 + P-network_4_3_AnnP_7 + P-network_4_3_AnnP_6 + P-network_1_6_RP_1 + P-network_1_6_RP_2 + P-network_1_6_RP_3 + P-network_1_6_RP_4 + P-network_1_6_RP_5 + P-network_1_6_RP_6 + P-network_1_6_RP_7 + P-network_4_3_AnnP_5 + P-network_4_3_AnnP_4 + P-network_4_3_AnnP_3 + P-network_4_3_AnnP_2 + P-network_4_3_AnnP_1 + P-network_4_4_AskP_1 + P-network_4_4_AskP_2 + P-network_4_4_AskP_3 + P-network_4_4_AskP_4 + P-network_4_4_AskP_5 + P-network_4_4_AskP_6 + P-network_4_4_AskP_7 + P-network_3_5_RP_1 + P-network_3_5_RP_2 + P-network_3_5_RP_3 + P-network_3_5_RP_4 + P-network_3_5_RP_5 + P-network_3_5_RP_6 + P-network_3_5_RP_7 + P-network_4_4_RI_7 + P-network_4_4_RI_6 + P-network_4_4_RI_5 + P-network_4_4_RI_4 + P-network_4_4_RI_3 + P-network_4_4_RI_2 + P-network_4_4_RI_1 + P-network_1_5_AnnP_1 + P-network_1_5_AnnP_2 + P-network_1_5_AnnP_3 + P-network_1_5_AnnP_4 + P-network_1_5_AnnP_5 + P-network_1_5_AnnP_6 + P-network_1_5_AnnP_7 + P-network_5_4_RP_1 + P-network_5_4_RP_2 + P-network_5_4_RP_3 + P-network_5_4_RP_4 + P-network_5_4_RP_5 + P-network_5_4_RP_6 + P-network_5_4_RP_7 + P-network_0_6_AI_1 + P-network_0_6_AI_2 + P-network_0_6_AI_3 + P-network_0_6_AI_4 + P-network_0_6_AI_5 + P-network_0_6_AI_6 + P-network_0_6_AI_7 + P-network_4_1_AI_7 + P-network_4_1_AI_6 + P-network_4_1_AI_5 + P-network_4_1_AI_4 + P-network_4_1_AI_3 + P-network_4_1_AI_2 + P-network_4_1_AI_1 + P-network_7_3_RP_1 + P-network_7_3_RP_2 + P-network_7_3_RP_3 + P-network_7_3_RP_4 + P-network_7_3_RP_5 + P-network_7_3_RP_6 + P-network_7_3_RP_7 + P-network_0_0_RP_1 + P-network_0_0_RP_2 + P-network_0_0_RP_3 + P-network_0_0_RP_4 + P-network_0_0_RP_5 + P-network_0_0_RP_6 + P-network_0_0_RP_7 + P-network_2_5_AI_1 + P-network_2_5_AI_2 + P-network_2_5_AI_3 + P-network_2_5_AI_4 + P-network_2_5_AI_5 + P-network_2_5_AI_6 + P-network_7_2_AskP_7 + P-network_2_5_AI_7 + P-network_7_2_AskP_6 + P-network_7_2_AskP_5 + P-network_7_2_AskP_4 + P-network_7_2_AskP_3 + P-network_6_1_AnnP_1 + P-network_6_1_AnnP_2 + P-network_6_1_AnnP_3 + P-network_6_1_AnnP_4 + P-network_6_1_AnnP_5 + P-network_6_1_AnnP_6 + P-network_6_1_AnnP_7 + P-network_7_2_AskP_2 + P-network_7_2_AskP_1 + P-network_1_3_AskP_1 + P-network_1_3_AskP_2 + P-network_1_3_AskP_3 + P-network_1_3_AskP_4 + P-network_1_3_AskP_5 + P-network_1_3_AskP_6 + P-network_1_3_AskP_7 + P-network_4_4_AI_1 + P-network_2_5_RI_7 + P-network_4_4_AI_2 + P-network_2_5_RI_6 + P-network_4_4_AI_3 + P-network_2_5_RI_5 + P-network_4_4_AI_4 + P-network_2_5_RI_4 + P-network_4_4_AI_5 + P-network_2_5_RI_3 + P-network_4_4_AI_6 + P-network_2_5_RI_2 + P-network_4_4_AI_7 + P-network_2_5_RI_1 + P-network_4_7_RI_1 + P-network_4_7_RI_2 + P-network_4_7_RI_3 + P-network_4_7_RI_4 + P-network_4_7_RI_5 + P-network_4_7_RI_6 + P-network_4_7_RI_7 + P-network_6_3_AI_1 + P-network_6_3_AI_2 + P-network_6_3_AI_3 + P-network_6_3_AI_4 + P-network_6_3_AI_5 + P-network_6_3_AI_6 + P-network_6_3_AI_7 + P-network_6_6_RI_1 + P-network_6_6_RI_2 + P-network_6_6_RI_3 + P-network_6_6_RI_4 + P-network_6_6_RI_5 + P-network_6_6_RI_6 + P-network_6_6_RI_7 + P-network_0_1_AskP_7 + P-network_0_1_AskP_6 + P-network_5_5_AnnP_1 + P-network_5_5_AnnP_2 + P-network_5_5_AnnP_3 + P-network_5_5_AnnP_4 + P-network_5_5_AnnP_5 + P-network_5_5_AnnP_6 + P-network_5_5_AnnP_7 + P-network_0_1_AskP_5 + P-network_0_7_AskP_1 + P-network_0_7_AskP_2 + P-network_0_7_AskP_3 + P-network_0_7_AskP_4 + P-network_0_7_AskP_5 + P-network_0_7_AskP_6 + P-network_0_7_AskP_7 + P-network_0_1_AskP_4 + P-network_1_2_RI_1 + P-network_1_2_RI_2 + P-network_1_2_RI_3 + P-network_1_2_RI_4 + P-network_1_2_RI_5 + P-network_1_2_RI_6 + P-network_1_2_RI_7 + P-network_0_1_AskP_3 + P-network_0_1_AskP_2 + P-network_3_0_AnnP_1 + P-network_3_0_AnnP_2 + P-network_3_0_AnnP_3 + P-network_3_0_AnnP_4 + P-network_3_0_AnnP_5 + P-network_3_0_AnnP_6 + P-network_3_0_AnnP_7 + P-network_0_1_AskP_1 + P-network_2_2_AI_7 + P-network_2_2_AI_6 + P-network_2_2_AI_5 + P-network_2_2_AI_4 + P-network_2_2_AI_3 + P-network_2_2_AI_2 + P-network_2_2_AI_1 + P-network_3_1_RI_1 + P-network_3_1_RI_2 + P-network_3_1_RI_3 + P-network_3_1_RI_4 + P-network_3_1_RI_5 + P-network_3_1_RI_6 + P-network_3_1_RI_7 + P-network_7_0_RP_7 + P-network_7_0_RP_6 + P-network_7_0_RP_5 + P-network_7_0_RP_4 + P-network_7_0_RP_3 + P-network_5_3_AskP_1 + P-network_5_3_AskP_2 + P-network_5_3_AskP_3 + P-network_5_3_AskP_4 + P-network_5_3_AskP_5 + P-network_5_3_AskP_6 + P-network_5_3_AskP_7 + P-network_7_0_RP_2 + P-network_7_0_RP_1 + P-network_5_0_RI_1 + P-network_5_0_RI_2 + P-network_5_0_RI_3 + P-network_2_7_RP_1 + P-network_5_0_RI_4 + P-network_2_7_RP_2 + P-network_5_0_RI_5 + P-network_2_7_RP_3 + P-network_5_0_RI_6 + P-network_2_7_RP_4 + P-network_5_0_RI_7 + P-network_2_7_RP_5 + P-network_2_7_RP_6 + P-network_2_7_RP_7 + P-network_0_6_RI_7 + P-network_0_6_RI_6 + P-network_0_6_RI_5 + P-network_0_6_RI_4 + P-network_0_6_RI_3 + P-network_0_6_RI_2 + P-network_0_6_RI_1 + P-network_2_4_AnnP_1 + P-network_2_4_AnnP_2 + P-network_2_4_AnnP_3 + P-network_2_4_AnnP_4 + P-network_2_4_AnnP_5 + P-network_2_4_AnnP_6 + P-network_2_4_AnnP_7 + P-network_4_6_RP_1 + P-network_4_6_RP_2 + P-network_4_6_RP_3 + P-network_4_6_RP_4 + P-network_4_6_RP_5 + P-network_4_6_RP_6 + P-network_4_6_RP_7 + P-network_0_3_AI_7 + P-network_0_3_AI_6 + P-network_0_3_AI_5 + P-network_0_3_AI_4 + P-network_0_3_AI_3 + P-network_0_3_AI_2 + P-network_4_7_AskP_1 + P-network_4_7_AskP_2 + P-network_4_7_AskP_3 + P-network_4_7_AskP_4 + P-network_4_7_AskP_5 + P-network_4_7_AskP_6 + P-network_4_7_AskP_7 + P-network_0_3_AI_1 + P-network_6_5_RP_1 + P-network_6_5_RP_2 + P-network_6_5_RP_3 + P-network_6_5_RP_4 + P-network_6_5_RP_5 + P-network_6_5_RP_6 + P-network_6_5_RP_7 + P-network_7_6_AI_7 + P-network_7_6_AI_6 + P-network_7_6_AI_5 + P-network_7_6_AI_4 + P-network_7_6_AI_3 + P-network_7_6_AI_2 + P-network_7_6_AI_1 + P-network_2_6_AskP_7 + P-network_2_6_AskP_6 + P-network_1_7_AI_1 + P-network_1_7_AI_2 + P-network_1_7_AI_3 + P-network_1_7_AI_4 + P-network_1_7_AI_5 + P-network_1_7_AI_6 + P-network_1_7_AI_7 + P-network_2_6_AskP_5 + P-network_2_6_AskP_4 + P-network_2_6_AskP_3 + P-network_2_6_AskP_2 + P-network_2_6_AskP_1 + P-network_5_1_RP_7 + P-network_5_1_RP_6 + P-network_5_1_RP_5 + P-network_5_1_RP_4 + P-network_7_0_AnnP_1 + P-network_7_0_AnnP_2 + P-network_7_0_AnnP_3 + P-network_7_0_AnnP_4 + P-network_7_0_AnnP_5 + P-network_7_0_AnnP_6 + P-network_7_0_AnnP_7 + P-network_5_1_RP_3 + P-network_1_1_RP_1 + P-network_1_1_RP_2 + P-network_1_1_RP_3 + P-network_1_1_RP_4 + P-network_1_1_RP_5 + P-network_1_1_RP_6 + P-network_1_1_RP_7 + P-network_5_1_RP_2 + P-network_2_2_AskP_1 + P-network_2_2_AskP_2 + P-network_2_2_AskP_3 + P-network_2_2_AskP_4 + P-network_2_2_AskP_5 + P-network_2_2_AskP_6 + P-network_2_2_AskP_7 + P-network_5_1_RP_1 + P-network_3_6_AI_1 + P-network_3_6_AI_2 + P-network_3_6_AI_3 + P-network_3_6_AI_4 + P-network_3_6_AI_5 + P-network_3_6_AI_6 + P-network_3_6_AI_7 + P-network_3_0_RP_1 + P-network_3_0_RP_2 + P-network_3_0_RP_3 + P-network_3_0_RP_4 + P-network_3_0_RP_5 + P-network_3_0_RP_6 + P-network_3_0_RP_7 + P-network_7_4_AnnP_7 + P-network_7_4_AnnP_6 + P-network_7_4_AnnP_5 + P-network_7_4_AnnP_4 + P-network_7_4_AnnP_3 + P-network_7_4_AnnP_2 + P-network_7_4_AnnP_1 + P-network_5_5_AI_1 + P-network_5_5_AI_2 + P-network_5_5_AI_3 + P-network_5_5_AI_4 + P-network_5_5_AI_5 + P-network_5_5_AI_6 + P-network_5_5_AI_7 + P-network_6_4_AnnP_1 + P-network_6_4_AnnP_2 + P-network_6_4_AnnP_3 + P-network_6_4_AnnP_4 + P-network_6_4_AnnP_5 + P-network_6_4_AnnP_6 + P-network_6_4_AnnP_7 + P-network_1_6_AskP_1 + P-network_1_6_AskP_2 + P-network_1_6_AskP_3 + P-network_1_6_AskP_4 + P-network_1_6_AskP_5 + P-network_1_6_AskP_6 + P-network_1_6_AskP_7 + P-network_7_4_AI_1 + P-network_7_4_AI_2 + P-network_7_4_AI_3 + P-network_7_4_AI_4 + P-network_7_4_AI_5 + P-network_7_4_AI_6 + P-network_7_4_AI_7 + P-network_0_1_AI_1 + P-network_0_1_AI_2 + P-network_0_1_AI_3 + P-network_0_1_AI_4 + P-network_0_1_AI_5 + P-network_0_1_AI_6 + P-network_0_1_AI_7 + P-network_7_7_RI_1 + P-network_7_7_RI_2 + P-network_7_7_RI_3 + P-network_7_7_RI_4 + P-network_7_7_RI_5 + P-network_7_7_RI_6 + P-network_7_7_RI_7 + P-network_0_4_RI_1 + P-network_0_4_RI_2 + P-network_0_4_RI_3 + P-network_0_4_RI_4 + P-network_0_4_RI_5 + P-network_0_4_RI_6 + P-network_0_4_RI_7 + P-network_5_7_AI_7 + P-network_5_7_AI_6 + P-network_5_7_AI_5 + P-network_5_7_AI_4 + P-network_5_7_AI_3 + P-network_5_7_AI_2 + P-network_5_7_AI_1 + P-network_2_0_AI_1 + P-network_2_0_AI_2 + P-network_2_0_AI_3 + P-network_2_0_AI_4 + P-network_2_0_AI_5 + P-network_2_0_AI_6 + P-network_2_0_AI_7 + P-network_3_2_RP_7 + P-network_2_3_RI_1 + P-network_2_3_RI_2 + P-network_2_3_RI_3 + P-network_2_3_RI_4 + P-network_2_3_RI_5 + P-network_2_3_RI_6 + P-network_2_3_RI_7 + P-network_3_2_RP_6 + P-network_3_2_RP_5 + P-network_3_2_RP_4 + P-network_3_2_RP_3 + P-network_3_2_RP_2 + P-network_3_2_RP_1 + P-network_0_3_AnnP_7 + P-network_6_2_AskP_1 + P-network_6_2_AskP_2 + P-network_6_2_AskP_3 + P-network_6_2_AskP_4 + P-network_6_2_AskP_5 + P-network_6_2_AskP_6 + P-network_6_2_AskP_7 + P-network_0_3_AnnP_6 + P-network_0_3_AnnP_5 + P-network_0_3_AnnP_4 + P-network_0_3_AnnP_3 + P-network_0_3_AnnP_2 + P-network_4_2_RI_1 + P-network_4_2_RI_2 + P-network_4_2_RI_3 + P-network_4_2_RI_4 + P-network_4_2_RI_5 + P-network_4_2_RI_6 + P-network_4_2_RI_7 + P-network_0_3_AnnP_1 + P-network_3_3_AnnP_1 + P-network_3_3_AnnP_2 + P-network_3_3_AnnP_3 + P-network_3_3_AnnP_4 + P-network_3_3_AnnP_5 + P-network_3_3_AnnP_6 + P-network_3_3_AnnP_7 + P-network_6_1_RI_1 + P-network_6_1_RI_2 + P-network_6_1_RI_3 + P-network_6_1_RI_4 + P-network_6_1_RI_5 + P-network_6_1_RI_6 + P-network_6_1_RI_7 + P-network_1_3_RP_7 + P-network_1_3_RP_6 + P-network_1_3_RP_5 + P-network_1_3_RP_4 + P-network_5_6_AskP_1 + P-network_5_6_AskP_2 + P-network_5_6_AskP_3 + P-network_5_6_AskP_4 + P-network_5_6_AskP_5 + P-network_5_6_AskP_6 + P-network_5_6_AskP_7 + P-network_1_3_RP_3 + P-network_1_3_RP_2 + P-network_1_3_RP_1 + P-network_3_2_AskP_7 + P-network_3_2_AskP_6 + P-network_3_2_AskP_5 + P-network_3_2_AskP_4 + P-network_3_2_AskP_3 + P-network_5_7_RP_1 + P-network_5_7_RP_2 + P-network_5_7_RP_3 + P-network_5_7_RP_4 + P-network_5_7_RP_5 + P-network_5_7_RP_6 + P-network_5_7_RP_7 + P-network_3_2_AskP_2 + P-network_3_2_AskP_1 + P-network_2_7_AnnP_1 + P-network_2_7_AnnP_2 + P-network_2_7_AnnP_3 + P-network_2_7_AnnP_4 + P-network_2_7_AnnP_5 + P-network_2_7_AnnP_6 + P-network_2_7_AnnP_7 + P-network_6_7_RP_7 + P-network_3_1_AskP_1 + P-network_3_1_AskP_2 + P-network_3_1_AskP_3 + P-network_3_1_AskP_4 + P-network_3_1_AskP_5 + P-network_3_1_AskP_6 + P-network_3_1_AskP_7 + P-network_6_7_RP_6 + P-network_7_6_RP_1 + P-network_7_6_RP_2 + P-network_7_6_RP_3 + P-network_7_6_RP_4 + P-network_7_6_RP_5 + P-network_7_6_RP_6 + P-network_7_6_RP_7 + P-network_6_7_RP_5 + P-network_0_3_RP_1 + P-network_0_3_RP_2 + P-network_0_3_RP_3 + P-network_0_3_RP_4 + P-network_0_3_RP_5 + P-network_6_7_RP_4 + P-network_0_3_RP_6 + P-network_6_7_RP_3 + P-network_0_3_RP_7 + P-network_6_7_RP_2 + P-network_6_7_RP_1 + P-network_5_7_AskP_7 + P-network_5_7_AskP_6 + P-network_5_7_AskP_5 + P-network_5_7_AskP_4 + P-network_5_7_AskP_3 + P-network_5_7_AskP_2 + P-network_5_7_AskP_1 + P-network_0_2_AnnP_1 + P-network_0_2_AnnP_2 + P-network_0_2_AnnP_3 + P-network_0_2_AnnP_4 + P-network_0_2_AnnP_5 + P-network_0_2_AnnP_6 + P-network_0_2_AnnP_7 + P-network_2_2_RP_1 + P-network_2_2_RP_2 + P-network_2_2_RP_3 + P-network_2_2_RP_4 + P-network_2_2_RP_5 + P-network_2_2_RP_6 + P-network_2_2_RP_7 + P-network_4_7_AI_1 + P-network_4_7_AI_2 + P-network_4_7_AI_3 + P-network_4_7_AI_4 + P-network_4_7_AI_5 + P-network_4_7_AI_6 + P-network_4_7_AI_7 + P-network_7_3_AnnP_1 + P-network_7_3_AnnP_2 + P-network_7_3_AnnP_3 + P-network_7_3_AnnP_4 + P-network_7_3_AnnP_5 + P-network_7_3_AnnP_6 + P-network_7_3_AnnP_7 + P-network_4_1_RP_1 + P-network_4_1_RP_2 + P-network_4_1_RP_3 + P-network_4_1_RP_4 + P-network_4_1_RP_5 + P-network_4_1_RP_6 + P-network_4_1_RP_7 + P-network_2_5_AskP_1 + P-network_2_5_AskP_2 + P-network_2_5_AskP_3 + P-network_2_5_AskP_4 + P-network_2_5_AskP_5 + P-network_2_5_AskP_6 + P-network_2_5_AskP_7 + P-network_6_6_AI_1 + P-network_6_6_AI_2 + P-network_6_6_AI_3 + P-network_6_6_AI_4 + P-network_6_6_AI_5 + P-network_6_6_AI_6 + P-network_6_6_AI_7 + P-network_6_0_RP_1 + P-network_6_0_RP_2 + P-network_6_0_RP_3 + P-network_6_0_RP_4 + P-network_6_0_RP_5 + P-network_6_0_RP_6 + P-network_6_0_RP_7 + P-network_1_2_AI_1 + P-network_1_2_AI_2 + P-network_1_2_AI_3 + P-network_1_2_AI_4 + P-network_1_2_AI_5 + P-network_1_2_AI_6 + P-network_1_2_AI_7 + P-network_0_0_AskP_1 + P-network_0_0_AskP_2 + P-network_0_0_AskP_3 + P-network_0_0_AskP_4 + P-network_0_0_AskP_5 + P-network_0_0_AskP_6 + P-network_0_0_AskP_7 + P-network_1_5_RI_1 + P-network_1_5_RI_2 + P-network_1_5_RI_3 + P-network_1_5_RI_4 + P-network_1_5_RI_5 + P-network_1_5_RI_6 + P-network_1_5_RI_7 + P-network_6_7_AnnP_1 + P-network_6_7_AnnP_2 + P-network_6_7_AnnP_3 + P-network_6_7_AnnP_4 + P-network_6_7_AnnP_5 + P-network_6_7_AnnP_6 + P-network_6_7_AnnP_7 + P-network_7_1_AskP_1 + P-network_7_1_AskP_2 + P-network_7_1_AskP_3 + P-network_7_1_AskP_4 + P-network_7_1_AskP_5 + P-network_7_1_AskP_6 + P-network_7_1_AskP_7 + P-network_3_1_AI_1 + P-network_3_1_AI_2 + P-network_3_1_AI_3 + P-network_3_1_AI_4 + P-network_3_1_AI_5 + P-network_3_1_AI_6 + P-network_3_1_AI_7 + P-network_3_4_RI_1 + P-network_3_4_RI_2 + P-network_3_4_RI_3 + P-network_3_4_RI_4 + P-network_3_4_RI_5 + P-network_3_4_RI_6 + P-network_3_4_RI_7 + P-network_4_2_AnnP_1 + P-network_4_2_AnnP_2 + P-network_4_2_AnnP_3 + P-network_4_2_AnnP_4 + P-network_4_2_AnnP_5 + P-network_4_2_AnnP_6 + P-network_4_2_AnnP_7 + P-network_5_0_AI_1 + P-network_5_0_AI_2 + P-network_5_0_AI_3 + P-network_5_0_AI_4 + P-network_5_0_AI_5 + P-network_5_0_AI_6 + P-network_5_0_AI_7 + P-network_5_3_RI_1 + P-network_5_3_RI_2 + P-network_5_3_RI_3 + P-network_5_3_RI_4 + P-network_5_3_RI_5 + P-network_5_3_RI_6 + P-network_5_3_RI_7 + P-network_7_1_RI_7 + P-network_6_5_AskP_1 + P-network_6_5_AskP_2 + P-network_6_5_AskP_3 + P-network_6_5_AskP_4 + P-network_6_5_AskP_5 + P-network_6_5_AskP_6 + P-network_6_5_AskP_7 + P-network_7_1_RI_6 + P-network_7_1_RI_5 + P-network_7_1_RI_4 + P-network_7_1_RI_3 + P-network_7_1_RI_2 + P-network_7_1_RI_1 + P-network_3_4_AnnP_7 + P-network_3_4_AnnP_6 + P-network_7_2_RI_1 + P-network_7_2_RI_2 + P-network_7_2_RI_3 + P-network_7_2_RI_4 + P-network_7_2_RI_5 + P-network_7_2_RI_6 + P-network_7_2_RI_7 + P-network_3_4_AnnP_5 + P-network_3_4_AnnP_4 + P-network_3_4_AnnP_3 + P-network_3_6_AnnP_1 + P-network_3_6_AnnP_2 + P-network_3_6_AnnP_3 + P-network_3_6_AnnP_4 + P-network_3_6_AnnP_5 + P-network_3_6_AnnP_6 + P-network_3_6_AnnP_7 + P-network_3_4_AnnP_2 + P-network_4_0_AskP_1 + P-network_4_0_AskP_2 + P-network_4_0_AskP_3 + P-network_4_0_AskP_4 + P-network_4_0_AskP_5 + P-network_4_0_AskP_6 + P-network_4_0_AskP_7 + P-network_3_4_AnnP_1 + P-network_1_1_AnnP_1 + P-network_1_1_AnnP_2 + P-network_1_1_AnnP_3 + P-network_1_1_AnnP_4 + P-network_1_1_AnnP_5 + P-network_1_1_AnnP_6 + P-network_1_1_AnnP_7 + P-network_1_4_RP_1 + P-network_1_4_RP_2 + P-network_1_4_RP_3 + P-network_1_4_RP_4 + P-network_1_4_RP_5 + P-network_1_4_RP_6 + P-network_1_4_RP_7 + P-network_5_2_RI_7 + P-network_5_2_RI_6 + P-network_5_2_RI_5 + P-network_5_2_RI_4 + P-network_5_2_RI_3 + P-network_5_2_RI_2 + P-network_5_2_RI_1 + P-network_3_4_AskP_1 + P-network_3_4_AskP_2 + P-network_3_4_AskP_3 + P-network_3_4_AskP_4 + P-network_3_4_AskP_5 + P-network_3_4_AskP_6 + P-network_3_4_AskP_7 + P-network_3_3_RP_1 + P-network_3_3_RP_2 + P-network_3_3_RP_3 + P-network_3_3_RP_4 + P-network_3_3_RP_5 + P-network_3_3_RP_6 + P-network_3_3_RP_7 + P-network_6_3_AskP_7 + P-network_6_3_AskP_6 + P-network_6_3_AskP_5 + P-network_6_3_AskP_4 + P-network_6_3_AskP_3 + P-network_6_3_AskP_2 + P-network_6_3_AskP_1 + P-network_0_5_AnnP_1 + P-network_0_5_AnnP_2 + P-network_0_5_AnnP_3 + P-network_0_5_AnnP_4 + P-network_0_5_AnnP_5 + P-network_0_5_AnnP_6 + P-network_0_5_AnnP_7 + P-network_5_2_RP_1 + P-network_5_2_RP_2 + P-network_5_2_RP_3 + P-network_5_2_RP_4 + P-network_5_2_RP_5 + P-network_5_2_RP_6 + P-network_5_2_RP_7 + P-network_7_7_AI_1 + P-network_7_7_AI_2 + P-network_7_7_AI_3 + P-network_7_7_AI_4 + P-network_7_7_AI_5 + P-network_7_7_AI_6 + P-network_7_7_AI_7 + P-network_0_4_AI_1 + P-network_0_4_AI_2 + P-network_0_4_AI_3 + P-network_0_4_AI_4 + P-network_0_4_AI_5 + P-network_0_4_AI_6 + P-network_0_4_AI_7 + P-network_0_7_RI_1 + P-network_0_7_RI_2 + P-network_0_7_RI_3 + P-network_0_7_RI_4 + P-network_0_7_RI_5 + P-network_0_7_RI_6 + P-network_0_7_RI_7 + P-network_7_6_AnnP_1 + P-network_7_6_AnnP_2 + P-network_7_6_AnnP_3 + P-network_7_6_AnnP_4 + P-network_7_6_AnnP_5 + P-network_7_6_AnnP_6 + P-network_7_6_AnnP_7 + P-network_7_1_RP_1 + P-network_7_1_RP_2 + P-network_7_1_RP_3 + P-network_7_1_RP_4 + P-network_7_1_RP_5 + P-network_7_1_RP_6 + P-network_7_1_RP_7 + P-network_2_3_AI_1 + P-network_2_3_AI_2 + P-network_2_3_AI_3 + P-network_2_3_AI_4 + P-network_2_3_AI_5 + P-network_2_3_AI_6 + P-network_2_3_AI_7 + P-network_3_3_RI_7 + P-network_2_6_RI_1 + P-network_2_6_RI_2 + P-network_2_6_RI_3 + P-network_2_6_RI_4 + P-network_2_6_RI_5 + P-network_2_6_RI_6 + P-network_2_6_RI_7 + P-network_3_3_RI_6 + P-network_3_3_RI_5 + P-network_3_3_RI_4 + P-network_3_3_RI_3 + P-network_3_3_RI_2 + P-network_3_3_RI_1 + P-network_5_1_AnnP_1 + P-network_5_1_AnnP_2 + P-network_5_1_AnnP_3 + P-network_5_1_AnnP_4 + P-network_5_1_AnnP_5 + P-network_5_1_AnnP_6 + P-network_5_1_AnnP_7 + P-network_3_0_AI_7 + P-network_3_0_AI_6 + P-network_3_0_AI_5 + P-network_4_2_AI_1 + P-network_4_2_AI_2 + P-network_4_2_AI_3 + P-network_4_2_AI_4 + P-network_4_2_AI_5 + P-network_4_2_AI_6 + P-network_4_2_AI_7 + P-network_3_0_AI_4 + P-network_3_0_AI_3 + P-network_3_0_AI_2 + P-network_3_0_AI_1 + P-network_0_3_AskP_1 + P-network_0_3_AskP_2 + P-network_0_3_AskP_3 + P-network_0_3_AskP_4 + P-network_0_3_AskP_5 + P-network_0_3_AskP_6 + P-network_0_3_AskP_7 + P-network_4_0_AnnP_7 + P-network_4_0_AnnP_6 + P-network_4_0_AnnP_5 + P-network_4_0_AnnP_4 + P-network_4_5_RI_1 + P-network_4_5_RI_2 + P-network_4_5_RI_3 + P-network_4_5_RI_4 + P-network_4_5_RI_5 + P-network_4_5_RI_6 + P-network_4_5_RI_7 + P-network_4_0_AnnP_3 + P-network_7_4_AskP_1 + P-network_7_4_AskP_2 + P-network_7_4_AskP_3 + P-network_7_4_AskP_4 + P-network_7_4_AskP_5 + P-network_7_4_AskP_6 + P-network_7_4_AskP_7 + P-network_4_0_AnnP_2 + P-network_6_1_AI_1 + P-network_6_1_AI_2 + P-network_4_0_AnnP_1 + P-network_6_1_AI_3 + P-network_6_1_AI_4 + P-network_6_1_AI_5 + P-network_6_1_AI_6 + P-network_6_1_AI_7 + P-network_6_4_RI_1 + P-network_6_4_RI_2 + P-network_6_4_RI_3 + P-network_6_4_RI_4 + P-network_6_4_RI_5 + P-network_6_4_RI_6 + P-network_6_4_RI_7 + P-network_1_4_RI_7 + P-network_1_4_RI_6 + P-network_1_4_RI_5 + P-network_1_4_RI_4 + P-network_1_4_RI_3 + P-network_1_4_RI_2 + P-network_1_4_RI_1 + P-network_4_5_AnnP_1 + P-network_4_5_AnnP_2 + P-network_4_5_AnnP_3 + P-network_4_5_AnnP_4 + P-network_4_5_AnnP_5 + P-network_4_5_AnnP_6 + P-network_4_5_AnnP_7 + P-network_1_1_AI_7 + P-network_1_1_AI_6 + P-network_1_1_AI_5 + P-network_1_0_RI_1 + P-network_1_0_RI_2 + P-network_1_0_RI_3 + P-network_1_0_RI_4 + P-network_1_0_RI_5 + P-network_1_0_RI_6 + P-network_1_0_RI_7 + P-network_1_1_AI_4 + P-network_1_1_AI_3 + P-network_1_1_AI_2 + P-network_2_0_AnnP_1 + P-network_2_0_AnnP_2 + P-network_2_0_AnnP_3 + P-network_2_0_AnnP_4 + P-network_2_0_AnnP_5 + P-network_2_0_AnnP_6 + P-network_2_0_AnnP_7 + P-network_1_1_AI_1 + P-network_1_7_AskP_7 + P-network_1_7_AskP_6 + P-network_1_7_AskP_5 + P-network_1_7_AskP_4 + P-network_1_7_AskP_3 + P-network_1_7_AskP_2 + P-network_1_7_AskP_1 + P-network_0_6_RP_1 + P-network_0_6_RP_2 + P-network_0_6_RP_3 + P-network_0_6_RP_4 + P-network_0_6_RP_5 + P-network_0_6_RP_6 + P-network_0_6_RP_7 + P-network_4_3_AskP_1 + P-network_4_3_AskP_2 + P-network_4_3_AskP_3 + P-network_4_3_AskP_4 + P-network_4_3_AskP_5 + P-network_4_3_AskP_6 + P-network_4_3_AskP_7 + P-network_6_5_AnnP_7 + P-network_6_5_AnnP_6 + P-network_6_5_AnnP_5 + P-network_6_5_AnnP_4 + P-network_6_5_AnnP_3 + P-network_2_5_RP_1 + P-network_2_5_RP_2 + P-network_2_5_RP_3 + P-network_2_5_RP_4 + P-network_2_5_RP_5 + P-network_2_5_RP_6 + P-network_2_5_RP_7 + P-network_6_5_AnnP_2 + P-network_6_5_AnnP_1 + P-network_6_5_AI_7 + P-network_1_4_AnnP_1 + P-network_1_4_AnnP_2 + P-network_1_4_AnnP_3 + P-network_1_4_AnnP_4 + P-network_1_4_AnnP_5 + P-network_1_4_AnnP_6 + P-network_1_4_AnnP_7 + P-network_6_5_AI_6 + P-network_6_5_AI_5 + P-network_6_5_AI_4 + P-network_6_5_AI_3 + P-network_6_5_AI_2 + P-network_6_5_AI_1 + P-network_4_4_RP_1 + P-network_4_4_RP_2 + P-network_4_4_RP_3 + P-network_4_4_RP_4 + P-network_4_4_RP_5 + P-network_4_4_RP_6 + P-network_4_4_RP_7 + P-network_4_0_RP_7 + P-network_4_0_RP_6 + P-network_4_0_RP_5 + P-network_4_0_RP_4 + P-network_4_0_RP_3 + P-network_3_7_AskP_1 + P-network_3_7_AskP_2 + P-network_3_7_AskP_3 + P-network_3_7_AskP_4 + P-network_3_7_AskP_5 + P-network_3_7_AskP_6 + P-network_3_7_AskP_7 + P-network_4_0_RP_2 + P-network_6_3_RP_1 + P-network_6_3_RP_2 + P-network_6_3_RP_3 + P-network_6_3_RP_4 + P-network_6_3_RP_5 + P-network_6_3_RP_6 + P-network_6_3_RP_7 + P-network_4_0_RP_1 + P-network_1_5_AI_1 + P-network_1_5_AI_2 + P-network_1_5_AI_3 + P-network_1_5_AI_4 + P-network_1_5_AI_5 + P-network_1_5_AI_6 + P-network_1_5_AI_7 + P-network_4_6_AI_7 + P-network_6_0_AnnP_1 + P-network_6_0_AnnP_2 + P-network_4_6_AI_6 + P-network_6_0_AnnP_3 + P-network_4_6_AI_5 + P-network_6_0_AnnP_4 + P-network_4_6_AI_4 + P-network_6_0_AnnP_5 + P-network_4_6_AI_3 + P-network_6_0_AnnP_6 + P-network_4_6_AI_2 + P-network_6_0_AnnP_7 + P-network_4_6_AI_1 + P-network_2_3_AskP_7 + P-network_2_3_AskP_6 + P-network_2_3_AskP_5 + P-network_2_3_AskP_4 + P-network_2_3_AskP_3 + P-network_2_3_AskP_2 + P-network_2_3_AskP_1 + P-network_2_1_RP_7 + P-network_2_1_RP_6 + P-network_1_2_AskP_1 + P-network_1_2_AskP_2 + P-network_1_2_AskP_3 + P-network_1_2_AskP_4 + P-network_1_2_AskP_5 + P-network_1_2_AskP_6 + P-network_1_2_AskP_7 + P-network_2_1_RP_5 + P-network_2_1_RP_4 + P-network_3_4_AI_1 + P-network_2_1_RP_3 + P-network_3_4_AI_2 + P-network_2_1_RP_2 + P-network_3_4_AI_3 + P-network_2_1_RP_1 + P-network_3_4_AI_4 + P-network_3_4_AI_5 + P-network_3_4_AI_6 + P-network_3_4_AI_7 + P-network_3_7_RI_1 + P-network_3_7_RI_2 + P-network_3_7_RI_3 + P-network_3_7_RI_4 + P-network_3_7_RI_5 + P-network_3_7_RI_6 + P-network_3_7_RI_7 + P-network_7_1_AnnP_7 + P-network_7_1_AnnP_6 + P-network_7_1_AnnP_5 + P-network_7_1_AnnP_4 + P-network_7_1_AnnP_3 + P-network_5_3_AI_1 + P-network_5_3_AI_2 + P-network_5_3_AI_3 + P-network_5_3_AI_4 + P-network_5_3_AI_5 + P-network_5_3_AI_6 + P-network_5_3_AI_7 + P-network_7_1_AnnP_2 + P-network_5_6_RI_1 + P-network_5_6_RI_2 + P-network_5_6_RI_3 + P-network_5_6_RI_4 + P-network_5_6_RI_5 + P-network_5_6_RI_6 + P-network_5_6_RI_7 + P-network_7_1_AnnP_1 + P-network_5_4_AnnP_1 + P-network_5_4_AnnP_2 + P-network_5_4_AnnP_3 + P-network_5_4_AnnP_4 + P-network_5_4_AnnP_5 + P-network_5_4_AnnP_6 + P-network_5_4_AnnP_7 + P-network_7_2_AI_1 + P-network_7_2_AI_2 + P-network_7_2_AI_3 + P-network_7_2_AI_4 + P-network_7_2_AI_5 + P-network_7_2_AI_6 + P-network_7_2_AI_7 + P-network_0_6_AskP_1 + P-network_0_6_AskP_2 + P-network_0_6_AskP_3 + P-network_0_6_AskP_4 + P-network_0_6_AskP_5 + P-network_0_6_AskP_6 + P-network_0_6_AskP_7 + P-network_7_5_RI_1 + P-network_7_5_RI_2 + P-network_7_5_RI_3 + P-network_7_5_RI_4 + P-network_7_5_RI_5 + P-network_7_5_RI_6 + P-network_7_5_RI_7 + P-network_0_2_RI_1 + P-network_0_2_RI_2 + P-network_0_2_RI_3 + P-network_0_2_RI_4 + P-network_0_2_RI_5 + P-network_0_2_RI_6 + P-network_0_2_RI_7 + P-network_7_7_AskP_1 + P-network_7_7_AskP_2 + P-network_7_7_AskP_3 + P-network_7_7_AskP_4 + P-network_7_7_AskP_5 + P-network_7_7_AskP_6 + P-network_7_7_AskP_7 + P-network_2_7_AI_7 + P-network_2_7_AI_6 + P-network_2_7_AI_5 + P-network_2_7_AI_4 + P-network_2_7_AI_3 + P-network_2_7_AI_2 + P-network_2_1_RI_1 + P-network_2_1_RI_2 + P-network_2_1_RI_3 + P-network_2_1_RI_4 + P-network_2_1_RI_5 + P-network_2_1_RI_6 + P-network_2_1_RI_7 + P-network_2_7_AI_1 + P-network_5_2_AskP_1 + P-network_5_2_AskP_2 + P-network_5_2_AskP_3 + P-network_5_2_AskP_4 + P-network_5_2_AskP_5 + P-network_5_2_AskP_6 + P-network_5_2_AskP_7 + P-network_0_2_RP_7 + P-network_0_2_RP_6 + P-network_0_2_RP_5 + P-network_0_2_RP_4 + P-network_0_2_RP_3 + P-network_0_2_RP_2 + P-network_0_2_RP_1 + P-network_7_5_RP_7 + P-network_7_5_RP_6 + P-network_4_0_RI_1 + P-network_4_0_RI_2 + P-network_7_5_RP_5 + P-network_4_0_RI_3 + P-network_1_7_RP_1 + P-network_4_0_RI_4 + P-network_1_7_RP_2 + P-network_4_0_RI_5 + P-network_1_7_RP_3 + P-network_4_0_RI_6 + P-network_1_7_RP_4 + P-network_4_0_RI_7 + P-network_1_7_RP_5 + P-network_1_7_RP_6 + P-network_1_7_RP_7 + P-network_7_5_RP_4 + P-network_7_5_RP_3 + P-network_7_5_RP_2 + P-network_7_5_RP_1 + P-network_0_0_AnnP_7 + P-network_0_0_AnnP_6 + P-network_0_0_AnnP_5 + P-network_0_0_AnnP_4 + P-network_0_0_AnnP_3 + P-network_0_0_AnnP_2 + P-network_0_0_AnnP_1 + P-network_2_3_AnnP_1 + P-network_2_3_AnnP_2 + P-network_2_3_AnnP_3 + P-network_2_3_AnnP_4 + P-network_2_3_AnnP_5 + P-network_2_3_AnnP_6 + P-network_2_3_AnnP_7 + P-network_3_6_RP_1 + P-network_3_6_RP_2 + P-network_3_6_RP_3 + P-network_3_6_RP_4 + P-network_3_6_RP_5 + P-network_3_6_RP_6 + P-network_3_6_RP_7 + P-network_4_6_AskP_1 + P-network_4_6_AskP_2 + P-network_4_6_AskP_3 + P-network_4_6_AskP_4 + P-network_4_6_AskP_5 + P-network_4_6_AskP_6 + P-network_4_6_AskP_7 + P-network_5_5_RP_1 + P-network_5_5_RP_2 + P-network_5_5_RP_3 + P-network_5_5_RP_4 + P-network_5_5_RP_5 + P-network_5_5_RP_6 + P-network_5_5_RP_7 + P-network_5_6_RP_7 + P-network_5_6_RP_6 + P-network_5_6_RP_5 + P-network_5_6_RP_4 + P-network_5_6_RP_3 + P-network_5_6_RP_2 + P-network_5_6_RP_1 + P-network_2_5_AnnP_7 + P-network_2_5_AnnP_6 + P-network_2_5_AnnP_5 + P-network_2_5_AnnP_4 + P-network_2_5_AnnP_3 + P-network_0_7_AI_1 + P-network_0_7_AI_2 + P-network_0_7_AI_3 + P-network_0_7_AI_4 + P-network_0_7_AI_5 + P-network_0_7_AI_6 + P-network_0_7_AI_7 + P-network_2_5_AnnP_2 + P-network_2_5_AnnP_1 + P-network_1_7_AnnP_1 + P-network_1_7_AnnP_2 + P-network_1_7_AnnP_3 + P-network_1_7_AnnP_4 + P-network_1_7_AnnP_5 + P-network_1_7_AnnP_6 + P-network_1_7_AnnP_7 + P-network_7_4_RP_1 + P-network_7_4_RP_2 + P-network_7_4_RP_3 + P-network_7_4_RP_4 + P-network_7_4_RP_5 + P-network_7_4_RP_6 + P-network_7_4_RP_7 + P-network_0_1_RP_1 + P-network_0_1_RP_2 + P-network_0_1_RP_3 + P-network_0_1_RP_4 + P-network_0_1_RP_5 + P-network_0_1_RP_6 + P-network_0_1_RP_7 + P-network_2_1_AskP_1 + P-network_2_1_AskP_2 + P-network_2_1_AskP_3 + P-network_2_1_AskP_4 + P-network_2_1_AskP_5 + P-network_2_1_AskP_6 + P-network_2_1_AskP_7 + P-network_2_6_AI_1 + P-network_2_6_AI_2 + P-network_2_6_AI_3 + P-network_2_6_AI_4 + P-network_2_6_AI_5 + P-network_2_6_AI_6 + P-network_2_6_AI_7 + P-network_2_0_RP_1 + P-network_2_0_RP_2 + P-network_2_0_RP_3 + P-network_2_0_RP_4 + P-network_2_0_RP_5 + P-network_2_0_RP_6 + P-network_2_0_RP_7 + P-network_4_5_AI_1 + P-network_4_5_AI_2 + P-network_4_5_AI_3 + P-network_4_5_AI_4 + P-network_4_5_AI_5 + P-network_4_5_AI_6 + P-network_4_5_AI_7 + P-network_6_3_AnnP_1 + P-network_6_3_AnnP_2 + P-network_6_3_AnnP_3 + P-network_6_3_AnnP_4 + P-network_6_3_AnnP_5 + P-network_6_3_AnnP_6 + P-network_6_3_AnnP_7 + P-network_1_5_AskP_1 + P-network_1_5_AskP_2 + P-network_1_5_AskP_3 + P-network_1_5_AskP_4 + P-network_1_5_AskP_5 + P-network_1_5_AskP_6 + P-network_1_5_AskP_7 + P-network_6_4_AI_1 + P-network_6_4_AI_2 + P-network_6_4_AI_3 + P-network_6_4_AI_4 + P-network_6_4_AI_5 + P-network_6_4_AI_6 + P-network_6_4_AI_7 + P-network_3_7_RP_7 + P-network_6_7_RI_1 + P-network_6_7_RI_2 + P-network_6_7_RI_3 + P-network_6_7_RI_4 + P-network_6_7_RI_5 + P-network_6_7_RI_6 + P-network_6_7_RI_7 + P-network_3_7_RP_6 + P-network_3_7_RP_5 + P-network_6_0_RI_7 + P-network_3_7_RP_4 + P-network_6_0_RI_6 + P-network_3_7_RP_3 + P-network_6_0_RI_5 + P-network_3_7_RP_2 + P-network_6_0_RI_4 + P-network_1_0_AI_1 + P-network_1_0_AI_2 + P-network_1_0_AI_3 + P-network_1_0_AI_4 + P-network_1_0_AI_5 + P-network_1_0_AI_6 + P-network_1_0_AI_7 + P-network_3_7_RP_1 + P-network_1_3_RI_1 + P-network_1_3_RI_2 + P-network_1_3_RI_3 + P-network_1_3_RI_4 + P-network_1_3_RI_5 + P-network_1_3_RI_6 + P-network_1_3_RI_7 + P-network_6_0_RI_3 + P-network_6_0_RI_2 + P-network_6_0_RI_1 + P-network_5_4_AskP_7 + P-network_5_4_AskP_6 + P-network_5_4_AskP_5 + P-network_5_4_AskP_4 + P-network_5_4_AskP_3 + P-network_5_7_AnnP_1 + P-network_5_7_AnnP_2 + P-network_5_7_AnnP_3 + P-network_5_7_AnnP_4 + P-network_5_7_AnnP_5 + P-network_5_7_AnnP_6 + P-network_5_7_AnnP_7 + P-network_5_4_AskP_2 + P-network_6_1_AskP_1 + P-network_6_1_AskP_2 + P-network_6_1_AskP_3 + P-network_6_1_AskP_4 + P-network_6_1_AskP_5 + P-network_6_1_AskP_6 + P-network_6_1_AskP_7 + P-network_5_4_AskP_1 + P-network_3_2_RI_1 + P-network_3_2_RI_2 + P-network_3_2_RI_3 + P-network_3_2_RI_4 + P-network_3_2_RI_5 + P-network_3_2_RI_6 + P-network_3_2_RI_7 + P-network_3_2_AnnP_1 + P-network_3_2_AnnP_2 + P-network_3_2_AnnP_3 + P-network_3_2_AnnP_4 + P-network_3_2_AnnP_5 + P-network_3_2_AnnP_6 + P-network_3_2_AnnP_7 + P-network_5_1_RI_1 + P-network_5_1_RI_2 + P-network_5_1_RI_3 + P-network_5_1_RI_4 + P-network_5_1_RI_5 + P-network_5_1_RI_6 + P-network_5_1_RI_7 + P-network_5_5_AskP_1 + P-network_5_5_AskP_2 + P-network_5_5_AskP_3 + P-network_5_5_AskP_4 + P-network_5_5_AskP_5 + P-network_5_5_AskP_6 + P-network_5_5_AskP_7 + P-network_7_0_RI_1 + P-network_7_0_RI_2 + P-network_7_0_RI_3 + P-network_4_7_RP_1 + P-network_7_0_RI_4 + P-network_4_7_RP_2 + P-network_7_0_RI_5 + P-network_4_7_RP_3 + P-network_7_0_RI_6 + P-network_4_7_RP_4 + P-network_7_0_RI_7 + P-network_4_7_RP_5 + P-network_4_7_RP_6 + P-network_4_7_RP_7 + P-network_2_6_AnnP_1 + P-network_2_6_AnnP_2 + P-network_2_6_AnnP_3 + P-network_2_6_AnnP_4 + P-network_2_6_AnnP_5 + P-network_2_6_AnnP_6 + P-network_2_6_AnnP_7 + P-network_3_0_AskP_1 + P-network_3_0_AskP_2 + P-network_3_0_AskP_3 + P-network_3_0_AskP_4 + P-network_3_0_AskP_5 + P-network_3_0_AskP_6 + P-network_3_0_AskP_7 + P-network_6_6_RP_1 + P-network_6_6_RP_2 + P-network_6_6_RP_3 + P-network_6_6_RP_4 + P-network_6_6_RP_5 + P-network_6_6_RP_6 + P-network_6_6_RP_7 + P-network_4_1_RI_7 + P-network_4_1_RI_6 + P-network_4_1_RI_5 + P-network_4_1_RI_4 + P-network_4_1_RI_3 + P-network_4_1_RI_2 + P-network_4_1_RI_1 + P-network_3_1_AnnP_7 + P-network_3_1_AnnP_6 + P-network_0_1_AnnP_1 + P-network_0_1_AnnP_2 + P-network_0_1_AnnP_3 + P-network_0_1_AnnP_4 + P-network_0_1_AnnP_5 + P-network_0_1_AnnP_6 + P-network_0_1_AnnP_7 + P-network_3_1_AnnP_5 + P-network_1_2_RP_1 + P-network_1_2_RP_2 + P-network_1_2_RP_3 + P-network_1_2_RP_4 + P-network_1_2_RP_5 + P-network_1_2_RP_6 + P-network_1_2_RP_7 + P-network_3_1_AnnP_4 + P-network_3_1_AnnP_3 + P-network_3_1_AnnP_2 + P-network_3_1_AnnP_1 + P-network_3_7_AI_1 + P-network_3_7_AI_2 + P-network_3_7_AI_3 + P-network_3_7_AI_4 + P-network_3_7_AI_5 + P-network_3_7_AI_6 + P-network_3_7_AI_7 + P-network_7_2_AnnP_1 + P-network_7_2_AnnP_2 + P-network_7_2_AnnP_3 + P-network_7_2_AnnP_4 + P-network_7_2_AnnP_5 + P-network_7_2_AnnP_6 + P-network_7_2_AnnP_7 + P-network_3_1_RP_1 + P-network_3_1_RP_2 + P-network_3_1_RP_3 + P-network_3_1_RP_4 + P-network_3_1_RP_5 + P-network_3_1_RP_6 + P-network_3_1_RP_7 + P-network_2_4_AskP_1 + P-network_2_4_AskP_2 + P-network_2_4_AskP_3 + P-network_2_4_AskP_4 + P-network_2_4_AskP_5 + P-network_2_4_AskP_6 + P-network_2_4_AskP_7 + P-network_2_2_RI_7 + P-network_2_2_RI_6 + P-network_2_2_RI_5 + P-network_2_2_RI_4 + P-network_2_2_RI_3 + P-network_2_2_RI_2 + P-network_2_2_RI_1 + P-network_5_6_AI_1 + P-network_5_6_AI_2 + P-network_5_6_AI_3 + P-network_5_6_AI_4 + P-network_5_6_AI_5 + P-network_5_6_AI_6 + P-network_5_6_AI_7 + P-network_5_0_RP_1 + P-network_5_0_RP_2 + P-network_5_0_RP_3 + P-network_5_0_RP_4 + P-network_5_0_RP_5 + P-network_5_0_RP_6 + P-network_5_0_RP_7 + P-network_7_5_AI_1 + P-network_7_5_AI_2 + P-network_7_5_AI_3 + P-network_7_5_AI_4 + P-network_7_5_AI_5 + P-network_7_5_AI_6 + P-network_7_5_AI_7 + P-network_0_2_AI_1 + P-network_0_2_AI_2 + P-network_0_2_AI_3 + P-network_0_2_AI_4 + P-network_0_2_AI_5 + P-network_0_2_AI_6 + P-network_0_2_AI_7 + P-network_6_0_AskP_7 + P-network_6_0_AskP_6 + P-network_0_5_RI_1 + P-network_0_5_RI_2 + P-network_0_5_RI_3 + P-network_0_5_RI_4 + P-network_0_5_RI_5 + P-network_0_5_RI_6 + P-network_0_5_RI_7 + P-network_6_0_AskP_5 + P-network_6_6_AnnP_1 + P-network_6_6_AnnP_2 + P-network_6_6_AnnP_3 + P-network_6_6_AnnP_4 + P-network_6_6_AnnP_5 + P-network_6_6_AnnP_6 + P-network_6_6_AnnP_7 + P-network_6_0_AskP_4 + P-network_7_0_AskP_1 + P-network_7_0_AskP_2 + P-network_7_0_AskP_3 + P-network_7_0_AskP_4 + P-network_7_0_AskP_5 + P-network_7_0_AskP_6 + P-network_7_0_AskP_7 + P-network_6_0_AskP_3 + P-network_2_1_AI_1 + P-network_2_1_AI_2 + P-network_2_1_AI_3 + P-network_2_1_AI_4 + P-network_2_1_AI_5 + P-network_2_1_AI_6 + P-network_2_1_AI_7 + P-network_6_0_AskP_2 + P-network_2_4_RI_1 + P-network_2_4_RI_2 + P-network_2_4_RI_3 + P-network_2_4_RI_4 + P-network_2_4_RI_5 + P-network_2_4_RI_6 + P-network_2_4_RI_7 + P-network_6_0_AskP_1 + P-network_5_6_AnnP_7 + P-network_4_1_AnnP_1 + P-network_4_1_AnnP_2 + P-network_4_1_AnnP_3 + P-network_4_1_AnnP_4 + P-network_4_1_AnnP_5 + P-network_4_1_AnnP_6 + P-network_4_1_AnnP_7 + P-network_5_6_AnnP_6 + P-network_5_6_AnnP_5 + P-network_5_6_AnnP_4 + P-network_5_6_AnnP_3 + P-network_5_6_AnnP_2 + P-network_5_6_AnnP_1 + P-network_4_0_AI_1 + P-network_4_0_AI_2 + P-network_4_0_AI_3 + P-network_4_0_AI_4 + P-network_4_0_AI_5 + P-network_4_0_AI_6 + P-network_4_0_AI_7 + P-network_4_3_RI_1 + P-network_4_3_RI_2 + P-network_4_3_RI_3 + P-network_4_3_RI_4 + P-network_4_3_RI_5 + P-network_4_3_RI_6 + P-network_4_3_RI_7 + P-network_0_3_RI_7 + P-network_0_3_RI_6 + P-network_0_3_RI_5 + P-network_0_3_RI_4 + P-network_6_4_AskP_1 + P-network_6_4_AskP_2 + P-network_6_4_AskP_3 + P-network_6_4_AskP_4 + P-network_6_4_AskP_5 + P-network_6_4_AskP_6 + P-network_6_4_AskP_7 + P-network_0_3_RI_3 + P-network_0_3_RI_2 + P-network_0_3_RI_1 + P-network_7_6_RI_7 + P-network_7_6_RI_6 + P-network_7_6_RI_5 + P-network_7_6_RI_4 + P-network_7_6_RI_3 + P-network_7_6_RI_2 + P-network_6_2_RI_1 + P-network_6_2_RI_2 + P-network_6_2_RI_3 + P-network_6_2_RI_4 + P-network_6_2_RI_5 + P-network_6_2_RI_6 + P-network_6_2_RI_7 + P-network_7_6_RI_1 + P-network_3_5_AnnP_1 + P-network_3_5_AnnP_2 + P-network_3_5_AnnP_3 + P-network_3_5_AnnP_4 + P-network_3_5_AnnP_5 + P-network_3_5_AnnP_6 + P-network_3_5_AnnP_7 + P-network_0_0_AI_7 + P-network_0_0_AI_6 + P-network_0_0_AI_5 + P-network_0_0_AI_4 + P-network_0_0_AI_3 + P-network_0_0_AI_2 + P-network_0_0_AI_1 + P-network_1_0_AnnP_1 + P-network_1_0_AnnP_2 + P-network_1_0_AnnP_3 + P-network_1_0_AnnP_4 + P-network_1_0_AnnP_5 + P-network_1_0_AnnP_6 + P-network_1_0_AnnP_7 + P-network_7_3_AI_7 + P-network_7_7_RP_1 + P-network_7_7_RP_2 + P-network_7_7_RP_3 + P-network_7_7_RP_4 + P-network_7_7_RP_5 + P-network_7_7_RP_6 + P-network_7_7_RP_7 + P-network_7_3_AI_6 + P-network_0_4_RP_1 + P-network_0_4_RP_2 + P-network_0_4_RP_3 + P-network_0_4_RP_4 + P-network_0_4_RP_5 + P-network_0_4_RP_6 + P-network_0_4_RP_7 + P-network_7_3_AI_5 + P-network_7_3_AI_4 + P-network_7_3_AI_3 + P-network_7_3_AI_2 + P-network_7_3_AI_1 + P-network_3_3_AskP_1 + P-network_3_3_AskP_2 + P-network_3_3_AskP_3 + P-network_3_3_AskP_4 + P-network_3_3_AskP_5 + P-network_3_3_AskP_6 + P-network_3_3_AskP_7 + P-network_2_3_RP_1 + P-network_2_3_RP_2 + P-network_2_3_RP_3 + P-network_2_3_RP_4 + P-network_2_3_RP_5 + P-network_2_3_RP_6 + P-network_5_7_RI_7 + P-network_2_3_RP_7 + P-network_5_7_RI_6 + P-network_5_7_RI_5 + P-network_5_7_RI_4 + P-network_5_7_RI_3 + P-network_5_7_RI_2 + P-network_5_7_RI_1 + P-network_5_4_AI_7 + P-network_5_4_AI_6 + P-network_5_4_AI_5 + P-network_5_4_AI_4 + P-network_5_4_AI_3 + P-network_5_4_AI_2 + P-network_5_4_AI_1 + P-network_0_4_AnnP_1 + P-network_0_4_AnnP_2 + P-network_0_4_AnnP_3 + P-network_0_4_AnnP_4 + P-network_0_4_AnnP_5 + P-network_0_4_AnnP_6 + P-network_0_4_AnnP_7 + P-network_1_4_AskP_7 + P-network_4_2_RP_1 + P-network_4_2_RP_2 + P-network_4_2_RP_3 + P-network_4_2_RP_4 + P-network_4_2_RP_5 + P-network_4_2_RP_6 + P-network_4_2_RP_7 + P-network_1_4_AskP_6 + P-network_6_7_AI_1 + P-network_6_7_AI_2 + P-network_6_7_AI_3 + P-network_6_7_AI_4 + P-network_6_7_AI_5 + P-network_6_7_AI_6 + P-network_6_7_AI_7 + P-network_1_4_AskP_5 + P-network_1_4_AskP_4 + P-network_1_4_AskP_3 + P-network_1_4_AskP_2 + P-network_1_4_AskP_1 + P-network_7_5_AnnP_1 + P-network_7_5_AnnP_2 + P-network_7_5_AnnP_3 + P-network_7_5_AnnP_4 + P-network_7_5_AnnP_5 + P-network_7_5_AnnP_6 + P-network_7_5_AnnP_7 + P-network_6_1_RP_1 + P-network_6_1_RP_2 + P-network_6_1_RP_3 + P-network_6_1_RP_4 + P-network_6_1_RP_5 + P-network_6_1_RP_6 + P-network_6_1_RP_7 + P-network_2_7_AskP_1 + P-network_2_7_AskP_2 + P-network_2_7_AskP_3 + P-network_2_7_AskP_4 + P-network_2_7_AskP_5 + P-network_2_7_AskP_6 + P-network_2_7_AskP_7 + P-network_1_3_AI_1 + P-network_1_3_AI_2 + P-network_1_3_AI_3 + P-network_1_3_AI_4 + P-network_1_3_AI_5 + P-network_1_3_AI_6 + P-network_1_3_AI_7 + P-network_1_6_RI_1 + P-network_1_6_RI_2 + P-network_1_6_RI_3 + P-network_1_6_RI_4 + P-network_1_6_RI_5 + P-network_1_6_RI_6 + P-network_1_6_RI_7 + P-network_6_2_AnnP_7 + P-network_5_0_AnnP_1 + P-network_5_0_AnnP_2 + P-network_5_0_AnnP_3 + P-network_5_0_AnnP_4 + P-network_5_0_AnnP_5 + P-network_5_0_AnnP_6 + P-network_5_0_AnnP_7 + P-network_6_2_AnnP_6 + P-network_6_2_AnnP_5 + P-network_6_2_AnnP_4 + P-network_6_2_AnnP_3 + P-network_6_2_AnnP_2 + P-network_6_2_AnnP_1 + P-network_3_2_AI_1 + P-network_3_2_AI_2 + P-network_3_2_AI_3 + P-network_3_2_AI_4 + P-network_3_2_AI_5 + P-network_3_2_AI_6 + P-network_3_2_AI_7 + P-network_0_2_AskP_1 + P-network_0_2_AskP_2 + P-network_0_2_AskP_3 + P-network_0_2_AskP_4 + P-network_0_2_AskP_5 + P-network_0_2_AskP_6 + P-network_0_2_AskP_7 + P-network_3_5_AI_7 + P-network_3_5_AI_6 + P-network_3_5_AI_5 + P-network_3_5_AI_4 + P-network_3_5_RI_1 + P-network_3_5_RI_2 + P-network_3_5_RI_3 + P-network_3_5_RI_4 + P-network_3_5_RI_5 + P-network_3_5_RI_6 + P-network_3_5_RI_7 + P-network_3_5_AI_3 + P-network_7_3_AskP_1 + P-network_7_3_AskP_2 + P-network_7_3_AskP_3 + P-network_7_3_AskP_4 + P-network_7_3_AskP_5 + P-network_7_3_AskP_6 + P-network_7_3_AskP_7 + P-network_3_5_AI_2 + P-network_5_1_AI_1 + P-network_5_1_AI_2 + P-network_3_5_AI_1 + P-network_5_1_AI_3 + P-network_5_1_AI_4 + P-network_5_1_AI_5 + P-network_5_1_AI_6 + P-network_5_1_AI_7 + P-network_5_4_RI_1 + P-network_5_4_RI_2 + P-network_5_4_RI_3 + P-network_5_4_RI_4 + P-network_5_4_RI_5 + P-network_5_4_RI_6 + P-network_5_4_RI_7 + P-network_1_0_RP_7 + P-network_1_0_RP_6 + P-network_1_0_RP_5 + P-network_1_0_RP_4 + P-network_1_0_RP_3 + P-network_1_0_RP_2 + P-network_1_0_RP_1 + P-network_4_4_AnnP_1 + P-network_4_4_AnnP_2 + P-network_4_4_AnnP_3 + P-network_4_4_AnnP_4 + P-network_4_4_AnnP_5 + P-network_4_4_AnnP_6 + P-network_4_4_AnnP_7 + P-network_1_6_AI_7 + P-network_7_0_AI_1 + P-network_1_6_AI_6 + P-network_7_0_AI_2 + P-network_1_6_AI_5 + P-network_7_0_AI_3 + P-network_1_6_AI_4 + P-network_7_0_AI_4 + P-network_1_6_AI_3 + P-network_7_0_AI_5 + P-network_1_6_AI_2 + P-network_7_0_AI_6 + P-network_1_6_AI_1 + P-network_7_0_AI_7 + P-network_7_3_RI_1 + P-network_7_3_RI_2 + P-network_7_3_RI_3 + P-network_7_3_RI_4 + P-network_7_3_RI_5 + P-network_7_3_RI_6 + P-network_7_3_RI_7 + P-network_2_0_AskP_7 + P-network_0_0_RI_1 + P-network_0_0_RI_2 + P-network_0_0_RI_3 + P-network_0_0_RI_4 + P-network_0_0_RI_5 + P-network_0_0_RI_6 + P-network_0_0_RI_7 + P-network_2_0_AskP_6 + P-network_6_7_AskP_1 + P-network_6_7_AskP_2 + P-network_6_7_AskP_3 + P-network_6_7_AskP_4 + P-network_6_7_AskP_5 + P-network_6_7_AskP_6 + P-network_6_7_AskP_7 + P-network_2_0_AskP_5 + P-network_2_0_AskP_4 + P-network_2_0_AskP_3 + P-network_2_0_AskP_2 + P-network_2_0_AskP_1 + P-network_4_2_AskP_1 + P-network_4_2_AskP_2 + P-network_4_2_AskP_3 + P-network_4_2_AskP_4 + P-network_4_2_AskP_5 + P-network_4_2_AskP_6 + P-network_4_2_AskP_7 + P-network_6_4_RP_7 + P-network_6_4_RP_6 + P-network_6_4_RP_5 + P-network_6_4_RP_4 + P-network_6_4_RP_3 + P-network_1_5_RP_1 + P-network_1_5_RP_2 + P-network_1_5_RP_3 + P-network_1_5_RP_4 + P-network_1_5_RP_5 + P-network_1_5_RP_6 + P-network_1_5_RP_7 + P-network_6_4_RP_2 + P-network_6_4_RP_1 + P-network_1_6_AnnP_7 + P-network_1_6_AnnP_6 + P-network_1_6_AnnP_5 + P-network_1_3_AnnP_1 + P-network_1_3_AnnP_2 + P-network_1_3_AnnP_3 + P-network_1_3_AnnP_4 + P-network_1_3_AnnP_5 + P-network_1_3_AnnP_6 + P-network_1_3_AnnP_7 + P-network_3_4_RP_1 + P-network_3_4_RP_2 + P-network_3_4_RP_3 + P-network_3_4_RP_4 + P-network_3_4_RP_5 + P-network_3_4_RP_6 + P-network_3_4_RP_7 + P-network_1_6_AnnP_4 + P-network_1_6_AnnP_3 + P-network_1_6_AnnP_2 + P-network_1_6_AnnP_1 + P-network_3_6_AskP_1 + P-network_3_6_AskP_2 + P-network_3_6_AskP_3 + P-network_3_6_AskP_4 + P-network_3_6_AskP_5 + P-network_3_6_AskP_6 + P-network_3_6_AskP_7 + P-network_5_3_RP_1 + P-network_5_3_RP_2 + P-network_5_3_RP_3 + P-network_5_3_RP_4 + P-network_5_3_RP_5 + P-network_5_3_RP_6 + P-network_5_3_RP_7 + P-network_0_5_AI_1 + P-network_0_5_AI_2 + P-network_0_5_AI_3 + P-network_0_5_AI_4 + P-network_0_5_AI_5 + P-network_0_5_AI_6 + P-network_0_5_AI_7 + P-network_0_7_AnnP_1 + P-network_0_7_AnnP_2 + P-network_0_7_AnnP_3 + P-network_0_7_AnnP_4 + P-network_0_7_AnnP_5 + P-network_0_7_AnnP_6 + P-network_0_7_AnnP_7 + P-network_7_2_RP_1 + P-network_7_2_RP_2 + P-network_7_2_RP_3 + P-network_7_2_RP_4 + P-network_7_2_RP_5 + P-network_7_2_RP_6 + P-network_7_2_RP_7 + P-network_1_1_AskP_1 + P-network_1_1_AskP_2 + P-network_1_1_AskP_3 + P-network_1_1_AskP_4 + P-network_1_1_AskP_5 + P-network_1_1_AskP_6 + P-network_1_1_AskP_7 + P-network_2_4_AI_1 + P-network_2_4_AI_2 + P-network_2_4_AI_3 + P-network_4_5_RP_7 + P-network_2_4_AI_4 + P-network_4_5_RP_6 + P-network_2_4_AI_5 + P-network_4_5_RP_5 + P-network_2_4_AI_6 + P-network_4_5_RP_4 + P-network_2_4_AI_7 + P-network_4_5_RP_3 + P-network_2_7_RI_1 + P-network_2_7_RI_2 + P-network_2_7_RI_3 + P-network_2_7_RI_4 + P-network_2_7_RI_5 + P-network_2_7_RI_6 + P-network_2_7_RI_7 + P-network_4_5_RP_2 + P-network_4_5_RP_1 + P-network_4_5_AskP_7 + P-network_4_5_AskP_6 + P-network_4_5_AskP_5 + P-network_4_5_AskP_4 + P-network_4_5_AskP_3 + P-network_4_5_AskP_2 + P-network_4_5_AskP_1 + P-network_4_3_AI_1 + P-network_4_3_AI_2 + P-network_4_3_AI_3 + P-network_4_3_AI_4 + P-network_4_3_AI_5 + P-network_4_3_AI_6 + P-network_4_3_AI_7 + P-network_4_6_RI_1 + P-network_4_6_RI_2 + P-network_4_6_RI_3 + P-network_4_6_RI_4 + P-network_4_6_RI_5 + P-network_4_6_RI_6 + P-network_4_6_RI_7 + P-network_5_3_AnnP_1 + P-network_5_3_AnnP_2 + P-network_5_3_AnnP_3 + P-network_5_3_AnnP_4 + P-network_5_3_AnnP_5 + P-network_5_3_AnnP_6 + P-network_5_3_AnnP_7 + P-network_6_2_AI_1 + P-network_6_2_AI_2 + P-network_6_2_AI_3 + P-network_6_2_AI_4 + P-network_6_2_AI_5 + P-network_6_2_AI_6 + P-network_6_2_AI_7 + P-network_0_5_AskP_1 + P-network_0_5_AskP_2 + P-network_0_5_AskP_3 + P-network_0_5_AskP_4 + P-network_0_5_AskP_5 + P-network_0_5_AskP_6 + P-network_0_5_AskP_7 + P-network_6_5_RI_1 + P-network_6_5_RI_2 + P-network_6_5_RI_3 + P-network_6_5_RI_4 + P-network_6_5_RI_5 + P-network_6_5_RI_6 + P-network_6_5_RI_7 + P-network_7_6_AskP_1 + P-network_7_6_AskP_2 + P-network_7_6_AskP_3 + P-network_7_6_AskP_4 + P-network_7_6_AskP_5 + P-network_7_6_AskP_6 + P-network_7_6_AskP_7 + P-network_1_1_RI_1 + P-network_1_1_RI_2 + P-network_1_1_RI_3 + P-network_1_1_RI_4 + P-network_1_1_RI_5 + P-network_1_1_RI_6 + P-network_1_1_RI_7 + P-network_2_6_RP_7 + P-network_2_6_RP_6 + P-network_2_6_RP_5 + P-network_2_6_RP_4 + P-network_4_7_AnnP_1 + P-network_4_7_AnnP_2 + P-network_4_7_AnnP_3 + P-network_4_7_AnnP_4 + P-network_4_7_AnnP_5 + P-network_4_7_AnnP_6 + P-network_4_7_AnnP_7 + P-network_2_6_RP_3 + P-network_5_1_AskP_1 + P-network_5_1_AskP_2 + P-network_5_1_AskP_3 + P-network_5_1_AskP_4 + P-network_5_1_AskP_5 + P-network_5_1_AskP_6 + P-network_5_1_AskP_7 + P-network_2_6_RP_2 + P-network_2_6_RP_1 + P-network_2_2_AnnP_7 + P-network_2_2_AnnP_6 + P-network_2_2_AnnP_5 + P-network_2_2_AnnP_4 + P-network_2_2_AnnP_3 + P-network_2_2_AnnP_2 + P-network_3_0_RI_1 + P-network_3_0_RI_2 + P-network_2_2_AnnP_1 + P-network_3_0_RI_3 + P-network_0_7_RP_1 + P-network_3_0_RI_4 + P-network_0_7_RP_2 + P-network_3_0_RI_5 + P-network_0_7_RP_3 + P-network_3_0_RI_6 + P-network_0_7_RP_4 + P-network_3_0_RI_7 + P-network_0_7_RP_5 + P-network_0_7_RP_6 + P-network_0_7_RP_7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: after: (P-network_2_2_AnnP_0 + P-network_0_7_RP_0 + P-network_3_0_RI_0 + P-network_2_6_RP_0 + P-network_5_1_AskP_0 + P-network_4_7_AnnP_0 + P-network_1_1_RI_0 + P-network_4_4_AnsP_7 + P-network_4_4_AnsP_6 + P-network_4_4_AnsP_5 + P-network_4_4_AnsP_4 + P-network_4_4_AnsP_3 + P-network_4_4_AnsP_2 + P-network_4_4_AnsP_1 + P-network_4_4_AnsP_0 + P-network_7_6_AskP_0 + P-network_6_5_RI_0 + P-network_0_5_AskP_0 + P-network_6_2_AI_0 + P-network_5_3_AnnP_0 + P-network_4_6_RI_0 + P-network_4_5_AskP_0 + P-network_4_3_AI_0 + P-network_5_0_AnsP_7 + P-network_5_0_AnsP_6 + P-network_5_0_AnsP_5 + P-network_5_0_AnsP_4 + P-network_5_0_AnsP_3 + P-network_5_0_AnsP_2 + P-network_4_5_RP_0 + P-network_5_0_AnsP_1 + P-network_5_0_AnsP_0 + P-network_2_7_RI_0 + P-network_2_4_AI_0 + P-network_1_1_AskP_0 + P-network_7_2_RP_0 + P-network_0_7_AnnP_0 + P-network_7_5_AnsP_7 + P-network_7_5_AnsP_6 + P-network_7_5_AnsP_5 + P-network_7_5_AnsP_4 + P-network_7_5_AnsP_3 + P-network_7_5_AnsP_2 + P-network_7_5_AnsP_1 + P-network_7_5_AnsP_0 + P-network_1_3_AnsP_0 + P-network_1_3_AnsP_1 + P-network_1_3_AnsP_2 + P-network_1_3_AnsP_3 + P-network_1_3_AnsP_4 + P-network_1_3_AnsP_5 + P-network_1_3_AnsP_6 + P-network_1_3_AnsP_7 + P-network_0_4_AnsP_7 + P-network_0_4_AnsP_6 + P-network_0_4_AnsP_5 + P-network_0_4_AnsP_4 + P-network_0_4_AnsP_3 + P-network_0_4_AnsP_2 + P-network_0_4_AnsP_1 + P-network_0_4_AnsP_0 + P-network_0_5_AI_0 + P-network_5_3_RP_0 + P-network_3_6_AskP_0 + P-network_1_6_AnnP_0 + P-network_3_4_RP_0 + P-network_1_3_AnnP_0 + P-network_1_0_AnsP_7 + P-network_1_0_AnsP_6 + P-network_1_0_AnsP_5 + P-network_1_0_AnsP_4 + P-network_1_0_AnsP_3 + P-network_1_0_AnsP_2 + P-network_6_4_RP_0 + P-network_1_0_AnsP_1 + P-network_1_0_AnsP_0 + P-network_1_5_RP_0 + P-network_4_2_AskP_0 + P-network_3_5_AnsP_7 + P-network_3_5_AnsP_6 + P-network_3_5_AnsP_5 + P-network_2_0_AskP_0 + P-network_3_5_AnsP_4 + P-network_3_5_AnsP_3 + P-network_3_5_AnsP_2 + P-network_3_5_AnsP_1 + P-network_3_5_AnsP_0 + P-network_6_7_AskP_0 + P-network_0_0_RI_0 + P-network_7_3_RI_0 + P-network_1_6_AI_0 + P-network_7_0_AI_0 + P-network_4_4_AnnP_0 + P-network_1_0_RP_0 + P-network_5_4_RI_0 + P-network_4_1_AnsP_7 + P-network_4_1_AnsP_6 + P-network_4_1_AnsP_5 + P-network_4_1_AnsP_4 + P-network_4_1_AnsP_3 + P-network_4_1_AnsP_2 + P-network_4_1_AnsP_1 + P-network_3_5_AI_0 + P-network_4_1_AnsP_0 + P-network_5_1_AI_0 + P-network_0_7_AnsP_0 + P-network_7_3_AskP_0 + P-network_0_7_AnsP_1 + P-network_3_5_RI_0 + P-network_0_7_AnsP_2 + P-network_0_7_AnsP_3 + P-network_0_7_AnsP_4 + P-network_0_7_AnsP_5 + P-network_0_7_AnsP_6 + P-network_0_7_AnsP_7 + P-network_0_2_AskP_0 + P-network_3_2_AI_0 + P-network_6_6_AnsP_7 + P-network_6_6_AnsP_6 + P-network_6_2_AnnP_0 + P-network_6_6_AnsP_5 + P-network_6_6_AnsP_4 + P-network_6_6_AnsP_3 + P-network_6_6_AnsP_2 + P-network_6_6_AnsP_1 + P-network_6_6_AnsP_0 + P-network_5_0_AnnP_0 + P-network_1_6_RI_0 + P-network_1_3_AI_0 + P-network_2_7_AskP_0 + P-network_6_1_RP_0 + P-network_7_5_AnnP_0 + P-network_1_4_AskP_0 + P-network_6_7_AI_0 + P-network_4_2_RP_0 + P-network_0_4_AnnP_0 + P-network_5_4_AI_0 + P-network_7_2_AnsP_7 + P-network_7_2_AnsP_6 + P-network_7_2_AnsP_5 + P-network_7_2_AnsP_4 + P-network_7_2_AnsP_3 + P-network_7_2_AnsP_2 + P-network_7_2_AnsP_1 + P-network_7_2_AnsP_0 + P-network_0_1_AnsP_7 + P-network_0_1_AnsP_6 + P-network_0_1_AnsP_5 + P-network_0_1_AnsP_4 + P-network_0_1_AnsP_3 + P-network_0_1_AnsP_2 + P-network_0_1_AnsP_1 + P-network_5_7_RI_0 + P-network_0_1_AnsP_0 + P-network_5_3_AnsP_0 + P-network_5_3_AnsP_1 + P-network_5_3_AnsP_2 + P-network_5_3_AnsP_3 + P-network_5_3_AnsP_4 + P-network_5_3_AnsP_5 + P-network_5_3_AnsP_6 + P-network_5_3_AnsP_7 + P-network_2_3_RP_0 + P-network_3_3_AskP_0 + P-network_2_6_AnsP_7 + P-network_2_6_AnsP_6 + P-network_2_6_AnsP_5 + P-network_7_3_AI_0 + P-network_2_6_AnsP_4 + P-network_2_6_AnsP_3 + P-network_2_6_AnsP_2 + P-network_2_6_AnsP_1 + P-network_2_6_AnsP_0 + P-network_0_4_RP_0 + P-network_7_7_RP_0 + P-network_0_0_AI_0 + P-network_1_0_AnnP_0 + P-network_3_5_AnnP_0 + P-network_7_6_RI_0 + P-network_6_2_RI_0 + P-network_3_2_AnsP_7 + P-network_3_2_AnsP_6 + P-network_3_2_AnsP_5 + P-network_3_2_AnsP_4 + P-network_3_2_AnsP_3 + P-network_0_3_RI_0 + P-network_3_2_AnsP_2 + P-network_3_2_AnsP_1 + P-network_3_2_AnsP_0 + P-network_6_4_AskP_0 + P-network_4_3_RI_0 + P-network_4_0_AI_0 + P-network_5_7_AnsP_7 + P-network_5_7_AnsP_6 + P-network_5_6_AnnP_0 + P-network_5_7_AnsP_5 + P-network_5_7_AnsP_4 + P-network_5_7_AnsP_3 + P-network_5_7_AnsP_2 + P-network_5_7_AnsP_1 + P-network_5_7_AnsP_0 + P-network_4_1_AnnP_0 + P-network_6_0_AskP_0 + P-network_2_4_RI_0 + P-network_2_1_AI_0 + P-network_7_0_AskP_0 + P-network_6_6_AnnP_0 + P-network_0_5_RI_0 + P-network_0_2_AI_0 + P-network_7_5_AI_0 + P-network_6_3_AnsP_7 + P-network_6_3_AnsP_6 + P-network_6_3_AnsP_5 + P-network_6_3_AnsP_4 + P-network_6_3_AnsP_3 + P-network_6_3_AnsP_2 + P-network_6_3_AnsP_1 + P-network_6_3_AnsP_0 + P-network_5_0_RP_0 + P-network_5_6_AI_0 + P-network_2_2_RI_0 + P-network_2_4_AskP_0 + P-network_3_1_RP_0 + P-network_7_2_AnnP_0 + P-network_3_7_AI_0 + P-network_1_7_AnsP_7 + P-network_1_7_AnsP_6 + P-network_1_7_AnsP_5 + P-network_1_7_AnsP_4 + P-network_1_7_AnsP_3 + P-network_3_1_AnnP_0 + P-network_1_7_AnsP_2 + P-network_1_7_AnsP_1 + P-network_1_7_AnsP_0 + P-network_1_2_RP_0 + P-network_0_1_AnnP_0 + P-network_4_7_AnsP_0 + P-network_4_7_AnsP_1 + P-network_4_7_AnsP_2 + P-network_4_7_AnsP_3 + P-network_4_7_AnsP_4 + P-network_4_7_AnsP_5 + P-network_4_7_AnsP_6 + P-network_4_7_AnsP_7 + P-network_4_1_RI_0 + P-network_6_6_RP_0 + P-network_3_0_AskP_0 + P-network_2_6_AnnP_0 + P-network_2_3_AnsP_7 + P-network_2_3_AnsP_6 + P-network_2_3_AnsP_5 + P-network_2_3_AnsP_4 + P-network_2_3_AnsP_3 + P-network_2_3_AnsP_2 + P-network_2_3_AnsP_1 + P-network_2_3_AnsP_0 + P-network_4_7_RP_0 + P-network_7_0_RI_0 + P-network_5_5_AskP_0 + P-network_5_1_RI_0 + P-network_3_2_AnnP_0 + P-network_5_4_AskP_0 + P-network_3_2_RI_0 + P-network_6_1_AskP_0 + P-network_5_7_AnnP_0 + P-network_6_0_RI_0 + P-network_3_7_RP_0 + P-network_1_3_RI_0 + P-network_1_0_AI_0 + P-network_5_4_AnsP_7 + P-network_5_4_AnsP_6 + P-network_5_4_AnsP_5 + P-network_5_4_AnsP_4 + P-network_5_4_AnsP_3 + P-network_5_4_AnsP_2 + P-network_5_4_AnsP_1 + P-network_5_4_AnsP_0 + P-network_6_7_RI_0 + P-network_2_2_AnsP_0 + P-network_2_2_AnsP_1 + P-network_2_2_AnsP_2 + P-network_2_2_AnsP_3 + P-network_2_2_AnsP_4 + P-network_2_2_AnsP_5 + P-network_2_2_AnsP_6 + P-network_2_2_AnsP_7 + P-network_6_4_AI_0 + P-network_1_5_AskP_0 + P-network_6_3_AnnP_0 + P-network_4_5_AI_0 + P-network_6_0_AnsP_7 + P-network_6_0_AnsP_6 + P-network_6_0_AnsP_5 + P-network_6_0_AnsP_4 + P-network_6_0_AnsP_3 + P-network_6_0_AnsP_2 + P-network_6_0_AnsP_1 + P-network_6_0_AnsP_0 + P-network_2_0_RP_0 + P-network_2_6_AI_0 + P-network_2_1_AskP_0 + P-network_0_1_RP_0 + P-network_7_4_RP_0 + P-network_2_5_AnnP_0 + P-network_1_7_AnnP_0 + P-network_0_7_AI_0 + P-network_5_6_RP_0 + P-network_1_4_AnsP_7 + P-network_1_4_AnsP_6 + P-network_1_4_AnsP_5 + P-network_1_4_AnsP_4 + P-network_1_4_AnsP_3 + P-network_1_4_AnsP_2 + P-network_1_4_AnsP_1 + P-network_1_4_AnsP_0 + P-network_5_5_RP_0 + P-network_4_6_AskP_0 + P-network_3_6_RP_0 + P-network_0_0_AnnP_0 + P-network_2_3_AnnP_0 + P-network_2_0_AnsP_7 + P-network_2_0_AnsP_6 + P-network_2_0_AnsP_5 + P-network_2_0_AnsP_4 + P-network_7_5_RP_0 + P-network_2_0_AnsP_3 + P-network_2_0_AnsP_2 + P-network_2_0_AnsP_1 + P-network_2_0_AnsP_0 + P-network_1_7_RP_0 + P-network_4_0_RI_0 + P-network_0_2_RP_0 + P-network_1_6_AnsP_0 + P-network_1_6_AnsP_1 + P-network_1_6_AnsP_2 + P-network_1_6_AnsP_3 + P-network_1_6_AnsP_4 + P-network_1_6_AnsP_5 + P-network_1_6_AnsP_6 + P-network_1_6_AnsP_7 + P-network_5_2_AskP_0 + P-network_2_7_AI_0 + P-network_2_1_RI_0 + P-network_4_5_AnsP_7 + P-network_4_5_AnsP_6 + P-network_4_5_AnsP_5 + P-network_4_5_AnsP_4 + P-network_4_5_AnsP_3 + P-network_4_5_AnsP_2 + P-network_4_5_AnsP_1 + P-network_4_5_AnsP_0 + P-network_7_7_AskP_0 + P-network_0_2_RI_0 + P-network_7_5_RI_0 + P-network_0_6_AskP_0 + P-network_7_2_AI_0 + P-network_5_4_AnnP_0 + P-network_7_1_AnnP_0 + P-network_5_6_RI_0 + P-network_5_3_AI_0 + P-network_5_1_AnsP_7 + P-network_5_1_AnsP_6 + P-network_5_1_AnsP_5 + P-network_5_1_AnsP_4 + P-network_5_1_AnsP_3 + P-network_5_1_AnsP_2 + P-network_5_1_AnsP_1 + P-network_5_1_AnsP_0 + P-network_3_7_RI_0 + P-network_2_1_RP_0 + P-network_3_4_AI_0 + P-network_1_2_AskP_0 + P-network_7_6_AnsP_7 + P-network_2_3_AskP_0 + P-network_7_6_AnsP_6 + P-network_7_6_AnsP_5 + P-network_7_6_AnsP_4 + P-network_7_6_AnsP_3 + P-network_7_6_AnsP_2 + P-network_7_6_AnsP_1 + P-network_7_6_AnsP_0 + P-network_4_6_AI_0 + P-network_6_0_AnnP_0 + P-network_0_5_AnsP_7 + P-network_0_5_AnsP_6 + P-network_0_5_AnsP_5 + P-network_0_5_AnsP_4 + P-network_0_5_AnsP_3 + P-network_0_5_AnsP_2 + P-network_0_5_AnsP_1 + P-network_0_5_AnsP_0 + P-network_4_0_RP_0 + P-network_1_5_AI_0 + P-network_6_3_RP_0 + P-network_3_7_AskP_0 + P-network_6_2_AnsP_0 + P-network_6_2_AnsP_1 + P-network_6_2_AnsP_2 + P-network_6_2_AnsP_3 + P-network_6_2_AnsP_4 + P-network_6_2_AnsP_5 + P-network_6_2_AnsP_6 + P-network_6_2_AnsP_7 + P-network_4_4_RP_0 + P-network_6_5_AI_0 + P-network_1_4_AnnP_0 + P-network_1_1_AnsP_7 + P-network_1_1_AnsP_6 + P-network_1_1_AnsP_5 + P-network_1_1_AnsP_4 + P-network_1_1_AnsP_3 + P-network_1_1_AnsP_2 + P-network_1_1_AnsP_1 + P-network_6_5_AnnP_0 + P-network_1_1_AnsP_0 + P-network_2_5_RP_0 + P-network_4_3_AskP_0 + P-network_0_6_RP_0 + P-network_1_7_AskP_0 + P-network_3_6_AnsP_7 + P-network_3_6_AnsP_6 + P-network_3_6_AnsP_5 + P-network_3_6_AnsP_4 + P-network_3_6_AnsP_3 + P-network_3_6_AnsP_2 + P-network_3_6_AnsP_1 + P-network_1_1_AI_0 + P-network_3_6_AnsP_0 + P-network_2_0_AnnP_0 + P-network_1_0_RI_0 + P-network_4_5_AnnP_0 + P-network_1_4_RI_0 + P-network_6_4_RI_0 + P-network_4_2_AnsP_7 + P-network_4_2_AnsP_6 + P-network_4_2_AnsP_5 + P-network_4_2_AnsP_4 + P-network_4_2_AnsP_3 + P-network_4_2_AnsP_2 + P-network_4_2_AnsP_1 + P-network_4_0_AnnP_0 + P-network_4_2_AnsP_0 + P-network_6_1_AI_0 + P-network_7_4_AskP_0 + P-network_4_5_RI_0 + P-network_5_6_AnsP_0 + P-network_5_6_AnsP_1 + P-network_5_6_AnsP_2 + P-network_5_6_AnsP_3 + P-network_5_6_AnsP_4 + P-network_5_6_AnsP_5 + P-network_5_6_AnsP_6 + P-network_5_6_AnsP_7 + P-network_0_3_AskP_0 + P-network_3_0_AI_0 + P-network_4_2_AI_0 + P-network_6_7_AnsP_7 + P-network_6_7_AnsP_6 + P-network_6_7_AnsP_5 + P-network_6_7_AnsP_4 + P-network_6_7_AnsP_3 + P-network_6_7_AnsP_2 + P-network_6_7_AnsP_1 + P-network_6_7_AnsP_0 + P-network_5_1_AnnP_0 + P-network_3_3_RI_0 + P-network_2_6_RI_0 + P-network_2_3_AI_0 + P-network_7_1_RP_0 + P-network_7_6_AnnP_0 + P-network_0_7_RI_0 + P-network_0_4_AI_0 + P-network_7_7_AI_0 + P-network_5_2_RP_0 + P-network_0_5_AnnP_0 + P-network_7_3_AnsP_7 + P-network_7_3_AnsP_6 + P-network_6_3_AskP_0 + P-network_7_3_AnsP_5 + P-network_7_3_AnsP_4 + P-network_7_3_AnsP_3 + P-network_7_3_AnsP_2 + P-network_7_3_AnsP_1 + P-network_7_3_AnsP_0 + P-network_0_2_AnsP_7 + P-network_0_2_AnsP_6 + P-network_0_2_AnsP_5 + P-network_0_2_AnsP_4 + P-network_0_2_AnsP_3 + P-network_0_2_AnsP_2 + P-network_0_2_AnsP_1 + P-network_0_2_AnsP_0 + P-network_3_1_AnsP_0 + P-network_3_1_AnsP_1 + P-network_3_1_AnsP_2 + P-network_3_1_AnsP_3 + P-network_3_1_AnsP_4 + P-network_3_1_AnsP_5 + P-network_3_1_AnsP_6 + P-network_3_1_AnsP_7 + P-network_3_3_RP_0 + P-network_5_2_RI_0 + P-network_3_4_AskP_0 + P-network_2_7_AnsP_7 + P-network_2_7_AnsP_6 + P-network_2_7_AnsP_5 + P-network_2_7_AnsP_4 + P-network_2_7_AnsP_3 + P-network_2_7_AnsP_2 + P-network_2_7_AnsP_1 + P-network_2_7_AnsP_0 + P-network_1_4_RP_0 + P-network_1_1_AnnP_0 + P-network_3_4_AnnP_0 + P-network_4_0_AskP_0 + P-network_3_6_AnnP_0 + P-network_7_2_RI_0 + P-network_3_3_AnsP_7 + P-network_3_3_AnsP_6 + P-network_7_1_RI_0 + P-network_3_3_AnsP_5 + P-network_3_3_AnsP_4 + P-network_3_3_AnsP_3 + P-network_3_3_AnsP_2 + P-network_3_3_AnsP_1 + P-network_3_3_AnsP_0 + P-network_6_5_AskP_0 + P-network_5_3_RI_0 + P-network_5_0_AI_0 + P-network_4_2_AnnP_0 + P-network_3_4_RI_0 + P-network_3_1_AI_0 + P-network_7_1_AskP_0 + P-network_6_7_AnnP_0 + P-network_1_5_RI_0 + P-network_0_0_AskP_0 + P-network_1_2_AI_0 + P-network_6_4_AnsP_7 + P-network_6_4_AnsP_6 + P-network_6_4_AnsP_5 + P-network_6_4_AnsP_4 + P-network_6_4_AnsP_3 + P-network_6_4_AnsP_2 + P-network_6_4_AnsP_1 + P-network_6_4_AnsP_0 + P-network_6_0_RP_0 + P-network_6_6_AI_0 + P-network_2_5_AskP_0 + P-network_4_1_RP_0 + P-network_7_3_AnnP_0 + P-network_4_7_AI_0 + P-network_2_2_RP_0 + P-network_0_2_AnnP_0 + P-network_7_0_AnsP_7 + P-network_7_0_AnsP_6 + P-network_7_0_AnsP_5 + P-network_7_0_AnsP_4 + P-network_7_0_AnsP_3 + P-network_5_7_AskP_0 + P-network_7_0_AnsP_2 + P-network_7_0_AnsP_1 + P-network_7_0_AnsP_0 + P-network_6_7_RP_0 + P-network_0_3_RP_0 + P-network_7_6_RP_0 + P-network_3_1_AskP_0 + P-network_2_5_AnsP_0 + P-network_2_5_AnsP_1 + P-network_2_5_AnsP_2 + P-network_2_5_AnsP_3 + P-network_2_5_AnsP_4 + P-network_2_5_AnsP_5 + P-network_2_5_AnsP_6 + P-network_2_5_AnsP_7 + P-network_2_7_AnnP_0 + P-network_2_4_AnsP_7 + P-network_2_4_AnsP_6 + P-network_2_4_AnsP_5 + P-network_2_4_AnsP_4 + P-network_2_4_AnsP_3 + P-network_2_4_AnsP_2 + P-network_3_2_AskP_0 + P-network_2_4_AnsP_1 + P-network_2_4_AnsP_0 + P-network_5_7_RP_0 + P-network_1_3_RP_0 + P-network_5_6_AskP_0 + P-network_0_0_AnsP_0 + P-network_0_0_AnsP_1 + P-network_0_0_AnsP_2 + P-network_0_0_AnsP_3 + P-network_0_0_AnsP_4 + P-network_0_0_AnsP_5 + P-network_0_0_AnsP_6 + P-network_0_0_AnsP_7 + P-network_6_1_RI_0 + P-network_3_3_AnnP_0 + P-network_7_1_AnsP_0 + P-network_7_1_AnsP_1 + P-network_7_1_AnsP_2 + P-network_7_1_AnsP_3 + P-network_7_1_AnsP_4 + P-network_7_1_AnsP_5 + P-network_7_1_AnsP_6 + P-network_7_1_AnsP_7 + P-network_0_3_AnnP_0 + P-network_4_2_RI_0 + P-network_3_0_AnsP_7 + P-network_3_0_AnsP_6 + P-network_3_0_AnsP_5 + P-network_3_0_AnsP_4 + P-network_3_0_AnsP_3 + P-network_3_0_AnsP_2 + P-network_3_0_AnsP_1 + P-network_3_0_AnsP_0 + P-network_6_2_AskP_0 + P-network_3_2_RP_0 + P-network_2_3_RI_0 + P-network_5_7_AI_0 + P-network_2_0_AI_0 + P-network_5_5_AnsP_7 + P-network_5_5_AnsP_6 + P-network_5_5_AnsP_5 + P-network_5_5_AnsP_4 + P-network_5_5_AnsP_3 + P-network_5_5_AnsP_2 + P-network_5_5_AnsP_1 + P-network_5_5_AnsP_0 + P-network_0_4_RI_0 + P-network_7_7_RI_0 + P-network_0_1_AI_0 + P-network_7_4_AI_0 + P-network_1_6_AskP_0 + P-network_6_4_AnnP_0 + P-network_5_5_AI_0 + P-network_6_1_AnsP_7 + P-network_7_4_AnnP_0 + P-network_6_1_AnsP_6 + P-network_6_1_AnsP_5 + P-network_6_1_AnsP_4 + P-network_6_1_AnsP_3 + P-network_6_1_AnsP_2 + P-network_6_1_AnsP_1 + P-network_6_1_AnsP_0 + P-network_3_0_RP_0 + P-network_3_6_AI_0 + P-network_5_1_RP_0 + P-network_2_2_AskP_0 + P-network_1_1_RP_0 + P-network_7_0_AnnP_0 + P-network_2_6_AskP_0 + P-network_1_7_AI_0 + P-network_1_5_AnsP_7 + P-network_7_6_AI_0 + P-network_1_5_AnsP_6 + P-network_1_5_AnsP_5 + P-network_1_5_AnsP_4 + P-network_1_5_AnsP_3 + P-network_1_5_AnsP_2 + P-network_1_5_AnsP_1 + P-network_1_5_AnsP_0 + P-network_0_3_AI_0 + P-network_6_5_RP_0 + P-network_4_7_AskP_0 + P-network_4_6_RP_0 + P-network_2_4_AnnP_0 + P-network_0_6_RI_0 + P-network_2_1_AnsP_7 + P-network_2_1_AnsP_6 + P-network_2_1_AnsP_5 + P-network_2_1_AnsP_4 + P-network_2_1_AnsP_3 + P-network_2_1_AnsP_2 + P-network_2_1_AnsP_1 + P-network_2_1_AnsP_0 + P-network_2_7_RP_0 + P-network_5_0_RI_0 + P-network_7_0_RP_0 + P-network_5_3_AskP_0 + P-network_6_5_AnsP_0 + P-network_6_5_AnsP_1 + P-network_6_5_AnsP_2 + P-network_6_5_AnsP_3 + P-network_6_5_AnsP_4 + P-network_6_5_AnsP_5 + P-network_6_5_AnsP_6 + P-network_6_5_AnsP_7 + P-network_3_1_RI_0 + P-network_4_6_AnsP_7 + P-network_2_2_AI_0 + P-network_4_6_AnsP_6 + P-network_4_6_AnsP_5 + P-network_4_6_AnsP_4 + P-network_4_6_AnsP_3 + P-network_4_6_AnsP_2 + P-network_4_6_AnsP_1 + P-network_4_6_AnsP_0 + P-network_0_1_AskP_0 + P-network_3_0_AnnP_0 + P-network_1_2_RI_0 + P-network_0_7_AskP_0 + P-network_5_5_AnnP_0 + P-network_6_6_RI_0 + P-network_6_3_AI_0 + P-network_5_2_AnsP_7 + P-network_5_2_AnsP_6 + P-network_5_2_AnsP_5 + P-network_5_2_AnsP_4 + P-network_5_2_AnsP_3 + P-network_5_2_AnsP_2 + P-network_5_2_AnsP_1 + P-network_5_2_AnsP_0 + P-network_2_5_RI_0 + P-network_4_7_RI_0 + P-network_4_4_AI_0 + P-network_1_3_AskP_0 + P-network_7_7_AnsP_7 + P-network_7_7_AnsP_6 + P-network_7_7_AnsP_5 + P-network_7_7_AnsP_4 + P-network_7_7_AnsP_3 + P-network_7_7_AnsP_2 + P-network_7_2_AskP_0 + P-network_7_7_AnsP_1 + P-network_7_7_AnsP_0 + P-network_6_1_AnnP_0 + P-network_0_6_AnsP_7 + P-network_0_6_AnsP_6 + P-network_0_6_AnsP_5 + P-network_0_6_AnsP_4 + P-network_0_6_AnsP_3 + P-network_0_6_AnsP_2 + P-network_0_6_AnsP_1 + P-network_0_6_AnsP_0 + P-network_2_5_AI_0 + P-network_0_0_RP_0 + P-network_7_3_RP_0 + P-network_4_1_AI_0 + P-network_4_0_AnsP_0 + P-network_4_0_AnsP_1 + P-network_4_0_AnsP_2 + P-network_4_0_AnsP_3 + P-network_4_0_AnsP_4 + P-network_4_0_AnsP_5 + P-network_4_0_AnsP_6 + P-network_4_0_AnsP_7 + P-network_0_6_AI_0 + P-network_5_4_RP_0 + P-network_1_5_AnnP_0 + P-network_4_4_RI_0 + P-network_1_2_AnsP_7 + P-network_1_2_AnsP_6 + P-network_1_2_AnsP_5 + P-network_1_2_AnsP_4 + P-network_1_2_AnsP_3 + P-network_1_2_AnsP_2 + P-network_1_2_AnsP_1 + P-network_1_2_AnsP_0 + P-network_3_5_RP_0 + P-network_4_4_AskP_0 + P-network_4_3_AnnP_0 + P-network_1_6_RP_0 + P-network_3_7_AnsP_7 + P-network_3_7_AnsP_6 + P-network_6_0_AI_0 + P-network_3_7_AnsP_5 + P-network_3_7_AnsP_4 + P-network_3_7_AnsP_3 + P-network_3_7_AnsP_2 + P-network_3_7_AnsP_1 + P-network_3_7_AnsP_0 + P-network_2_1_AnnP_0 + P-network_2_0_RI_0 + P-network_5_0_AskP_0 + P-network_4_6_AnnP_0 + P-network_6_3_RI_0 + P-network_0_1_RI_0 + P-network_7_4_RI_0 + P-network_4_3_AnsP_7 + P-network_4_3_AnsP_6 + P-network_4_3_AnsP_5 + P-network_4_3_AnsP_4 + P-network_4_3_AnsP_3 + P-network_4_3_AnsP_2 + P-network_4_3_AnsP_1 + P-network_4_3_AnsP_0 + P-network_7_1_AI_0 + P-network_7_5_AskP_0 + P-network_5_5_RI_0 + P-network_0_4_AskP_0 + P-network_5_2_AI_0 + P-network_5_2_AnnP_0 + P-network_3_6_RI_0 + P-network_6_6_AskP_0 + P-network_3_3_AI_0 + P-network_3_4_AnsP_0 + P-network_3_4_AnsP_1 + P-network_3_4_AnsP_2 + P-network_3_4_AnsP_3 + P-network_3_4_AnsP_4 + P-network_3_4_AnsP_5 + P-network_3_4_AnsP_6 + P-network_3_4_AnsP_7 + P-network_7_7_AnnP_0 + P-network_1_7_RI_0 + P-network_3_7_AnnP_0 + P-network_1_4_AI_0 + P-network_1_0_AskP_0 + P-network_6_2_RP_0 + P-network_0_6_AnnP_0 + P-network_7_4_AnsP_7 + P-network_4_1_AskP_0 + P-network_7_4_AnsP_6 + P-network_7_4_AnsP_5 + P-network_7_4_AnsP_4 + P-network_7_4_AnsP_3 + P-network_7_4_AnsP_2 + P-network_7_4_AnsP_1 + P-network_7_4_AnsP_0 + P-network_0_5_RP_0 + P-network_0_3_AnsP_7 + P-network_0_3_AnsP_6 + P-network_0_3_AnsP_5 + P-network_0_3_AnsP_4 + P-network_0_3_AnsP_3 + P-network_0_3_AnsP_2 + P-network_0_3_AnsP_1 + P-network_0_3_AnsP_0 + P-network_4_3_RP_0 + P-network_3_5_AskP_0 + P-network_2_4_RP_0 + P-network_1_2_AnnP_0 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: place invariant simplifies atomic proposition
lola: before: (P-electedSecondary_7 + P-electedSecondary_6 + P-electedSecondary_5 + P-electedSecondary_4 + P-electedSecondary_3 + P-electedSecondary_2 + P-electedSecondary_1 + P-electedSecondary_0 <= P-stage_2_SEC + P-stage_3_NEG + P-stage_5_SEC + P-stage_4_PRIM + P-stage_1_SEC + P-stage_6_SEC + P-stage_3_SEC + P-stage_0_SEC + P-stage_7_PRIM + P-stage_1_NEG + P-stage_2_PRIM + P-stage_6_NEG + P-stage_4_NEG + P-stage_5_PRIM + P-stage_7_NEG + P-stage_0_PRIM + P-stage_2_NEG + P-stage_3_PRIM + P-stage_4_SEC + P-stage_5_NEG + P-stage_7_SEC + P-stage_6_PRIM + P-stage_0_NEG + P-stage_1_PRIM)
lola: after: (P-electedSecondary_7 + P-electedSecondary_6 + P-electedSecondary_5 + P-electedSecondary_4 + P-electedSecondary_3 + P-electedSecondary_2 + P-electedSecondary_1 + P-electedSecondary_0 <= 7)
lola: LP says that atomic proposition is always true: (P-electedSecondary_7 + P-electedSecondary_6 + P-electedSecondary_5 + P-electedSecondary_4 + P-electedSecondary_3 + P-electedSecondary_2 + P-electedSecondary_1 + P-electedSecondary_0 <= 7)
lola: LP says that atomic proposition is always false: (3 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-poll__networl_7_4_AnsP_7 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_1_6_AnsP_4 + P-poll__networl_1_6_AnsP_3 + P-poll__networl_1_6_AnsP_2 + P-poll__networl_1_6_AnsP_1 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_7 + P-poll__networl_0_0_AskP_1 + P-poll__networl_0_0_AskP_2 + P-poll__networl_0_0_AskP_3 + P-poll__networl_0_0_AskP_4 + P-poll__networl_0_0_AskP_5 + P-poll__networl_0_0_AskP_6 + P-poll__networl_0_0_AskP_7 + P-poll__networl_3_3_RI_0 + P-poll__networl_3_3_RI_1 + P-poll__networl_3_3_RI_2 + P-poll__networl_3_3_RI_3 + P-poll__networl_3_3_RI_4 + P-poll__networl_3_3_RI_5 + P-poll__networl_3_3_RI_6 + P-poll__networl_3_3_RI_7 + P-poll__networl_0_0_AskP_0 + P-poll__networl_6_7_AnnP_0 + P-poll__networl_6_7_AnnP_1 + P-poll__networl_6_7_AnnP_2 + P-poll__networl_6_7_AnnP_3 + P-poll__networl_6_7_AnnP_4 + P-poll__networl_6_7_AnnP_5 + P-poll__networl_6_7_AnnP_6 + P-poll__networl_6_7_AnnP_7 + P-poll__networl_3_0_AI_7 + P-poll__networl_7_1_AskP_0 + P-poll__networl_7_1_AskP_1 + P-poll__networl_7_1_AskP_2 + P-poll__networl_7_1_AskP_3 + P-poll__networl_7_1_AskP_4 + P-poll__networl_7_1_AskP_5 + P-poll__networl_7_1_AskP_6 + P-poll__networl_7_1_AskP_7 + P-poll__networl_3_0_AI_6 + P-poll__networl_3_0_AI_5 + P-poll__networl_5_2_RI_0 + P-poll__networl_5_2_RI_1 + P-poll__networl_5_2_RI_2 + P-poll__networl_5_2_RI_3 + P-poll__networl_5_2_RI_4 + P-poll__networl_5_2_RI_5 + P-poll__networl_5_2_RI_6 + P-poll__networl_5_2_RI_7 + P-poll__networl_3_0_AI_4 + P-poll__networl_4_2_AnnP_0 + P-poll__networl_4_2_AnnP_1 + P-poll__networl_4_2_AnnP_2 + P-poll__networl_4_2_AnnP_3 + P-poll__networl_4_2_AnnP_4 + P-poll__networl_4_2_AnnP_5 + P-poll__networl_4_2_AnnP_6 + P-poll__networl_4_2_AnnP_7 + P-poll__networl_3_0_AI_3 + P-poll__networl_3_0_AI_2 + P-poll__networl_3_0_AI_1 + P-poll__networl_3_0_AI_0 + P-poll__networl_7_1_RI_0 + P-poll__networl_7_1_RI_1 + P-poll__networl_7_1_RI_2 + P-poll__networl_7_1_RI_3 + P-poll__networl_7_1_RI_4 + P-poll__networl_7_1_RI_5 + P-poll__networl_7_1_RI_6 + P-poll__networl_7_1_RI_7 + P-poll__networl_6_4_AnsP_0 + P-poll__networl_6_5_AskP_0 + P-poll__networl_6_5_AskP_1 + P-poll__networl_6_5_AskP_2 + P-poll__networl_6_5_AskP_3 + P-poll__networl_6_5_AskP_4 + P-poll__networl_6_5_AskP_5 + P-poll__networl_6_5_AskP_6 + P-poll__networl_6_5_AskP_7 + P-poll__networl_3_3_AnsP_0 + P-poll__networl_1_4_RI_7 + P-poll__networl_1_4_RI_6 + P-poll__networl_1_4_RI_5 + P-poll__networl_1_4_RI_4 + P-poll__networl_1_4_RI_3 + P-poll__networl_1_4_RI_2 + P-poll__networl_1_4_RI_1 + P-poll__networl_1_4_RI_0 + P-poll__networl_1_1_AI_7 + P-poll__networl_1_1_AI_6 + P-poll__networl_1_1_AI_5 + P-poll__networl_1_1_AI_4 + P-poll__networl_1_1_AI_3 + P-poll__networl_6_7_RP_0 + P-poll__networl_6_7_RP_1 + P-poll__networl_6_7_RP_2 + P-poll__networl_6_7_RP_3 + P-poll__networl_6_7_RP_4 + P-poll__networl_6_7_RP_5 + P-poll__networl_6_7_RP_6 + P-poll__networl_6_7_RP_7 + P-poll__networl_1_1_AI_2 + P-poll__networl_1_1_AI_1 + P-poll__networl_1_1_AI_0 + P-poll__networl_3_6_AnnP_0 + P-poll__networl_3_6_AnnP_1 + P-poll__networl_3_6_AnnP_2 + P-poll__networl_3_6_AnnP_3 + P-poll__networl_3_6_AnnP_4 + P-poll__networl_3_6_AnnP_5 + P-poll__networl_3_6_AnnP_6 + P-poll__networl_3_6_AnnP_7 + P-poll__networl_2_5_AskP_7 + P-poll__networl_2_5_AskP_6 + P-poll__networl_2_5_AskP_5 + P-poll__networl_2_5_AskP_4 + P-poll__networl_2_5_AskP_3 + P-poll__networl_2_5_AskP_2 + P-poll__networl_2_5_AskP_1 + P-poll__networl_4_0_AskP_0 + P-poll__networl_4_0_AskP_1 + P-poll__networl_4_0_AskP_2 + P-poll__networl_4_0_AskP_3 + P-poll__networl_4_0_AskP_4 + P-poll__networl_4_0_AskP_5 + P-poll__networl_4_0_AskP_6 + P-poll__networl_4_0_AskP_7 + P-poll__networl_2_5_AskP_0 + P-poll__networl_1_3_RP_0 + P-poll__networl_1_3_RP_1 + P-poll__networl_1_3_RP_2 + P-poll__networl_1_3_RP_3 + P-poll__networl_1_3_RP_4 + P-poll__networl_1_3_RP_5 + P-poll__networl_1_3_RP_6 + P-poll__networl_1_3_RP_7 + P-poll__networl_7_3_AnnP_7 + P-poll__networl_7_3_AnnP_6 + P-poll__networl_1_1_AnnP_0 + P-poll__networl_1_1_AnnP_1 + P-poll__networl_1_1_AnnP_2 + P-poll__networl_1_1_AnnP_3 + P-poll__networl_1_1_AnnP_4 + P-poll__networl_1_1_AnnP_5 + P-poll__networl_1_1_AnnP_6 + P-poll__networl_1_1_AnnP_7 + P-poll__networl_7_3_AnnP_5 + P-poll__networl_7_3_AnnP_4 + P-poll__networl_3_2_RP_0 + P-poll__networl_3_2_RP_1 + P-poll__networl_3_2_RP_2 + P-poll__networl_3_2_RP_3 + P-poll__networl_3_2_RP_4 + P-poll__networl_3_2_RP_5 + P-poll__networl_3_2_RP_6 + P-poll__networl_3_2_RP_7 + P-poll__networl_2_7_AnsP_0 + P-poll__networl_7_3_AnnP_3 + P-poll__networl_7_3_AnnP_2 + P-poll__networl_7_3_AnnP_1 + P-poll__networl_7_3_AnnP_0 + P-poll__networl_6_5_AI_7 + P-poll__networl_6_5_AI_6 + P-poll__networl_6_5_AI_5 + P-poll__networl_6_5_AI_4 + P-poll__networl_5_7_AI_0 + P-poll__networl_5_7_AI_1 + P-poll__networl_5_7_AI_2 + P-poll__networl_5_7_AI_3 + P-poll__networl_5_7_AI_4 + P-poll__networl_5_7_AI_5 + P-poll__networl_5_7_AI_6 + P-poll__networl_5_7_AI_7 + P-poll__networl_6_5_AI_3 + P-poll__networl_6_5_AI_2 + P-poll__networl_6_5_AI_1 + P-poll__networl_6_5_AI_0 + P-poll__networl_3_4_AskP_0 + P-poll__networl_3_4_AskP_1 + P-poll__networl_3_4_AskP_2 + P-poll__networl_3_4_AskP_3 + P-poll__networl_3_4_AskP_4 + P-poll__networl_3_4_AskP_5 + P-poll__networl_3_4_AskP_6 + P-poll__networl_3_4_AskP_7 + P-poll__networl_5_1_RP_0 + P-poll__networl_5_1_RP_1 + P-poll__networl_5_1_RP_2 + P-poll__networl_5_1_RP_3 + P-poll__networl_5_1_RP_4 + P-poll__networl_5_1_RP_5 + P-poll__networl_5_1_RP_6 + P-poll__networl_5_1_RP_7 + P-poll__networl_7_6_AI_0 + P-poll__networl_7_6_AI_1 + P-poll__networl_7_6_AI_2 + P-poll__networl_7_6_AI_3 + P-poll__networl_7_6_AI_4 + P-poll__networl_7_6_AI_5 + P-poll__networl_7_6_AI_6 + P-poll__networl_7_6_AI_7 + P-poll__networl_0_3_AI_0 + P-poll__networl_0_3_AI_1 + P-poll__networl_0_3_AI_2 + P-poll__networl_0_2_AnsP_0 + P-poll__networl_0_3_AI_3 + P-poll__networl_0_3_AI_4 + P-poll__networl_0_3_AI_5 + P-poll__networl_0_3_AI_6 + P-poll__networl_0_3_AI_7 + P-poll__networl_4_0_RP_7 + P-poll__networl_0_6_RI_0 + P-poll__networl_0_6_RI_1 + P-poll__networl_0_6_RI_2 + P-poll__networl_0_6_RI_3 + P-poll__networl_0_6_RI_4 + P-poll__networl_0_6_RI_5 + P-poll__networl_0_6_RI_6 + P-poll__networl_0_6_RI_7 + P-poll__networl_4_0_RP_6 + P-poll__networl_4_0_RP_5 + P-poll__networl_4_0_RP_4 + P-poll__networl_7_3_AnsP_0 + P-poll__networl_4_0_RP_3 + P-poll__networl_4_0_RP_2 + P-poll__networl_4_0_RP_1 + P-poll__networl_4_0_RP_0 + P-poll__networl_0_2_AnnP_7 + P-poll__networl_0_2_AnnP_6 + P-poll__networl_0_2_AnnP_5 + P-poll__networl_0_5_AnnP_0 + P-poll__networl_0_5_AnnP_1 + P-poll__networl_0_5_AnnP_2 + P-poll__networl_0_5_AnnP_3 + P-poll__networl_0_5_AnnP_4 + P-poll__networl_0_5_AnnP_5 + P-poll__networl_0_5_AnnP_6 + P-poll__networl_0_5_AnnP_7 + P-poll__networl_7_0_RP_0 + P-poll__networl_7_0_RP_1 + P-poll__networl_7_0_RP_2 + P-poll__networl_7_0_RP_3 + P-poll__networl_7_0_RP_4 + P-poll__networl_7_0_RP_5 + P-poll__networl_7_0_RP_6 + P-poll__networl_7_0_RP_7 + P-poll__networl_0_2_AnnP_4 + P-poll__networl_0_2_AnnP_3 + P-poll__networl_2_2_AI_0 + P-poll__networl_0_2_AnnP_2 + P-poll__networl_2_2_AI_1 + P-poll__networl_2_2_AI_2 + P-poll__networl_2_2_AI_3 + P-poll__networl_2_2_AI_4 + P-poll__networl_2_2_AI_5 + P-poll__networl_2_2_AI_6 + P-poll__networl_2_2_AI_7 + P-poll__networl_2_5_RI_0 + P-poll__networl_2_5_RI_1 + P-poll__networl_2_5_RI_2 + P-poll__networl_2_5_RI_3 + P-poll__networl_2_5_RI_4 + P-poll__networl_2_5_RI_5 + P-poll__networl_2_5_RI_6 + P-poll__networl_2_5_RI_7 + P-poll__networl_0_2_AnnP_1 + P-poll__networl_0_2_AnnP_0 + P-poll__networl_7_6_AnnP_0 + P-poll__networl_7_6_AnnP_1 + P-poll__networl_7_6_AnnP_2 + P-poll__networl_7_6_AnnP_3 + P-poll__networl_7_6_AnnP_4 + P-poll__networl_7_6_AnnP_5 + P-poll__networl_7_6_AnnP_6 + P-poll__networl_7_6_AnnP_7 + P-poll__networl_7_0_AnsP_0 + P-poll__networl_4_1_AI_0 + P-poll__networl_4_1_AI_1 + P-poll__networl_4_1_AI_2 + P-poll__networl_4_1_AI_3 + P-poll__networl_4_1_AI_4 + P-poll__networl_4_1_AI_5 + P-poll__networl_4_1_AI_6 + P-poll__networl_4_1_AI_7 + P-poll__networl_4_4_RI_0 + P-poll__networl_4_4_RI_1 + P-poll__networl_4_4_RI_2 + P-poll__networl_4_4_RI_3 + P-poll__networl_4_4_RI_4 + P-poll__networl_4_4_RI_5 + P-poll__networl_4_4_RI_6 + P-poll__networl_4_4_RI_7 + P-poll__networl_5_1_AnnP_0 + P-poll__networl_5_1_AnnP_1 + P-poll__networl_5_1_AnnP_2 + P-poll__networl_5_1_AnnP_3 + P-poll__networl_5_1_AnnP_4 + P-poll__networl_5_1_AnnP_5 + P-poll__networl_5_1_AnnP_6 + P-poll__networl_5_1_AnnP_7 + P-poll__networl_6_7_AnsP_0 + P-poll__networl_4_6_AI_7 + P-poll__networl_4_6_AI_6 + P-poll__networl_4_6_AI_5 + P-poll__networl_4_6_AI_4 + P-poll__networl_6_0_AI_0 + P-poll__networl_6_0_AI_1 + P-poll__networl_6_0_AI_2 + P-poll__networl_6_0_AI_3 + P-poll__networl_6_0_AI_4 + P-poll__networl_6_0_AI_5 + P-poll__networl_6_0_AI_6 + P-poll__networl_4_6_AI_3 + P-poll__networl_6_0_AI_7 + P-poll__networl_4_6_AI_2 + P-poll__networl_4_6_AI_1 + P-poll__networl_4_6_AI_0 + P-poll__networl_0_3_AskP_0 + P-poll__networl_0_3_AskP_1 + P-poll__networl_0_3_AskP_2 + P-poll__networl_0_3_AskP_3 + P-poll__networl_0_3_AskP_4 + P-poll__networl_0_3_AskP_5 + P-poll__networl_0_3_AskP_6 + P-poll__networl_0_3_AskP_7 + P-poll__networl_6_3_RI_0 + P-poll__networl_6_3_RI_1 + P-poll__networl_6_3_RI_2 + P-poll__networl_6_3_RI_3 + P-poll__networl_6_3_RI_4 + P-poll__networl_6_3_RI_5 + P-poll__networl_6_3_RI_6 + P-poll__networl_6_3_RI_7 + P-poll__networl_2_1_RP_7 + P-poll__networl_2_1_RP_6 + P-poll__networl_2_1_RP_5 + P-poll__networl_2_1_RP_4 + P-poll__networl_2_1_RP_3 + P-poll__networl_2_1_RP_2 + P-poll__networl_2_1_RP_1 + P-poll__networl_7_4_AskP_0 + P-poll__networl_7_4_AskP_1 + P-poll__networl_7_4_AskP_2 + P-poll__networl_7_4_AskP_3 + P-poll__networl_7_4_AskP_4 + P-poll__networl_7_4_AskP_5 + P-poll__networl_7_4_AskP_6 + P-poll__networl_7_4_AskP_7 + P-poll__networl_2_1_RP_0 + P-poll__networl_4_2_AnsP_0 + P-poll__networl_3_1_AskP_7 + P-poll__networl_3_1_AskP_6 + P-poll__networl_3_1_AskP_5 + P-poll__networl_3_1_AskP_4 + P-poll__networl_3_1_AskP_3 + P-poll__networl_3_1_AskP_2 + P-poll__networl_3_1_AskP_1 + P-poll__networl_3_1_AskP_0 + P-poll__networl_2_7_AnnP_7 + P-poll__networl_4_5_AnnP_0 + P-poll__networl_4_5_AnnP_1 + P-poll__networl_4_5_AnnP_2 + P-poll__networl_4_5_AnnP_3 + P-poll__networl_4_5_AnnP_4 + P-poll__networl_4_5_AnnP_5 + P-poll__networl_4_5_AnnP_6 + P-poll__networl_4_5_AnnP_7 + P-poll__networl_2_7_AnnP_6 + P-poll__networl_2_7_AnnP_5 + P-poll__networl_2_7_AnnP_4 + P-poll__networl_2_7_AnnP_3 + P-poll__networl_2_7_AnnP_2 + P-poll__networl_2_7_AnnP_1 + P-poll__networl_2_7_AnnP_0 + P-poll__networl_0_5_RP_0 + P-poll__networl_0_5_RP_1 + P-poll__networl_0_5_RP_2 + P-poll__networl_0_5_RP_3 + P-poll__networl_0_5_RP_4 + P-poll__networl_0_5_RP_5 + P-poll__networl_0_5_RP_6 + P-poll__networl_0_5_RP_7 + P-poll__networl_2_7_AI_7 + P-poll__networl_2_7_AI_6 + P-poll__networl_2_7_AI_5 + P-poll__networl_2_0_AnnP_0 + P-poll__networl_2_7_AI_4 + P-poll__networl_2_0_AnnP_1 + P-poll__networl_2_7_AI_3 + P-poll__networl_2_0_AnnP_2 + P-poll__networl_2_0_AnnP_3 + P-poll__networl_2_0_AnnP_4 + P-poll__networl_2_0_AnnP_5 + P-poll__networl_2_0_AnnP_6 + P-poll__networl_2_0_AnnP_7 + P-poll__networl_2_7_AI_2 + P-poll__networl_3_6_AnsP_0 + P-poll__networl_2_7_AI_1 + P-poll__networl_2_7_AI_0 + P-poll__networl_2_4_RP_0 + P-poll__networl_2_4_RP_1 + P-poll__networl_2_4_RP_2 + P-poll__networl_2_4_RP_3 + P-poll__networl_2_4_RP_4 + P-poll__networl_2_4_RP_5 + P-poll__networl_2_4_RP_6 + P-poll__networl_2_4_RP_7 + P-poll__networl_2_4_AnsP_0 + P-poll__networl_0_2_RP_7 + P-poll__networl_0_2_RP_6 + P-poll__networl_0_2_RP_5 + P-poll__networl_0_2_RP_4 + P-poll__networl_0_2_RP_3 + P-poll__networl_0_2_RP_2 + P-poll__networl_0_2_RP_1 + P-poll__networl_4_3_AskP_0 + P-poll__networl_4_3_AskP_1 + P-poll__networl_4_3_AskP_2 + P-poll__networl_4_3_AskP_3 + P-poll__networl_4_3_AskP_4 + P-poll__networl_4_3_AskP_5 + P-poll__networl_4_3_AskP_6 + P-poll__networl_4_3_AskP_7 + P-poll__networl_0_2_RP_0 + P-poll__networl_4_3_RP_0 + P-poll__networl_4_3_RP_1 + P-poll__networl_4_3_RP_2 + P-poll__networl_4_3_RP_3 + P-poll__networl_4_3_RP_4 + P-poll__networl_4_3_RP_5 + P-poll__networl_4_3_RP_6 + P-poll__networl_4_3_RP_7 + P-poll__networl_7_5_RP_7 + P-poll__networl_7_5_RP_6 + P-poll__networl_1_1_AnsP_0 + P-poll__networl_7_5_RP_5 + P-poll__networl_7_5_RP_4 + P-poll__networl_7_5_RP_3 + P-poll__networl_7_5_RP_2 + P-poll__networl_7_5_RP_1 + P-poll__networl_7_5_RP_0 + P-poll__networl_1_4_AnnP_0 + P-poll__networl_1_4_AnnP_1 + P-poll__networl_1_4_AnnP_2 + P-poll__networl_1_4_AnnP_3 + P-poll__networl_1_4_AnnP_4 + P-poll__networl_1_4_AnnP_5 + P-poll__networl_1_4_AnnP_6 + P-poll__networl_1_4_AnnP_7 + P-poll__networl_6_2_RP_0 + P-poll__networl_6_2_RP_1 + P-poll__networl_6_2_RP_2 + P-poll__networl_6_2_RP_3 + P-poll__networl_6_2_RP_4 + P-poll__networl_6_2_RP_5 + P-poll__networl_6_2_RP_6 + P-poll__networl_6_2_RP_7 + P-poll__networl_1_4_AI_0 + P-poll__networl_1_4_AI_1 + P-poll__networl_1_4_AI_2 + P-poll__networl_1_4_AI_3 + P-poll__networl_1_4_AI_4 + P-poll__networl_1_4_AI_5 + P-poll__networl_1_4_AI_6 + P-poll__networl_1_4_AI_7 + P-poll__networl_1_7_RI_0 + P-poll__networl_1_7_RI_1 + P-poll__networl_1_7_RI_2 + P-poll__networl_1_7_RI_3 + P-poll__networl_1_7_RI_4 + P-poll__networl_1_7_RI_5 + P-poll__networl_1_7_RI_6 + P-poll__networl_1_7_RI_7 + P-poll__networl_5_6_AskP_7 + P-poll__networl_3_7_AskP_0 + P-poll__networl_3_7_AskP_1 + P-poll__networl_3_7_AskP_2 + P-poll__networl_3_7_AskP_3 + P-poll__networl_3_7_AskP_4 + P-poll__networl_3_7_AskP_5 + P-poll__networl_3_7_AskP_6 + P-poll__networl_3_7_AskP_7 + P-poll__networl_5_6_AskP_6 + P-poll__networl_5_6_AskP_5 + P-poll__networl_5_6_AskP_4 + P-poll__networl_3_3_AI_0 + P-poll__networl_3_3_AI_1 + P-poll__networl_3_3_AI_2 + P-poll__networl_0_5_AnsP_0 + P-poll__networl_3_3_AI_3 + P-poll__networl_5_6_AskP_3 + P-poll__networl_3_3_AI_4 + P-poll__networl_5_6_AskP_2 + P-poll__networl_3_3_AI_5 + P-poll__networl_5_6_AskP_1 + P-poll__networl_3_3_AI_6 + P-poll__networl_5_6_AskP_0 + P-poll__networl_3_3_AI_7 + P-poll__networl_3_6_RI_0 + P-poll__networl_3_6_RI_1 + P-poll__networl_3_6_RI_2 + P-poll__networl_3_6_RI_3 + P-poll__networl_3_6_RI_4 + P-poll__networl_3_6_RI_5 + P-poll__networl_3_6_RI_6 + P-poll__networl_3_6_RI_7 + P-poll__networl_6_0_AnnP_0 + P-poll__networl_6_0_AnnP_1 + P-poll__networl_6_0_AnnP_2 + P-poll__networl_6_0_AnnP_3 + P-poll__networl_6_0_AnnP_4 + P-poll__networl_6_0_AnnP_5 + P-poll__networl_6_0_AnnP_6 + P-poll__networl_6_0_AnnP_7 + P-poll__networl_7_6_AnsP_0 + P-poll__networl_1_2_AskP_0 + P-poll__networl_1_2_AskP_1 + P-poll__networl_1_2_AskP_2 + P-poll__networl_1_2_AskP_3 + P-poll__networl_1_2_AskP_4 + P-poll__networl_1_2_AskP_5 + P-poll__networl_1_2_AskP_6 + P-poll__networl_1_2_AskP_7 + P-poll__networl_5_6_RP_7 + P-poll__networl_5_2_AI_0 + P-poll__networl_5_2_AI_1 + P-poll__networl_5_2_AI_2 + P-poll__networl_5_2_AI_3 + P-poll__networl_5_2_AI_4 + P-poll__networl_5_2_AI_5 + P-poll__networl_5_2_AI_6 + P-poll__networl_5_2_AI_7 + P-poll__networl_5_6_RP_6 + P-poll__networl_5_5_RI_0 + P-poll__networl_5_5_RI_1 + P-poll__networl_5_5_RI_2 + P-poll__networl_5_5_RI_3 + P-poll__networl_5_5_RI_4 + P-poll__networl_5_5_RI_5 + P-poll__networl_5_5_RI_6 + P-poll__networl_5_5_RI_7 + P-poll__networl_5_6_RP_5 + P-poll__networl_5_6_RP_4 + P-poll__networl_5_6_RP_3 + P-poll__networl_5_1_AnsP_0 + P-poll__networl_5_6_RP_2 + P-poll__networl_5_6_RP_1 + P-poll__networl_5_6_RP_0 + P-poll__networl_7_1_AI_0 + P-poll__networl_7_1_AI_1 + P-poll__networl_7_1_AI_2 + P-poll__networl_7_1_AI_3 + P-poll__networl_7_1_AI_4 + P-poll__networl_7_1_AI_5 + P-poll__networl_7_1_AI_6 + P-poll__networl_7_1_AI_7 + P-poll__networl_7_4_RI_0 + P-poll__networl_7_4_RI_1 + P-poll__networl_7_4_RI_2 + P-poll__networl_7_4_RI_3 + P-poll__networl_7_4_RI_4 + P-poll__networl_7_4_RI_5 + P-poll__networl_7_4_RI_6 + P-poll__networl_7_4_RI_7 + P-poll__networl_0_1_RI_0 + P-poll__networl_0_1_RI_1 + P-poll__networl_0_1_RI_2 + P-poll__networl_0_1_RI_3 + P-poll__networl_0_1_RI_4 + P-poll__networl_0_1_RI_5 + P-poll__networl_0_1_RI_6 + P-poll__networl_0_1_RI_7 + P-poll__networl_5_4_AnnP_0 + P-poll__networl_5_4_AnnP_1 + P-poll__networl_5_4_AnnP_2 + P-poll__networl_5_4_AnnP_3 + P-poll__networl_5_4_AnnP_4 + P-poll__networl_5_4_AnnP_5 + P-poll__networl_5_4_AnnP_6 + P-poll__networl_5_4_AnnP_7 + P-poll__networl_0_6_AskP_0 + P-poll__networl_0_6_AskP_1 + P-poll__networl_0_6_AskP_2 + P-poll__networl_0_6_AskP_3 + P-poll__networl_0_6_AskP_4 + P-poll__networl_0_6_AskP_5 + P-poll__networl_0_6_AskP_6 + P-poll__networl_0_6_AskP_7 + P-poll__networl_2_0_RI_0 + P-poll__networl_2_0_RI_1 + P-poll__networl_2_0_RI_2 + P-poll__networl_2_0_RI_3 + P-poll__networl_2_0_RI_4 + P-poll__networl_2_0_RI_5 + P-poll__networl_2_0_RI_6 + P-poll__networl_2_0_RI_7 + P-poll__networl_7_7_AskP_0 + P-poll__networl_7_7_AskP_1 + P-poll__networl_7_7_AskP_2 + P-poll__networl_7_7_AskP_3 + P-poll__networl_7_7_AskP_4 + P-poll__networl_7_7_AskP_5 + P-poll__networl_7_7_AskP_6 + P-poll__networl_7_7_AskP_7 + P-poll__networl_4_5_AnsP_0 + P-poll__networl_3_3_AnnP_7 + P-poll__networl_3_3_AnnP_6 + P-poll__networl_3_3_AnnP_5 + P-poll__networl_3_3_AnnP_4 + P-poll__networl_3_3_AnnP_3 + P-poll__networl_3_3_AnnP_2 + P-poll__networl_3_3_AnnP_1 + P-poll__networl_1_6_RP_0 + P-poll__networl_1_6_RP_1 + P-poll__networl_1_6_RP_2 + P-poll__networl_1_6_RP_3 + P-poll__networl_1_6_RP_4 + P-poll__networl_1_6_RP_5 + P-poll__networl_1_6_RP_6 + P-poll__networl_1_6_RP_7 + P-poll__networl_3_3_AnnP_0 + P-poll__networl_5_2_AskP_0 + P-poll__networl_5_2_AskP_1 + P-poll__networl_5_2_AskP_2 + P-poll__networl_5_2_AskP_3 + P-poll__networl_5_2_AskP_4 + P-poll__networl_5_2_AskP_5 + P-poll__networl_5_2_AskP_6 + P-poll__networl_5_2_AskP_7 + P-poll__networl_3_5_RP_0 + P-poll__networl_3_5_RP_1 + P-poll__networl_3_5_RP_2 + P-poll__networl_3_5_RP_3 + P-poll__networl_3_5_RP_4 + P-poll__networl_3_5_RP_5 + P-poll__networl_3_5_RP_6 + P-poll__networl_3_5_RP_7 + P-poll__networl_2_0_AnsP_0 + P-poll__networl_3_7_RP_7 + P-poll__networl_2_3_AnnP_0 + P-poll__networl_2_3_AnnP_1 + P-poll__networl_2_3_AnnP_2 + P-poll__networl_2_3_AnnP_3 + P-poll__networl_2_3_AnnP_4 + P-poll__networl_2_3_AnnP_5 + P-poll__networl_2_3_AnnP_6 + P-poll__networl_2_3_AnnP_7 + P-poll__networl_3_7_RP_6 + P-poll__networl_3_7_RP_5 + P-poll__networl_6_0_RI_7 + P-poll__networl_3_7_RP_4 + P-poll__networl_6_0_RI_6 + P-poll__networl_3_7_RP_3 + P-poll__networl_6_0_RI_5 + P-poll__networl_3_7_RP_2 + P-poll__networl_6_0_RI_4 + P-poll__networl_3_7_RP_1 + P-poll__networl_6_0_RI_3 + P-poll__networl_5_4_RP_0 + P-poll__networl_5_4_RP_1 + P-poll__networl_5_4_RP_2 + P-poll__networl_5_4_RP_3 + P-poll__networl_5_4_RP_4 + P-poll__networl_5_4_RP_5 + P-poll__networl_5_4_RP_6 + P-poll__networl_5_4_RP_7 + P-poll__networl_3_7_RP_0 + P-poll__networl_6_0_RI_2 + P-poll__networl_6_0_RI_1 + P-poll__networl_0_6_AI_0 + P-poll__networl_0_6_AI_1 + P-poll__networl_0_6_AI_2 + P-poll__networl_0_6_AI_3 + P-poll__networl_0_6_AI_4 + P-poll__networl_0_6_AI_5 + P-poll__networl_0_6_AI_6 + P-poll__networl_0_6_AI_7 + P-poll__networl_6_0_RI_0 + P-poll__networl_3_0_AnsP_0 + P-poll__networl_4_6_AskP_0 + P-poll__networl_4_6_AskP_1 + P-poll__networl_4_6_AskP_2 + P-poll__networl_4_6_AskP_3 + P-poll__networl_4_6_AskP_4 + P-poll__networl_4_6_AskP_5 + P-poll__networl_4_6_AskP_6 + P-poll__networl_4_6_AskP_7 + P-poll__networl_7_3_RP_0 + P-poll__networl_7_3_RP_1 + P-poll__networl_7_3_RP_2 + P-poll__networl_7_3_RP_3 + P-poll__networl_7_3_RP_4 + P-poll__networl_7_3_RP_5 + P-poll__networl_7_3_RP_6 + P-poll__networl_7_3_RP_7 + P-poll__networl_0_0_RP_0 + P-poll__networl_0_0_RP_1 + P-poll__networl_0_0_RP_2 + P-poll__networl_0_0_RP_3 + P-poll__networl_0_0_RP_4 + P-poll__networl_0_0_RP_5 + P-poll__networl_0_0_RP_6 + P-poll__networl_0_0_RP_7 + P-poll__networl_1_4_AnsP_0 + P-poll__networl_6_2_AskP_7 + P-poll__networl_2_5_AI_0 + P-poll__networl_6_2_AskP_6 + P-poll__networl_2_5_AI_1 + P-poll__networl_2_5_AI_2 + P-poll__networl_2_5_AI_3 + P-poll__networl_2_5_AI_4 + P-poll__networl_2_5_AI_5 + P-poll__networl_2_5_AI_6 + P-poll__networl_2_5_AI_7 + P-poll__networl_6_2_AskP_5 + P-poll__networl_1_7_AnnP_0 + P-poll__networl_1_7_AnnP_1 + P-poll__networl_1_7_AnnP_2 + P-poll__networl_1_7_AnnP_3 + P-poll__networl_1_7_AnnP_4 + P-poll__networl_1_7_AnnP_5 + P-poll__networl_1_7_AnnP_6 + P-poll__networl_1_7_AnnP_7 + P-poll__networl_6_2_AskP_4 + P-poll__networl_6_2_AskP_3 + P-poll__networl_6_2_AskP_2 + P-poll__networl_6_2_AskP_1 + P-poll__networl_2_1_AskP_0 + P-poll__networl_2_1_AskP_1 + P-poll__networl_2_1_AskP_2 + P-poll__networl_2_1_AskP_3 + P-poll__networl_2_1_AskP_4 + P-poll__networl_2_1_AskP_5 + P-poll__networl_2_1_AskP_6 + P-poll__networl_2_1_AskP_7 + P-poll__networl_6_2_AskP_0 + P-poll__networl_4_4_AI_0 + P-poll__networl_4_4_AI_1 + P-poll__networl_4_4_AI_2 + P-poll__networl_4_4_AI_3 + P-poll__networl_4_4_AI_4 + P-poll__networl_4_4_AI_5 + P-poll__networl_4_4_AI_6 + P-poll__networl_4_4_AI_7 + P-poll__networl_4_7_RI_0 + P-poll__networl_4_7_RI_1 + P-poll__networl_4_7_RI_2 + P-poll__networl_4_7_RI_3 + P-poll__networl_4_7_RI_4 + P-poll__networl_4_7_RI_5 + P-poll__networl_4_7_RI_6 + P-poll__networl_4_7_RI_7 + P-poll__networl_6_0_AnsP_0 + P-poll__networl_4_1_RI_7 + P-poll__networl_4_1_RI_6 + P-poll__networl_4_1_RI_5 + P-poll__networl_4_1_RI_4 + P-poll__networl_4_1_RI_3 + P-poll__networl_4_1_RI_2 + P-poll__networl_4_1_RI_1 + P-poll__networl_4_1_RI_0 + P-poll__networl_6_3_AI_0 + P-poll__networl_6_3_AI_1 + P-poll__networl_6_3_AI_2 + P-poll__networl_6_3_AI_3 + P-poll__networl_6_3_AI_4 + P-poll__networl_6_3_AI_5 + P-poll__networl_6_3_AI_6 + P-poll__networl_6_3_AI_7 + P-poll__networl_6_6_RI_0 + P-poll__networl_6_6_RI_1 + P-poll__networl_6_6_RI_2 + P-poll__networl_6_6_RI_3 + P-poll__networl_6_6_RI_4 + P-poll__networl_6_6_RI_5 + P-poll__networl_6_6_RI_6 + P-poll__networl_6_6_RI_7 + P-poll__networl_5_5_AnsP_0 + P-poll__networl_6_3_AnnP_0 + P-poll__networl_6_3_AnnP_1 + P-poll__networl_6_3_AnnP_2 + P-poll__networl_6_3_AnnP_3 + P-poll__networl_6_3_AnnP_4 + P-poll__networl_6_3_AnnP_5 + P-poll__networl_6_3_AnnP_6 + P-poll__networl_6_3_AnnP_7 + P-poll__networl_2_2_RI_7 + P-poll__networl_2_2_RI_6 + P-poll__networl_2_2_RI_5 + P-poll__networl_2_2_RI_4 + P-poll__networl_2_2_RI_3 + P-poll__networl_2_2_RI_2 + P-poll__networl_1_5_AskP_0 + P-poll__networl_1_5_AskP_1 + P-poll__networl_1_5_AskP_2 + P-poll__networl_1_5_AskP_3 + P-poll__networl_1_5_AskP_4 + P-poll__networl_1_5_AskP_5 + P-poll__networl_1_5_AskP_6 + P-poll__networl_1_5_AskP_7 + P-poll__networl_2_2_RI_1 + P-poll__networl_2_2_RI_0 + P-poll__networl_1_6_AskP_7 + P-poll__networl_1_6_AskP_6 + P-poll__networl_1_6_AskP_5 + P-poll__networl_1_6_AskP_4 + P-poll__networl_1_6_AskP_3 + P-poll__networl_1_6_AskP_2 + P-poll__networl_1_2_RI_0 + P-poll__networl_1_2_RI_1 + P-poll__networl_1_2_RI_2 + P-poll__networl_1_2_RI_3 + P-poll__networl_1_2_RI_4 + P-poll__networl_1_2_RI_5 + P-poll__networl_1_2_RI_6 + P-poll__networl_1_2_RI_7 + P-poll__networl_1_6_AskP_1 + P-poll__networl_1_6_AskP_0 + P-poll__networl_5_4_AnsP_0 + P-poll__networl_3_1_RI_0 + P-poll__networl_3_1_RI_1 + P-poll__networl_3_1_RI_2 + P-poll__networl_3_1_RI_3 + P-poll__networl_3_1_RI_4 + P-poll__networl_3_1_RI_5 + P-poll__networl_3_1_RI_6 + P-poll__networl_3_1_RI_7 + P-poll__networl_5_7_AnnP_0 + P-poll__networl_5_7_AnnP_1 + P-poll__networl_5_7_AnnP_2 + P-poll__networl_5_7_AnnP_3 + P-poll__networl_5_7_AnnP_4 + P-poll__networl_5_7_AnnP_5 + P-poll__networl_5_7_AnnP_6 + P-poll__networl_5_7_AnnP_7 + P-poll__networl_6_1_AskP_0 + P-poll__networl_6_1_AskP_1 + P-poll__networl_6_1_AskP_2 + P-poll__networl_6_1_AskP_3 + P-poll__networl_6_1_AskP_4 + P-poll__networl_6_1_AskP_5 + P-poll__networl_6_1_AskP_6 + P-poll__networl_6_1_AskP_7 + P-poll__networl_6_4_AnnP_7 + P-poll__networl_5_0_RI_0 + P-poll__networl_5_0_RI_1 + P-poll__networl_5_0_RI_2 + P-poll__networl_2_7_RP_0 + P-poll__networl_5_0_RI_3 + P-poll__networl_2_7_RP_1 + P-poll__networl_5_0_RI_4 + P-poll__networl_2_7_RP_2 + P-poll__networl_5_0_RI_5 + P-poll__networl_2_7_RP_3 + P-poll__networl_5_0_RI_6 + P-poll__networl_2_7_RP_4 + P-poll__networl_5_0_RI_7 + P-poll__networl_2_7_RP_5 + P-poll__networl_2_7_RP_6 + P-poll__networl_2_7_RP_7 + P-poll__networl_6_4_AnnP_6 + P-poll__networl_3_2_AnnP_0 + P-poll__networl_3_2_AnnP_1 + P-poll__networl_3_2_AnnP_2 + P-poll__networl_3_2_AnnP_3 + P-poll__networl_3_2_AnnP_4 + P-poll__networl_3_2_AnnP_5 + P-poll__networl_3_2_AnnP_6 + P-poll__networl_3_2_AnnP_7 + P-poll__networl_6_4_AnnP_5 + P-poll__networl_6_4_AnnP_4 + P-poll__networl_6_4_AnnP_3 + P-poll__networl_4_6_RP_0 + P-poll__networl_4_6_RP_1 + P-poll__networl_4_6_RP_2 + P-poll__networl_4_6_RP_3 + P-poll__networl_4_6_RP_4 + P-poll__networl_4_6_RP_5 + P-poll__networl_4_6_RP_6 + P-poll__networl_4_6_RP_7 + P-poll__networl_6_4_AnnP_2 + P-poll__networl_6_4_AnnP_1 + P-poll__networl_6_4_AnnP_0 + P-poll__networl_0_3_RI_7 + P-poll__networl_0_3_RI_6 + P-poll__networl_0_3_RI_5 + P-poll__networl_0_3_RI_4 + P-poll__networl_0_3_RI_3 + P-poll__networl_0_3_RI_2 + P-poll__networl_0_3_RI_1 + P-poll__networl_5_5_AskP_0 + P-poll__networl_5_5_AskP_1 + P-poll__networl_5_5_AskP_2 + P-poll__networl_5_5_AskP_3 + P-poll__networl_5_5_AskP_4 + P-poll__networl_5_5_AskP_5 + P-poll__networl_5_5_AskP_6 + P-poll__networl_5_5_AskP_7 + P-poll__networl_0_3_RI_0 + P-poll__networl_7_6_RI_7 + P-poll__networl_6_5_RP_0 + P-poll__networl_6_5_RP_1 + P-poll__networl_6_5_RP_2 + P-poll__networl_6_5_RP_3 + P-poll__networl_6_5_RP_4 + P-poll__networl_6_5_RP_5 + P-poll__networl_6_5_RP_6 + P-poll__networl_6_5_RP_7 + P-poll__networl_2_3_AnsP_0 + P-poll__networl_7_6_RI_6 + P-poll__networl_7_6_RI_5 + P-poll__networl_7_6_RI_4 + P-poll__networl_7_6_RI_3 + P-poll__networl_7_6_RI_2 + P-poll__networl_7_6_RI_1 + P-poll__networl_7_6_RI_0 + P-poll__networl_0_0_AI_7 + P-poll__networl_1_7_AI_0 + P-poll__networl_1_7_AI_1 + P-poll__networl_1_7_AI_2 + P-poll__networl_1_7_AI_3 + P-poll__networl_1_7_AI_4 + P-poll__networl_1_7_AI_5 + P-poll__networl_1_7_AI_6 + P-poll__networl_1_7_AI_7 + P-poll__networl_0_0_AI_6 + P-poll__networl_0_0_AI_5 + P-poll__networl_2_6_AnnP_0 + P-poll__networl_2_6_AnnP_1 + P-poll__networl_2_6_AnnP_2 + P-poll__networl_2_6_AnnP_3 + P-poll__networl_2_6_AnnP_4 + P-poll__networl_2_6_AnnP_5 + P-poll__networl_2_6_AnnP_6 + P-poll__networl_2_6_AnnP_7 + P-poll__networl_0_0_AI_4 + P-poll__networl_3_0_AskP_0 + P-poll__networl_3_0_AskP_1 + P-poll__networl_3_0_AskP_2 + P-poll__networl_3_0_AskP_3 + P-poll__networl_3_0_AskP_4 + P-poll__networl_3_0_AskP_5 + P-poll__networl_3_0_AskP_6 + P-poll__networl_3_0_AskP_7 + P-poll__networl_1_1_RP_0 + P-poll__networl_1_1_RP_1 + P-poll__networl_1_1_RP_2 + P-poll__networl_1_1_RP_3 + P-poll__networl_1_1_RP_4 + P-poll__networl_1_1_RP_5 + P-poll__networl_1_1_RP_6 + P-poll__networl_1_1_RP_7 + P-poll__networl_0_0_AI_3 + P-poll__networl_3_6_AI_0 + P-poll__networl_3_6_AI_1 + P-poll__networl_3_6_AI_2 + P-poll__networl_3_6_AI_3 + P-poll__networl_3_6_AI_4 + P-poll__networl_3_6_AI_5 + P-poll__networl_3_6_AI_6 + P-poll__networl_3_6_AI_7 + P-poll__networl_0_0_AI_2 + P-poll__networl_0_0_AI_1 + P-poll__networl_0_0_AI_0 + P-poll__networl_0_1_AnnP_0 + P-poll__networl_0_1_AnnP_1 + P-poll__networl_0_1_AnnP_2 + P-poll__networl_0_1_AnnP_3 + P-poll__networl_0_1_AnnP_4 + P-poll__networl_0_1_AnnP_5 + P-poll__networl_0_1_AnnP_6 + P-poll__networl_0_1_AnnP_7 + P-poll__networl_3_0_RP_0 + P-poll__networl_3_0_RP_1 + P-poll__networl_3_0_RP_2 + P-poll__networl_3_0_RP_3 + P-poll__networl_3_0_RP_4 + P-poll__networl_3_0_RP_5 + P-poll__networl_3_0_RP_6 + P-poll__networl_3_0_RP_7 + P-poll__networl_7_3_AI_7 + P-poll__networl_1_7_AnsP_0 + P-poll__networl_7_3_AI_6 + P-poll__networl_7_3_AI_5 + P-poll__networl_7_3_AI_4 + P-poll__networl_7_3_AI_3 + P-poll__networl_7_3_AI_2 + P-poll__networl_7_3_AI_1 + P-poll__networl_7_3_AI_0 + P-poll__networl_5_5_AI_0 + P-poll__networl_5_5_AI_1 + P-poll__networl_5_5_AI_2 + P-poll__networl_5_5_AI_3 + P-poll__networl_5_5_AI_4 + P-poll__networl_5_5_AI_5 + P-poll__networl_5_5_AI_6 + P-poll__networl_5_5_AI_7 + P-poll__networl_7_2_AnnP_0 + P-poll__networl_7_2_AnnP_1 + P-poll__networl_7_2_AnnP_2 + P-poll__networl_7_2_AnnP_3 + P-poll__networl_7_2_AnnP_4 + P-poll__networl_7_2_AnnP_5 + P-poll__networl_7_2_AnnP_6 + P-poll__networl_7_2_AnnP_7 + P-poll__networl_6_1_AnsP_0 + P-poll__networl_2_4_AskP_0 + P-poll__networl_2_4_AskP_1 + P-poll__networl_2_4_AskP_2 + P-poll__networl_2_4_AskP_3 + P-poll__networl_2_4_AskP_4 + P-poll__networl_2_4_AskP_5 + P-poll__networl_2_4_AskP_6 + P-poll__networl_2_4_AskP_7 + P-poll__networl_7_4_AI_0 + P-poll__networl_7_4_AI_1 + P-poll__networl_7_4_AI_2 + P-poll__networl_7_4_AI_3 + P-poll__networl_7_4_AI_4 + P-poll__networl_7_4_AI_5 + P-poll__networl_7_4_AI_6 + P-poll__networl_7_4_AI_7 + P-poll__networl_0_1_AI_0 + P-poll__networl_0_1_AI_1 + P-poll__networl_0_1_AI_2 + P-poll__networl_0_1_AI_3 + P-poll__networl_0_1_AI_4 + P-poll__networl_0_1_AI_5 + P-poll__networl_0_1_AI_6 + P-poll__networl_0_1_AI_7 + P-poll__networl_7_7_RI_0 + P-poll__networl_7_7_RI_1 + P-poll__networl_7_7_RI_2 + P-poll__networl_7_7_RI_3 + P-poll__networl_7_7_RI_4 + P-poll__networl_7_7_RI_5 + P-poll__networl_7_7_RI_6 + P-poll__networl_7_7_RI_7 + P-poll__networl_0_4_RI_0 + P-poll__networl_0_4_RI_1 + P-poll__networl_0_4_RI_2 + P-poll__networl_0_4_RI_3 + P-poll__networl_0_4_RI_4 + P-poll__networl_0_4_RI_5 + P-poll__networl_0_4_RI_6 + P-poll__networl_0_4_RI_7 + P-poll__networl_6_3_AnsP_0 + P-poll__networl_5_7_RI_7 + P-poll__networl_5_7_RI_6 + P-poll__networl_5_7_RI_5 + P-poll__networl_5_7_RI_4 + P-poll__networl_5_7_RI_3 + P-poll__networl_5_7_RI_2 + P-poll__networl_5_7_RI_1 + P-poll__networl_2_0_AI_0 + P-poll__networl_2_0_AI_1 + P-poll__networl_2_0_AI_2 + P-poll__networl_2_0_AI_3 + P-poll__networl_2_0_AI_4 + P-poll__networl_2_0_AI_5 + P-poll__networl_2_0_AI_6 + P-poll__networl_2_0_AI_7 + P-poll__networl_2_3_RI_0 + P-poll__networl_2_3_RI_1 + P-poll__networl_2_3_RI_2 + P-poll__networl_2_3_RI_3 + P-poll__networl_2_3_RI_4 + P-poll__networl_2_3_RI_5 + P-poll__networl_2_3_RI_6 + P-poll__networl_2_3_RI_7 + P-poll__networl_5_7_RI_0 + P-poll__networl_5_4_AI_7 + P-poll__networl_6_6_AnnP_0 + P-poll__networl_6_6_AnnP_1 + P-poll__networl_6_6_AnnP_2 + P-poll__networl_6_6_AnnP_3 + P-poll__networl_6_6_AnnP_4 + P-poll__networl_6_6_AnnP_5 + P-poll__networl_6_6_AnnP_6 + P-poll__networl_6_6_AnnP_7 + P-poll__networl_5_4_AI_6 + P-poll__networl_7_0_AskP_0 + P-poll__networl_7_0_AskP_1 + P-poll__networl_7_0_AskP_2 + P-poll__networl_7_0_AskP_3 + P-poll__networl_7_0_AskP_4 + P-poll__networl_7_0_AskP_5 + P-poll__networl_7_0_AskP_6 + P-poll__networl_7_0_AskP_7 + P-poll__networl_5_4_AI_5 + P-poll__networl_5_4_AI_4 + P-poll__networl_5_4_AI_3 + P-poll__networl_5_4_AI_2 + P-poll__networl_5_4_AI_1 + P-poll__networl_5_4_AI_0 + P-poll__networl_4_2_RI_0 + P-poll__networl_4_2_RI_1 + P-poll__networl_4_2_RI_2 + P-poll__networl_4_2_RI_3 + P-poll__networl_4_2_RI_4 + P-poll__networl_4_2_RI_5 + P-poll__networl_4_2_RI_6 + P-poll__networl_4_2_RI_7 + P-poll__networl_4_1_AnnP_0 + P-poll__networl_4_1_AnnP_1 + P-poll__networl_4_1_AnnP_2 + P-poll__networl_4_1_AnnP_3 + P-poll__networl_4_1_AnnP_4 + P-poll__networl_4_1_AnnP_5 + P-poll__networl_4_1_AnnP_6 + P-poll__networl_4_1_AnnP_7 + P-poll__networl_2_2_AskP_7 + P-poll__networl_5_7_AnsP_0 + P-poll__networl_2_2_AskP_6 + P-poll__networl_2_2_AskP_5 + P-poll__networl_2_2_AskP_4 + P-poll__networl_2_2_AskP_3 + P-poll__networl_2_2_AskP_2 + P-poll__networl_2_2_AskP_1 + P-poll__networl_2_2_AskP_0 + P-poll__networl_6_1_RI_0 + P-poll__networl_6_1_RI_1 + P-poll__networl_6_1_RI_2 + P-poll__networl_6_1_RI_3 + P-poll__networl_6_1_RI_4 + P-poll__networl_6_1_RI_5 + P-poll__networl_6_1_RI_6 + P-poll__networl_6_1_RI_7 + P-poll__networl_7_0_AnnP_7 + P-poll__networl_7_0_AnnP_6 + P-poll__networl_7_0_AnnP_5 + P-poll__networl_6_4_AskP_0 + P-poll__networl_6_4_AskP_1 + P-poll__networl_6_4_AskP_2 + P-poll__networl_6_4_AskP_3 + P-poll__networl_6_4_AskP_4 + P-poll__networl_6_4_AskP_5 + P-poll__networl_6_4_AskP_6 + P-poll__networl_6_4_AskP_7 + P-poll__networl_7_0_AnnP_4 + P-poll__networl_7_0_AnnP_3 + P-poll__networl_3_2_AnsP_0 + P-poll__networl_7_0_AnnP_2 + P-poll__networl_7_0_AnnP_1 + P-poll__networl_7_0_AnnP_0 + P-poll__networl_3_5_AI_7 + P-poll__networl_3_5_AI_6 + P-poll__networl_3_5_AI_5 + P-poll__networl_3_5_AI_4 + P-poll__networl_3_5_AI_3 + P-poll__networl_5_7_RP_0 + P-poll__networl_5_7_RP_1 + P-poll__networl_5_7_RP_2 + P-poll__networl_5_7_RP_3 + P-poll__networl_5_7_RP_4 + P-poll__networl_5_7_RP_5 + P-poll__networl_5_7_RP_6 + P-poll__networl_5_7_RP_7 + P-poll__networl_3_5_AI_2 + P-poll__networl_3_5_AI_1 + P-poll__networl_3_5_AI_0 + P-poll__networl_1_5_AnsP_0 + P-poll__networl_3_5_AnnP_0 + P-poll__networl_3_5_AnnP_1 + P-poll__networl_3_5_AnnP_2 + P-poll__networl_3_5_AnnP_3 + P-poll__networl_3_5_AnnP_4 + P-poll__networl_3_5_AnnP_5 + P-poll__networl_3_5_AnnP_6 + P-poll__networl_3_5_AnnP_7 + P-poll__networl_7_6_RP_0 + P-poll__networl_7_6_RP_1 + P-poll__networl_7_6_RP_2 + P-poll__networl_7_6_RP_3 + P-poll__networl_7_6_RP_4 + P-poll__networl_7_6_RP_5 + P-poll__networl_7_6_RP_6 + P-poll__networl_7_6_RP_7 + P-poll__networl_0_3_RP_0 + P-poll__networl_0_3_RP_1 + P-poll__networl_0_3_RP_2 + P-poll__networl_0_3_RP_3 + P-poll__networl_0_3_RP_4 + P-poll__networl_0_3_RP_5 + P-poll__networl_0_3_RP_6 + P-poll__networl_0_3_RP_7 + P-poll__networl_1_0_RP_7 + P-poll__networl_1_0_RP_6 + P-poll__networl_1_0_RP_5 + P-poll__networl_1_0_RP_4 + P-poll__networl_1_0_RP_3 + P-poll__networl_1_0_RP_2 + P-poll__networl_1_0_RP_1 + P-poll__networl_1_0_RP_0 + P-poll__networl_1_0_AnnP_0 + P-poll__networl_1_0_AnnP_1 + P-poll__networl_1_0_AnnP_2 + P-poll__networl_1_0_AnnP_3 + P-poll__networl_1_0_AnnP_4 + P-poll__networl_1_0_AnnP_5 + P-poll__networl_1_0_AnnP_6 + P-poll__networl_1_0_AnnP_7 + P-poll__networl_4_7_AskP_7 + P-poll__networl_4_7_AskP_6 + P-poll__networl_4_7_AskP_5 + P-poll__networl_4_7_AskP_4 + P-poll__networl_2_2_RP_0 + P-poll__networl_2_2_RP_1 + P-poll__networl_2_2_RP_2 + P-poll__networl_2_2_RP_3 + P-poll__networl_2_2_RP_4 + P-poll__networl_2_2_RP_5 + P-poll__networl_2_2_RP_6 + P-poll__networl_2_2_RP_7 + P-poll__networl_2_6_AnsP_0 + P-poll__networl_4_7_AskP_3 + P-poll__networl_4_7_AskP_2 + P-poll__networl_4_7_AskP_1 + P-poll__networl_4_7_AskP_0 + P-poll__networl_4_7_AI_0 + P-poll__networl_4_7_AI_1 + P-poll__networl_4_7_AI_2 + P-poll__networl_4_7_AI_3 + P-poll__networl_4_7_AI_4 + P-poll__networl_4_7_AI_5 + P-poll__networl_4_7_AI_6 + P-poll__networl_4_7_AI_7 + P-poll__networl_1_6_AI_7 + P-poll__networl_1_6_AI_6 + P-poll__networl_1_6_AI_5 + P-poll__networl_1_6_AI_4 + P-poll__networl_1_6_AI_3 + P-poll__networl_1_6_AI_2 + P-poll__networl_1_6_AI_1 + P-poll__networl_3_3_AskP_0 + P-poll__networl_3_3_AskP_1 + P-poll__networl_3_3_AskP_2 + P-poll__networl_3_3_AskP_3 + P-poll__networl_3_3_AskP_4 + P-poll__networl_3_3_AskP_5 + P-poll__networl_3_3_AskP_6 + P-poll__networl_3_3_AskP_7 + P-poll__networl_4_1_RP_0 + P-poll__networl_4_1_RP_1 + P-poll__networl_4_1_RP_2 + P-poll__networl_4_1_RP_3 + P-poll__networl_4_1_RP_4 + P-poll__networl_4_1_RP_5 + P-poll__networl_4_1_RP_6 + P-poll__networl_4_1_RP_7 + P-poll__networl_1_6_AI_0 + P-poll__networl_6_6_AI_0 + P-poll__networl_6_6_AI_1 + P-poll__networl_6_6_AI_2 + P-poll__networl_6_6_AI_3 + P-poll__networl_6_6_AI_4 + P-poll__networl_6_6_AI_5 + P-poll__networl_6_6_AI_6 + P-poll__networl_6_6_AI_7 + P-poll__networl_0_1_AnsP_0 + P-poll__networl_6_4_RP_7 + P-poll__networl_6_4_RP_6 + P-poll__networl_6_4_RP_5 + P-poll__networl_7_2_AnsP_0 + P-poll__networl_6_4_RP_4 + P-poll__networl_6_4_RP_3 + P-poll__networl_6_4_RP_2 + P-poll__networl_6_4_RP_1 + P-poll__networl_6_4_RP_0 + P-poll__networl_0_4_AnnP_0 + P-poll__networl_0_4_AnnP_1 + P-poll__networl_0_4_AnnP_2 + P-poll__networl_0_4_AnnP_3 + P-poll__networl_0_4_AnnP_4 + P-poll__networl_0_4_AnnP_5 + P-poll__networl_0_4_AnnP_6 + P-poll__networl_0_4_AnnP_7 + P-poll__networl_6_0_RP_0 + P-poll__networl_6_0_RP_1 + P-poll__networl_6_0_RP_2 + P-poll__networl_6_0_RP_3 + P-poll__networl_6_0_RP_4 + P-poll__networl_6_0_RP_5 + P-poll__networl_6_0_RP_6 + P-poll__networl_6_0_RP_7 + P-poll__networl_1_2_AI_0 + P-poll__networl_1_2_AI_1 + P-poll__networl_1_2_AI_2 + P-poll__networl_1_2_AI_3 + P-poll__networl_1_2_AI_4 + P-poll__networl_1_2_AI_5 + P-poll__networl_1_2_AI_6 + P-poll__networl_1_2_AI_7 + P-poll__networl_1_5_RI_0 + P-poll__networl_1_5_RI_1 + P-poll__networl_1_5_RI_2 + P-poll__networl_1_5_RI_3 + P-poll__networl_1_5_RI_4 + P-poll__networl_1_5_RI_5 + P-poll__networl_1_5_RI_6 + P-poll__networl_1_5_RI_7 + P-poll__networl_7_5_AnnP_0 + P-poll__networl_7_5_AnnP_1 + P-poll__networl_7_5_AnnP_2 + P-poll__networl_7_5_AnnP_3 + P-poll__networl_7_5_AnnP_4 + P-poll__networl_7_5_AnnP_5 + P-poll__networl_7_5_AnnP_6 + P-poll__networl_7_5_AnnP_7 + P-poll__networl_2_7_AskP_0 + P-poll__networl_2_7_AskP_1 + P-poll__networl_2_7_AskP_2 + P-poll__networl_2_7_AskP_3 + P-poll__networl_2_7_AskP_4 + P-poll__networl_2_7_AskP_5 + P-poll__networl_2_7_AskP_6 + P-poll__networl_2_7_AskP_7 + P-poll__networl_2_4_AnnP_7 + P-poll__networl_2_4_AnnP_6 + P-poll__networl_2_4_AnnP_5 + P-poll__networl_3_1_AI_0 + P-poll__networl_3_1_AI_1 + P-poll__networl_3_1_AI_2 + P-poll__networl_3_1_AI_3 + P-poll__networl_3_1_AI_4 + P-poll__networl_3_1_AI_5 + P-poll__networl_3_1_AI_6 + P-poll__networl_3_1_AI_7 + P-poll__networl_3_4_RI_0 + P-poll__networl_3_4_RI_1 + P-poll__networl_3_4_RI_2 + P-poll__networl_3_4_RI_3 + P-poll__networl_3_4_RI_4 + P-poll__networl_3_4_RI_5 + P-poll__networl_3_4_RI_6 + P-poll__networl_3_4_RI_7 + P-poll__networl_2_4_AnnP_4 + P-poll__networl_5_0_AnnP_0 + P-poll__networl_5_0_AnnP_1 + P-poll__networl_5_0_AnnP_2 + P-poll__networl_5_0_AnnP_3 + P-poll__networl_5_0_AnnP_4 + P-poll__networl_5_0_AnnP_5 + P-poll__networl_5_0_AnnP_6 + P-poll__networl_5_0_AnnP_7 + P-poll__networl_2_4_AnnP_3 + P-poll__networl_6_6_AnsP_0 + P-poll__networl_2_4_AnnP_2 + P-poll__networl_2_4_AnnP_1 + P-poll__networl_2_4_AnnP_0 + P-poll__networl_5_0_AI_0 + P-poll__networl_5_0_AI_1 + P-poll__networl_5_0_AI_2 + P-poll__networl_5_0_AI_3 + P-poll__networl_5_0_AI_4 + P-poll__networl_5_0_AI_5 + P-poll__networl_5_0_AI_6 + P-poll__networl_5_0_AI_7 + P-poll__networl_2_1_AnsP_0 + P-poll__networl_4_5_RP_7 + P-poll__networl_4_5_RP_6 + P-poll__networl_4_5_RP_5 + P-poll__networl_4_5_RP_4 + P-poll__networl_4_5_RP_3 + P-poll__networl_4_5_RP_2 + P-poll__networl_0_2_AskP_0 + P-poll__networl_0_2_AskP_1 + P-poll__networl_0_2_AskP_2 + P-poll__networl_0_2_AskP_3 + P-poll__networl_0_2_AskP_4 + P-poll__networl_0_2_AskP_5 + P-poll__networl_0_2_AskP_6 + P-poll__networl_0_2_AskP_7 + P-poll__networl_5_3_RI_0 + P-poll__networl_5_3_RI_1 + P-poll__networl_5_3_RI_2 + P-poll__networl_5_3_RI_3 + P-poll__networl_5_3_RI_4 + P-poll__networl_5_3_RI_5 + P-poll__networl_5_3_RI_6 + P-poll__networl_5_3_RI_7 + P-poll__networl_4_5_RP_1 + P-poll__networl_4_5_RP_0 + P-poll__networl_7_3_AskP_0 + P-poll__networl_7_3_AskP_1 + P-poll__networl_7_3_AskP_2 + P-poll__networl_7_3_AskP_3 + P-poll__networl_7_3_AskP_4 + P-poll__networl_7_3_AskP_5 + P-poll__networl_7_3_AskP_6 + P-poll__networl_7_3_AskP_7 + P-poll__networl_5_3_AskP_7 + P-poll__networl_5_3_AskP_6 + P-poll__networl_5_3_AskP_5 + P-poll__networl_4_1_AnsP_0 + P-poll__networl_5_3_AskP_4 + P-poll__networl_5_3_AskP_3 + P-poll__networl_5_3_AskP_2 + P-poll__networl_5_3_AskP_1 + P-poll__networl_5_3_AskP_0 + P-poll__networl_7_2_RI_0 + P-poll__networl_7_2_RI_1 + P-poll__networl_7_2_RI_2 + P-poll__networl_7_2_RI_3 + P-poll__networl_7_2_RI_4 + P-poll__networl_7_2_RI_5 + P-poll__networl_7_2_RI_6 + P-poll__networl_7_2_RI_7 + P-poll__networl_4_4_AnnP_0 + P-poll__networl_4_4_AnnP_1 + P-poll__networl_4_4_AnnP_2 + P-poll__networl_4_4_AnnP_3 + P-poll__networl_4_4_AnnP_4 + P-poll__networl_4_4_AnnP_5 + P-poll__networl_4_4_AnnP_6 + P-poll__networl_4_4_AnnP_7 + P-poll__networl_2_6_RP_7 + P-poll__networl_2_6_RP_6 + P-poll__networl_2_6_RP_5 + P-poll__networl_2_6_RP_4 + P-poll__networl_2_6_RP_3 + P-poll__networl_2_6_RP_2 + P-poll__networl_2_6_RP_1 + P-poll__networl_2_6_RP_0 + P-poll__networl_4_6_AnsP_0 + P-poll__networl_6_7_AskP_0 + P-poll__networl_6_7_AskP_1 + P-poll__networl_6_7_AskP_2 + P-poll__networl_6_7_AskP_3 + P-poll__networl_6_7_AskP_4 + P-poll__networl_6_7_AskP_5 + P-poll__networl_6_7_AskP_6 + P-poll__networl_6_7_AskP_7 + P-poll__networl_3_5_AnsP_0 + P-poll__networl_3_0_AnnP_7 + P-poll__networl_3_0_AnnP_6 + P-poll__networl_3_0_AnnP_5 + P-poll__networl_1_4_RP_0 + P-poll__networl_1_4_RP_1 + P-poll__networl_1_4_RP_2 + P-poll__networl_1_4_RP_3 + P-poll__networl_1_4_RP_4 + P-poll__networl_1_4_RP_5 + P-poll__networl_1_4_RP_6 + P-poll__networl_1_4_RP_7 + P-poll__networl_3_0_AnnP_4 + P-poll__networl_3_0_AnnP_3 + P-poll__networl_3_0_AnnP_2 + P-poll__networl_3_0_AnnP_1 + P-poll__networl_3_0_AnnP_0 + P-poll__networl_4_2_AskP_0 + P-poll__networl_4_2_AskP_1 + P-poll__networl_4_2_AskP_2 + P-poll__networl_4_2_AskP_3 + P-poll__networl_4_2_AskP_4 + P-poll__networl_4_2_AskP_5 + P-poll__networl_4_2_AskP_6 + P-poll__networl_4_2_AskP_7 + P-poll__networl_3_3_RP_0 + P-poll__networl_3_3_RP_1 + P-poll__networl_3_3_RP_2 + P-poll__networl_3_3_RP_3 + P-poll__networl_3_3_RP_4 + P-poll__networl_3_3_RP_5 + P-poll__networl_3_3_RP_6 + P-poll__networl_3_3_RP_7 + P-poll__networl_1_0_AnsP_0 + P-poll__networl_0_7_RP_7 + P-poll__networl_0_7_RP_6 + P-poll__networl_0_7_RP_5 + P-poll__networl_3_0_RI_7 + P-poll__networl_0_7_RP_4 + P-poll__networl_3_0_RI_6 + P-poll__networl_0_7_RP_3 + P-poll__networl_1_3_AnnP_0 + P-poll__networl_1_3_AnnP_1 + P-poll__networl_1_3_AnnP_2 + P-poll__networl_1_3_AnnP_3 + P-poll__networl_1_3_AnnP_4 + P-poll__networl_1_3_AnnP_5 + P-poll__networl_1_3_AnnP_6 + P-poll__networl_1_3_AnnP_7 + P-poll__networl_3_0_RI_5 + P-poll__networl_0_7_RP_2 + P-poll__networl_5_2_RP_0 + P-poll__networl_5_2_RP_1 + P-poll__networl_5_2_RP_2 + P-poll__networl_5_2_RP_3 + P-poll__networl_5_2_RP_4 + P-poll__networl_5_2_RP_5 + P-poll__networl_5_2_RP_6 + P-poll__networl_5_2_RP_7 + P-poll__networl_3_0_RI_4 + P-poll__networl_0_7_RP_1 + P-poll__networl_3_0_RI_3 + P-poll__networl_7_7_AI_0 + P-poll__networl_7_7_AI_1 + P-poll__networl_7_7_AI_2 + P-poll__networl_7_7_AI_3 + P-poll__networl_7_7_AI_4 + P-poll__networl_7_7_AI_5 + P-poll__networl_7_7_AI_6 + P-poll__networl_7_7_AI_7 + P-poll__networl_0_4_AI_0 + P-poll__networl_0_4_AI_1 + P-poll__networl_0_4_AI_2 + P-poll__networl_0_4_AI_3 + P-poll__networl_0_4_AI_4 + P-poll__networl_0_4_AI_5 + P-poll__networl_0_4_AI_6 + P-poll__networl_0_4_AI_7 + P-poll__networl_0_7_RI_0 + P-poll__networl_0_7_RI_1 + P-poll__networl_0_7_RI_2 + P-poll__networl_0_7_RI_3 + P-poll__networl_0_7_RI_4 + P-poll__networl_0_7_RI_5 + P-poll__networl_0_7_RI_6 + P-poll__networl_0_7_RI_7 + P-poll__networl_0_7_RP_0 + P-poll__networl_3_0_RI_2 + P-poll__networl_3_0_RI_1 + P-poll__networl_3_0_RI_0 + P-poll__networl_3_6_AskP_0 + P-poll__networl_3_6_AskP_1 + P-poll__networl_3_6_AskP_2 + P-poll__networl_3_6_AskP_3 + P-poll__networl_3_6_AskP_4 + P-poll__networl_3_6_AskP_5 + P-poll__networl_3_6_AskP_6 + P-poll__networl_3_6_AskP_7 + P-poll__networl_7_1_RP_0 + P-poll__networl_7_1_RP_1 + P-poll__networl_7_1_RP_2 + P-poll__networl_7_1_RP_3 + P-poll__networl_7_1_RP_4 + P-poll__networl_7_1_RP_5 + P-poll__networl_7_1_RP_6 + P-poll__networl_7_1_RP_7 + P-poll__networl_2_3_AI_0 + P-poll__networl_2_3_AI_1 + P-poll__networl_2_3_AI_2 + P-poll__networl_0_4_AnsP_0 + P-poll__networl_2_3_AI_3 + P-poll__networl_2_3_AI_4 + P-poll__networl_2_3_AI_5 + P-poll__networl_2_3_AI_6 + P-poll__networl_2_3_AI_7 + P-poll__networl_2_6_RI_0 + P-poll__networl_2_6_RI_1 + P-poll__networl_2_6_RI_2 + P-poll__networl_2_6_RI_3 + P-poll__networl_2_6_RI_4 + P-poll__networl_2_6_RI_5 + P-poll__networl_2_6_RI_6 + P-poll__networl_2_6_RI_7 + P-poll__networl_0_7_AskP_7 + P-poll__networl_0_7_AskP_6 + P-poll__networl_0_7_AskP_5 + P-poll__networl_0_7_AskP_4 + P-poll__networl_0_7_AskP_3 + P-poll__networl_0_7_AskP_2 + P-poll__networl_0_7_AskP_1 + P-poll__networl_0_7_AskP_0 + P-poll__networl_7_5_AnsP_0 + P-poll__networl_0_7_AnnP_0 + P-poll__networl_0_7_AnnP_1 + P-poll__networl_0_7_AnnP_2 + P-poll__networl_0_7_AnnP_3 + P-poll__networl_0_7_AnnP_4 + P-poll__networl_0_7_AnnP_5 + P-poll__networl_0_7_AnnP_6 + P-poll__networl_0_7_AnnP_7 + P-poll__networl_1_1_AskP_0 + P-poll__networl_1_1_AskP_1 + P-poll__networl_1_1_AskP_2 + P-poll__networl_1_1_AskP_3 + P-poll__networl_1_1_AskP_4 + P-poll__networl_1_1_AskP_5 + P-poll__networl_1_1_AskP_6 + P-poll__networl_1_1_AskP_7 + P-poll__networl_4_2_AI_0 + P-poll__networl_4_2_AI_1 + P-poll__networl_4_2_AI_2 + P-poll__networl_4_2_AI_3 + P-poll__networl_4_2_AI_4 + P-poll__networl_4_2_AI_5 + P-poll__networl_4_2_AI_6 + P-poll__networl_4_2_AI_7 + P-poll__networl_4_5_RI_0 + P-poll__networl_4_5_RI_1 + P-poll__networl_4_5_RI_2 + P-poll__networl_4_5_RI_3 + P-poll__networl_4_5_RI_4 + P-poll__networl_4_5_RI_5 + P-poll__networl_4_5_RI_6 + P-poll__networl_4_5_RI_7 + P-poll__networl_5_5_AnnP_7 + P-poll__networl_5_0_AnsP_0 + P-poll__networl_5_5_AnnP_6 + P-poll__networl_5_5_AnnP_5 + P-poll__networl_5_5_AnnP_4 + P-poll__networl_5_5_AnnP_3 + P-poll__networl_5_5_AnnP_2 + P-poll__networl_5_5_AnnP_1 + P-poll__networl_5_5_AnnP_0 + P-poll__networl_1_1_RI_7 + P-poll__networl_6_1_AI_0 + P-poll__networl_6_1_AI_1 + P-poll__networl_6_1_AI_2 + P-poll__networl_6_1_AI_3 + P-poll__networl_6_1_AI_4 + P-poll__networl_6_1_AI_5 + P-poll__networl_6_1_AI_6 + P-poll__networl_6_1_AI_7 + P-poll__networl_6_4_RI_0 + P-poll__networl_6_4_RI_1 + P-poll__networl_6_4_RI_2 + P-poll__networl_6_4_RI_3 + P-poll__networl_6_4_RI_4 + P-poll__networl_6_4_RI_5 + P-poll__networl_6_4_RI_6 + P-poll__networl_6_4_RI_7 + P-poll__networl_1_1_RI_6 + P-poll__networl_5_3_AnnP_0 + P-poll__networl_5_3_AnnP_1 + P-poll__networl_5_3_AnnP_2 + P-poll__networl_5_3_AnnP_3 + P-poll__networl_5_3_AnnP_4 + P-poll__networl_5_3_AnnP_5 + P-poll__networl_5_3_AnnP_6 + P-poll__networl_5_3_AnnP_7 + P-poll__networl_1_1_RI_5 + P-poll__networl_1_1_RI_4 + P-poll__networl_1_1_RI_3 + P-poll__networl_1_1_RI_2 + P-poll__networl_1_1_RI_1 + P-poll__networl_1_1_RI_0 + P-poll__networl_5_2_AnsP_0 + P-poll__networl_0_5_AskP_0 + P-poll__networl_0_5_AskP_1 + P-poll__networl_0_5_AskP_2 + P-poll__networl_0_5_AskP_3 + P-poll__networl_0_5_AskP_4 + P-poll__networl_0_5_AskP_5 + P-poll__networl_0_5_AskP_6 + P-poll__networl_0_5_AskP_7 + P-poll__networl_1_0_RI_0 + P-poll__networl_1_0_RI_1 + P-poll__networl_1_0_RI_2 + P-poll__networl_1_0_RI_3 + P-poll__networl_1_0_RI_4 + P-poll__networl_1_0_RI_5 + P-poll__networl_1_0_RI_6 + P-poll__networl_1_0_RI_7 + P-poll__networl_7_6_AskP_0 + P-poll__networl_7_6_AskP_1 + P-poll__networl_7_6_AskP_2 + P-poll__networl_7_6_AskP_3 + P-poll__networl_7_6_AskP_4 + P-poll__networl_7_6_AskP_5 + P-poll__networl_7_6_AskP_6 + P-poll__networl_7_6_AskP_7 + P-poll__networl_4_4_AnsP_0 + P-poll__networl_6_5_RI_7 + P-poll__networl_6_5_RI_6 + P-poll__networl_6_5_RI_5 + P-poll__networl_0_6_RP_0 + P-poll__networl_0_6_RP_1 + P-poll__networl_0_6_RP_2 + P-poll__networl_0_6_RP_3 + P-poll__networl_0_6_RP_4 + P-poll__networl_0_6_RP_5 + P-poll__networl_0_6_RP_6 + P-poll__networl_0_6_RP_7 + P-poll__networl_4_7_AnnP_0 + P-poll__networl_4_7_AnnP_1 + P-poll__networl_4_7_AnnP_2 + P-poll__networl_4_7_AnnP_3 + P-poll__networl_4_7_AnnP_4 + P-poll__networl_4_7_AnnP_5 + P-poll__networl_4_7_AnnP_6 + P-poll__networl_4_7_AnnP_7 + P-poll__networl_6_5_RI_4 + P-poll__networl_6_5_RI_3 + P-poll__networl_6_5_RI_2 + P-poll__networl_6_5_RI_1 + P-poll__networl_6_5_RI_0 + P-poll__networl_6_2_AI_7 + P-poll__networl_6_2_AI_6 + P-poll__networl_6_2_AI_5 + P-poll__networl_6_2_AI_4 + P-poll__networl_5_1_AskP_0 + P-poll__networl_5_1_AskP_1 + P-poll__networl_5_1_AskP_2 + P-poll__networl_5_1_AskP_3 + P-poll__networl_5_1_AskP_4 + P-poll__networl_5_1_AskP_5 + P-poll__networl_5_1_AskP_6 + P-poll__networl_5_1_AskP_7 + P-poll__networl_6_2_AI_3 + P-poll__networl_6_2_AI_2 + P-poll__networl_6_2_AI_1 + P-poll__networl_6_2_AI_0 + P-poll__networl_1_3_AskP_7 + P-poll__networl_1_3_AskP_6 + P-poll__networl_1_3_AskP_5 + P-poll__networl_1_3_AskP_4 + P-poll__networl_1_3_AskP_3 + P-poll__networl_2_5_RP_0 + P-poll__networl_2_5_RP_1 + P-poll__networl_2_5_RP_2 + P-poll__networl_2_5_RP_3 + P-poll__networl_2_5_RP_4 + P-poll__networl_2_5_RP_5 + P-poll__networl_2_5_RP_6 + P-poll__networl_2_5_RP_7 + P-poll__networl_1_3_AskP_2 + P-poll__networl_2_2_AnnP_0 + P-poll__networl_2_2_AnnP_1 + P-poll__networl_2_2_AnnP_2 + P-poll__networl_2_2_AnnP_3 + P-poll__networl_2_2_AnnP_4 + P-poll__networl_2_2_AnnP_5 + P-poll__networl_2_2_AnnP_6 + P-poll__networl_2_2_AnnP_7 + P-poll__networl_1_3_AskP_1 + P-poll__networl_1_3_AskP_0 + P-poll__networl_4_4_RP_0 + P-poll__networl_4_4_RP_1 + P-poll__networl_4_4_RP_2 + P-poll__networl_4_4_RP_3 + P-poll__networl_4_4_RP_4 + P-poll__networl_4_4_RP_5 + P-poll__networl_4_4_RP_6 + P-poll__networl_4_4_RP_7 + P-poll__networl_4_5_AskP_0 + P-poll__networl_4_5_AskP_1 + P-poll__networl_4_5_AskP_2 + P-poll__networl_4_5_AskP_3 + P-poll__networl_4_5_AskP_4 + P-poll__networl_4_5_AskP_5 + P-poll__networl_4_5_AskP_6 + P-poll__networl_4_5_AskP_7 + P-poll__networl_6_3_RP_0 + P-poll__networl_6_3_RP_1 + P-poll__networl_6_3_RP_2 + P-poll__networl_6_3_RP_3 + P-poll__networl_6_3_RP_4 + P-poll__networl_6_3_RP_5 + P-poll__networl_6_3_RP_6 + P-poll__networl_6_3_RP_7 + P-poll__networl_1_3_AnsP_0 + P-poll__networl_7_7_AnsP_0 + P-poll__networl_1_5_AI_0 + P-poll__networl_1_5_AI_1 + P-poll__networl_1_5_AI_2 + P-poll__networl_1_5_AI_3 + P-poll__networl_1_5_AI_4 + P-poll__networl_1_5_AI_5 + P-poll__networl_1_5_AI_6 + P-poll__networl_1_5_AI_7 + P-poll__networl_1_6_AnnP_0 + P-poll__networl_1_6_AnnP_1 + P-poll__networl_1_6_AnnP_2 + P-poll__networl_1_6_AnnP_3 + P-poll__networl_1_6_AnnP_4 + P-poll__networl_1_6_AnnP_5 + P-poll__networl_1_6_AnnP_6 + P-poll__networl_1_6_AnnP_7 + P-poll__networl_2_0_AskP_0 + P-poll__networl_2_0_AskP_1 + P-poll__networl_2_0_AskP_2 + P-poll__networl_2_0_AskP_3 + P-poll__networl_2_0_AskP_4 + P-poll__networl_2_0_AskP_5 + P-poll__networl_2_0_AskP_6 + P-poll__networl_2_0_AskP_7 + P-poll__networl_3_4_AI_0 + P-poll__networl_3_4_AI_1 + P-poll__networl_3_4_AI_2 + P-poll__networl_3_4_AI_3 + P-poll__networl_3_4_AI_4 + P-poll__networl_3_4_AI_5 + P-poll__networl_3_4_AI_6 + P-poll__networl_3_4_AI_7 + P-poll__networl_3_7_RI_0 + P-poll__networl_3_7_RI_1 + P-poll__networl_3_7_RI_2 + P-poll__networl_3_7_RI_3 + P-poll__networl_3_7_RI_4 + P-poll__networl_3_7_RI_5 + P-poll__networl_3_7_RI_6 + P-poll__networl_3_7_RI_7 + P-poll__networl_6_1_AnnP_7 + P-poll__networl_6_1_AnnP_6 + P-poll__networl_6_1_AnnP_5 + P-poll__networl_5_3_AI_0 + P-poll__networl_5_3_AI_1 + P-poll__networl_5_3_AI_2 + P-poll__networl_0_7_AnsP_0 + P-poll__networl_5_3_AI_3 + P-poll__networl_6_1_AnnP_4 + P-poll__networl_5_3_AI_4 + P-poll__networl_6_1_AnnP_3 + P-poll__networl_5_3_AI_5 + P-poll__networl_6_1_AnnP_2 + P-poll__networl_5_3_AI_6 + P-poll__networl_6_1_AnnP_1 + P-poll__networl_5_3_AI_7 + P-poll__networl_6_1_AnnP_0 + P-poll__networl_5_6_RI_0 + P-poll__networl_5_6_RI_1 + P-poll__networl_5_6_RI_2 + P-poll__networl_5_6_RI_3 + P-poll__networl_5_6_RI_4 + P-poll__networl_5_6_RI_5 + P-poll__networl_5_6_RI_6 + P-poll__networl_5_6_RI_7 + P-poll__networl_6_2_AnnP_0 + P-poll__networl_6_2_AnnP_1 + P-poll__networl_6_2_AnnP_2 + P-poll__networl_6_2_AnnP_3 + P-poll__networl_6_2_AnnP_4 + P-poll__networl_6_2_AnnP_5 + P-poll__networl_6_2_AnnP_6 + P-poll__networl_6_2_AnnP_7 + P-poll__networl_4_6_RI_7 + P-poll__networl_4_6_RI_6 + P-poll__networl_4_6_RI_5 + P-poll__networl_4_6_RI_4 + P-poll__networl_4_6_RI_3 + P-poll__networl_4_6_RI_2 + P-poll__networl_4_6_RI_1 + P-poll__networl_4_6_RI_0 + P-poll__networl_4_3_AI_7 + P-poll__networl_4_3_AI_6 + P-poll__networl_4_3_AI_5 + P-poll__networl_4_3_AI_4 + P-poll__networl_4_3_AI_3 + P-poll__networl_1_4_AskP_0 + P-poll__networl_1_4_AskP_1 + P-poll__networl_1_4_AskP_2 + P-poll__networl_1_4_AskP_3 + P-poll__networl_1_4_AskP_4 + P-poll__networl_1_4_AskP_5 + P-poll__networl_1_4_AskP_6 + P-poll__networl_1_4_AskP_7 + P-poll__networl_7_2_AI_0 + P-poll__networl_7_2_AI_1 + P-poll__networl_7_2_AI_2 + P-poll__networl_7_2_AI_3 + P-poll__networl_7_2_AI_4 + P-poll__networl_7_2_AI_5 + P-poll__networl_7_2_AI_6 + P-poll__networl_7_2_AI_7 + P-poll__networl_7_5_RI_0 + P-poll__networl_7_5_RI_1 + P-poll__networl_7_5_RI_2 + P-poll__networl_7_5_RI_3 + P-poll__networl_7_5_RI_4 + P-poll__networl_7_5_RI_5 + P-poll__networl_7_5_RI_6 + P-poll__networl_7_5_RI_7 + P-poll__networl_0_2_RI_0 + P-poll__networl_0_2_RI_1 + P-poll__networl_0_2_RI_2 + P-poll__networl_0_2_RI_3 + P-poll__networl_0_2_RI_4 + P-poll__networl_0_2_RI_5 + P-poll__networl_0_2_RI_6 + P-poll__networl_0_2_RI_7 + P-poll__networl_0_6_AnsP_0 + P-poll__networl_4_3_AI_2 + P-poll__networl_4_3_AI_1 + P-poll__networl_4_3_AI_0 + P-poll__networl_5_3_AnsP_0 + P-poll__networl_2_1_RI_0 + P-poll__networl_2_1_RI_1 + P-poll__networl_2_1_RI_2 + P-poll__networl_2_1_RI_3 + P-poll__networl_2_1_RI_4 + P-poll__networl_2_1_RI_5 + P-poll__networl_2_1_RI_6 + P-poll__networl_2_1_RI_7 + P-poll__networl_5_6_AnnP_0 + P-poll__networl_5_6_AnnP_1 + P-poll__networl_5_6_AnnP_2 + P-poll__networl_5_6_AnnP_3 + P-poll__networl_5_6_AnnP_4 + P-poll__networl_5_6_AnnP_5 + P-poll__networl_5_6_AnnP_6 + P-poll__networl_5_6_AnnP_7 + P-poll__networl_6_0_AskP_0 + P-poll__networl_6_0_AskP_1 + P-poll__networl_6_0_AskP_2 + P-poll__networl_6_0_AskP_3 + P-poll__networl_6_0_AskP_4 + P-poll__networl_6_0_AskP_5 + P-poll__networl_6_0_AskP_6 + P-poll__networl_6_0_AskP_7 + P-poll__networl_2_7_RI_7 + P-poll__networl_2_7_RI_6 + P-poll__networl_2_7_RI_5 + P-poll__networl_2_7_RI_4 + P-poll__networl_2_7_RI_3 + P-poll__networl_2_7_RI_2 + P-poll__networl_4_0_RI_0 + P-poll__networl_4_0_RI_1 + P-poll__networl_4_0_RI_2 + P-poll__networl_1_7_RP_0 + P-poll__networl_4_0_RI_3 + P-poll__networl_1_7_RP_1 + P-poll__networl_4_0_RI_4 + P-poll__networl_1_7_RP_2 + P-poll__networl_4_0_RI_5 + P-poll__networl_1_7_RP_3 + P-poll__networl_4_0_RI_6 + P-poll__networl_1_7_RP_4 + P-poll__networl_4_0_RI_7 + P-poll__networl_1_7_RP_5 + P-poll__networl_1_7_RP_6 + P-poll__networl_1_7_RP_7 + P-poll__networl_2_7_RI_1 + P-poll__networl_2_7_RI_0 + P-poll__networl_2_4_AI_7 + P-poll__networl_2_4_AI_6 + P-poll__networl_2_4_AI_5 + P-poll__networl_3_1_AnnP_0 + P-poll__networl_3_1_AnnP_1 + P-poll__networl_3_1_AnnP_2 + P-poll__networl_3_1_AnnP_3 + P-poll__networl_3_1_AnnP_4 + P-poll__networl_3_1_AnnP_5 + P-poll__networl_3_1_AnnP_6 + P-poll__networl_3_1_AnnP_7 + P-poll__networl_2_4_AI_4 + P-poll__networl_2_4_AI_3 + P-poll__networl_4_7_AnsP_0 + P-poll__networl_2_4_AI_2 + P-poll__networl_2_4_AI_1 + P-poll__networl_2_4_AI_0 + P-poll__networl_7_2_RP_7 + P-poll__networl_7_2_RP_6 + P-poll__networl_7_2_RP_5 + P-poll__networl_7_2_RP_4 + P-poll__networl_7_2_RP_3 + P-poll__networl_7_2_RP_2 + P-poll__networl_3_6_RP_0 + P-poll__networl_3_6_RP_1 + P-poll__networl_3_6_RP_2 + P-poll__networl_3_6_RP_3 + P-poll__networl_3_6_RP_4 + P-poll__networl_3_6_RP_5 + P-poll__networl_3_6_RP_6 + P-poll__networl_3_6_RP_7 + P-poll__networl_7_2_RP_1 + P-poll__networl_7_2_RP_0 + P-poll__networl_5_4_AskP_0 + P-poll__networl_5_4_AskP_1 + P-poll__networl_5_4_AskP_2 + P-poll__networl_5_4_AskP_3 + P-poll__networl_5_4_AskP_4 + P-poll__networl_5_4_AskP_5 + P-poll__networl_5_4_AskP_6 + P-poll__networl_5_4_AskP_7 + P-poll__networl_1_5_AnnP_7 + P-poll__networl_1_5_AnnP_6 + P-poll__networl_5_5_RP_0 + P-poll__networl_5_5_RP_1 + P-poll__networl_5_5_RP_2 + P-poll__networl_5_5_RP_3 + P-poll__networl_5_5_RP_4 + P-poll__networl_5_5_RP_5 + P-poll__networl_5_5_RP_6 + P-poll__networl_5_5_RP_7 + P-poll__networl_2_2_AnsP_0 + P-poll__networl_1_5_AnnP_5 + P-poll__networl_1_5_AnnP_4 + P-poll__networl_1_5_AnnP_3 + P-poll__networl_1_5_AnnP_2 + P-poll__networl_1_5_AnnP_1 + P-poll__networl_1_5_AnnP_0 + P-poll__networl_0_7_AI_0 + P-poll__networl_0_7_AI_1 + P-poll__networl_0_7_AI_2 + P-poll__networl_0_7_AI_3 + P-poll__networl_0_7_AI_4 + P-poll__networl_0_7_AI_5 + P-poll__networl_0_7_AI_6 + P-poll__networl_0_7_AI_7 + P-poll__networl_2_5_AnnP_0 + P-poll__networl_2_5_AnnP_1 + P-poll__networl_2_5_AnnP_2 + P-poll__networl_2_5_AnnP_3 + P-poll__networl_2_5_AnnP_4 + P-poll__networl_2_5_AnnP_5 + P-poll__networl_2_5_AnnP_6 + P-poll__networl_2_5_AnnP_7 + P-poll__networl_7_4_RP_0 + P-poll__networl_7_4_RP_1 + P-poll__networl_7_4_RP_2 + P-poll__networl_7_4_RP_3 + P-poll__networl_7_4_RP_4 + P-poll__networl_7_4_RP_5 + P-poll__networl_7_4_RP_6 + P-poll__networl_7_4_RP_7 + P-poll__networl_0_1_RP_0 + P-poll__networl_0_1_RP_1 + P-poll__networl_0_1_RP_2 + P-poll__networl_0_1_RP_3 + P-poll__networl_0_1_RP_4 + P-poll__networl_0_1_RP_5 + P-poll__networl_0_1_RP_6 + P-poll__networl_0_1_RP_7 + P-poll__networl_2_6_AI_0 + P-poll__networl_2_6_AI_1 + P-poll__networl_2_6_AI_2 + P-poll__networl_2_6_AI_3 + P-poll__networl_2_6_AI_4 + P-poll__networl_2_6_AI_5 + P-poll__networl_2_6_AI_6 + P-poll__networl_2_6_AI_7 + P-poll__networl_0_5_AI_7 + P-poll__networl_0_5_AI_6 + P-poll__networl_0_5_AI_5 + P-poll__networl_0_0_AnnP_0 + P-poll__networl_0_0_AnnP_1 + P-poll__networl_0_0_AnnP_2 + P-poll__networl_0_0_AnnP_3 + P-poll__networl_0_0_AnnP_4 + P-poll__networl_0_0_AnnP_5 + P-poll__networl_0_0_AnnP_6 + P-poll__networl_0_0_AnnP_7 + P-poll__networl_2_0_RP_0 + P-poll__networl_2_0_RP_1 + P-poll__networl_2_0_RP_2 + P-poll__networl_2_0_RP_3 + P-poll__networl_2_0_RP_4 + P-poll__networl_2_0_RP_5 + P-poll__networl_2_0_RP_6 + P-poll__networl_2_0_RP_7 + P-poll__networl_0_5_AI_4 + P-poll__networl_1_6_AnsP_0 + P-poll__networl_0_5_AI_3 + P-poll__networl_0_5_AI_2 + P-poll__networl_0_5_AI_1 + P-poll__networl_0_5_AI_0 + P-poll__networl_1_2_AnsP_0 + P-poll__networl_4_5_AI_0 + P-poll__networl_4_5_AI_1 + P-poll__networl_4_5_AI_2 + P-poll__networl_4_5_AI_3 + P-poll__networl_4_5_AI_4 + P-poll__networl_4_5_AI_5 + P-poll__networl_4_5_AI_6 + P-poll__networl_4_5_AI_7 + P-poll__networl_7_1_AnnP_0 + P-poll__networl_7_1_AnnP_1 + P-poll__networl_7_1_AnnP_2 + P-poll__networl_7_1_AnnP_3 + P-poll__networl_7_1_AnnP_4 + P-poll__networl_7_1_AnnP_5 + P-poll__networl_7_1_AnnP_6 + P-poll__networl_7_1_AnnP_7 + P-poll__networl_2_3_AskP_0 + P-poll__networl_2_3_AskP_1 + P-poll__networl_2_3_AskP_2 + P-poll__networl_2_3_AskP_3 + P-poll__networl_2_3_AskP_4 + P-poll__networl_2_3_AskP_5 + P-poll__networl_2_3_AskP_6 + P-poll__networl_2_3_AskP_7 + P-poll__networl_6_4_AI_0 + P-poll__networl_6_4_AI_1 + P-poll__networl_6_4_AI_2 + P-poll__networl_6_4_AI_3 + P-poll__networl_6_4_AI_4 + P-poll__networl_6_4_AI_5 + P-poll__networl_6_4_AI_6 + P-poll__networl_6_4_AI_7 + P-poll__networl_5_3_RP_7 + P-poll__networl_5_3_RP_6 + P-poll__networl_5_3_RP_5 + P-poll__networl_5_3_RP_4 + P-poll__networl_5_3_RP_3 + P-poll__networl_5_3_RP_2 + P-poll__networl_6_7_RI_0 + P-poll__networl_6_7_RI_1 + P-poll__networl_6_7_RI_2 + P-poll__networl_6_7_RI_3 + P-poll__networl_6_7_RI_4 + P-poll__networl_6_7_RI_5 + P-poll__networl_6_7_RI_6 + P-poll__networl_6_7_RI_7 + P-poll__networl_5_3_RP_1 + P-poll__networl_6_2_AnsP_0 + P-poll__networl_5_3_RP_0 + P-poll__networl_1_0_AI_0 + P-poll__networl_1_0_AI_1 + P-poll__networl_1_0_AI_2 + P-poll__networl_1_0_AI_3 + P-poll__networl_1_0_AI_4 + P-poll__networl_1_0_AI_5 + P-poll__networl_1_0_AI_6 + P-poll__networl_1_0_AI_7 + P-poll__networl_1_3_RI_0 + P-poll__networl_1_3_RI_1 + P-poll__networl_1_3_RI_2 + P-poll__networl_1_3_RI_3 + P-poll__networl_1_3_RI_4 + P-poll__networl_1_3_RI_5 + P-poll__networl_1_3_RI_6 + P-poll__networl_1_3_RI_7 + P-poll__networl_6_5_AnnP_0 + P-poll__networl_6_5_AnnP_1 + P-poll__networl_6_5_AnnP_2 + P-poll__networl_6_5_AnnP_3 + P-poll__networl_6_5_AnnP_4 + P-poll__networl_6_5_AnnP_5 + P-poll__networl_6_5_AnnP_6 + P-poll__networl_6_5_AnnP_7 + P-poll__networl_4_4_AskP_7 + P-poll__networl_4_4_AskP_6 + P-poll__networl_4_4_AskP_5 + P-poll__networl_1_7_AskP_0 + P-poll__networl_1_7_AskP_1 + P-poll__networl_1_7_AskP_2 + P-poll__networl_1_7_AskP_3 + P-poll__networl_1_7_AskP_4 + P-poll__networl_1_7_AskP_5 + P-poll__networl_1_7_AskP_6 + P-poll__networl_1_7_AskP_7 + P-poll__networl_3_2_RI_0 + P-poll__networl_3_2_RI_1 + P-poll__networl_3_2_RI_2 + P-poll__networl_3_2_RI_3 + P-poll__networl_3_2_RI_4 + P-poll__networl_3_2_RI_5 + P-poll__networl_3_2_RI_6 + P-poll__networl_3_2_RI_7 + P-poll__networl_4_4_AskP_4 + P-poll__networl_4_4_AskP_3 + P-poll__networl_4_0_AnnP_0 + P-poll__networl_4_0_AnnP_1 + P-poll__networl_4_0_AnnP_2 + P-poll__networl_4_0_AnnP_3 + P-poll__networl_4_0_AnnP_4 + P-poll__networl_4_0_AnnP_5 + P-poll__networl_4_0_AnnP_6 + P-poll__networl_4_0_AnnP_7 + P-poll__networl_4_4_AskP_2 + P-poll__networl_4_4_AskP_1 + P-poll__networl_5_6_AnsP_0 + P-poll__networl_4_4_AskP_0 + P-poll__networl_3_4_RP_7 + P-poll__networl_3_4_RP_6 + P-poll__networl_3_4_RP_5 + P-poll__networl_3_4_RP_4 + P-poll__networl_3_4_RP_3 + P-poll__networl_3_4_RP_2 + P-poll__networl_3_4_RP_1 + P-poll__networl_5_1_RI_0 + P-poll__networl_5_1_RI_1 + P-poll__networl_5_1_RI_2 + P-poll__networl_5_1_RI_3 + P-poll__networl_5_1_RI_4 + P-poll__networl_5_1_RI_5 + P-poll__networl_5_1_RI_6 + P-poll__networl_5_1_RI_7 + P-poll__networl_3_4_RP_0 + P-poll__networl_3_7_AnsP_0 + P-poll__networl_6_3_AskP_0 + P-poll__networl_6_3_AskP_1 + P-poll__networl_6_3_AskP_2 + P-poll__networl_6_3_AskP_3 + P-poll__networl_6_3_AskP_4 + P-poll__networl_6_3_AskP_5 + P-poll__networl_6_3_AskP_6 + P-poll__networl_6_3_AskP_7 + P-poll__networl_3_1_AnsP_0 + P-poll__networl_2_1_AnnP_7 + P-poll__networl_2_1_AnnP_6 + P-poll__networl_7_0_RI_0 + P-poll__networl_7_0_RI_1 + P-poll__networl_7_0_RI_2 + P-poll__networl_4_7_RP_0 + P-poll__networl_7_0_RI_3 + P-poll__networl_4_7_RP_1 + P-poll__networl_7_0_RI_4 + P-poll__networl_4_7_RP_2 + P-poll__networl_7_0_RI_5 + P-poll__networl_4_7_RP_3 + P-poll__networl_7_0_RI_6 + P-poll__networl_4_7_RP_4 + P-poll__networl_7_0_RI_7 + P-poll__networl_4_7_RP_5 + P-poll__networl_4_7_RP_6 + P-poll__networl_4_7_RP_7 + P-poll__networl_2_1_AnnP_5 + P-poll__networl_3_4_AnnP_0 + P-poll__networl_3_4_AnnP_1 + P-poll__networl_3_4_AnnP_2 + P-poll__networl_3_4_AnnP_3 + P-poll__networl_3_4_AnnP_4 + P-poll__networl_3_4_AnnP_5 + P-poll__networl_3_4_AnnP_6 + P-poll__networl_3_4_AnnP_7 + P-poll__networl_2_1_AnnP_4 + P-poll__networl_2_1_AnnP_3 + P-poll__networl_2_1_AnnP_2 + P-poll__networl_6_6_RP_0 + P-poll__networl_6_6_RP_1 + P-poll__networl_6_6_RP_2 + P-poll__networl_6_6_RP_3 + P-poll__networl_6_6_RP_4 + P-poll__networl_6_6_RP_5 + P-poll__networl_6_6_RP_6 + P-poll__networl_6_6_RP_7 + P-poll__networl_2_1_AnnP_1 + P-poll__networl_2_1_AnnP_0 + P-poll__networl_1_5_RP_7 + P-poll__networl_1_5_RP_6 + P-poll__networl_5_7_AskP_0 + P-poll__networl_5_7_AskP_1 + P-poll__networl_5_7_AskP_2 + P-poll__networl_5_7_AskP_3 + P-poll__networl_5_7_AskP_4 + P-poll__networl_5_7_AskP_5 + P-poll__networl_5_7_AskP_6 + P-poll__networl_5_7_AskP_7 + P-poll__networl_1_5_RP_5 + P-poll__networl_1_5_RP_4 + P-poll__networl_1_2_RP_0 + P-poll__networl_1_2_RP_1 + P-poll__networl_1_2_RP_2 + P-poll__networl_1_2_RP_3 + P-poll__networl_1_2_RP_4 + P-poll__networl_1_2_RP_5 + P-poll__networl_1_2_RP_6 + P-poll__networl_1_2_RP_7 + P-poll__networl_2_5_AnsP_0 + P-poll__networl_1_5_RP_3 + P-poll__networl_1_5_RP_2 + P-poll__networl_1_5_RP_1 + P-poll__networl_1_5_RP_0 + P-poll__networl_3_7_AI_0 + P-poll__networl_3_7_AI_1 + P-poll__networl_3_7_AI_2 + P-poll__networl_3_7_AI_3 + P-poll__networl_3_7_AI_4 + P-poll__networl_3_7_AI_5 + P-poll__networl_3_7_AI_6 + P-poll__networl_3_7_AI_7 + P-poll__networl_5_0_AskP_7 + P-poll__networl_5_0_AskP_6 + P-poll__networl_5_0_AskP_5 + P-poll__networl_5_0_AskP_4 + P-poll__networl_5_0_AskP_3 + P-poll__networl_5_0_AskP_2 + P-poll__networl_5_0_AskP_1 + P-poll__networl_3_2_AskP_0 + P-poll__networl_3_2_AskP_1 + P-poll__networl_3_2_AskP_2 + P-poll__networl_3_2_AskP_3 + P-poll__networl_3_2_AskP_4 + P-poll__networl_3_2_AskP_5 + P-poll__networl_3_2_AskP_6 + P-poll__networl_3_2_AskP_7 + P-poll__networl_3_1_RP_0 + P-poll__networl_3_1_RP_1 + P-poll__networl_3_1_RP_2 + P-poll__networl_3_1_RP_3 + P-poll__networl_3_1_RP_4 + P-poll__networl_3_1_RP_5 + P-poll__networl_3_1_RP_6 + P-poll__networl_3_1_RP_7 + P-poll__networl_5_0_AskP_0 + P-poll__networl_5_6_AI_0 + P-poll__networl_5_6_AI_1 + P-poll__networl_5_6_AI_2 + P-poll__networl_5_6_AI_3 + P-poll__networl_5_6_AI_4 + P-poll__networl_5_6_AI_5 + P-poll__networl_5_6_AI_6 + P-poll__networl_5_6_AI_7 + P-poll__networl_0_0_AnsP_0 + P-poll__networl_4_6_AnnP_7 + P-poll__networl_4_6_AnnP_6 + P-poll__networl_4_6_AnnP_5 + P-poll__networl_4_6_AnnP_4 + P-poll__networl_4_6_AnnP_3 + P-poll__networl_4_6_AnnP_2 + P-poll__networl_4_6_AnnP_1 + P-poll__networl_7_1_AnsP_0 + P-poll__networl_4_6_AnnP_0 + P-poll__networl_0_3_AnnP_0 + P-poll__networl_0_3_AnnP_1 + P-poll__networl_0_3_AnnP_2 + P-poll__networl_0_3_AnnP_3 + P-poll__networl_0_3_AnnP_4 + P-poll__networl_0_3_AnnP_5 + P-poll__networl_0_3_AnnP_6 + P-poll__networl_0_3_AnnP_7 + P-poll__networl_5_0_RP_0 + P-poll__networl_5_0_RP_1 + P-poll__networl_5_0_RP_2 + P-poll__networl_5_0_RP_3 + P-poll__networl_5_0_RP_4 + P-poll__networl_5_0_RP_5 + P-poll__networl_5_0_RP_6 + P-poll__networl_5_0_RP_7 + P-poll__networl_4_3_AnsP_0 + P-poll__networl_7_5_AI_0 + P-poll__networl_7_5_AI_1 + P-poll__networl_7_5_AI_2 + P-poll__networl_7_5_AI_3 + P-poll__networl_7_5_AI_4 + P-poll__networl_7_5_AI_5 + P-poll__networl_7_5_AI_6 + P-poll__networl_7_5_AI_7 + P-poll__networl_0_2_AI_0 + P-poll__networl_0_2_AI_1 + P-poll__networl_0_2_AI_2 + P-poll__networl_0_2_AI_3 + P-poll__networl_0_2_AI_4 + P-poll__networl_0_2_AI_5 + P-poll__networl_0_2_AI_6 + P-poll__networl_0_2_AI_7 + P-poll__networl_0_5_RI_0 + P-poll__networl_0_5_RI_1 + P-poll__networl_0_5_RI_2 + P-poll__networl_0_5_RI_3 + P-poll__networl_0_5_RI_4 + P-poll__networl_0_5_RI_5 + P-poll__networl_0_5_RI_6 + P-poll__networl_0_5_RI_7 + P-poll__networl_7_4_AnnP_0 + P-poll__networl_7_4_AnnP_1 + P-poll__networl_7_4_AnnP_2 + P-poll__networl_7_4_AnnP_3 + P-poll__networl_7_4_AnnP_4 + P-poll__networl_7_4_AnnP_5 + P-poll__networl_7_4_AnnP_6 + P-poll__networl_7_4_AnnP_7 + P-poll__networl_2_6_AskP_0 + P-poll__networl_2_6_AskP_1 + P-poll__networl_2_6_AskP_2 + P-poll__networl_2_6_AskP_3 + P-poll__networl_2_6_AskP_4 + P-poll__networl_2_6_AskP_5 + P-poll__networl_2_6_AskP_6 + P-poll__networl_2_6_AskP_7 + P-poll__networl_2_1_AI_0 + P-poll__networl_2_1_AI_1 + P-poll__networl_2_1_AI_2 + P-poll__networl_2_1_AI_3 + P-poll__networl_2_1_AI_4 + P-poll__networl_2_1_AI_5 + P-poll__networl_2_1_AI_6 + P-poll__networl_2_1_AI_7 + P-poll__networl_2_4_RI_0 + P-poll__networl_2_4_RI_1 + P-poll__networl_2_4_RI_2 + P-poll__networl_2_4_RI_3 + P-poll__networl_2_4_RI_4 + P-poll__networl_2_4_RI_5 + P-poll__networl_2_4_RI_6 + P-poll__networl_2_4_RI_7 + P-poll__networl_6_5_AnsP_0 + P-poll__networl_4_0_AI_0 + P-poll__networl_4_0_AI_1 + P-poll__networl_4_0_AI_2 + P-poll__networl_4_0_AI_3 + P-poll__networl_4_0_AI_4 + P-poll__networl_4_0_AI_5 + P-poll__networl_4_0_AI_6 + P-poll__networl_4_0_AI_7 + P-poll__networl_7_5_AskP_7 + P-poll__networl_7_5_AskP_6 + P-poll__networl_7_5_AskP_5 + P-poll__networl_7_5_AskP_4 + P-poll__networl_0_1_AskP_0 + P-poll__networl_0_1_AskP_1 + P-poll__networl_0_1_AskP_2 + P-poll__networl_0_1_AskP_3 + P-poll__networl_0_1_AskP_4 + P-poll__networl_0_1_AskP_5 + P-poll__networl_0_1_AskP_6 + P-poll__networl_0_1_AskP_7 + P-poll__networl_4_3_RI_0 + P-poll__networl_4_3_RI_1 + P-poll__networl_4_3_RI_2 + P-poll__networl_4_3_RI_3 + P-poll__networl_4_3_RI_4 + P-poll__networl_4_3_RI_5 + P-poll__networl_4_3_RI_6 + P-poll__networl_4_3_RI_7 + P-poll__networl_7_2_AskP_0 + P-poll__networl_7_2_AskP_1 + P-poll__networl_7_2_AskP_2 + P-poll__networl_7_2_AskP_3 + P-poll__networl_7_2_AskP_4 + P-poll__networl_7_2_AskP_5 + P-poll__networl_7_2_AskP_6 + P-poll__networl_7_2_AskP_7 + P-poll__networl_7_5_AskP_3 + P-poll__networl_4_0_AnsP_0 + P-poll__networl_7_5_AskP_2 + P-poll__networl_7_5_AskP_1 + P-poll__networl_7_5_AskP_0 + P-poll__networl_6_2_RI_0 + P-poll__networl_6_2_RI_1 + P-poll__networl_6_2_RI_2 + P-poll__networl_6_2_RI_3 + P-poll__networl_6_2_RI_4 + P-poll__networl_6_2_RI_5 + P-poll__networl_6_2_RI_6 + P-poll__networl_6_2_RI_7 + P-poll__networl_0_0_RI_7 + P-poll__networl_0_0_RI_6 + P-poll__networl_0_0_RI_5 + P-poll__networl_0_0_RI_4 + P-poll__networl_0_0_RI_3 + P-poll__networl_0_0_RI_2 + P-poll__networl_0_0_RI_1 + P-poll__networl_4_3_AnnP_0 + P-poll__networl_4_3_AnnP_1 + P-poll__networl_4_3_AnnP_2 + P-poll__networl_4_3_AnnP_3 + P-poll__networl_4_3_AnnP_4 + P-poll__networl_4_3_AnnP_5 + P-poll__networl_4_3_AnnP_6 + P-poll__networl_4_3_AnnP_7 + P-poll__networl_0_0_RI_0 + P-poll__networl_7_3_RI_7 + P-poll__networl_7_3_RI_6 + P-poll__networl_7_3_RI_5 + P-poll__networl_7_3_RI_4 + P-poll__networl_7_3_RI_3 + P-poll__networl_7_3_RI_2 + P-poll__networl_7_3_RI_1 + P-poll__networl_7_3_RI_0 + P-poll__networl_0_4_AskP_7 + P-poll__networl_0_4_AskP_6 + P-poll__networl_0_4_AskP_5 + P-poll__networl_0_4_AskP_4 + P-poll__networl_0_4_AskP_3 + P-poll__networl_0_4_AskP_2 + P-poll__networl_0_4_AskP_1 + P-poll__networl_0_4_AskP_0 + P-poll__networl_7_0_AI_7 + P-poll__networl_7_0_AI_6 + P-poll__networl_7_0_AI_5 + P-poll__networl_7_0_AI_4 + P-poll__networl_7_0_AI_3 + P-poll__networl_7_0_AI_2 + P-poll__networl_7_0_AI_1 + P-poll__networl_7_0_AI_0 + P-poll__networl_6_6_AskP_0 + P-poll__networl_6_6_AskP_1 + P-poll__networl_6_6_AskP_2 + P-poll__networl_6_6_AskP_3 + P-poll__networl_6_6_AskP_4 + P-poll__networl_6_6_AskP_5 + P-poll__networl_6_6_AskP_6 + P-poll__networl_6_6_AskP_7 + P-poll__networl_3_4_AnsP_0 + P-poll__networl_7_7_RP_0 + P-poll__networl_7_7_RP_1 + P-poll__networl_7_7_RP_2 + P-poll__networl_7_7_RP_3 + P-poll__networl_7_7_RP_4 + P-poll__networl_7_7_RP_5 + P-poll__networl_7_7_RP_6 + P-poll__networl_7_7_RP_7 + P-poll__networl_0_4_RP_0 + P-poll__networl_0_4_RP_1 + P-poll__networl_0_4_RP_2 + P-poll__networl_0_4_RP_3 + P-poll__networl_0_4_RP_4 + P-poll__networl_0_4_RP_5 + P-poll__networl_0_4_RP_6 + P-poll__networl_0_4_RP_7 + P-poll__networl_3_7_AnnP_0 + P-poll__networl_3_7_AnnP_1 + P-poll__networl_3_7_AnnP_2 + P-poll__networl_3_7_AnnP_3 + P-poll__networl_3_7_AnnP_4 + P-poll__networl_3_7_AnnP_5 + P-poll__networl_3_7_AnnP_6 + P-poll__networl_3_7_AnnP_7 + P-poll__networl_4_1_AskP_0 + P-poll__networl_4_1_AskP_1 + P-poll__networl_4_1_AskP_2 + P-poll__networl_4_1_AskP_3 + P-poll__networl_4_1_AskP_4 + P-poll__networl_4_1_AskP_5 + P-poll__networl_4_1_AskP_6 + P-poll__networl_4_1_AskP_7 + P-poll__networl_2_3_RP_0 + P-poll__networl_2_3_RP_1 + P-poll__networl_2_3_RP_2 + P-poll__networl_2_3_RP_3 + P-poll__networl_2_3_RP_4 + P-poll__networl_2_3_RP_5 + P-poll__networl_2_3_RP_6 + P-poll__networl_2_3_RP_7 + P-poll__networl_5_2_AnnP_7 + P-poll__networl_5_2_AnnP_6 + P-poll__networl_5_2_AnnP_5 + P-poll__networl_5_2_AnnP_4 + P-poll__networl_5_2_AnnP_3 + P-poll__networl_5_2_AnnP_2 + P-poll__networl_5_2_AnnP_1 + P-poll__networl_1_2_AnnP_0 + P-poll__networl_1_2_AnnP_1 + P-poll__networl_1_2_AnnP_2 + P-poll__networl_1_2_AnnP_3 + P-poll__networl_1_2_AnnP_4 + P-poll__networl_1_2_AnnP_5 + P-poll__networl_1_2_AnnP_6 + P-poll__networl_1_2_AnnP_7 + P-poll__networl_5_2_AnnP_0 + P-poll__networl_5_4_RI_7 + P-poll__networl_4_2_RP_0 + P-poll__networl_4_2_RP_1 + P-poll__networl_4_2_RP_2 + P-poll__networl_4_2_RP_3 + P-poll__networl_4_2_RP_4 + P-poll__networl_4_2_RP_5 + P-poll__networl_4_2_RP_6 + P-poll__networl_4_2_RP_7 + P-poll__networl_5_4_RI_6 + P-poll__networl_6_7_AI_0 + P-poll__networl_6_7_AI_1 + P-poll__networl_6_7_AI_2 + P-poll__networl_6_7_AI_3 + P-poll__networl_6_7_AI_4 + P-poll__networl_6_7_AI_5 + P-poll__networl_6_7_AI_6 + P-poll__networl_6_7_AI_7 + P-poll__networl_5_4_RI_5 + P-poll__networl_5_4_RI_4 + P-poll__networl_5_4_RI_3 + P-poll__networl_5_4_RI_2 + P-poll__networl_5_4_RI_1 + P-poll__networl_5_4_RI_0 + P-poll__networl_5_1_AI_7 + P-poll__networl_5_1_AI_6 + P-poll__networl_5_1_AI_5 + P-poll__networl_3_5_AskP_0 + P-poll__networl_3_5_AskP_1 + P-poll__networl_3_5_AskP_2 + P-poll__networl_3_5_AskP_3 + P-poll__networl_3_5_AskP_4 + P-poll__networl_3_5_AskP_5 + P-poll__networl_3_5_AskP_6 + P-poll__networl_3_5_AskP_7 + P-poll__networl_6_1_RP_0 + P-poll__networl_6_1_RP_1 + P-poll__networl_6_1_RP_2 + P-poll__networl_6_1_RP_3 + P-poll__networl_6_1_RP_4 + P-poll__networl_6_1_RP_5 + P-poll__networl_6_1_RP_6 + P-poll__networl_6_1_RP_7 + P-poll__networl_5_1_AI_4 + P-poll__networl_1_3_AI_0 + P-poll__networl_1_3_AI_1 + P-poll__networl_1_3_AI_2 + P-poll__networl_0_3_AnsP_0 + P-poll__networl_1_3_AI_3 + P-poll__networl_5_1_AI_3 + P-poll__networl_1_3_AI_4 + P-poll__networl_5_1_AI_2 + P-poll__networl_1_3_AI_5 + P-poll__networl_5_1_AI_1 + P-poll__networl_1_3_AI_6 + P-poll__networl_5_1_AI_0 + P-poll__networl_1_3_AI_7 + P-poll__networl_1_6_RI_0 + P-poll__networl_1_6_RI_1 + P-poll__networl_1_6_RI_2 + P-poll__networl_1_6_RI_3 + P-poll__networl_1_6_RI_4 + P-poll__networl_1_6_RI_5 + P-poll__networl_1_6_RI_6 + P-poll__networl_1_6_RI_7 + P-poll__networl_7_4_AnsP_0 + P-poll__networl_0_6_AnnP_0 + P-poll__networl_0_6_AnnP_1 + P-poll__networl_0_6_AnnP_2 + P-poll__networl_0_6_AnnP_3 + P-poll__networl_0_6_AnnP_4 + P-poll__networl_0_6_AnnP_5 + P-poll__networl_0_6_AnnP_6 + P-poll__networl_0_6_AnnP_7 + P-poll__networl_1_0_AskP_0 + P-poll__networl_1_0_AskP_1 + P-poll__networl_1_0_AskP_2 + P-poll__networl_1_0_AskP_3 + P-poll__networl_1_0_AskP_4 + P-poll__networl_1_0_AskP_5 + P-poll__networl_1_0_AskP_6 + P-poll__networl_1_0_AskP_7 + P-poll__networl_3_2_AI_0 + P-poll__networl_3_2_AI_1 + P-poll__networl_3_2_AI_2 + P-poll__networl_3_2_AI_3 + P-poll__networl_3_2_AI_4 + P-poll__networl_3_2_AI_5 + P-poll__networl_3_2_AI_6 + P-poll__networl_3_2_AI_7 + P-poll__networl_3_5_RI_0 + P-poll__networl_3_5_RI_1 + P-poll__networl_3_5_RI_2 + P-poll__networl_3_5_RI_3 + P-poll__networl_3_5_RI_4 + P-poll__networl_3_5_RI_5 + P-poll__networl_3_5_RI_6 + P-poll__networl_3_5_RI_7 + P-poll__networl_7_7_AnnP_0 + P-poll__networl_7_7_AnnP_1 + P-poll__networl_7_7_AnnP_2 + P-poll__networl_7_7_AnnP_3 + P-poll__networl_7_7_AnnP_4 + P-poll__networl_7_7_AnnP_5 + P-poll__networl_7_7_AnnP_6 + P-poll__networl_7_7_AnnP_7)
lola: after: (3 <= P-poll__networl_7_4_AnsP_7 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_1_6_AnsP_4 + P-poll__networl_1_6_AnsP_3 + P-poll__networl_1_6_AnsP_2 + P-poll__networl_1_6_AnsP_1 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_7)
lola: LP says that atomic proposition is always false: (3 <= P-poll__networl_7_4_AnsP_7 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_1_6_AnsP_4 + P-poll__networl_1_6_AnsP_3 + P-poll__networl_1_6_AnsP_2 + P-poll__networl_1_6_AnsP_1 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_7)
lola: LP says that atomic proposition is always true: (P-poll__waitingMessage_0 + P-poll__waitingMessage_1 + P-poll__waitingMessage_2 + P-poll__waitingMessage_4 + P-poll__waitingMessage_5 + P-poll__waitingMessage_6 + P-poll__waitingMessage_7 + P-poll__waitingMessage_3 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-stage_2_SEC + P-stage_3_NEG + P-stage_5_SEC + P-stage_4_PRIM + P-stage_1_SEC + P-stage_6_SEC + P-stage_3_SEC + P-stage_0_SEC + P-stage_7_PRIM + P-stage_1_NEG + P-stage_2_PRIM + P-stage_6_NEG + P-stage_4_NEG + P-stage_5_PRIM + P-stage_7_NEG + P-stage_0_PRIM + P-stage_2_NEG + P-stage_3_PRIM + P-stage_4_SEC + P-stage_5_NEG + P-stage_7_SEC + P-stage_6_PRIM + P-stage_0_NEG + P-stage_1_PRIM)
lola: after: (0 <= 4)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (2 <= P-dead_7 + P-dead_6 + P-dead_5 + P-dead_4 + P-dead_3 + P-dead_2 + P-dead_1 + P-dead_0)
lola: after: (2 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-poll__networl_7_4_AnsP_7 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_1_6_AnsP_4 + P-poll__networl_1_6_AnsP_3 + P-poll__networl_1_6_AnsP_2 + P-poll__networl_1_6_AnsP_1 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_7 + P-poll__networl_0_0_AskP_1 + P-poll__networl_0_0_AskP_2 + P-poll__networl_0_0_AskP_3 + P-poll__networl_0_0_AskP_4 + P-poll__networl_0_0_AskP_5 + P-poll__networl_0_0_AskP_6 + P-poll__networl_0_0_AskP_7 + P-poll__networl_3_3_RI_0 + P-poll__networl_3_3_RI_1 + P-poll__networl_3_3_RI_2 + P-poll__networl_3_3_RI_3 + P-poll__networl_3_3_RI_4 + P-poll__networl_3_3_RI_5 + P-poll__networl_3_3_RI_6 + P-poll__networl_3_3_RI_7 + P-poll__networl_0_0_AskP_0 + P-poll__networl_6_7_AnnP_0 + P-poll__networl_6_7_AnnP_1 + P-poll__networl_6_7_AnnP_2 + P-poll__networl_6_7_AnnP_3 + P-poll__networl_6_7_AnnP_4 + P-poll__networl_6_7_AnnP_5 + P-poll__networl_6_7_AnnP_6 + P-poll__networl_6_7_AnnP_7 + P-poll__networl_3_0_AI_7 + P-poll__networl_7_1_AskP_0 + P-poll__networl_7_1_AskP_1 + P-poll__networl_7_1_AskP_2 + P-poll__networl_7_1_AskP_3 + P-poll__networl_7_1_AskP_4 + P-poll__networl_7_1_AskP_5 + P-poll__networl_7_1_AskP_6 + P-poll__networl_7_1_AskP_7 + P-poll__networl_3_0_AI_6 + P-poll__networl_3_0_AI_5 + P-poll__networl_5_2_RI_0 + P-poll__networl_5_2_RI_1 + P-poll__networl_5_2_RI_2 + P-poll__networl_5_2_RI_3 + P-poll__networl_5_2_RI_4 + P-poll__networl_5_2_RI_5 + P-poll__networl_5_2_RI_6 + P-poll__networl_5_2_RI_7 + P-poll__networl_3_0_AI_4 + P-poll__networl_4_2_AnnP_0 + P-poll__networl_4_2_AnnP_1 + P-poll__networl_4_2_AnnP_2 + P-poll__networl_4_2_AnnP_3 + P-poll__networl_4_2_AnnP_4 + P-poll__networl_4_2_AnnP_5 + P-poll__networl_4_2_AnnP_6 + P-poll__networl_4_2_AnnP_7 + P-poll__networl_3_0_AI_3 + P-poll__networl_3_0_AI_2 + P-poll__networl_3_0_AI_1 + P-poll__networl_3_0_AI_0 + P-poll__networl_7_1_RI_0 + P-poll__networl_7_1_RI_1 + P-poll__networl_7_1_RI_2 + P-poll__networl_7_1_RI_3 + P-poll__networl_7_1_RI_4 + P-poll__networl_7_1_RI_5 + P-poll__networl_7_1_RI_6 + P-poll__networl_7_1_RI_7 + P-poll__networl_6_4_AnsP_0 + P-poll__networl_6_5_AskP_0 + P-poll__networl_6_5_AskP_1 + P-poll__networl_6_5_AskP_2 + P-poll__networl_6_5_AskP_3 + P-poll__networl_6_5_AskP_4 + P-poll__networl_6_5_AskP_5 + P-poll__networl_6_5_AskP_6 + P-poll__networl_6_5_AskP_7 + P-poll__networl_3_3_AnsP_0 + P-poll__networl_1_4_RI_7 + P-poll__networl_1_4_RI_6 + P-poll__networl_1_4_RI_5 + P-poll__networl_1_4_RI_4 + P-poll__networl_1_4_RI_3 + P-poll__networl_1_4_RI_2 + P-poll__networl_1_4_RI_1 + P-poll__networl_1_4_RI_0 + P-poll__networl_1_1_AI_7 + P-poll__networl_1_1_AI_6 + P-poll__networl_1_1_AI_5 + P-poll__networl_1_1_AI_4 + P-poll__networl_1_1_AI_3 + P-poll__networl_6_7_RP_0 + P-poll__networl_6_7_RP_1 + P-poll__networl_6_7_RP_2 + P-poll__networl_6_7_RP_3 + P-poll__networl_6_7_RP_4 + P-poll__networl_6_7_RP_5 + P-poll__networl_6_7_RP_6 + P-poll__networl_6_7_RP_7 + P-poll__networl_1_1_AI_2 + P-poll__networl_1_1_AI_1 + P-poll__networl_1_1_AI_0 + P-poll__networl_3_6_AnnP_0 + P-poll__networl_3_6_AnnP_1 + P-poll__networl_3_6_AnnP_2 + P-poll__networl_3_6_AnnP_3 + P-poll__networl_3_6_AnnP_4 + P-poll__networl_3_6_AnnP_5 + P-poll__networl_3_6_AnnP_6 + P-poll__networl_3_6_AnnP_7 + P-poll__networl_2_5_AskP_7 + P-poll__networl_2_5_AskP_6 + P-poll__networl_2_5_AskP_5 + P-poll__networl_2_5_AskP_4 + P-poll__networl_2_5_AskP_3 + P-poll__networl_2_5_AskP_2 + P-poll__networl_2_5_AskP_1 + P-poll__networl_4_0_AskP_0 + P-poll__networl_4_0_AskP_1 + P-poll__networl_4_0_AskP_2 + P-poll__networl_4_0_AskP_3 + P-poll__networl_4_0_AskP_4 + P-poll__networl_4_0_AskP_5 + P-poll__networl_4_0_AskP_6 + P-poll__networl_4_0_AskP_7 + P-poll__networl_2_5_AskP_0 + P-poll__networl_1_3_RP_0 + P-poll__networl_1_3_RP_1 + P-poll__networl_1_3_RP_2 + P-poll__networl_1_3_RP_3 + P-poll__networl_1_3_RP_4 + P-poll__networl_1_3_RP_5 + P-poll__networl_1_3_RP_6 + P-poll__networl_1_3_RP_7 + P-poll__networl_7_3_AnnP_7 + P-poll__networl_7_3_AnnP_6 + P-poll__networl_1_1_AnnP_0 + P-poll__networl_1_1_AnnP_1 + P-poll__networl_1_1_AnnP_2 + P-poll__networl_1_1_AnnP_3 + P-poll__networl_1_1_AnnP_4 + P-poll__networl_1_1_AnnP_5 + P-poll__networl_1_1_AnnP_6 + P-poll__networl_1_1_AnnP_7 + P-poll__networl_7_3_AnnP_5 + P-poll__networl_7_3_AnnP_4 + P-poll__networl_3_2_RP_0 + P-poll__networl_3_2_RP_1 + P-poll__networl_3_2_RP_2 + P-poll__networl_3_2_RP_3 + P-poll__networl_3_2_RP_4 + P-poll__networl_3_2_RP_5 + P-poll__networl_3_2_RP_6 + P-poll__networl_3_2_RP_7 + P-poll__networl_2_7_AnsP_0 + P-poll__networl_7_3_AnnP_3 + P-poll__networl_7_3_AnnP_2 + P-poll__networl_7_3_AnnP_1 + P-poll__networl_7_3_AnnP_0 + P-poll__networl_6_5_AI_7 + P-poll__networl_6_5_AI_6 + P-poll__networl_6_5_AI_5 + P-poll__networl_6_5_AI_4 + P-poll__networl_5_7_AI_0 + P-poll__networl_5_7_AI_1 + P-poll__networl_5_7_AI_2 + P-poll__networl_5_7_AI_3 + P-poll__networl_5_7_AI_4 + P-poll__networl_5_7_AI_5 + P-poll__networl_5_7_AI_6 + P-poll__networl_5_7_AI_7 + P-poll__networl_6_5_AI_3 + P-poll__networl_6_5_AI_2 + P-poll__networl_6_5_AI_1 + P-poll__networl_6_5_AI_0 + P-poll__networl_3_4_AskP_0 + P-poll__networl_3_4_AskP_1 + P-poll__networl_3_4_AskP_2 + P-poll__networl_3_4_AskP_3 + P-poll__networl_3_4_AskP_4 + P-poll__networl_3_4_AskP_5 + P-poll__networl_3_4_AskP_6 + P-poll__networl_3_4_AskP_7 + P-poll__networl_5_1_RP_0 + P-poll__networl_5_1_RP_1 + P-poll__networl_5_1_RP_2 + P-poll__networl_5_1_RP_3 + P-poll__networl_5_1_RP_4 + P-poll__networl_5_1_RP_5 + P-poll__networl_5_1_RP_6 + P-poll__networl_5_1_RP_7 + P-poll__networl_7_6_AI_0 + P-poll__networl_7_6_AI_1 + P-poll__networl_7_6_AI_2 + P-poll__networl_7_6_AI_3 + P-poll__networl_7_6_AI_4 + P-poll__networl_7_6_AI_5 + P-poll__networl_7_6_AI_6 + P-poll__networl_7_6_AI_7 + P-poll__networl_0_3_AI_0 + P-poll__networl_0_3_AI_1 + P-poll__networl_0_3_AI_2 + P-poll__networl_0_2_AnsP_0 + P-poll__networl_0_3_AI_3 + P-poll__networl_0_3_AI_4 + P-poll__networl_0_3_AI_5 + P-poll__networl_0_3_AI_6 + P-poll__networl_0_3_AI_7 + P-poll__networl_4_0_RP_7 + P-poll__networl_0_6_RI_0 + P-poll__networl_0_6_RI_1 + P-poll__networl_0_6_RI_2 + P-poll__networl_0_6_RI_3 + P-poll__networl_0_6_RI_4 + P-poll__networl_0_6_RI_5 + P-poll__networl_0_6_RI_6 + P-poll__networl_0_6_RI_7 + P-poll__networl_4_0_RP_6 + P-poll__networl_4_0_RP_5 + P-poll__networl_4_0_RP_4 + P-poll__networl_7_3_AnsP_0 + P-poll__networl_4_0_RP_3 + P-poll__networl_4_0_RP_2 + P-poll__networl_4_0_RP_1 + P-poll__networl_4_0_RP_0 + P-poll__networl_0_2_AnnP_7 + P-poll__networl_0_2_AnnP_6 + P-poll__networl_0_2_AnnP_5 + P-poll__networl_0_5_AnnP_0 + P-poll__networl_0_5_AnnP_1 + P-poll__networl_0_5_AnnP_2 + P-poll__networl_0_5_AnnP_3 + P-poll__networl_0_5_AnnP_4 + P-poll__networl_0_5_AnnP_5 + P-poll__networl_0_5_AnnP_6 + P-poll__networl_0_5_AnnP_7 + P-poll__networl_7_0_RP_0 + P-poll__networl_7_0_RP_1 + P-poll__networl_7_0_RP_2 + P-poll__networl_7_0_RP_3 + P-poll__networl_7_0_RP_4 + P-poll__networl_7_0_RP_5 + P-poll__networl_7_0_RP_6 + P-poll__networl_7_0_RP_7 + P-poll__networl_0_2_AnnP_4 + P-poll__networl_0_2_AnnP_3 + P-poll__networl_2_2_AI_0 + P-poll__networl_0_2_AnnP_2 + P-poll__networl_2_2_AI_1 + P-poll__networl_2_2_AI_2 + P-poll__networl_2_2_AI_3 + P-poll__networl_2_2_AI_4 + P-poll__networl_2_2_AI_5 + P-poll__networl_2_2_AI_6 + P-poll__networl_2_2_AI_7 + P-poll__networl_2_5_RI_0 + P-poll__networl_2_5_RI_1 + P-poll__networl_2_5_RI_2 + P-poll__networl_2_5_RI_3 + P-poll__networl_2_5_RI_4 + P-poll__networl_2_5_RI_5 + P-poll__networl_2_5_RI_6 + P-poll__networl_2_5_RI_7 + P-poll__networl_0_2_AnnP_1 + P-poll__networl_0_2_AnnP_0 + P-poll__networl_7_6_AnnP_0 + P-poll__networl_7_6_AnnP_1 + P-poll__networl_7_6_AnnP_2 + P-poll__networl_7_6_AnnP_3 + P-poll__networl_7_6_AnnP_4 + P-poll__networl_7_6_AnnP_5 + P-poll__networl_7_6_AnnP_6 + P-poll__networl_7_6_AnnP_7 + P-poll__networl_7_0_AnsP_0 + P-poll__networl_4_1_AI_0 + P-poll__networl_4_1_AI_1 + P-poll__networl_4_1_AI_2 + P-poll__networl_4_1_AI_3 + P-poll__networl_4_1_AI_4 + P-poll__networl_4_1_AI_5 + P-poll__networl_4_1_AI_6 + P-poll__networl_4_1_AI_7 + P-poll__networl_4_4_RI_0 + P-poll__networl_4_4_RI_1 + P-poll__networl_4_4_RI_2 + P-poll__networl_4_4_RI_3 + P-poll__networl_4_4_RI_4 + P-poll__networl_4_4_RI_5 + P-poll__networl_4_4_RI_6 + P-poll__networl_4_4_RI_7 + P-poll__networl_5_1_AnnP_0 + P-poll__networl_5_1_AnnP_1 + P-poll__networl_5_1_AnnP_2 + P-poll__networl_5_1_AnnP_3 + P-poll__networl_5_1_AnnP_4 + P-poll__networl_5_1_AnnP_5 + P-poll__networl_5_1_AnnP_6 + P-poll__networl_5_1_AnnP_7 + P-poll__networl_6_7_AnsP_0 + P-poll__networl_4_6_AI_7 + P-poll__networl_4_6_AI_6 + P-poll__networl_4_6_AI_5 + P-poll__networl_4_6_AI_4 + P-poll__networl_6_0_AI_0 + P-poll__networl_6_0_AI_1 + P-poll__networl_6_0_AI_2 + P-poll__networl_6_0_AI_3 + P-poll__networl_6_0_AI_4 + P-poll__networl_6_0_AI_5 + P-poll__networl_6_0_AI_6 + P-poll__networl_4_6_AI_3 + P-poll__networl_6_0_AI_7 + P-poll__networl_4_6_AI_2 + P-poll__networl_4_6_AI_1 + P-poll__networl_4_6_AI_0 + P-poll__networl_0_3_AskP_0 + P-poll__networl_0_3_AskP_1 + P-poll__networl_0_3_AskP_2 + P-poll__networl_0_3_AskP_3 + P-poll__networl_0_3_AskP_4 + P-poll__networl_0_3_AskP_5 + P-poll__networl_0_3_AskP_6 + P-poll__networl_0_3_AskP_7 + P-poll__networl_6_3_RI_0 + P-poll__networl_6_3_RI_1 + P-poll__networl_6_3_RI_2 + P-poll__networl_6_3_RI_3 + P-poll__networl_6_3_RI_4 + P-poll__networl_6_3_RI_5 + P-poll__networl_6_3_RI_6 + P-poll__networl_6_3_RI_7 + P-poll__networl_2_1_RP_7 + P-poll__networl_2_1_RP_6 + P-poll__networl_2_1_RP_5 + P-poll__networl_2_1_RP_4 + P-poll__networl_2_1_RP_3 + P-poll__networl_2_1_RP_2 + P-poll__networl_2_1_RP_1 + P-poll__networl_7_4_AskP_0 + P-poll__networl_7_4_AskP_1 + P-poll__networl_7_4_AskP_2 + P-poll__networl_7_4_AskP_3 + P-poll__networl_7_4_AskP_4 + P-poll__networl_7_4_AskP_5 + P-poll__networl_7_4_AskP_6 + P-poll__networl_7_4_AskP_7 + P-poll__networl_2_1_RP_0 + P-poll__networl_4_2_AnsP_0 + P-poll__networl_3_1_AskP_7 + P-poll__networl_3_1_AskP_6 + P-poll__networl_3_1_AskP_5 + P-poll__networl_3_1_AskP_4 + P-poll__networl_3_1_AskP_3 + P-poll__networl_3_1_AskP_2 + P-poll__networl_3_1_AskP_1 + P-poll__networl_3_1_AskP_0 + P-poll__networl_2_7_AnnP_7 + P-poll__networl_4_5_AnnP_0 + P-poll__networl_4_5_AnnP_1 + P-poll__networl_4_5_AnnP_2 + P-poll__networl_4_5_AnnP_3 + P-poll__networl_4_5_AnnP_4 + P-poll__networl_4_5_AnnP_5 + P-poll__networl_4_5_AnnP_6 + P-poll__networl_4_5_AnnP_7 + P-poll__networl_2_7_AnnP_6 + P-poll__networl_2_7_AnnP_5 + P-poll__networl_2_7_AnnP_4 + P-poll__networl_2_7_AnnP_3 + P-poll__networl_2_7_AnnP_2 + P-poll__networl_2_7_AnnP_1 + P-poll__networl_2_7_AnnP_0 + P-poll__networl_0_5_RP_0 + P-poll__networl_0_5_RP_1 + P-poll__networl_0_5_RP_2 + P-poll__networl_0_5_RP_3 + P-poll__networl_0_5_RP_4 + P-poll__networl_0_5_RP_5 + P-poll__networl_0_5_RP_6 + P-poll__networl_0_5_RP_7 + P-poll__networl_2_7_AI_7 + P-poll__networl_2_7_AI_6 + P-poll__networl_2_7_AI_5 + P-poll__networl_2_0_AnnP_0 + P-poll__networl_2_7_AI_4 + P-poll__networl_2_0_AnnP_1 + P-poll__networl_2_7_AI_3 + P-poll__networl_2_0_AnnP_2 + P-poll__networl_2_0_AnnP_3 + P-poll__networl_2_0_AnnP_4 + P-poll__networl_2_0_AnnP_5 + P-poll__networl_2_0_AnnP_6 + P-poll__networl_2_0_AnnP_7 + P-poll__networl_2_7_AI_2 + P-poll__networl_3_6_AnsP_0 + P-poll__networl_2_7_AI_1 + P-poll__networl_2_7_AI_0 + P-poll__networl_2_4_RP_0 + P-poll__networl_2_4_RP_1 + P-poll__networl_2_4_RP_2 + P-poll__networl_2_4_RP_3 + P-poll__networl_2_4_RP_4 + P-poll__networl_2_4_RP_5 + P-poll__networl_2_4_RP_6 + P-poll__networl_2_4_RP_7 + P-poll__networl_2_4_AnsP_0 + P-poll__networl_0_2_RP_7 + P-poll__networl_0_2_RP_6 + P-poll__networl_0_2_RP_5 + P-poll__networl_0_2_RP_4 + P-poll__networl_0_2_RP_3 + P-poll__networl_0_2_RP_2 + P-poll__networl_0_2_RP_1 + P-poll__networl_4_3_AskP_0 + P-poll__networl_4_3_AskP_1 + P-poll__networl_4_3_AskP_2 + P-poll__networl_4_3_AskP_3 + P-poll__networl_4_3_AskP_4 + P-poll__networl_4_3_AskP_5 + P-poll__networl_4_3_AskP_6 + P-poll__networl_4_3_AskP_7 + P-poll__networl_0_2_RP_0 + P-poll__networl_4_3_RP_0 + P-poll__networl_4_3_RP_1 + P-poll__networl_4_3_RP_2 + P-poll__networl_4_3_RP_3 + P-poll__networl_4_3_RP_4 + P-poll__networl_4_3_RP_5 + P-poll__networl_4_3_RP_6 + P-poll__networl_4_3_RP_7 + P-poll__networl_7_5_RP_7 + P-poll__networl_7_5_RP_6 + P-poll__networl_1_1_AnsP_0 + P-poll__networl_7_5_RP_5 + P-poll__networl_7_5_RP_4 + P-poll__networl_7_5_RP_3 + P-poll__networl_7_5_RP_2 + P-poll__networl_7_5_RP_1 + P-poll__networl_7_5_RP_0 + P-poll__networl_1_4_AnnP_0 + P-poll__networl_1_4_AnnP_1 + P-poll__networl_1_4_AnnP_2 + P-poll__networl_1_4_AnnP_3 + P-poll__networl_1_4_AnnP_4 + P-poll__networl_1_4_AnnP_5 + P-poll__networl_1_4_AnnP_6 + P-poll__networl_1_4_AnnP_7 + P-poll__networl_6_2_RP_0 + P-poll__networl_6_2_RP_1 + P-poll__networl_6_2_RP_2 + P-poll__networl_6_2_RP_3 + P-poll__networl_6_2_RP_4 + P-poll__networl_6_2_RP_5 + P-poll__networl_6_2_RP_6 + P-poll__networl_6_2_RP_7 + P-poll__networl_1_4_AI_0 + P-poll__networl_1_4_AI_1 + P-poll__networl_1_4_AI_2 + P-poll__networl_1_4_AI_3 + P-poll__networl_1_4_AI_4 + P-poll__networl_1_4_AI_5 + P-poll__networl_1_4_AI_6 + P-poll__networl_1_4_AI_7 + P-poll__networl_1_7_RI_0 + P-poll__networl_1_7_RI_1 + P-poll__networl_1_7_RI_2 + P-poll__networl_1_7_RI_3 + P-poll__networl_1_7_RI_4 + P-poll__networl_1_7_RI_5 + P-poll__networl_1_7_RI_6 + P-poll__networl_1_7_RI_7 + P-poll__networl_5_6_AskP_7 + P-poll__networl_3_7_AskP_0 + P-poll__networl_3_7_AskP_1 + P-poll__networl_3_7_AskP_2 + P-poll__networl_3_7_AskP_3 + P-poll__networl_3_7_AskP_4 + P-poll__networl_3_7_AskP_5 + P-poll__networl_3_7_AskP_6 + P-poll__networl_3_7_AskP_7 + P-poll__networl_5_6_AskP_6 + P-poll__networl_5_6_AskP_5 + P-poll__networl_5_6_AskP_4 + P-poll__networl_3_3_AI_0 + P-poll__networl_3_3_AI_1 + P-poll__networl_3_3_AI_2 + P-poll__networl_0_5_AnsP_0 + P-poll__networl_3_3_AI_3 + P-poll__networl_5_6_AskP_3 + P-poll__networl_3_3_AI_4 + P-poll__networl_5_6_AskP_2 + P-poll__networl_3_3_AI_5 + P-poll__networl_5_6_AskP_1 + P-poll__networl_3_3_AI_6 + P-poll__networl_5_6_AskP_0 + P-poll__networl_3_3_AI_7 + P-poll__networl_3_6_RI_0 + P-poll__networl_3_6_RI_1 + P-poll__networl_3_6_RI_2 + P-poll__networl_3_6_RI_3 + P-poll__networl_3_6_RI_4 + P-poll__networl_3_6_RI_5 + P-poll__networl_3_6_RI_6 + P-poll__networl_3_6_RI_7 + P-poll__networl_6_0_AnnP_0 + P-poll__networl_6_0_AnnP_1 + P-poll__networl_6_0_AnnP_2 + P-poll__networl_6_0_AnnP_3 + P-poll__networl_6_0_AnnP_4 + P-poll__networl_6_0_AnnP_5 + P-poll__networl_6_0_AnnP_6 + P-poll__networl_6_0_AnnP_7 + P-poll__networl_7_6_AnsP_0 + P-poll__networl_1_2_AskP_0 + P-poll__networl_1_2_AskP_1 + P-poll__networl_1_2_AskP_2 + P-poll__networl_1_2_AskP_3 + P-poll__networl_1_2_AskP_4 + P-poll__networl_1_2_AskP_5 + P-poll__networl_1_2_AskP_6 + P-poll__networl_1_2_AskP_7 + P-poll__networl_5_6_RP_7 + P-poll__networl_5_2_AI_0 + P-poll__networl_5_2_AI_1 + P-poll__networl_5_2_AI_2 + P-poll__networl_5_2_AI_3 + P-poll__networl_5_2_AI_4 + P-poll__networl_5_2_AI_5 + P-poll__networl_5_2_AI_6 + P-poll__networl_5_2_AI_7 + P-poll__networl_5_6_RP_6 + P-poll__networl_5_5_RI_0 + P-poll__networl_5_5_RI_1 + P-poll__networl_5_5_RI_2 + P-poll__networl_5_5_RI_3 + P-poll__networl_5_5_RI_4 + P-poll__networl_5_5_RI_5 + P-poll__networl_5_5_RI_6 + P-poll__networl_5_5_RI_7 + P-poll__networl_5_6_RP_5 + P-poll__networl_5_6_RP_4 + P-poll__networl_5_6_RP_3 + P-poll__networl_5_1_AnsP_0 + P-poll__networl_5_6_RP_2 + P-poll__networl_5_6_RP_1 + P-poll__networl_5_6_RP_0 + P-poll__networl_7_1_AI_0 + P-poll__networl_7_1_AI_1 + P-poll__networl_7_1_AI_2 + P-poll__networl_7_1_AI_3 + P-poll__networl_7_1_AI_4 + P-poll__networl_7_1_AI_5 + P-poll__networl_7_1_AI_6 + P-poll__networl_7_1_AI_7 + P-poll__networl_7_4_RI_0 + P-poll__networl_7_4_RI_1 + P-poll__networl_7_4_RI_2 + P-poll__networl_7_4_RI_3 + P-poll__networl_7_4_RI_4 + P-poll__networl_7_4_RI_5 + P-poll__networl_7_4_RI_6 + P-poll__networl_7_4_RI_7 + P-poll__networl_0_1_RI_0 + P-poll__networl_0_1_RI_1 + P-poll__networl_0_1_RI_2 + P-poll__networl_0_1_RI_3 + P-poll__networl_0_1_RI_4 + P-poll__networl_0_1_RI_5 + P-poll__networl_0_1_RI_6 + P-poll__networl_0_1_RI_7 + P-poll__networl_5_4_AnnP_0 + P-poll__networl_5_4_AnnP_1 + P-poll__networl_5_4_AnnP_2 + P-poll__networl_5_4_AnnP_3 + P-poll__networl_5_4_AnnP_4 + P-poll__networl_5_4_AnnP_5 + P-poll__networl_5_4_AnnP_6 + P-poll__networl_5_4_AnnP_7 + P-poll__networl_0_6_AskP_0 + P-poll__networl_0_6_AskP_1 + P-poll__networl_0_6_AskP_2 + P-poll__networl_0_6_AskP_3 + P-poll__networl_0_6_AskP_4 + P-poll__networl_0_6_AskP_5 + P-poll__networl_0_6_AskP_6 + P-poll__networl_0_6_AskP_7 + P-poll__networl_2_0_RI_0 + P-poll__networl_2_0_RI_1 + P-poll__networl_2_0_RI_2 + P-poll__networl_2_0_RI_3 + P-poll__networl_2_0_RI_4 + P-poll__networl_2_0_RI_5 + P-poll__networl_2_0_RI_6 + P-poll__networl_2_0_RI_7 + P-poll__networl_7_7_AskP_0 + P-poll__networl_7_7_AskP_1 + P-poll__networl_7_7_AskP_2 + P-poll__networl_7_7_AskP_3 + P-poll__networl_7_7_AskP_4 + P-poll__networl_7_7_AskP_5 + P-poll__networl_7_7_AskP_6 + P-poll__networl_7_7_AskP_7 + P-poll__networl_4_5_AnsP_0 + P-poll__networl_3_3_AnnP_7 + P-poll__networl_3_3_AnnP_6 + P-poll__networl_3_3_AnnP_5 + P-poll__networl_3_3_AnnP_4 + P-poll__networl_3_3_AnnP_3 + P-poll__networl_3_3_AnnP_2 + P-poll__networl_3_3_AnnP_1 + P-poll__networl_1_6_RP_0 + P-poll__networl_1_6_RP_1 + P-poll__networl_1_6_RP_2 + P-poll__networl_1_6_RP_3 + P-poll__networl_1_6_RP_4 + P-poll__networl_1_6_RP_5 + P-poll__networl_1_6_RP_6 + P-poll__networl_1_6_RP_7 + P-poll__networl_3_3_AnnP_0 + P-poll__networl_5_2_AskP_0 + P-poll__networl_5_2_AskP_1 + P-poll__networl_5_2_AskP_2 + P-poll__networl_5_2_AskP_3 + P-poll__networl_5_2_AskP_4 + P-poll__networl_5_2_AskP_5 + P-poll__networl_5_2_AskP_6 + P-poll__networl_5_2_AskP_7 + P-poll__networl_3_5_RP_0 + P-poll__networl_3_5_RP_1 + P-poll__networl_3_5_RP_2 + P-poll__networl_3_5_RP_3 + P-poll__networl_3_5_RP_4 + P-poll__networl_3_5_RP_5 + P-poll__networl_3_5_RP_6 + P-poll__networl_3_5_RP_7 + P-poll__networl_2_0_AnsP_0 + P-poll__networl_3_7_RP_7 + P-poll__networl_2_3_AnnP_0 + P-poll__networl_2_3_AnnP_1 + P-poll__networl_2_3_AnnP_2 + P-poll__networl_2_3_AnnP_3 + P-poll__networl_2_3_AnnP_4 + P-poll__networl_2_3_AnnP_5 + P-poll__networl_2_3_AnnP_6 + P-poll__networl_2_3_AnnP_7 + P-poll__networl_3_7_RP_6 + P-poll__networl_3_7_RP_5 + P-poll__networl_6_0_RI_7 + P-poll__networl_3_7_RP_4 + P-poll__networl_6_0_RI_6 + P-poll__networl_3_7_RP_3 + P-poll__networl_6_0_RI_5 + P-poll__networl_3_7_RP_2 + P-poll__networl_6_0_RI_4 + P-poll__networl_3_7_RP_1 + P-poll__networl_6_0_RI_3 + P-poll__networl_5_4_RP_0 + P-poll__networl_5_4_RP_1 + P-poll__networl_5_4_RP_2 + P-poll__networl_5_4_RP_3 + P-poll__networl_5_4_RP_4 + P-poll__networl_5_4_RP_5 + P-poll__networl_5_4_RP_6 + P-poll__networl_5_4_RP_7 + P-poll__networl_3_7_RP_0 + P-poll__networl_6_0_RI_2 + P-poll__networl_6_0_RI_1 + P-poll__networl_0_6_AI_0 + P-poll__networl_0_6_AI_1 + P-poll__networl_0_6_AI_2 + P-poll__networl_0_6_AI_3 + P-poll__networl_0_6_AI_4 + P-poll__networl_0_6_AI_5 + P-poll__networl_0_6_AI_6 + P-poll__networl_0_6_AI_7 + P-poll__networl_6_0_RI_0 + P-poll__networl_3_0_AnsP_0 + P-poll__networl_4_6_AskP_0 + P-poll__networl_4_6_AskP_1 + P-poll__networl_4_6_AskP_2 + P-poll__networl_4_6_AskP_3 + P-poll__networl_4_6_AskP_4 + P-poll__networl_4_6_AskP_5 + P-poll__networl_4_6_AskP_6 + P-poll__networl_4_6_AskP_7 + P-poll__networl_7_3_RP_0 + P-poll__networl_7_3_RP_1 + P-poll__networl_7_3_RP_2 + P-poll__networl_7_3_RP_3 + P-poll__networl_7_3_RP_4 + P-poll__networl_7_3_RP_5 + P-poll__networl_7_3_RP_6 + P-poll__networl_7_3_RP_7 + P-poll__networl_0_0_RP_0 + P-poll__networl_0_0_RP_1 + P-poll__networl_0_0_RP_2 + P-poll__networl_0_0_RP_3 + P-poll__networl_0_0_RP_4 + P-poll__networl_0_0_RP_5 + P-poll__networl_0_0_RP_6 + P-poll__networl_0_0_RP_7 + P-poll__networl_1_4_AnsP_0 + P-poll__networl_6_2_AskP_7 + P-poll__networl_2_5_AI_0 + P-poll__networl_6_2_AskP_6 + P-poll__networl_2_5_AI_1 + P-poll__networl_2_5_AI_2 + P-poll__networl_2_5_AI_3 + P-poll__networl_2_5_AI_4 + P-poll__networl_2_5_AI_5 + P-poll__networl_2_5_AI_6 + P-poll__networl_2_5_AI_7 + P-poll__networl_6_2_AskP_5 + P-poll__networl_1_7_AnnP_0 + P-poll__networl_1_7_AnnP_1 + P-poll__networl_1_7_AnnP_2 + P-poll__networl_1_7_AnnP_3 + P-poll__networl_1_7_AnnP_4 + P-poll__networl_1_7_AnnP_5 + P-poll__networl_1_7_AnnP_6 + P-poll__networl_1_7_AnnP_7 + P-poll__networl_6_2_AskP_4 + P-poll__networl_6_2_AskP_3 + P-poll__networl_6_2_AskP_2 + P-poll__networl_6_2_AskP_1 + P-poll__networl_2_1_AskP_0 + P-poll__networl_2_1_AskP_1 + P-poll__networl_2_1_AskP_2 + P-poll__networl_2_1_AskP_3 + P-poll__networl_2_1_AskP_4 + P-poll__networl_2_1_AskP_5 + P-poll__networl_2_1_AskP_6 + P-poll__networl_2_1_AskP_7 + P-poll__networl_6_2_AskP_0 + P-poll__networl_4_4_AI_0 + P-poll__networl_4_4_AI_1 + P-poll__networl_4_4_AI_2 + P-poll__networl_4_4_AI_3 + P-poll__networl_4_4_AI_4 + P-poll__networl_4_4_AI_5 + P-poll__networl_4_4_AI_6 + P-poll__networl_4_4_AI_7 + P-poll__networl_4_7_RI_0 + P-poll__networl_4_7_RI_1 + P-poll__networl_4_7_RI_2 + P-poll__networl_4_7_RI_3 + P-poll__networl_4_7_RI_4 + P-poll__networl_4_7_RI_5 + P-poll__networl_4_7_RI_6 + P-poll__networl_4_7_RI_7 + P-poll__networl_6_0_AnsP_0 + P-poll__networl_4_1_RI_7 + P-poll__networl_4_1_RI_6 + P-poll__networl_4_1_RI_5 + P-poll__networl_4_1_RI_4 + P-poll__networl_4_1_RI_3 + P-poll__networl_4_1_RI_2 + P-poll__networl_4_1_RI_1 + P-poll__networl_4_1_RI_0 + P-poll__networl_6_3_AI_0 + P-poll__networl_6_3_AI_1 + P-poll__networl_6_3_AI_2 + P-poll__networl_6_3_AI_3 + P-poll__networl_6_3_AI_4 + P-poll__networl_6_3_AI_5 + P-poll__networl_6_3_AI_6 + P-poll__networl_6_3_AI_7 + P-poll__networl_6_6_RI_0 + P-poll__networl_6_6_RI_1 + P-poll__networl_6_6_RI_2 + P-poll__networl_6_6_RI_3 + P-poll__networl_6_6_RI_4 + P-poll__networl_6_6_RI_5 + P-poll__networl_6_6_RI_6 + P-poll__networl_6_6_RI_7 + P-poll__networl_5_5_AnsP_0 + P-poll__networl_6_3_AnnP_0 + P-poll__networl_6_3_AnnP_1 + P-poll__networl_6_3_AnnP_2 + P-poll__networl_6_3_AnnP_3 + P-poll__networl_6_3_AnnP_4 + P-poll__networl_6_3_AnnP_5 + P-poll__networl_6_3_AnnP_6 + P-poll__networl_6_3_AnnP_7 + P-poll__networl_2_2_RI_7 + P-poll__networl_2_2_RI_6 + P-poll__networl_2_2_RI_5 + P-poll__networl_2_2_RI_4 + P-poll__networl_2_2_RI_3 + P-poll__networl_2_2_RI_2 + P-poll__networl_1_5_AskP_0 + P-poll__networl_1_5_AskP_1 + P-poll__networl_1_5_AskP_2 + P-poll__networl_1_5_AskP_3 + P-poll__networl_1_5_AskP_4 + P-poll__networl_1_5_AskP_5 + P-poll__networl_1_5_AskP_6 + P-poll__networl_1_5_AskP_7 + P-poll__networl_2_2_RI_1 + P-poll__networl_2_2_RI_0 + P-poll__networl_1_6_AskP_7 + P-poll__networl_1_6_AskP_6 + P-poll__networl_1_6_AskP_5 + P-poll__networl_1_6_AskP_4 + P-poll__networl_1_6_AskP_3 + P-poll__networl_1_6_AskP_2 + P-poll__networl_1_2_RI_0 + P-poll__networl_1_2_RI_1 + P-poll__networl_1_2_RI_2 + P-poll__networl_1_2_RI_3 + P-poll__networl_1_2_RI_4 + P-poll__networl_1_2_RI_5 + P-poll__networl_1_2_RI_6 + P-poll__networl_1_2_RI_7 + P-poll__networl_1_6_AskP_1 + P-poll__networl_1_6_AskP_0 + P-poll__networl_5_4_AnsP_0 + P-poll__networl_3_1_RI_0 + P-poll__networl_3_1_RI_1 + P-poll__networl_3_1_RI_2 + P-poll__networl_3_1_RI_3 + P-poll__networl_3_1_RI_4 + P-poll__networl_3_1_RI_5 + P-poll__networl_3_1_RI_6 + P-poll__networl_3_1_RI_7 + P-poll__networl_5_7_AnnP_0 + P-poll__networl_5_7_AnnP_1 + P-poll__networl_5_7_AnnP_2 + P-poll__networl_5_7_AnnP_3 + P-poll__networl_5_7_AnnP_4 + P-poll__networl_5_7_AnnP_5 + P-poll__networl_5_7_AnnP_6 + P-poll__networl_5_7_AnnP_7 + P-poll__networl_6_1_AskP_0 + P-poll__networl_6_1_AskP_1 + P-poll__networl_6_1_AskP_2 + P-poll__networl_6_1_AskP_3 + P-poll__networl_6_1_AskP_4 + P-poll__networl_6_1_AskP_5 + P-poll__networl_6_1_AskP_6 + P-poll__networl_6_1_AskP_7 + P-poll__networl_6_4_AnnP_7 + P-poll__networl_5_0_RI_0 + P-poll__networl_5_0_RI_1 + P-poll__networl_5_0_RI_2 + P-poll__networl_2_7_RP_0 + P-poll__networl_5_0_RI_3 + P-poll__networl_2_7_RP_1 + P-poll__networl_5_0_RI_4 + P-poll__networl_2_7_RP_2 + P-poll__networl_5_0_RI_5 + P-poll__networl_2_7_RP_3 + P-poll__networl_5_0_RI_6 + P-poll__networl_2_7_RP_4 + P-poll__networl_5_0_RI_7 + P-poll__networl_2_7_RP_5 + P-poll__networl_2_7_RP_6 + P-poll__networl_2_7_RP_7 + P-poll__networl_6_4_AnnP_6 + P-poll__networl_3_2_AnnP_0 + P-poll__networl_3_2_AnnP_1 + P-poll__networl_3_2_AnnP_2 + P-poll__networl_3_2_AnnP_3 + P-poll__networl_3_2_AnnP_4 + P-poll__networl_3_2_AnnP_5 + P-poll__networl_3_2_AnnP_6 + P-poll__networl_3_2_AnnP_7 + P-poll__networl_6_4_AnnP_5 + P-poll__networl_6_4_AnnP_4 + P-poll__networl_6_4_AnnP_3 + P-poll__networl_4_6_RP_0 + P-poll__networl_4_6_RP_1 + P-poll__networl_4_6_RP_2 + P-poll__networl_4_6_RP_3 + P-poll__networl_4_6_RP_4 + P-poll__networl_4_6_RP_5 + P-poll__networl_4_6_RP_6 + P-poll__networl_4_6_RP_7 + P-poll__networl_6_4_AnnP_2 + P-poll__networl_6_4_AnnP_1 + P-poll__networl_6_4_AnnP_0 + P-poll__networl_0_3_RI_7 + P-poll__networl_0_3_RI_6 + P-poll__networl_0_3_RI_5 + P-poll__networl_0_3_RI_4 + P-poll__networl_0_3_RI_3 + P-poll__networl_0_3_RI_2 + P-poll__networl_0_3_RI_1 + P-poll__networl_5_5_AskP_0 + P-poll__networl_5_5_AskP_1 + P-poll__networl_5_5_AskP_2 + P-poll__networl_5_5_AskP_3 + P-poll__networl_5_5_AskP_4 + P-poll__networl_5_5_AskP_5 + P-poll__networl_5_5_AskP_6 + P-poll__networl_5_5_AskP_7 + P-poll__networl_0_3_RI_0 + P-poll__networl_7_6_RI_7 + P-poll__networl_6_5_RP_0 + P-poll__networl_6_5_RP_1 + P-poll__networl_6_5_RP_2 + P-poll__networl_6_5_RP_3 + P-poll__networl_6_5_RP_4 + P-poll__networl_6_5_RP_5 + P-poll__networl_6_5_RP_6 + P-poll__networl_6_5_RP_7 + P-poll__networl_2_3_AnsP_0 + P-poll__networl_7_6_RI_6 + P-poll__networl_7_6_RI_5 + P-poll__networl_7_6_RI_4 + P-poll__networl_7_6_RI_3 + P-poll__networl_7_6_RI_2 + P-poll__networl_7_6_RI_1 + P-poll__networl_7_6_RI_0 + P-poll__networl_0_0_AI_7 + P-poll__networl_1_7_AI_0 + P-poll__networl_1_7_AI_1 + P-poll__networl_1_7_AI_2 + P-poll__networl_1_7_AI_3 + P-poll__networl_1_7_AI_4 + P-poll__networl_1_7_AI_5 + P-poll__networl_1_7_AI_6 + P-poll__networl_1_7_AI_7 + P-poll__networl_0_0_AI_6 + P-poll__networl_0_0_AI_5 + P-poll__networl_2_6_AnnP_0 + P-poll__networl_2_6_AnnP_1 + P-poll__networl_2_6_AnnP_2 + P-poll__networl_2_6_AnnP_3 + P-poll__networl_2_6_AnnP_4 + P-poll__networl_2_6_AnnP_5 + P-poll__networl_2_6_AnnP_6 + P-poll__networl_2_6_AnnP_7 + P-poll__networl_0_0_AI_4 + P-poll__networl_3_0_AskP_0 + P-poll__networl_3_0_AskP_1 + P-poll__networl_3_0_AskP_2 + P-poll__networl_3_0_AskP_3 + P-poll__networl_3_0_AskP_4 + P-poll__networl_3_0_AskP_5 + P-poll__networl_3_0_AskP_6 + P-poll__networl_3_0_AskP_7 + P-poll__networl_1_1_RP_0 + P-poll__networl_1_1_RP_1 + P-poll__networl_1_1_RP_2 + P-poll__networl_1_1_RP_3 + P-poll__networl_1_1_RP_4 + P-poll__networl_1_1_RP_5 + P-poll__networl_1_1_RP_6 + P-poll__networl_1_1_RP_7 + P-poll__networl_0_0_AI_3 + P-poll__networl_3_6_AI_0 + P-poll__networl_3_6_AI_1 + P-poll__networl_3_6_AI_2 + P-poll__networl_3_6_AI_3 + P-poll__networl_3_6_AI_4 + P-poll__networl_3_6_AI_5 + P-poll__networl_3_6_AI_6 + P-poll__networl_3_6_AI_7 + P-poll__networl_0_0_AI_2 + P-poll__networl_0_0_AI_1 + P-poll__networl_0_0_AI_0 + P-poll__networl_0_1_AnnP_0 + P-poll__networl_0_1_AnnP_1 + P-poll__networl_0_1_AnnP_2 + P-poll__networl_0_1_AnnP_3 + P-poll__networl_0_1_AnnP_4 + P-poll__networl_0_1_AnnP_5 + P-poll__networl_0_1_AnnP_6 + P-poll__networl_0_1_AnnP_7 + P-poll__networl_3_0_RP_0 + P-poll__networl_3_0_RP_1 + P-poll__networl_3_0_RP_2 + P-poll__networl_3_0_RP_3 + P-poll__networl_3_0_RP_4 + P-poll__networl_3_0_RP_5 + P-poll__networl_3_0_RP_6 + P-poll__networl_3_0_RP_7 + P-poll__networl_7_3_AI_7 + P-poll__networl_1_7_AnsP_0 + P-poll__networl_7_3_AI_6 + P-poll__networl_7_3_AI_5 + P-poll__networl_7_3_AI_4 + P-poll__networl_7_3_AI_3 + P-poll__networl_7_3_AI_2 + P-poll__networl_7_3_AI_1 + P-poll__networl_7_3_AI_0 + P-poll__networl_5_5_AI_0 + P-poll__networl_5_5_AI_1 + P-poll__networl_5_5_AI_2 + P-poll__networl_5_5_AI_3 + P-poll__networl_5_5_AI_4 + P-poll__networl_5_5_AI_5 + P-poll__networl_5_5_AI_6 + P-poll__networl_5_5_AI_7 + P-poll__networl_7_2_AnnP_0 + P-poll__networl_7_2_AnnP_1 + P-poll__networl_7_2_AnnP_2 + P-poll__networl_7_2_AnnP_3 + P-poll__networl_7_2_AnnP_4 + P-poll__networl_7_2_AnnP_5 + P-poll__networl_7_2_AnnP_6 + P-poll__networl_7_2_AnnP_7 + P-poll__networl_6_1_AnsP_0 + P-poll__networl_2_4_AskP_0 + P-poll__networl_2_4_AskP_1 + P-poll__networl_2_4_AskP_2 + P-poll__networl_2_4_AskP_3 + P-poll__networl_2_4_AskP_4 + P-poll__networl_2_4_AskP_5 + P-poll__networl_2_4_AskP_6 + P-poll__networl_2_4_AskP_7 + P-poll__networl_7_4_AI_0 + P-poll__networl_7_4_AI_1 + P-poll__networl_7_4_AI_2 + P-poll__networl_7_4_AI_3 + P-poll__networl_7_4_AI_4 + P-poll__networl_7_4_AI_5 + P-poll__networl_7_4_AI_6 + P-poll__networl_7_4_AI_7 + P-poll__networl_0_1_AI_0 + P-poll__networl_0_1_AI_1 + P-poll__networl_0_1_AI_2 + P-poll__networl_0_1_AI_3 + P-poll__networl_0_1_AI_4 + P-poll__networl_0_1_AI_5 + P-poll__networl_0_1_AI_6 + P-poll__networl_0_1_AI_7 + P-poll__networl_7_7_RI_0 + P-poll__networl_7_7_RI_1 + P-poll__networl_7_7_RI_2 + P-poll__networl_7_7_RI_3 + P-poll__networl_7_7_RI_4 + P-poll__networl_7_7_RI_5 + P-poll__networl_7_7_RI_6 + P-poll__networl_7_7_RI_7 + P-poll__networl_0_4_RI_0 + P-poll__networl_0_4_RI_1 + P-poll__networl_0_4_RI_2 + P-poll__networl_0_4_RI_3 + P-poll__networl_0_4_RI_4 + P-poll__networl_0_4_RI_5 + P-poll__networl_0_4_RI_6 + P-poll__networl_0_4_RI_7 + P-poll__networl_6_3_AnsP_0 + P-poll__networl_5_7_RI_7 + P-poll__networl_5_7_RI_6 + P-poll__networl_5_7_RI_5 + P-poll__networl_5_7_RI_4 + P-poll__networl_5_7_RI_3 + P-poll__networl_5_7_RI_2 + P-poll__networl_5_7_RI_1 + P-poll__networl_2_0_AI_0 + P-poll__networl_2_0_AI_1 + P-poll__networl_2_0_AI_2 + P-poll__networl_2_0_AI_3 + P-poll__networl_2_0_AI_4 + P-poll__networl_2_0_AI_5 + P-poll__networl_2_0_AI_6 + P-poll__networl_2_0_AI_7 + P-poll__networl_2_3_RI_0 + P-poll__networl_2_3_RI_1 + P-poll__networl_2_3_RI_2 + P-poll__networl_2_3_RI_3 + P-poll__networl_2_3_RI_4 + P-poll__networl_2_3_RI_5 + P-poll__networl_2_3_RI_6 + P-poll__networl_2_3_RI_7 + P-poll__networl_5_7_RI_0 + P-poll__networl_5_4_AI_7 + P-poll__networl_6_6_AnnP_0 + P-poll__networl_6_6_AnnP_1 + P-poll__networl_6_6_AnnP_2 + P-poll__networl_6_6_AnnP_3 + P-poll__networl_6_6_AnnP_4 + P-poll__networl_6_6_AnnP_5 + P-poll__networl_6_6_AnnP_6 + P-poll__networl_6_6_AnnP_7 + P-poll__networl_5_4_AI_6 + P-poll__networl_7_0_AskP_0 + P-poll__networl_7_0_AskP_1 + P-poll__networl_7_0_AskP_2 + P-poll__networl_7_0_AskP_3 + P-poll__networl_7_0_AskP_4 + P-poll__networl_7_0_AskP_5 + P-poll__networl_7_0_AskP_6 + P-poll__networl_7_0_AskP_7 + P-poll__networl_5_4_AI_5 + P-poll__networl_5_4_AI_4 + P-poll__networl_5_4_AI_3 + P-poll__networl_5_4_AI_2 + P-poll__networl_5_4_AI_1 + P-poll__networl_5_4_AI_0 + P-poll__networl_4_2_RI_0 + P-poll__networl_4_2_RI_1 + P-poll__networl_4_2_RI_2 + P-poll__networl_4_2_RI_3 + P-poll__networl_4_2_RI_4 + P-poll__networl_4_2_RI_5 + P-poll__networl_4_2_RI_6 + P-poll__networl_4_2_RI_7 + P-poll__networl_4_1_AnnP_0 + P-poll__networl_4_1_AnnP_1 + P-poll__networl_4_1_AnnP_2 + P-poll__networl_4_1_AnnP_3 + P-poll__networl_4_1_AnnP_4 + P-poll__networl_4_1_AnnP_5 + P-poll__networl_4_1_AnnP_6 + P-poll__networl_4_1_AnnP_7 + P-poll__networl_2_2_AskP_7 + P-poll__networl_5_7_AnsP_0 + P-poll__networl_2_2_AskP_6 + P-poll__networl_2_2_AskP_5 + P-poll__networl_2_2_AskP_4 + P-poll__networl_2_2_AskP_3 + P-poll__networl_2_2_AskP_2 + P-poll__networl_2_2_AskP_1 + P-poll__networl_2_2_AskP_0 + P-poll__networl_6_1_RI_0 + P-poll__networl_6_1_RI_1 + P-poll__networl_6_1_RI_2 + P-poll__networl_6_1_RI_3 + P-poll__networl_6_1_RI_4 + P-poll__networl_6_1_RI_5 + P-poll__networl_6_1_RI_6 + P-poll__networl_6_1_RI_7 + P-poll__networl_7_0_AnnP_7 + P-poll__networl_7_0_AnnP_6 + P-poll__networl_7_0_AnnP_5 + P-poll__networl_6_4_AskP_0 + P-poll__networl_6_4_AskP_1 + P-poll__networl_6_4_AskP_2 + P-poll__networl_6_4_AskP_3 + P-poll__networl_6_4_AskP_4 + P-poll__networl_6_4_AskP_5 + P-poll__networl_6_4_AskP_6 + P-poll__networl_6_4_AskP_7 + P-poll__networl_7_0_AnnP_4 + P-poll__networl_7_0_AnnP_3 + P-poll__networl_3_2_AnsP_0 + P-poll__networl_7_0_AnnP_2 + P-poll__networl_7_0_AnnP_1 + P-poll__networl_7_0_AnnP_0 + P-poll__networl_3_5_AI_7 + P-poll__networl_3_5_AI_6 + P-poll__networl_3_5_AI_5 + P-poll__networl_3_5_AI_4 + P-poll__networl_3_5_AI_3 + P-poll__networl_5_7_RP_0 + P-poll__networl_5_7_RP_1 + P-poll__networl_5_7_RP_2 + P-poll__networl_5_7_RP_3 + P-poll__networl_5_7_RP_4 + P-poll__networl_5_7_RP_5 + P-poll__networl_5_7_RP_6 + P-poll__networl_5_7_RP_7 + P-poll__networl_3_5_AI_2 + P-poll__networl_3_5_AI_1 + P-poll__networl_3_5_AI_0 + P-poll__networl_1_5_AnsP_0 + P-poll__networl_3_5_AnnP_0 + P-poll__networl_3_5_AnnP_1 + P-poll__networl_3_5_AnnP_2 + P-poll__networl_3_5_AnnP_3 + P-poll__networl_3_5_AnnP_4 + P-poll__networl_3_5_AnnP_5 + P-poll__networl_3_5_AnnP_6 + P-poll__networl_3_5_AnnP_7 + P-poll__networl_7_6_RP_0 + P-poll__networl_7_6_RP_1 + P-poll__networl_7_6_RP_2 + P-poll__networl_7_6_RP_3 + P-poll__networl_7_6_RP_4 + P-poll__networl_7_6_RP_5 + P-poll__networl_7_6_RP_6 + P-poll__networl_7_6_RP_7 + P-poll__networl_0_3_RP_0 + P-poll__networl_0_3_RP_1 + P-poll__networl_0_3_RP_2 + P-poll__networl_0_3_RP_3 + P-poll__networl_0_3_RP_4 + P-poll__networl_0_3_RP_5 + P-poll__networl_0_3_RP_6 + P-poll__networl_0_3_RP_7 + P-poll__networl_1_0_RP_7 + P-poll__networl_1_0_RP_6 + P-poll__networl_1_0_RP_5 + P-poll__networl_1_0_RP_4 + P-poll__networl_1_0_RP_3 + P-poll__networl_1_0_RP_2 + P-poll__networl_1_0_RP_1 + P-poll__networl_1_0_RP_0 + P-poll__networl_1_0_AnnP_0 + P-poll__networl_1_0_AnnP_1 + P-poll__networl_1_0_AnnP_2 + P-poll__networl_1_0_AnnP_3 + P-poll__networl_1_0_AnnP_4 + P-poll__networl_1_0_AnnP_5 + P-poll__networl_1_0_AnnP_6 + P-poll__networl_1_0_AnnP_7 + P-poll__networl_4_7_AskP_7 + P-poll__networl_4_7_AskP_6 + P-poll__networl_4_7_AskP_5 + P-poll__networl_4_7_AskP_4 + P-poll__networl_2_2_RP_0 + P-poll__networl_2_2_RP_1 + P-poll__networl_2_2_RP_2 + P-poll__networl_2_2_RP_3 + P-poll__networl_2_2_RP_4 + P-poll__networl_2_2_RP_5 + P-poll__networl_2_2_RP_6 + P-poll__networl_2_2_RP_7 + P-poll__networl_2_6_AnsP_0 + P-poll__networl_4_7_AskP_3 + P-poll__networl_4_7_AskP_2 + P-poll__networl_4_7_AskP_1 + P-poll__networl_4_7_AskP_0 + P-poll__networl_4_7_AI_0 + P-poll__networl_4_7_AI_1 + P-poll__networl_4_7_AI_2 + P-poll__networl_4_7_AI_3 + P-poll__networl_4_7_AI_4 + P-poll__networl_4_7_AI_5 + P-poll__networl_4_7_AI_6 + P-poll__networl_4_7_AI_7 + P-poll__networl_1_6_AI_7 + P-poll__networl_1_6_AI_6 + P-poll__networl_1_6_AI_5 + P-poll__networl_1_6_AI_4 + P-poll__networl_1_6_AI_3 + P-poll__networl_1_6_AI_2 + P-poll__networl_1_6_AI_1 + P-poll__networl_3_3_AskP_0 + P-poll__networl_3_3_AskP_1 + P-poll__networl_3_3_AskP_2 + P-poll__networl_3_3_AskP_3 + P-poll__networl_3_3_AskP_4 + P-poll__networl_3_3_AskP_5 + P-poll__networl_3_3_AskP_6 + P-poll__networl_3_3_AskP_7 + P-poll__networl_4_1_RP_0 + P-poll__networl_4_1_RP_1 + P-poll__networl_4_1_RP_2 + P-poll__networl_4_1_RP_3 + P-poll__networl_4_1_RP_4 + P-poll__networl_4_1_RP_5 + P-poll__networl_4_1_RP_6 + P-poll__networl_4_1_RP_7 + P-poll__networl_1_6_AI_0 + P-poll__networl_6_6_AI_0 + P-poll__networl_6_6_AI_1 + P-poll__networl_6_6_AI_2 + P-poll__networl_6_6_AI_3 + P-poll__networl_6_6_AI_4 + P-poll__networl_6_6_AI_5 + P-poll__networl_6_6_AI_6 + P-poll__networl_6_6_AI_7 + P-poll__networl_0_1_AnsP_0 + P-poll__networl_6_4_RP_7 + P-poll__networl_6_4_RP_6 + P-poll__networl_6_4_RP_5 + P-poll__networl_7_2_AnsP_0 + P-poll__networl_6_4_RP_4 + P-poll__networl_6_4_RP_3 + P-poll__networl_6_4_RP_2 + P-poll__networl_6_4_RP_1 + P-poll__networl_6_4_RP_0 + P-poll__networl_0_4_AnnP_0 + P-poll__networl_0_4_AnnP_1 + P-poll__networl_0_4_AnnP_2 + P-poll__networl_0_4_AnnP_3 + P-poll__networl_0_4_AnnP_4 + P-poll__networl_0_4_AnnP_5 + P-poll__networl_0_4_AnnP_6 + P-poll__networl_0_4_AnnP_7 + P-poll__networl_6_0_RP_0 + P-poll__networl_6_0_RP_1 + P-poll__networl_6_0_RP_2 + P-poll__networl_6_0_RP_3 + P-poll__networl_6_0_RP_4 + P-poll__networl_6_0_RP_5 + P-poll__networl_6_0_RP_6 + P-poll__networl_6_0_RP_7 + P-poll__networl_1_2_AI_0 + P-poll__networl_1_2_AI_1 + P-poll__networl_1_2_AI_2 + P-poll__networl_1_2_AI_3 + P-poll__networl_1_2_AI_4 + P-poll__networl_1_2_AI_5 + P-poll__networl_1_2_AI_6 + P-poll__networl_1_2_AI_7 + P-poll__networl_1_5_RI_0 + P-poll__networl_1_5_RI_1 + P-poll__networl_1_5_RI_2 + P-poll__networl_1_5_RI_3 + P-poll__networl_1_5_RI_4 + P-poll__networl_1_5_RI_5 + P-poll__networl_1_5_RI_6 + P-poll__networl_1_5_RI_7 + P-poll__networl_7_5_AnnP_0 + P-poll__networl_7_5_AnnP_1 + P-poll__networl_7_5_AnnP_2 + P-poll__networl_7_5_AnnP_3 + P-poll__networl_7_5_AnnP_4 + P-poll__networl_7_5_AnnP_5 + P-poll__networl_7_5_AnnP_6 + P-poll__networl_7_5_AnnP_7 + P-poll__networl_2_7_AskP_0 + P-poll__networl_2_7_AskP_1 + P-poll__networl_2_7_AskP_2 + P-poll__networl_2_7_AskP_3 + P-poll__networl_2_7_AskP_4 + P-poll__networl_2_7_AskP_5 + P-poll__networl_2_7_AskP_6 + P-poll__networl_2_7_AskP_7 + P-poll__networl_2_4_AnnP_7 + P-poll__networl_2_4_AnnP_6 + P-poll__networl_2_4_AnnP_5 + P-poll__networl_3_1_AI_0 + P-poll__networl_3_1_AI_1 + P-poll__networl_3_1_AI_2 + P-poll__networl_3_1_AI_3 + P-poll__networl_3_1_AI_4 + P-poll__networl_3_1_AI_5 + P-poll__networl_3_1_AI_6 + P-poll__networl_3_1_AI_7 + P-poll__networl_3_4_RI_0 + P-poll__networl_3_4_RI_1 + P-poll__networl_3_4_RI_2 + P-poll__networl_3_4_RI_3 + P-poll__networl_3_4_RI_4 + P-poll__networl_3_4_RI_5 + P-poll__networl_3_4_RI_6 + P-poll__networl_3_4_RI_7 + P-poll__networl_2_4_AnnP_4 + P-poll__networl_5_0_AnnP_0 + P-poll__networl_5_0_AnnP_1 + P-poll__networl_5_0_AnnP_2 + P-poll__networl_5_0_AnnP_3 + P-poll__networl_5_0_AnnP_4 + P-poll__networl_5_0_AnnP_5 + P-poll__networl_5_0_AnnP_6 + P-poll__networl_5_0_AnnP_7 + P-poll__networl_2_4_AnnP_3 + P-poll__networl_6_6_AnsP_0 + P-poll__networl_2_4_AnnP_2 + P-poll__networl_2_4_AnnP_1 + P-poll__networl_2_4_AnnP_0 + P-poll__networl_5_0_AI_0 + P-poll__networl_5_0_AI_1 + P-poll__networl_5_0_AI_2 + P-poll__networl_5_0_AI_3 + P-poll__networl_5_0_AI_4 + P-poll__networl_5_0_AI_5 + P-poll__networl_5_0_AI_6 + P-poll__networl_5_0_AI_7 + P-poll__networl_2_1_AnsP_0 + P-poll__networl_4_5_RP_7 + P-poll__networl_4_5_RP_6 + P-poll__networl_4_5_RP_5 + P-poll__networl_4_5_RP_4 + P-poll__networl_4_5_RP_3 + P-poll__networl_4_5_RP_2 + P-poll__networl_0_2_AskP_0 + P-poll__networl_0_2_AskP_1 + P-poll__networl_0_2_AskP_2 + P-poll__networl_0_2_AskP_3 + P-poll__networl_0_2_AskP_4 + P-poll__networl_0_2_AskP_5 + P-poll__networl_0_2_AskP_6 + P-poll__networl_0_2_AskP_7 + P-poll__networl_5_3_RI_0 + P-poll__networl_5_3_RI_1 + P-poll__networl_5_3_RI_2 + P-poll__networl_5_3_RI_3 + P-poll__networl_5_3_RI_4 + P-poll__networl_5_3_RI_5 + P-poll__networl_5_3_RI_6 + P-poll__networl_5_3_RI_7 + P-poll__networl_4_5_RP_1 + P-poll__networl_4_5_RP_0 + P-poll__networl_7_3_AskP_0 + P-poll__networl_7_3_AskP_1 + P-poll__networl_7_3_AskP_2 + P-poll__networl_7_3_AskP_3 + P-poll__networl_7_3_AskP_4 + P-poll__networl_7_3_AskP_5 + P-poll__networl_7_3_AskP_6 + P-poll__networl_7_3_AskP_7 + P-poll__networl_5_3_AskP_7 + P-poll__networl_5_3_AskP_6 + P-poll__networl_5_3_AskP_5 + P-poll__networl_4_1_AnsP_0 + P-poll__networl_5_3_AskP_4 + P-poll__networl_5_3_AskP_3 + P-poll__networl_5_3_AskP_2 + P-poll__networl_5_3_AskP_1 + P-poll__networl_5_3_AskP_0 + P-poll__networl_7_2_RI_0 + P-poll__networl_7_2_RI_1 + P-poll__networl_7_2_RI_2 + P-poll__networl_7_2_RI_3 + P-poll__networl_7_2_RI_4 + P-poll__networl_7_2_RI_5 + P-poll__networl_7_2_RI_6 + P-poll__networl_7_2_RI_7 + P-poll__networl_4_4_AnnP_0 + P-poll__networl_4_4_AnnP_1 + P-poll__networl_4_4_AnnP_2 + P-poll__networl_4_4_AnnP_3 + P-poll__networl_4_4_AnnP_4 + P-poll__networl_4_4_AnnP_5 + P-poll__networl_4_4_AnnP_6 + P-poll__networl_4_4_AnnP_7 + P-poll__networl_2_6_RP_7 + P-poll__networl_2_6_RP_6 + P-poll__networl_2_6_RP_5 + P-poll__networl_2_6_RP_4 + P-poll__networl_2_6_RP_3 + P-poll__networl_2_6_RP_2 + P-poll__networl_2_6_RP_1 + P-poll__networl_2_6_RP_0 + P-poll__networl_4_6_AnsP_0 + P-poll__networl_6_7_AskP_0 + P-poll__networl_6_7_AskP_1 + P-poll__networl_6_7_AskP_2 + P-poll__networl_6_7_AskP_3 + P-poll__networl_6_7_AskP_4 + P-poll__networl_6_7_AskP_5 + P-poll__networl_6_7_AskP_6 + P-poll__networl_6_7_AskP_7 + P-poll__networl_3_5_AnsP_0 + P-poll__networl_3_0_AnnP_7 + P-poll__networl_3_0_AnnP_6 + P-poll__networl_3_0_AnnP_5 + P-poll__networl_1_4_RP_0 + P-poll__networl_1_4_RP_1 + P-poll__networl_1_4_RP_2 + P-poll__networl_1_4_RP_3 + P-poll__networl_1_4_RP_4 + P-poll__networl_1_4_RP_5 + P-poll__networl_1_4_RP_6 + P-poll__networl_1_4_RP_7 + P-poll__networl_3_0_AnnP_4 + P-poll__networl_3_0_AnnP_3 + P-poll__networl_3_0_AnnP_2 + P-poll__networl_3_0_AnnP_1 + P-poll__networl_3_0_AnnP_0 + P-poll__networl_4_2_AskP_0 + P-poll__networl_4_2_AskP_1 + P-poll__networl_4_2_AskP_2 + P-poll__networl_4_2_AskP_3 + P-poll__networl_4_2_AskP_4 + P-poll__networl_4_2_AskP_5 + P-poll__networl_4_2_AskP_6 + P-poll__networl_4_2_AskP_7 + P-poll__networl_3_3_RP_0 + P-poll__networl_3_3_RP_1 + P-poll__networl_3_3_RP_2 + P-poll__networl_3_3_RP_3 + P-poll__networl_3_3_RP_4 + P-poll__networl_3_3_RP_5 + P-poll__networl_3_3_RP_6 + P-poll__networl_3_3_RP_7 + P-poll__networl_1_0_AnsP_0 + P-poll__networl_0_7_RP_7 + P-poll__networl_0_7_RP_6 + P-poll__networl_0_7_RP_5 + P-poll__networl_3_0_RI_7 + P-poll__networl_0_7_RP_4 + P-poll__networl_3_0_RI_6 + P-poll__networl_0_7_RP_3 + P-poll__networl_1_3_AnnP_0 + P-poll__networl_1_3_AnnP_1 + P-poll__networl_1_3_AnnP_2 + P-poll__networl_1_3_AnnP_3 + P-poll__networl_1_3_AnnP_4 + P-poll__networl_1_3_AnnP_5 + P-poll__networl_1_3_AnnP_6 + P-poll__networl_1_3_AnnP_7 + P-poll__networl_3_0_RI_5 + P-poll__networl_0_7_RP_2 + P-poll__networl_5_2_RP_0 + P-poll__networl_5_2_RP_1 + P-poll__networl_5_2_RP_2 + P-poll__networl_5_2_RP_3 + P-poll__networl_5_2_RP_4 + P-poll__networl_5_2_RP_5 + P-poll__networl_5_2_RP_6 + P-poll__networl_5_2_RP_7 + P-poll__networl_3_0_RI_4 + P-poll__networl_0_7_RP_1 + P-poll__networl_3_0_RI_3 + P-poll__networl_7_7_AI_0 + P-poll__networl_7_7_AI_1 + P-poll__networl_7_7_AI_2 + P-poll__networl_7_7_AI_3 + P-poll__networl_7_7_AI_4 + P-poll__networl_7_7_AI_5 + P-poll__networl_7_7_AI_6 + P-poll__networl_7_7_AI_7 + P-poll__networl_0_4_AI_0 + P-poll__networl_0_4_AI_1 + P-poll__networl_0_4_AI_2 + P-poll__networl_0_4_AI_3 + P-poll__networl_0_4_AI_4 + P-poll__networl_0_4_AI_5 + P-poll__networl_0_4_AI_6 + P-poll__networl_0_4_AI_7 + P-poll__networl_0_7_RI_0 + P-poll__networl_0_7_RI_1 + P-poll__networl_0_7_RI_2 + P-poll__networl_0_7_RI_3 + P-poll__networl_0_7_RI_4 + P-poll__networl_0_7_RI_5 + P-poll__networl_0_7_RI_6 + P-poll__networl_0_7_RI_7 + P-poll__networl_0_7_RP_0 + P-poll__networl_3_0_RI_2 + P-poll__networl_3_0_RI_1 + P-poll__networl_3_0_RI_0 + P-poll__networl_3_6_AskP_0 + P-poll__networl_3_6_AskP_1 + P-poll__networl_3_6_AskP_2 + P-poll__networl_3_6_AskP_3 + P-poll__networl_3_6_AskP_4 + P-poll__networl_3_6_AskP_5 + P-poll__networl_3_6_AskP_6 + P-poll__networl_3_6_AskP_7 + P-poll__networl_7_1_RP_0 + P-poll__networl_7_1_RP_1 + P-poll__networl_7_1_RP_2 + P-poll__networl_7_1_RP_3 + P-poll__networl_7_1_RP_4 + P-poll__networl_7_1_RP_5 + P-poll__networl_7_1_RP_6 + P-poll__networl_7_1_RP_7 + P-poll__networl_2_3_AI_0 + P-poll__networl_2_3_AI_1 + P-poll__networl_2_3_AI_2 + P-poll__networl_0_4_AnsP_0 + P-poll__networl_2_3_AI_3 + P-poll__networl_2_3_AI_4 + P-poll__networl_2_3_AI_5 + P-poll__networl_2_3_AI_6 + P-poll__networl_2_3_AI_7 + P-poll__networl_2_6_RI_0 + P-poll__networl_2_6_RI_1 + P-poll__networl_2_6_RI_2 + P-poll__networl_2_6_RI_3 + P-poll__networl_2_6_RI_4 + P-poll__networl_2_6_RI_5 + P-poll__networl_2_6_RI_6 + P-poll__networl_2_6_RI_7 + P-poll__networl_0_7_AskP_7 + P-poll__networl_0_7_AskP_6 + P-poll__networl_0_7_AskP_5 + P-poll__networl_0_7_AskP_4 + P-poll__networl_0_7_AskP_3 + P-poll__networl_0_7_AskP_2 + P-poll__networl_0_7_AskP_1 + P-poll__networl_0_7_AskP_0 + P-poll__networl_7_5_AnsP_0 + P-poll__networl_0_7_AnnP_0 + P-poll__networl_0_7_AnnP_1 + P-poll__networl_0_7_AnnP_2 + P-poll__networl_0_7_AnnP_3 + P-poll__networl_0_7_AnnP_4 + P-poll__networl_0_7_AnnP_5 + P-poll__networl_0_7_AnnP_6 + P-poll__networl_0_7_AnnP_7 + P-poll__networl_1_1_AskP_0 + P-poll__networl_1_1_AskP_1 + P-poll__networl_1_1_AskP_2 + P-poll__networl_1_1_AskP_3 + P-poll__networl_1_1_AskP_4 + P-poll__networl_1_1_AskP_5 + P-poll__networl_1_1_AskP_6 + P-poll__networl_1_1_AskP_7 + P-poll__networl_4_2_AI_0 + P-poll__networl_4_2_AI_1 + P-poll__networl_4_2_AI_2 + P-poll__networl_4_2_AI_3 + P-poll__networl_4_2_AI_4 + P-poll__networl_4_2_AI_5 + P-poll__networl_4_2_AI_6 + P-poll__networl_4_2_AI_7 + P-poll__networl_4_5_RI_0 + P-poll__networl_4_5_RI_1 + P-poll__networl_4_5_RI_2 + P-poll__networl_4_5_RI_3 + P-poll__networl_4_5_RI_4 + P-poll__networl_4_5_RI_5 + P-poll__networl_4_5_RI_6 + P-poll__networl_4_5_RI_7 + P-poll__networl_5_5_AnnP_7 + P-poll__networl_5_0_AnsP_0 + P-poll__networl_5_5_AnnP_6 + P-poll__networl_5_5_AnnP_5 + P-poll__networl_5_5_AnnP_4 + P-poll__networl_5_5_AnnP_3 + P-poll__networl_5_5_AnnP_2 + P-poll__networl_5_5_AnnP_1 + P-poll__networl_5_5_AnnP_0 + P-poll__networl_1_1_RI_7 + P-poll__networl_6_1_AI_0 + P-poll__networl_6_1_AI_1 + P-poll__networl_6_1_AI_2 + P-poll__networl_6_1_AI_3 + P-poll__networl_6_1_AI_4 + P-poll__networl_6_1_AI_5 + P-poll__networl_6_1_AI_6 + P-poll__networl_6_1_AI_7 + P-poll__networl_6_4_RI_0 + P-poll__networl_6_4_RI_1 + P-poll__networl_6_4_RI_2 + P-poll__networl_6_4_RI_3 + P-poll__networl_6_4_RI_4 + P-poll__networl_6_4_RI_5 + P-poll__networl_6_4_RI_6 + P-poll__networl_6_4_RI_7 + P-poll__networl_1_1_RI_6 + P-poll__networl_5_3_AnnP_0 + P-poll__networl_5_3_AnnP_1 + P-poll__networl_5_3_AnnP_2 + P-poll__networl_5_3_AnnP_3 + P-poll__networl_5_3_AnnP_4 + P-poll__networl_5_3_AnnP_5 + P-poll__networl_5_3_AnnP_6 + P-poll__networl_5_3_AnnP_7 + P-poll__networl_1_1_RI_5 + P-poll__networl_1_1_RI_4 + P-poll__networl_1_1_RI_3 + P-poll__networl_1_1_RI_2 + P-poll__networl_1_1_RI_1 + P-poll__networl_1_1_RI_0 + P-poll__networl_5_2_AnsP_0 + P-poll__networl_0_5_AskP_0 + P-poll__networl_0_5_AskP_1 + P-poll__networl_0_5_AskP_2 + P-poll__networl_0_5_AskP_3 + P-poll__networl_0_5_AskP_4 + P-poll__networl_0_5_AskP_5 + P-poll__networl_0_5_AskP_6 + P-poll__networl_0_5_AskP_7 + P-poll__networl_1_0_RI_0 + P-poll__networl_1_0_RI_1 + P-poll__networl_1_0_RI_2 + P-poll__networl_1_0_RI_3 + P-poll__networl_1_0_RI_4 + P-poll__networl_1_0_RI_5 + P-poll__networl_1_0_RI_6 + P-poll__networl_1_0_RI_7 + P-poll__networl_7_6_AskP_0 + P-poll__networl_7_6_AskP_1 + P-poll__networl_7_6_AskP_2 + P-poll__networl_7_6_AskP_3 + P-poll__networl_7_6_AskP_4 + P-poll__networl_7_6_AskP_5 + P-poll__networl_7_6_AskP_6 + P-poll__networl_7_6_AskP_7 + P-poll__networl_4_4_AnsP_0 + P-poll__networl_6_5_RI_7 + P-poll__networl_6_5_RI_6 + P-poll__networl_6_5_RI_5 + P-poll__networl_0_6_RP_0 + P-poll__networl_0_6_RP_1 + P-poll__networl_0_6_RP_2 + P-poll__networl_0_6_RP_3 + P-poll__networl_0_6_RP_4 + P-poll__networl_0_6_RP_5 + P-poll__networl_0_6_RP_6 + P-poll__networl_0_6_RP_7 + P-poll__networl_4_7_AnnP_0 + P-poll__networl_4_7_AnnP_1 + P-poll__networl_4_7_AnnP_2 + P-poll__networl_4_7_AnnP_3 + P-poll__networl_4_7_AnnP_4 + P-poll__networl_4_7_AnnP_5 + P-poll__networl_4_7_AnnP_6 + P-poll__networl_4_7_AnnP_7 + P-poll__networl_6_5_RI_4 + P-poll__networl_6_5_RI_3 + P-poll__networl_6_5_RI_2 + P-poll__networl_6_5_RI_1 + P-poll__networl_6_5_RI_0 + P-poll__networl_6_2_AI_7 + P-poll__networl_6_2_AI_6 + P-poll__networl_6_2_AI_5 + P-poll__networl_6_2_AI_4 + P-poll__networl_5_1_AskP_0 + P-poll__networl_5_1_AskP_1 + P-poll__networl_5_1_AskP_2 + P-poll__networl_5_1_AskP_3 + P-poll__networl_5_1_AskP_4 + P-poll__networl_5_1_AskP_5 + P-poll__networl_5_1_AskP_6 + P-poll__networl_5_1_AskP_7 + P-poll__networl_6_2_AI_3 + P-poll__networl_6_2_AI_2 + P-poll__networl_6_2_AI_1 + P-poll__networl_6_2_AI_0 + P-poll__networl_1_3_AskP_7 + P-poll__networl_1_3_AskP_6 + P-poll__networl_1_3_AskP_5 + P-poll__networl_1_3_AskP_4 + P-poll__networl_1_3_AskP_3 + P-poll__networl_2_5_RP_0 + P-poll__networl_2_5_RP_1 + P-poll__networl_2_5_RP_2 + P-poll__networl_2_5_RP_3 + P-poll__networl_2_5_RP_4 + P-poll__networl_2_5_RP_5 + P-poll__networl_2_5_RP_6 + P-poll__networl_2_5_RP_7 + P-poll__networl_1_3_AskP_2 + P-poll__networl_2_2_AnnP_0 + P-poll__networl_2_2_AnnP_1 + P-poll__networl_2_2_AnnP_2 + P-poll__networl_2_2_AnnP_3 + P-poll__networl_2_2_AnnP_4 + P-poll__networl_2_2_AnnP_5 + P-poll__networl_2_2_AnnP_6 + P-poll__networl_2_2_AnnP_7 + P-poll__networl_1_3_AskP_1 + P-poll__networl_1_3_AskP_0 + P-poll__networl_4_4_RP_0 + P-poll__networl_4_4_RP_1 + P-poll__networl_4_4_RP_2 + P-poll__networl_4_4_RP_3 + P-poll__networl_4_4_RP_4 + P-poll__networl_4_4_RP_5 + P-poll__networl_4_4_RP_6 + P-poll__networl_4_4_RP_7 + P-poll__networl_4_5_AskP_0 + P-poll__networl_4_5_AskP_1 + P-poll__networl_4_5_AskP_2 + P-poll__networl_4_5_AskP_3 + P-poll__networl_4_5_AskP_4 + P-poll__networl_4_5_AskP_5 + P-poll__networl_4_5_AskP_6 + P-poll__networl_4_5_AskP_7 + P-poll__networl_6_3_RP_0 + P-poll__networl_6_3_RP_1 + P-poll__networl_6_3_RP_2 + P-poll__networl_6_3_RP_3 + P-poll__networl_6_3_RP_4 + P-poll__networl_6_3_RP_5 + P-poll__networl_6_3_RP_6 + P-poll__networl_6_3_RP_7 + P-poll__networl_1_3_AnsP_0 + P-poll__networl_7_7_AnsP_0 + P-poll__networl_1_5_AI_0 + P-poll__networl_1_5_AI_1 + P-poll__networl_1_5_AI_2 + P-poll__networl_1_5_AI_3 + P-poll__networl_1_5_AI_4 + P-poll__networl_1_5_AI_5 + P-poll__networl_1_5_AI_6 + P-poll__networl_1_5_AI_7 + P-poll__networl_1_6_AnnP_0 + P-poll__networl_1_6_AnnP_1 + P-poll__networl_1_6_AnnP_2 + P-poll__networl_1_6_AnnP_3 + P-poll__networl_1_6_AnnP_4 + P-poll__networl_1_6_AnnP_5 + P-poll__networl_1_6_AnnP_6 + P-poll__networl_1_6_AnnP_7 + P-poll__networl_2_0_AskP_0 + P-poll__networl_2_0_AskP_1 + P-poll__networl_2_0_AskP_2 + P-poll__networl_2_0_AskP_3 + P-poll__networl_2_0_AskP_4 + P-poll__networl_2_0_AskP_5 + P-poll__networl_2_0_AskP_6 + P-poll__networl_2_0_AskP_7 + P-poll__networl_3_4_AI_0 + P-poll__networl_3_4_AI_1 + P-poll__networl_3_4_AI_2 + P-poll__networl_3_4_AI_3 + P-poll__networl_3_4_AI_4 + P-poll__networl_3_4_AI_5 + P-poll__networl_3_4_AI_6 + P-poll__networl_3_4_AI_7 + P-poll__networl_3_7_RI_0 + P-poll__networl_3_7_RI_1 + P-poll__networl_3_7_RI_2 + P-poll__networl_3_7_RI_3 + P-poll__networl_3_7_RI_4 + P-poll__networl_3_7_RI_5 + P-poll__networl_3_7_RI_6 + P-poll__networl_3_7_RI_7 + P-poll__networl_6_1_AnnP_7 + P-poll__networl_6_1_AnnP_6 + P-poll__networl_6_1_AnnP_5 + P-poll__networl_5_3_AI_0 + P-poll__networl_5_3_AI_1 + P-poll__networl_5_3_AI_2 + P-poll__networl_0_7_AnsP_0 + P-poll__networl_5_3_AI_3 + P-poll__networl_6_1_AnnP_4 + P-poll__networl_5_3_AI_4 + P-poll__networl_6_1_AnnP_3 + P-poll__networl_5_3_AI_5 + P-poll__networl_6_1_AnnP_2 + P-poll__networl_5_3_AI_6 + P-poll__networl_6_1_AnnP_1 + P-poll__networl_5_3_AI_7 + P-poll__networl_6_1_AnnP_0 + P-poll__networl_5_6_RI_0 + P-poll__networl_5_6_RI_1 + P-poll__networl_5_6_RI_2 + P-poll__networl_5_6_RI_3 + P-poll__networl_5_6_RI_4 + P-poll__networl_5_6_RI_5 + P-poll__networl_5_6_RI_6 + P-poll__networl_5_6_RI_7 + P-poll__networl_6_2_AnnP_0 + P-poll__networl_6_2_AnnP_1 + P-poll__networl_6_2_AnnP_2 + P-poll__networl_6_2_AnnP_3 + P-poll__networl_6_2_AnnP_4 + P-poll__networl_6_2_AnnP_5 + P-poll__networl_6_2_AnnP_6 + P-poll__networl_6_2_AnnP_7 + P-poll__networl_4_6_RI_7 + P-poll__networl_4_6_RI_6 + P-poll__networl_4_6_RI_5 + P-poll__networl_4_6_RI_4 + P-poll__networl_4_6_RI_3 + P-poll__networl_4_6_RI_2 + P-poll__networl_4_6_RI_1 + P-poll__networl_4_6_RI_0 + P-poll__networl_4_3_AI_7 + P-poll__networl_4_3_AI_6 + P-poll__networl_4_3_AI_5 + P-poll__networl_4_3_AI_4 + P-poll__networl_4_3_AI_3 + P-poll__networl_1_4_AskP_0 + P-poll__networl_1_4_AskP_1 + P-poll__networl_1_4_AskP_2 + P-poll__networl_1_4_AskP_3 + P-poll__networl_1_4_AskP_4 + P-poll__networl_1_4_AskP_5 + P-poll__networl_1_4_AskP_6 + P-poll__networl_1_4_AskP_7 + P-poll__networl_7_2_AI_0 + P-poll__networl_7_2_AI_1 + P-poll__networl_7_2_AI_2 + P-poll__networl_7_2_AI_3 + P-poll__networl_7_2_AI_4 + P-poll__networl_7_2_AI_5 + P-poll__networl_7_2_AI_6 + P-poll__networl_7_2_AI_7 + P-poll__networl_7_5_RI_0 + P-poll__networl_7_5_RI_1 + P-poll__networl_7_5_RI_2 + P-poll__networl_7_5_RI_3 + P-poll__networl_7_5_RI_4 + P-poll__networl_7_5_RI_5 + P-poll__networl_7_5_RI_6 + P-poll__networl_7_5_RI_7 + P-poll__networl_0_2_RI_0 + P-poll__networl_0_2_RI_1 + P-poll__networl_0_2_RI_2 + P-poll__networl_0_2_RI_3 + P-poll__networl_0_2_RI_4 + P-poll__networl_0_2_RI_5 + P-poll__networl_0_2_RI_6 + P-poll__networl_0_2_RI_7 + P-poll__networl_0_6_AnsP_0 + P-poll__networl_4_3_AI_2 + P-poll__networl_4_3_AI_1 + P-poll__networl_4_3_AI_0 + P-poll__networl_5_3_AnsP_0 + P-poll__networl_2_1_RI_0 + P-poll__networl_2_1_RI_1 + P-poll__networl_2_1_RI_2 + P-poll__networl_2_1_RI_3 + P-poll__networl_2_1_RI_4 + P-poll__networl_2_1_RI_5 + P-poll__networl_2_1_RI_6 + P-poll__networl_2_1_RI_7 + P-poll__networl_5_6_AnnP_0 + P-poll__networl_5_6_AnnP_1 + P-poll__networl_5_6_AnnP_2 + P-poll__networl_5_6_AnnP_3 + P-poll__networl_5_6_AnnP_4 + P-poll__networl_5_6_AnnP_5 + P-poll__networl_5_6_AnnP_6 + P-poll__networl_5_6_AnnP_7 + P-poll__networl_6_0_AskP_0 + P-poll__networl_6_0_AskP_1 + P-poll__networl_6_0_AskP_2 + P-poll__networl_6_0_AskP_3 + P-poll__networl_6_0_AskP_4 + P-poll__networl_6_0_AskP_5 + P-poll__networl_6_0_AskP_6 + P-poll__networl_6_0_AskP_7 + P-poll__networl_2_7_RI_7 + P-poll__networl_2_7_RI_6 + P-poll__networl_2_7_RI_5 + P-poll__networl_2_7_RI_4 + P-poll__networl_2_7_RI_3 + P-poll__networl_2_7_RI_2 + P-poll__networl_4_0_RI_0 + P-poll__networl_4_0_RI_1 + P-poll__networl_4_0_RI_2 + P-poll__networl_1_7_RP_0 + P-poll__networl_4_0_RI_3 + P-poll__networl_1_7_RP_1 + P-poll__networl_4_0_RI_4 + P-poll__networl_1_7_RP_2 + P-poll__networl_4_0_RI_5 + P-poll__networl_1_7_RP_3 + P-poll__networl_4_0_RI_6 + P-poll__networl_1_7_RP_4 + P-poll__networl_4_0_RI_7 + P-poll__networl_1_7_RP_5 + P-poll__networl_1_7_RP_6 + P-poll__networl_1_7_RP_7 + P-poll__networl_2_7_RI_1 + P-poll__networl_2_7_RI_0 + P-poll__networl_2_4_AI_7 + P-poll__networl_2_4_AI_6 + P-poll__networl_2_4_AI_5 + P-poll__networl_3_1_AnnP_0 + P-poll__networl_3_1_AnnP_1 + P-poll__networl_3_1_AnnP_2 + P-poll__networl_3_1_AnnP_3 + P-poll__networl_3_1_AnnP_4 + P-poll__networl_3_1_AnnP_5 + P-poll__networl_3_1_AnnP_6 + P-poll__networl_3_1_AnnP_7 + P-poll__networl_2_4_AI_4 + P-poll__networl_2_4_AI_3 + P-poll__networl_4_7_AnsP_0 + P-poll__networl_2_4_AI_2 + P-poll__networl_2_4_AI_1 + P-poll__networl_2_4_AI_0 + P-poll__networl_7_2_RP_7 + P-poll__networl_7_2_RP_6 + P-poll__networl_7_2_RP_5 + P-poll__networl_7_2_RP_4 + P-poll__networl_7_2_RP_3 + P-poll__networl_7_2_RP_2 + P-poll__networl_3_6_RP_0 + P-poll__networl_3_6_RP_1 + P-poll__networl_3_6_RP_2 + P-poll__networl_3_6_RP_3 + P-poll__networl_3_6_RP_4 + P-poll__networl_3_6_RP_5 + P-poll__networl_3_6_RP_6 + P-poll__networl_3_6_RP_7 + P-poll__networl_7_2_RP_1 + P-poll__networl_7_2_RP_0 + P-poll__networl_5_4_AskP_0 + P-poll__networl_5_4_AskP_1 + P-poll__networl_5_4_AskP_2 + P-poll__networl_5_4_AskP_3 + P-poll__networl_5_4_AskP_4 + P-poll__networl_5_4_AskP_5 + P-poll__networl_5_4_AskP_6 + P-poll__networl_5_4_AskP_7 + P-poll__networl_1_5_AnnP_7 + P-poll__networl_1_5_AnnP_6 + P-poll__networl_5_5_RP_0 + P-poll__networl_5_5_RP_1 + P-poll__networl_5_5_RP_2 + P-poll__networl_5_5_RP_3 + P-poll__networl_5_5_RP_4 + P-poll__networl_5_5_RP_5 + P-poll__networl_5_5_RP_6 + P-poll__networl_5_5_RP_7 + P-poll__networl_2_2_AnsP_0 + P-poll__networl_1_5_AnnP_5 + P-poll__networl_1_5_AnnP_4 + P-poll__networl_1_5_AnnP_3 + P-poll__networl_1_5_AnnP_2 + P-poll__networl_1_5_AnnP_1 + P-poll__networl_1_5_AnnP_0 + P-poll__networl_0_7_AI_0 + P-poll__networl_0_7_AI_1 + P-poll__networl_0_7_AI_2 + P-poll__networl_0_7_AI_3 + P-poll__networl_0_7_AI_4 + P-poll__networl_0_7_AI_5 + P-poll__networl_0_7_AI_6 + P-poll__networl_0_7_AI_7 + P-poll__networl_2_5_AnnP_0 + P-poll__networl_2_5_AnnP_1 + P-poll__networl_2_5_AnnP_2 + P-poll__networl_2_5_AnnP_3 + P-poll__networl_2_5_AnnP_4 + P-poll__networl_2_5_AnnP_5 + P-poll__networl_2_5_AnnP_6 + P-poll__networl_2_5_AnnP_7 + P-poll__networl_7_4_RP_0 + P-poll__networl_7_4_RP_1 + P-poll__networl_7_4_RP_2 + P-poll__networl_7_4_RP_3 + P-poll__networl_7_4_RP_4 + P-poll__networl_7_4_RP_5 + P-poll__networl_7_4_RP_6 + P-poll__networl_7_4_RP_7 + P-poll__networl_0_1_RP_0 + P-poll__networl_0_1_RP_1 + P-poll__networl_0_1_RP_2 + P-poll__networl_0_1_RP_3 + P-poll__networl_0_1_RP_4 + P-poll__networl_0_1_RP_5 + P-poll__networl_0_1_RP_6 + P-poll__networl_0_1_RP_7 + P-poll__networl_2_6_AI_0 + P-poll__networl_2_6_AI_1 + P-poll__networl_2_6_AI_2 + P-poll__networl_2_6_AI_3 + P-poll__networl_2_6_AI_4 + P-poll__networl_2_6_AI_5 + P-poll__networl_2_6_AI_6 + P-poll__networl_2_6_AI_7 + P-poll__networl_0_5_AI_7 + P-poll__networl_0_5_AI_6 + P-poll__networl_0_5_AI_5 + P-poll__networl_0_0_AnnP_0 + P-poll__networl_0_0_AnnP_1 + P-poll__networl_0_0_AnnP_2 + P-poll__networl_0_0_AnnP_3 + P-poll__networl_0_0_AnnP_4 + P-poll__networl_0_0_AnnP_5 + P-poll__networl_0_0_AnnP_6 + P-poll__networl_0_0_AnnP_7 + P-poll__networl_2_0_RP_0 + P-poll__networl_2_0_RP_1 + P-poll__networl_2_0_RP_2 + P-poll__networl_2_0_RP_3 + P-poll__networl_2_0_RP_4 + P-poll__networl_2_0_RP_5 + P-poll__networl_2_0_RP_6 + P-poll__networl_2_0_RP_7 + P-poll__networl_0_5_AI_4 + P-poll__networl_1_6_AnsP_0 + P-poll__networl_0_5_AI_3 + P-poll__networl_0_5_AI_2 + P-poll__networl_0_5_AI_1 + P-poll__networl_0_5_AI_0 + P-poll__networl_1_2_AnsP_0 + P-poll__networl_4_5_AI_0 + P-poll__networl_4_5_AI_1 + P-poll__networl_4_5_AI_2 + P-poll__networl_4_5_AI_3 + P-poll__networl_4_5_AI_4 + P-poll__networl_4_5_AI_5 + P-poll__networl_4_5_AI_6 + P-poll__networl_4_5_AI_7 + P-poll__networl_7_1_AnnP_0 + P-poll__networl_7_1_AnnP_1 + P-poll__networl_7_1_AnnP_2 + P-poll__networl_7_1_AnnP_3 + P-poll__networl_7_1_AnnP_4 + P-poll__networl_7_1_AnnP_5 + P-poll__networl_7_1_AnnP_6 + P-poll__networl_7_1_AnnP_7 + P-poll__networl_2_3_AskP_0 + P-poll__networl_2_3_AskP_1 + P-poll__networl_2_3_AskP_2 + P-poll__networl_2_3_AskP_3 + P-poll__networl_2_3_AskP_4 + P-poll__networl_2_3_AskP_5 + P-poll__networl_2_3_AskP_6 + P-poll__networl_2_3_AskP_7 + P-poll__networl_6_4_AI_0 + P-poll__networl_6_4_AI_1 + P-poll__networl_6_4_AI_2 + P-poll__networl_6_4_AI_3 + P-poll__networl_6_4_AI_4 + P-poll__networl_6_4_AI_5 + P-poll__networl_6_4_AI_6 + P-poll__networl_6_4_AI_7 + P-poll__networl_5_3_RP_7 + P-poll__networl_5_3_RP_6 + P-poll__networl_5_3_RP_5 + P-poll__networl_5_3_RP_4 + P-poll__networl_5_3_RP_3 + P-poll__networl_5_3_RP_2 + P-poll__networl_6_7_RI_0 + P-poll__networl_6_7_RI_1 + P-poll__networl_6_7_RI_2 + P-poll__networl_6_7_RI_3 + P-poll__networl_6_7_RI_4 + P-poll__networl_6_7_RI_5 + P-poll__networl_6_7_RI_6 + P-poll__networl_6_7_RI_7 + P-poll__networl_5_3_RP_1 + P-poll__networl_6_2_AnsP_0 + P-poll__networl_5_3_RP_0 + P-poll__networl_1_0_AI_0 + P-poll__networl_1_0_AI_1 + P-poll__networl_1_0_AI_2 + P-poll__networl_1_0_AI_3 + P-poll__networl_1_0_AI_4 + P-poll__networl_1_0_AI_5 + P-poll__networl_1_0_AI_6 + P-poll__networl_1_0_AI_7 + P-poll__networl_1_3_RI_0 + P-poll__networl_1_3_RI_1 + P-poll__networl_1_3_RI_2 + P-poll__networl_1_3_RI_3 + P-poll__networl_1_3_RI_4 + P-poll__networl_1_3_RI_5 + P-poll__networl_1_3_RI_6 + P-poll__networl_1_3_RI_7 + P-poll__networl_6_5_AnnP_0 + P-poll__networl_6_5_AnnP_1 + P-poll__networl_6_5_AnnP_2 + P-poll__networl_6_5_AnnP_3 + P-poll__networl_6_5_AnnP_4 + P-poll__networl_6_5_AnnP_5 + P-poll__networl_6_5_AnnP_6 + P-poll__networl_6_5_AnnP_7 + P-poll__networl_4_4_AskP_7 + P-poll__networl_4_4_AskP_6 + P-poll__networl_4_4_AskP_5 + P-poll__networl_1_7_AskP_0 + P-poll__networl_1_7_AskP_1 + P-poll__networl_1_7_AskP_2 + P-poll__networl_1_7_AskP_3 + P-poll__networl_1_7_AskP_4 + P-poll__networl_1_7_AskP_5 + P-poll__networl_1_7_AskP_6 + P-poll__networl_1_7_AskP_7 + P-poll__networl_3_2_RI_0 + P-poll__networl_3_2_RI_1 + P-poll__networl_3_2_RI_2 + P-poll__networl_3_2_RI_3 + P-poll__networl_3_2_RI_4 + P-poll__networl_3_2_RI_5 + P-poll__networl_3_2_RI_6 + P-poll__networl_3_2_RI_7 + P-poll__networl_4_4_AskP_4 + P-poll__networl_4_4_AskP_3 + P-poll__networl_4_0_AnnP_0 + P-poll__networl_4_0_AnnP_1 + P-poll__networl_4_0_AnnP_2 + P-poll__networl_4_0_AnnP_3 + P-poll__networl_4_0_AnnP_4 + P-poll__networl_4_0_AnnP_5 + P-poll__networl_4_0_AnnP_6 + P-poll__networl_4_0_AnnP_7 + P-poll__networl_4_4_AskP_2 + P-poll__networl_4_4_AskP_1 + P-poll__networl_5_6_AnsP_0 + P-poll__networl_4_4_AskP_0 + P-poll__networl_3_4_RP_7 + P-poll__networl_3_4_RP_6 + P-poll__networl_3_4_RP_5 + P-poll__networl_3_4_RP_4 + P-poll__networl_3_4_RP_3 + P-poll__networl_3_4_RP_2 + P-poll__networl_3_4_RP_1 + P-poll__networl_5_1_RI_0 + P-poll__networl_5_1_RI_1 + P-poll__networl_5_1_RI_2 + P-poll__networl_5_1_RI_3 + P-poll__networl_5_1_RI_4 + P-poll__networl_5_1_RI_5 + P-poll__networl_5_1_RI_6 + P-poll__networl_5_1_RI_7 + P-poll__networl_3_4_RP_0 + P-poll__networl_3_7_AnsP_0 + P-poll__networl_6_3_AskP_0 + P-poll__networl_6_3_AskP_1 + P-poll__networl_6_3_AskP_2 + P-poll__networl_6_3_AskP_3 + P-poll__networl_6_3_AskP_4 + P-poll__networl_6_3_AskP_5 + P-poll__networl_6_3_AskP_6 + P-poll__networl_6_3_AskP_7 + P-poll__networl_3_1_AnsP_0 + P-poll__networl_2_1_AnnP_7 + P-poll__networl_2_1_AnnP_6 + P-poll__networl_7_0_RI_0 + P-poll__networl_7_0_RI_1 + P-poll__networl_7_0_RI_2 + P-poll__networl_4_7_RP_0 + P-poll__networl_7_0_RI_3 + P-poll__networl_4_7_RP_1 + P-poll__networl_7_0_RI_4 + P-poll__networl_4_7_RP_2 + P-poll__networl_7_0_RI_5 + P-poll__networl_4_7_RP_3 + P-poll__networl_7_0_RI_6 + P-poll__networl_4_7_RP_4 + P-poll__networl_7_0_RI_7 + P-poll__networl_4_7_RP_5 + P-poll__networl_4_7_RP_6 + P-poll__networl_4_7_RP_7 + P-poll__networl_2_1_AnnP_5 + P-poll__networl_3_4_AnnP_0 + P-poll__networl_3_4_AnnP_1 + P-poll__networl_3_4_AnnP_2 + P-poll__networl_3_4_AnnP_3 + P-poll__networl_3_4_AnnP_4 + P-poll__networl_3_4_AnnP_5 + P-poll__networl_3_4_AnnP_6 + P-poll__networl_3_4_AnnP_7 + P-poll__networl_2_1_AnnP_4 + P-poll__networl_2_1_AnnP_3 + P-poll__networl_2_1_AnnP_2 + P-poll__networl_6_6_RP_0 + P-poll__networl_6_6_RP_1 + P-poll__networl_6_6_RP_2 + P-poll__networl_6_6_RP_3 + P-poll__networl_6_6_RP_4 + P-poll__networl_6_6_RP_5 + P-poll__networl_6_6_RP_6 + P-poll__networl_6_6_RP_7 + P-poll__networl_2_1_AnnP_1 + P-poll__networl_2_1_AnnP_0 + P-poll__networl_1_5_RP_7 + P-poll__networl_1_5_RP_6 + P-poll__networl_5_7_AskP_0 + P-poll__networl_5_7_AskP_1 + P-poll__networl_5_7_AskP_2 + P-poll__networl_5_7_AskP_3 + P-poll__networl_5_7_AskP_4 + P-poll__networl_5_7_AskP_5 + P-poll__networl_5_7_AskP_6 + P-poll__networl_5_7_AskP_7 + P-poll__networl_1_5_RP_5 + P-poll__networl_1_5_RP_4 + P-poll__networl_1_2_RP_0 + P-poll__networl_1_2_RP_1 + P-poll__networl_1_2_RP_2 + P-poll__networl_1_2_RP_3 + P-poll__networl_1_2_RP_4 + P-poll__networl_1_2_RP_5 + P-poll__networl_1_2_RP_6 + P-poll__networl_1_2_RP_7 + P-poll__networl_2_5_AnsP_0 + P-poll__networl_1_5_RP_3 + P-poll__networl_1_5_RP_2 + P-poll__networl_1_5_RP_1 + P-poll__networl_1_5_RP_0 + P-poll__networl_3_7_AI_0 + P-poll__networl_3_7_AI_1 + P-poll__networl_3_7_AI_2 + P-poll__networl_3_7_AI_3 + P-poll__networl_3_7_AI_4 + P-poll__networl_3_7_AI_5 + P-poll__networl_3_7_AI_6 + P-poll__networl_3_7_AI_7 + P-poll__networl_5_0_AskP_7 + P-poll__networl_5_0_AskP_6 + P-poll__networl_5_0_AskP_5 + P-poll__networl_5_0_AskP_4 + P-poll__networl_5_0_AskP_3 + P-poll__networl_5_0_AskP_2 + P-poll__networl_5_0_AskP_1 + P-poll__networl_3_2_AskP_0 + P-poll__networl_3_2_AskP_1 + P-poll__networl_3_2_AskP_2 + P-poll__networl_3_2_AskP_3 + P-poll__networl_3_2_AskP_4 + P-poll__networl_3_2_AskP_5 + P-poll__networl_3_2_AskP_6 + P-poll__networl_3_2_AskP_7 + P-poll__networl_3_1_RP_0 + P-poll__networl_3_1_RP_1 + P-poll__networl_3_1_RP_2 + P-poll__networl_3_1_RP_3 + P-poll__networl_3_1_RP_4 + P-poll__networl_3_1_RP_5 + P-poll__networl_3_1_RP_6 + P-poll__networl_3_1_RP_7 + P-poll__networl_5_0_AskP_0 + P-poll__networl_5_6_AI_0 + P-poll__networl_5_6_AI_1 + P-poll__networl_5_6_AI_2 + P-poll__networl_5_6_AI_3 + P-poll__networl_5_6_AI_4 + P-poll__networl_5_6_AI_5 + P-poll__networl_5_6_AI_6 + P-poll__networl_5_6_AI_7 + P-poll__networl_0_0_AnsP_0 + P-poll__networl_4_6_AnnP_7 + P-poll__networl_4_6_AnnP_6 + P-poll__networl_4_6_AnnP_5 + P-poll__networl_4_6_AnnP_4 + P-poll__networl_4_6_AnnP_3 + P-poll__networl_4_6_AnnP_2 + P-poll__networl_4_6_AnnP_1 + P-poll__networl_7_1_AnsP_0 + P-poll__networl_4_6_AnnP_0 + P-poll__networl_0_3_AnnP_0 + P-poll__networl_0_3_AnnP_1 + P-poll__networl_0_3_AnnP_2 + P-poll__networl_0_3_AnnP_3 + P-poll__networl_0_3_AnnP_4 + P-poll__networl_0_3_AnnP_5 + P-poll__networl_0_3_AnnP_6 + P-poll__networl_0_3_AnnP_7 + P-poll__networl_5_0_RP_0 + P-poll__networl_5_0_RP_1 + P-poll__networl_5_0_RP_2 + P-poll__networl_5_0_RP_3 + P-poll__networl_5_0_RP_4 + P-poll__networl_5_0_RP_5 + P-poll__networl_5_0_RP_6 + P-poll__networl_5_0_RP_7 + P-poll__networl_4_3_AnsP_0 + P-poll__networl_7_5_AI_0 + P-poll__networl_7_5_AI_1 + P-poll__networl_7_5_AI_2 + P-poll__networl_7_5_AI_3 + P-poll__networl_7_5_AI_4 + P-poll__networl_7_5_AI_5 + P-poll__networl_7_5_AI_6 + P-poll__networl_7_5_AI_7 + P-poll__networl_0_2_AI_0 + P-poll__networl_0_2_AI_1 + P-poll__networl_0_2_AI_2 + P-poll__networl_0_2_AI_3 + P-poll__networl_0_2_AI_4 + P-poll__networl_0_2_AI_5 + P-poll__networl_0_2_AI_6 + P-poll__networl_0_2_AI_7 + P-poll__networl_0_5_RI_0 + P-poll__networl_0_5_RI_1 + P-poll__networl_0_5_RI_2 + P-poll__networl_0_5_RI_3 + P-poll__networl_0_5_RI_4 + P-poll__networl_0_5_RI_5 + P-poll__networl_0_5_RI_6 + P-poll__networl_0_5_RI_7 + P-poll__networl_7_4_AnnP_0 + P-poll__networl_7_4_AnnP_1 + P-poll__networl_7_4_AnnP_2 + P-poll__networl_7_4_AnnP_3 + P-poll__networl_7_4_AnnP_4 + P-poll__networl_7_4_AnnP_5 + P-poll__networl_7_4_AnnP_6 + P-poll__networl_7_4_AnnP_7 + P-poll__networl_2_6_AskP_0 + P-poll__networl_2_6_AskP_1 + P-poll__networl_2_6_AskP_2 + P-poll__networl_2_6_AskP_3 + P-poll__networl_2_6_AskP_4 + P-poll__networl_2_6_AskP_5 + P-poll__networl_2_6_AskP_6 + P-poll__networl_2_6_AskP_7 + P-poll__networl_2_1_AI_0 + P-poll__networl_2_1_AI_1 + P-poll__networl_2_1_AI_2 + P-poll__networl_2_1_AI_3 + P-poll__networl_2_1_AI_4 + P-poll__networl_2_1_AI_5 + P-poll__networl_2_1_AI_6 + P-poll__networl_2_1_AI_7 + P-poll__networl_2_4_RI_0 + P-poll__networl_2_4_RI_1 + P-poll__networl_2_4_RI_2 + P-poll__networl_2_4_RI_3 + P-poll__networl_2_4_RI_4 + P-poll__networl_2_4_RI_5 + P-poll__networl_2_4_RI_6 + P-poll__networl_2_4_RI_7 + P-poll__networl_6_5_AnsP_0 + P-poll__networl_4_0_AI_0 + P-poll__networl_4_0_AI_1 + P-poll__networl_4_0_AI_2 + P-poll__networl_4_0_AI_3 + P-poll__networl_4_0_AI_4 + P-poll__networl_4_0_AI_5 + P-poll__networl_4_0_AI_6 + P-poll__networl_4_0_AI_7 + P-poll__networl_7_5_AskP_7 + P-poll__networl_7_5_AskP_6 + P-poll__networl_7_5_AskP_5 + P-poll__networl_7_5_AskP_4 + P-poll__networl_0_1_AskP_0 + P-poll__networl_0_1_AskP_1 + P-poll__networl_0_1_AskP_2 + P-poll__networl_0_1_AskP_3 + P-poll__networl_0_1_AskP_4 + P-poll__networl_0_1_AskP_5 + P-poll__networl_0_1_AskP_6 + P-poll__networl_0_1_AskP_7 + P-poll__networl_4_3_RI_0 + P-poll__networl_4_3_RI_1 + P-poll__networl_4_3_RI_2 + P-poll__networl_4_3_RI_3 + P-poll__networl_4_3_RI_4 + P-poll__networl_4_3_RI_5 + P-poll__networl_4_3_RI_6 + P-poll__networl_4_3_RI_7 + P-poll__networl_7_2_AskP_0 + P-poll__networl_7_2_AskP_1 + P-poll__networl_7_2_AskP_2 + P-poll__networl_7_2_AskP_3 + P-poll__networl_7_2_AskP_4 + P-poll__networl_7_2_AskP_5 + P-poll__networl_7_2_AskP_6 + P-poll__networl_7_2_AskP_7 + P-poll__networl_7_5_AskP_3 + P-poll__networl_4_0_AnsP_0 + P-poll__networl_7_5_AskP_2 + P-poll__networl_7_5_AskP_1 + P-poll__networl_7_5_AskP_0 + P-poll__networl_6_2_RI_0 + P-poll__networl_6_2_RI_1 + P-poll__networl_6_2_RI_2 + P-poll__networl_6_2_RI_3 + P-poll__networl_6_2_RI_4 + P-poll__networl_6_2_RI_5 + P-poll__networl_6_2_RI_6 + P-poll__networl_6_2_RI_7 + P-poll__networl_0_0_RI_7 + P-poll__networl_0_0_RI_6 + P-poll__networl_0_0_RI_5 + P-poll__networl_0_0_RI_4 + P-poll__networl_0_0_RI_3 + P-poll__networl_0_0_RI_2 + P-poll__networl_0_0_RI_1 + P-poll__networl_4_3_AnnP_0 + P-poll__networl_4_3_AnnP_1 + P-poll__networl_4_3_AnnP_2 + P-poll__networl_4_3_AnnP_3 + P-poll__networl_4_3_AnnP_4 + P-poll__networl_4_3_AnnP_5 + P-poll__networl_4_3_AnnP_6 + P-poll__networl_4_3_AnnP_7 + P-poll__networl_0_0_RI_0 + P-poll__networl_7_3_RI_7 + P-poll__networl_7_3_RI_6 + P-poll__networl_7_3_RI_5 + P-poll__networl_7_3_RI_4 + P-poll__networl_7_3_RI_3 + P-poll__networl_7_3_RI_2 + P-poll__networl_7_3_RI_1 + P-poll__networl_7_3_RI_0 + P-poll__networl_0_4_AskP_7 + P-poll__networl_0_4_AskP_6 + P-poll__networl_0_4_AskP_5 + P-poll__networl_0_4_AskP_4 + P-poll__networl_0_4_AskP_3 + P-poll__networl_0_4_AskP_2 + P-poll__networl_0_4_AskP_1 + P-poll__networl_0_4_AskP_0 + P-poll__networl_7_0_AI_7 + P-poll__networl_7_0_AI_6 + P-poll__networl_7_0_AI_5 + P-poll__networl_7_0_AI_4 + P-poll__networl_7_0_AI_3 + P-poll__networl_7_0_AI_2 + P-poll__networl_7_0_AI_1 + P-poll__networl_7_0_AI_0 + P-poll__networl_6_6_AskP_0 + P-poll__networl_6_6_AskP_1 + P-poll__networl_6_6_AskP_2 + P-poll__networl_6_6_AskP_3 + P-poll__networl_6_6_AskP_4 + P-poll__networl_6_6_AskP_5 + P-poll__networl_6_6_AskP_6 + P-poll__networl_6_6_AskP_7 + P-poll__networl_3_4_AnsP_0 + P-poll__networl_7_7_RP_0 + P-poll__networl_7_7_RP_1 + P-poll__networl_7_7_RP_2 + P-poll__networl_7_7_RP_3 + P-poll__networl_7_7_RP_4 + P-poll__networl_7_7_RP_5 + P-poll__networl_7_7_RP_6 + P-poll__networl_7_7_RP_7 + P-poll__networl_0_4_RP_0 + P-poll__networl_0_4_RP_1 + P-poll__networl_0_4_RP_2 + P-poll__networl_0_4_RP_3 + P-poll__networl_0_4_RP_4 + P-poll__networl_0_4_RP_5 + P-poll__networl_0_4_RP_6 + P-poll__networl_0_4_RP_7 + P-poll__networl_3_7_AnnP_0 + P-poll__networl_3_7_AnnP_1 + P-poll__networl_3_7_AnnP_2 + P-poll__networl_3_7_AnnP_3 + P-poll__networl_3_7_AnnP_4 + P-poll__networl_3_7_AnnP_5 + P-poll__networl_3_7_AnnP_6 + P-poll__networl_3_7_AnnP_7 + P-poll__networl_4_1_AskP_0 + P-poll__networl_4_1_AskP_1 + P-poll__networl_4_1_AskP_2 + P-poll__networl_4_1_AskP_3 + P-poll__networl_4_1_AskP_4 + P-poll__networl_4_1_AskP_5 + P-poll__networl_4_1_AskP_6 + P-poll__networl_4_1_AskP_7 + P-poll__networl_2_3_RP_0 + P-poll__networl_2_3_RP_1 + P-poll__networl_2_3_RP_2 + P-poll__networl_2_3_RP_3 + P-poll__networl_2_3_RP_4 + P-poll__networl_2_3_RP_5 + P-poll__networl_2_3_RP_6 + P-poll__networl_2_3_RP_7 + P-poll__networl_5_2_AnnP_7 + P-poll__networl_5_2_AnnP_6 + P-poll__networl_5_2_AnnP_5 + P-poll__networl_5_2_AnnP_4 + P-poll__networl_5_2_AnnP_3 + P-poll__networl_5_2_AnnP_2 + P-poll__networl_5_2_AnnP_1 + P-poll__networl_1_2_AnnP_0 + P-poll__networl_1_2_AnnP_1 + P-poll__networl_1_2_AnnP_2 + P-poll__networl_1_2_AnnP_3 + P-poll__networl_1_2_AnnP_4 + P-poll__networl_1_2_AnnP_5 + P-poll__networl_1_2_AnnP_6 + P-poll__networl_1_2_AnnP_7 + P-poll__networl_5_2_AnnP_0 + P-poll__networl_5_4_RI_7 + P-poll__networl_4_2_RP_0 + P-poll__networl_4_2_RP_1 + P-poll__networl_4_2_RP_2 + P-poll__networl_4_2_RP_3 + P-poll__networl_4_2_RP_4 + P-poll__networl_4_2_RP_5 + P-poll__networl_4_2_RP_6 + P-poll__networl_4_2_RP_7 + P-poll__networl_5_4_RI_6 + P-poll__networl_6_7_AI_0 + P-poll__networl_6_7_AI_1 + P-poll__networl_6_7_AI_2 + P-poll__networl_6_7_AI_3 + P-poll__networl_6_7_AI_4 + P-poll__networl_6_7_AI_5 + P-poll__networl_6_7_AI_6 + P-poll__networl_6_7_AI_7 + P-poll__networl_5_4_RI_5 + P-poll__networl_5_4_RI_4 + P-poll__networl_5_4_RI_3 + P-poll__networl_5_4_RI_2 + P-poll__networl_5_4_RI_1 + P-poll__networl_5_4_RI_0 + P-poll__networl_5_1_AI_7 + P-poll__networl_5_1_AI_6 + P-poll__networl_5_1_AI_5 + P-poll__networl_3_5_AskP_0 + P-poll__networl_3_5_AskP_1 + P-poll__networl_3_5_AskP_2 + P-poll__networl_3_5_AskP_3 + P-poll__networl_3_5_AskP_4 + P-poll__networl_3_5_AskP_5 + P-poll__networl_3_5_AskP_6 + P-poll__networl_3_5_AskP_7 + P-poll__networl_6_1_RP_0 + P-poll__networl_6_1_RP_1 + P-poll__networl_6_1_RP_2 + P-poll__networl_6_1_RP_3 + P-poll__networl_6_1_RP_4 + P-poll__networl_6_1_RP_5 + P-poll__networl_6_1_RP_6 + P-poll__networl_6_1_RP_7 + P-poll__networl_5_1_AI_4 + P-poll__networl_1_3_AI_0 + P-poll__networl_1_3_AI_1 + P-poll__networl_1_3_AI_2 + P-poll__networl_0_3_AnsP_0 + P-poll__networl_1_3_AI_3 + P-poll__networl_5_1_AI_3 + P-poll__networl_1_3_AI_4 + P-poll__networl_5_1_AI_2 + P-poll__networl_1_3_AI_5 + P-poll__networl_5_1_AI_1 + P-poll__networl_1_3_AI_6 + P-poll__networl_5_1_AI_0 + P-poll__networl_1_3_AI_7 + P-poll__networl_1_6_RI_0 + P-poll__networl_1_6_RI_1 + P-poll__networl_1_6_RI_2 + P-poll__networl_1_6_RI_3 + P-poll__networl_1_6_RI_4 + P-poll__networl_1_6_RI_5 + P-poll__networl_1_6_RI_6 + P-poll__networl_1_6_RI_7 + P-poll__networl_7_4_AnsP_0 + P-poll__networl_0_6_AnnP_0 + P-poll__networl_0_6_AnnP_1 + P-poll__networl_0_6_AnnP_2 + P-poll__networl_0_6_AnnP_3 + P-poll__networl_0_6_AnnP_4 + P-poll__networl_0_6_AnnP_5 + P-poll__networl_0_6_AnnP_6 + P-poll__networl_0_6_AnnP_7 + P-poll__networl_1_0_AskP_0 + P-poll__networl_1_0_AskP_1 + P-poll__networl_1_0_AskP_2 + P-poll__networl_1_0_AskP_3 + P-poll__networl_1_0_AskP_4 + P-poll__networl_1_0_AskP_5 + P-poll__networl_1_0_AskP_6 + P-poll__networl_1_0_AskP_7 + P-poll__networl_3_2_AI_0 + P-poll__networl_3_2_AI_1 + P-poll__networl_3_2_AI_2 + P-poll__networl_3_2_AI_3 + P-poll__networl_3_2_AI_4 + P-poll__networl_3_2_AI_5 + P-poll__networl_3_2_AI_6 + P-poll__networl_3_2_AI_7 + P-poll__networl_3_5_RI_0 + P-poll__networl_3_5_RI_1 + P-poll__networl_3_5_RI_2 + P-poll__networl_3_5_RI_3 + P-poll__networl_3_5_RI_4 + P-poll__networl_3_5_RI_5 + P-poll__networl_3_5_RI_6 + P-poll__networl_3_5_RI_7 + P-poll__networl_7_7_AnnP_0 + P-poll__networl_7_7_AnnP_1 + P-poll__networl_7_7_AnnP_2 + P-poll__networl_7_7_AnnP_3 + P-poll__networl_7_7_AnnP_4 + P-poll__networl_7_7_AnnP_5 + P-poll__networl_7_7_AnnP_6 + P-poll__networl_7_7_AnnP_7)
lola: after: (3 <= P-poll__networl_7_4_AnsP_7 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_1_6_AnsP_4 + P-poll__networl_1_6_AnsP_3 + P-poll__networl_1_6_AnsP_2 + P-poll__networl_1_6_AnsP_1 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_7)
lola: LP says that atomic proposition is always false: (3 <= P-poll__networl_7_4_AnsP_7 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_1_6_AnsP_4 + P-poll__networl_1_6_AnsP_3 + P-poll__networl_1_6_AnsP_2 + P-poll__networl_1_6_AnsP_1 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_7)
lola: place invariant simplifies atomic proposition
lola: before: (P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7 <= P-poll__networl_7_4_AnsP_7 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_1_6_AnsP_4 + P-poll__networl_1_6_AnsP_3 + P-poll__networl_1_6_AnsP_2 + P-poll__networl_1_6_AnsP_1 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_7 + P-poll__networl_0_0_AskP_1 + P-poll__networl_0_0_AskP_2 + P-poll__networl_0_0_AskP_3 + P-poll__networl_0_0_AskP_4 + P-poll__networl_0_0_AskP_5 + P-poll__networl_0_0_AskP_6 + P-poll__networl_0_0_AskP_7 + P-poll__networl_3_3_RI_0 + P-poll__networl_3_3_RI_1 + P-poll__networl_3_3_RI_2 + P-poll__networl_3_3_RI_3 + P-poll__networl_3_3_RI_4 + P-poll__networl_3_3_RI_5 + P-poll__networl_3_3_RI_6 + P-poll__networl_3_3_RI_7 + P-poll__networl_0_0_AskP_0 + P-poll__networl_6_7_AnnP_0 + P-poll__networl_6_7_AnnP_1 + P-poll__networl_6_7_AnnP_2 + P-poll__networl_6_7_AnnP_3 + P-poll__networl_6_7_AnnP_4 + P-poll__networl_6_7_AnnP_5 + P-poll__networl_6_7_AnnP_6 + P-poll__networl_6_7_AnnP_7 + P-poll__networl_3_0_AI_7 + P-poll__networl_7_1_AskP_0 + P-poll__networl_7_1_AskP_1 + P-poll__networl_7_1_AskP_2 + P-poll__networl_7_1_AskP_3 + P-poll__networl_7_1_AskP_4 + P-poll__networl_7_1_AskP_5 + P-poll__networl_7_1_AskP_6 + P-poll__networl_7_1_AskP_7 + P-poll__networl_3_0_AI_6 + P-poll__networl_3_0_AI_5 + P-poll__networl_5_2_RI_0 + P-poll__networl_5_2_RI_1 + P-poll__networl_5_2_RI_2 + P-poll__networl_5_2_RI_3 + P-poll__networl_5_2_RI_4 + P-poll__networl_5_2_RI_5 + P-poll__networl_5_2_RI_6 + P-poll__networl_5_2_RI_7 + P-poll__networl_3_0_AI_4 + P-poll__networl_4_2_AnnP_0 + P-poll__networl_4_2_AnnP_1 + P-poll__networl_4_2_AnnP_2 + P-poll__networl_4_2_AnnP_3 + P-poll__networl_4_2_AnnP_4 + P-poll__networl_4_2_AnnP_5 + P-poll__networl_4_2_AnnP_6 + P-poll__networl_4_2_AnnP_7 + P-poll__networl_3_0_AI_3 + P-poll__networl_3_0_AI_2 + P-poll__networl_3_0_AI_1 + P-poll__networl_3_0_AI_0 + P-poll__networl_7_1_RI_0 + P-poll__networl_7_1_RI_1 + P-poll__networl_7_1_RI_2 + P-poll__networl_7_1_RI_3 + P-poll__networl_7_1_RI_4 + P-poll__networl_7_1_RI_5 + P-poll__networl_7_1_RI_6 + P-poll__networl_7_1_RI_7 + P-poll__networl_6_4_AnsP_0 + P-poll__networl_6_5_AskP_0 + P-poll__networl_6_5_AskP_1 + P-poll__networl_6_5_AskP_2 + P-poll__networl_6_5_AskP_3 + P-poll__networl_6_5_AskP_4 + P-poll__networl_6_5_AskP_5 + P-poll__networl_6_5_AskP_6 + P-poll__networl_6_5_AskP_7 + P-poll__networl_3_3_AnsP_0 + P-poll__networl_1_4_RI_7 + P-poll__networl_1_4_RI_6 + P-poll__networl_1_4_RI_5 + P-poll__networl_1_4_RI_4 + P-poll__networl_1_4_RI_3 + P-poll__networl_1_4_RI_2 + P-poll__networl_1_4_RI_1 + P-poll__networl_1_4_RI_0 + P-poll__networl_1_1_AI_7 + P-poll__networl_1_1_AI_6 + P-poll__networl_1_1_AI_5 + P-poll__networl_1_1_AI_4 + P-poll__networl_1_1_AI_3 + P-poll__networl_6_7_RP_0 + P-poll__networl_6_7_RP_1 + P-poll__networl_6_7_RP_2 + P-poll__networl_6_7_RP_3 + P-poll__networl_6_7_RP_4 + P-poll__networl_6_7_RP_5 + P-poll__networl_6_7_RP_6 + P-poll__networl_6_7_RP_7 + P-poll__networl_1_1_AI_2 + P-poll__networl_1_1_AI_1 + P-poll__networl_1_1_AI_0 + P-poll__networl_3_6_AnnP_0 + P-poll__networl_3_6_AnnP_1 + P-poll__networl_3_6_AnnP_2 + P-poll__networl_3_6_AnnP_3 + P-poll__networl_3_6_AnnP_4 + P-poll__networl_3_6_AnnP_5 + P-poll__networl_3_6_AnnP_6 + P-poll__networl_3_6_AnnP_7 + P-poll__networl_2_5_AskP_7 + P-poll__networl_2_5_AskP_6 + P-poll__networl_2_5_AskP_5 + P-poll__networl_2_5_AskP_4 + P-poll__networl_2_5_AskP_3 + P-poll__networl_2_5_AskP_2 + P-poll__networl_2_5_AskP_1 + P-poll__networl_4_0_AskP_0 + P-poll__networl_4_0_AskP_1 + P-poll__networl_4_0_AskP_2 + P-poll__networl_4_0_AskP_3 + P-poll__networl_4_0_AskP_4 + P-poll__networl_4_0_AskP_5 + P-poll__networl_4_0_AskP_6 + P-poll__networl_4_0_AskP_7 + P-poll__networl_2_5_AskP_0 + P-poll__networl_1_3_RP_0 + P-poll__networl_1_3_RP_1 + P-poll__networl_1_3_RP_2 + P-poll__networl_1_3_RP_3 + P-poll__networl_1_3_RP_4 + P-poll__networl_1_3_RP_5 + P-poll__networl_1_3_RP_6 + P-poll__networl_1_3_RP_7 + P-poll__networl_7_3_AnnP_7 + P-poll__networl_7_3_AnnP_6 + P-poll__networl_1_1_AnnP_0 + P-poll__networl_1_1_AnnP_1 + P-poll__networl_1_1_AnnP_2 + P-poll__networl_1_1_AnnP_3 + P-poll__networl_1_1_AnnP_4 + P-poll__networl_1_1_AnnP_5 + P-poll__networl_1_1_AnnP_6 + P-poll__networl_1_1_AnnP_7 + P-poll__networl_7_3_AnnP_5 + P-poll__networl_7_3_AnnP_4 + P-poll__networl_3_2_RP_0 + P-poll__networl_3_2_RP_1 + P-poll__networl_3_2_RP_2 + P-poll__networl_3_2_RP_3 + P-poll__networl_3_2_RP_4 + P-poll__networl_3_2_RP_5 + P-poll__networl_3_2_RP_6 + P-poll__networl_3_2_RP_7 + P-poll__networl_2_7_AnsP_0 + P-poll__networl_7_3_AnnP_3 + P-poll__networl_7_3_AnnP_2 + P-poll__networl_7_3_AnnP_1 + P-poll__networl_7_3_AnnP_0 + P-poll__networl_6_5_AI_7 + P-poll__networl_6_5_AI_6 + P-poll__networl_6_5_AI_5 + P-poll__networl_6_5_AI_4 + P-poll__networl_5_7_AI_0 + P-poll__networl_5_7_AI_1 + P-poll__networl_5_7_AI_2 + P-poll__networl_5_7_AI_3 + P-poll__networl_5_7_AI_4 + P-poll__networl_5_7_AI_5 + P-poll__networl_5_7_AI_6 + P-poll__networl_5_7_AI_7 + P-poll__networl_6_5_AI_3 + P-poll__networl_6_5_AI_2 + P-poll__networl_6_5_AI_1 + P-poll__networl_6_5_AI_0 + P-poll__networl_3_4_AskP_0 + P-poll__networl_3_4_AskP_1 + P-poll__networl_3_4_AskP_2 + P-poll__networl_3_4_AskP_3 + P-poll__networl_3_4_AskP_4 + P-poll__networl_3_4_AskP_5 + P-poll__networl_3_4_AskP_6 + P-poll__networl_3_4_AskP_7 + P-poll__networl_5_1_RP_0 + P-poll__networl_5_1_RP_1 + P-poll__networl_5_1_RP_2 + P-poll__networl_5_1_RP_3 + P-poll__networl_5_1_RP_4 + P-poll__networl_5_1_RP_5 + P-poll__networl_5_1_RP_6 + P-poll__networl_5_1_RP_7 + P-poll__networl_7_6_AI_0 + P-poll__networl_7_6_AI_1 + P-poll__networl_7_6_AI_2 + P-poll__networl_7_6_AI_3 + P-poll__networl_7_6_AI_4 + P-poll__networl_7_6_AI_5 + P-poll__networl_7_6_AI_6 + P-poll__networl_7_6_AI_7 + P-poll__networl_0_3_AI_0 + P-poll__networl_0_3_AI_1 + P-poll__networl_0_3_AI_2 + P-poll__networl_0_2_AnsP_0 + P-poll__networl_0_3_AI_3 + P-poll__networl_0_3_AI_4 + P-poll__networl_0_3_AI_5 + P-poll__networl_0_3_AI_6 + P-poll__networl_0_3_AI_7 + P-poll__networl_4_0_RP_7 + P-poll__networl_0_6_RI_0 + P-poll__networl_0_6_RI_1 + P-poll__networl_0_6_RI_2 + P-poll__networl_0_6_RI_3 + P-poll__networl_0_6_RI_4 + P-poll__networl_0_6_RI_5 + P-poll__networl_0_6_RI_6 + P-poll__networl_0_6_RI_7 + P-poll__networl_4_0_RP_6 + P-poll__networl_4_0_RP_5 + P-poll__networl_4_0_RP_4 + P-poll__networl_7_3_AnsP_0 + P-poll__networl_4_0_RP_3 + P-poll__networl_4_0_RP_2 + P-poll__networl_4_0_RP_1 + P-poll__networl_4_0_RP_0 + P-poll__networl_0_2_AnnP_7 + P-poll__networl_0_2_AnnP_6 + P-poll__networl_0_2_AnnP_5 + P-poll__networl_0_5_AnnP_0 + P-poll__networl_0_5_AnnP_1 + P-poll__networl_0_5_AnnP_2 + P-poll__networl_0_5_AnnP_3 + P-poll__networl_0_5_AnnP_4 + P-poll__networl_0_5_AnnP_5 + P-poll__networl_0_5_AnnP_6 + P-poll__networl_0_5_AnnP_7 + P-poll__networl_7_0_RP_0 + P-poll__networl_7_0_RP_1 + P-poll__networl_7_0_RP_2 + P-poll__networl_7_0_RP_3 + P-poll__networl_7_0_RP_4 + P-poll__networl_7_0_RP_5 + P-poll__networl_7_0_RP_6 + P-poll__networl_7_0_RP_7 + P-poll__networl_0_2_AnnP_4 + P-poll__networl_0_2_AnnP_3 + P-poll__networl_2_2_AI_0 + P-poll__networl_0_2_AnnP_2 + P-poll__networl_2_2_AI_1 + P-poll__networl_2_2_AI_2 + P-poll__networl_2_2_AI_3 + P-poll__networl_2_2_AI_4 + P-poll__networl_2_2_AI_5 + P-poll__networl_2_2_AI_6 + P-poll__networl_2_2_AI_7 + P-poll__networl_2_5_RI_0 + P-poll__networl_2_5_RI_1 + P-poll__networl_2_5_RI_2 + P-poll__networl_2_5_RI_3 + P-poll__networl_2_5_RI_4 + P-poll__networl_2_5_RI_5 + P-poll__networl_2_5_RI_6 + P-poll__networl_2_5_RI_7 + P-poll__networl_0_2_AnnP_1 + P-poll__networl_0_2_AnnP_0 + P-poll__networl_7_6_AnnP_0 + P-poll__networl_7_6_AnnP_1 + P-poll__networl_7_6_AnnP_2 + P-poll__networl_7_6_AnnP_3 + P-poll__networl_7_6_AnnP_4 + P-poll__networl_7_6_AnnP_5 + P-poll__networl_7_6_AnnP_6 + P-poll__networl_7_6_AnnP_7 + P-poll__networl_7_0_AnsP_0 + P-poll__networl_4_1_AI_0 + P-poll__networl_4_1_AI_1 + P-poll__networl_4_1_AI_2 + P-poll__networl_4_1_AI_3 + P-poll__networl_4_1_AI_4 + P-poll__networl_4_1_AI_5 + P-poll__networl_4_1_AI_6 + P-poll__networl_4_1_AI_7 + P-poll__networl_4_4_RI_0 + P-poll__networl_4_4_RI_1 + P-poll__networl_4_4_RI_2 + P-poll__networl_4_4_RI_3 + P-poll__networl_4_4_RI_4 + P-poll__networl_4_4_RI_5 + P-poll__networl_4_4_RI_6 + P-poll__networl_4_4_RI_7 + P-poll__networl_5_1_AnnP_0 + P-poll__networl_5_1_AnnP_1 + P-poll__networl_5_1_AnnP_2 + P-poll__networl_5_1_AnnP_3 + P-poll__networl_5_1_AnnP_4 + P-poll__networl_5_1_AnnP_5 + P-poll__networl_5_1_AnnP_6 + P-poll__networl_5_1_AnnP_7 + P-poll__networl_6_7_AnsP_0 + P-poll__networl_4_6_AI_7 + P-poll__networl_4_6_AI_6 + P-poll__networl_4_6_AI_5 + P-poll__networl_4_6_AI_4 + P-poll__networl_6_0_AI_0 + P-poll__networl_6_0_AI_1 + P-poll__networl_6_0_AI_2 + P-poll__networl_6_0_AI_3 + P-poll__networl_6_0_AI_4 + P-poll__networl_6_0_AI_5 + P-poll__networl_6_0_AI_6 + P-poll__networl_4_6_AI_3 + P-poll__networl_6_0_AI_7 + P-poll__networl_4_6_AI_2 + P-poll__networl_4_6_AI_1 + P-poll__networl_4_6_AI_0 + P-poll__networl_0_3_AskP_0 + P-poll__networl_0_3_AskP_1 + P-poll__networl_0_3_AskP_2 + P-poll__networl_0_3_AskP_3 + P-poll__networl_0_3_AskP_4 + P-poll__networl_0_3_AskP_5 + P-poll__networl_0_3_AskP_6 + P-poll__networl_0_3_AskP_7 + P-poll__networl_6_3_RI_0 + P-poll__networl_6_3_RI_1 + P-poll__networl_6_3_RI_2 + P-poll__networl_6_3_RI_3 + P-poll__networl_6_3_RI_4 + P-poll__networl_6_3_RI_5 + P-poll__networl_6_3_RI_6 + P-poll__networl_6_3_RI_7 + P-poll__networl_2_1_RP_7 + P-poll__networl_2_1_RP_6 + P-poll__networl_2_1_RP_5 + P-poll__networl_2_1_RP_4 + P-poll__networl_2_1_RP_3 + P-poll__networl_2_1_RP_2 + P-poll__networl_2_1_RP_1 + P-poll__networl_7_4_AskP_0 + P-poll__networl_7_4_AskP_1 + P-poll__networl_7_4_AskP_2 + P-poll__networl_7_4_AskP_3 + P-poll__networl_7_4_AskP_4 + P-poll__networl_7_4_AskP_5 + P-poll__networl_7_4_AskP_6 + P-poll__networl_7_4_AskP_7 + P-poll__networl_2_1_RP_0 + P-poll__networl_4_2_AnsP_0 + P-poll__networl_3_1_AskP_7 + P-poll__networl_3_1_AskP_6 + P-poll__networl_3_1_AskP_5 + P-poll__networl_3_1_AskP_4 + P-poll__networl_3_1_AskP_3 + P-poll__networl_3_1_AskP_2 + P-poll__networl_3_1_AskP_1 + P-poll__networl_3_1_AskP_0 + P-poll__networl_2_7_AnnP_7 + P-poll__networl_4_5_AnnP_0 + P-poll__networl_4_5_AnnP_1 + P-poll__networl_4_5_AnnP_2 + P-poll__networl_4_5_AnnP_3 + P-poll__networl_4_5_AnnP_4 + P-poll__networl_4_5_AnnP_5 + P-poll__networl_4_5_AnnP_6 + P-poll__networl_4_5_AnnP_7 + P-poll__networl_2_7_AnnP_6 + P-poll__networl_2_7_AnnP_5 + P-poll__networl_2_7_AnnP_4 + P-poll__networl_2_7_AnnP_3 + P-poll__networl_2_7_AnnP_2 + P-poll__networl_2_7_AnnP_1 + P-poll__networl_2_7_AnnP_0 + P-poll__networl_0_5_RP_0 + P-poll__networl_0_5_RP_1 + P-poll__networl_0_5_RP_2 + P-poll__networl_0_5_RP_3 + P-poll__networl_0_5_RP_4 + P-poll__networl_0_5_RP_5 + P-poll__networl_0_5_RP_6 + P-poll__networl_0_5_RP_7 + P-poll__networl_2_7_AI_7 + P-poll__networl_2_7_AI_6 + P-poll__networl_2_7_AI_5 + P-poll__networl_2_0_AnnP_0 + P-poll__networl_2_7_AI_4 + P-poll__networl_2_0_AnnP_1 + P-poll__networl_2_7_AI_3 + P-poll__networl_2_0_AnnP_2 + P-poll__networl_2_0_AnnP_3 + P-poll__networl_2_0_AnnP_4 + P-poll__networl_2_0_AnnP_5 + P-poll__networl_2_0_AnnP_6 + P-poll__networl_2_0_AnnP_7 + P-poll__networl_2_7_AI_2 + P-poll__networl_3_6_AnsP_0 + P-poll__networl_2_7_AI_1 + P-poll__networl_2_7_AI_0 + P-poll__networl_2_4_RP_0 + P-poll__networl_2_4_RP_1 + P-poll__networl_2_4_RP_2 + P-poll__networl_2_4_RP_3 + P-poll__networl_2_4_RP_4 + P-poll__networl_2_4_RP_5 + P-poll__networl_2_4_RP_6 + P-poll__networl_2_4_RP_7 + P-poll__networl_2_4_AnsP_0 + P-poll__networl_0_2_RP_7 + P-poll__networl_0_2_RP_6 + P-poll__networl_0_2_RP_5 + P-poll__networl_0_2_RP_4 + P-poll__networl_0_2_RP_3 + P-poll__networl_0_2_RP_2 + P-poll__networl_0_2_RP_1 + P-poll__networl_4_3_AskP_0 + P-poll__networl_4_3_AskP_1 + P-poll__networl_4_3_AskP_2 + P-poll__networl_4_3_AskP_3 + P-poll__networl_4_3_AskP_4 + P-poll__networl_4_3_AskP_5 + P-poll__networl_4_3_AskP_6 + P-poll__networl_4_3_AskP_7 + P-poll__networl_0_2_RP_0 + P-poll__networl_4_3_RP_0 + P-poll__networl_4_3_RP_1 + P-poll__networl_4_3_RP_2 + P-poll__networl_4_3_RP_3 + P-poll__networl_4_3_RP_4 + P-poll__networl_4_3_RP_5 + P-poll__networl_4_3_RP_6 + P-poll__networl_4_3_RP_7 + P-poll__networl_7_5_RP_7 + P-poll__networl_7_5_RP_6 + P-poll__networl_1_1_AnsP_0 + P-poll__networl_7_5_RP_5 + P-poll__networl_7_5_RP_4 + P-poll__networl_7_5_RP_3 + P-poll__networl_7_5_RP_2 + P-poll__networl_7_5_RP_1 + P-poll__networl_7_5_RP_0 + P-poll__networl_1_4_AnnP_0 + P-poll__networl_1_4_AnnP_1 + P-poll__networl_1_4_AnnP_2 + P-poll__networl_1_4_AnnP_3 + P-poll__networl_1_4_AnnP_4 + P-poll__networl_1_4_AnnP_5 + P-poll__networl_1_4_AnnP_6 + P-poll__networl_1_4_AnnP_7 + P-poll__networl_6_2_RP_0 + P-poll__networl_6_2_RP_1 + P-poll__networl_6_2_RP_2 + P-poll__networl_6_2_RP_3 + P-poll__networl_6_2_RP_4 + P-poll__networl_6_2_RP_5 + P-poll__networl_6_2_RP_6 + P-poll__networl_6_2_RP_7 + P-poll__networl_1_4_AI_0 + P-poll__networl_1_4_AI_1 + P-poll__networl_1_4_AI_2 + P-poll__networl_1_4_AI_3 + P-poll__networl_1_4_AI_4 + P-poll__networl_1_4_AI_5 + P-poll__networl_1_4_AI_6 + P-poll__networl_1_4_AI_7 + P-poll__networl_1_7_RI_0 + P-poll__networl_1_7_RI_1 + P-poll__networl_1_7_RI_2 + P-poll__networl_1_7_RI_3 + P-poll__networl_1_7_RI_4 + P-poll__networl_1_7_RI_5 + P-poll__networl_1_7_RI_6 + P-poll__networl_1_7_RI_7 + P-poll__networl_5_6_AskP_7 + P-poll__networl_3_7_AskP_0 + P-poll__networl_3_7_AskP_1 + P-poll__networl_3_7_AskP_2 + P-poll__networl_3_7_AskP_3 + P-poll__networl_3_7_AskP_4 + P-poll__networl_3_7_AskP_5 + P-poll__networl_3_7_AskP_6 + P-poll__networl_3_7_AskP_7 + P-poll__networl_5_6_AskP_6 + P-poll__networl_5_6_AskP_5 + P-poll__networl_5_6_AskP_4 + P-poll__networl_3_3_AI_0 + P-poll__networl_3_3_AI_1 + P-poll__networl_3_3_AI_2 + P-poll__networl_0_5_AnsP_0 + P-poll__networl_3_3_AI_3 + P-poll__networl_5_6_AskP_3 + P-poll__networl_3_3_AI_4 + P-poll__networl_5_6_AskP_2 + P-poll__networl_3_3_AI_5 + P-poll__networl_5_6_AskP_1 + P-poll__networl_3_3_AI_6 + P-poll__networl_5_6_AskP_0 + P-poll__networl_3_3_AI_7 + P-poll__networl_3_6_RI_0 + P-poll__networl_3_6_RI_1 + P-poll__networl_3_6_RI_2 + P-poll__networl_3_6_RI_3 + P-poll__networl_3_6_RI_4 + P-poll__networl_3_6_RI_5 + P-poll__networl_3_6_RI_6 + P-poll__networl_3_6_RI_7 + P-poll__networl_6_0_AnnP_0 + P-poll__networl_6_0_AnnP_1 + P-poll__networl_6_0_AnnP_2 + P-poll__networl_6_0_AnnP_3 + P-poll__networl_6_0_AnnP_4 + P-poll__networl_6_0_AnnP_5 + P-poll__networl_6_0_AnnP_6 + P-poll__networl_6_0_AnnP_7 + P-poll__networl_7_6_AnsP_0 + P-poll__networl_1_2_AskP_0 + P-poll__networl_1_2_AskP_1 + P-poll__networl_1_2_AskP_2 + P-poll__networl_1_2_AskP_3 + P-poll__networl_1_2_AskP_4 + P-poll__networl_1_2_AskP_5 + P-poll__networl_1_2_AskP_6 + P-poll__networl_1_2_AskP_7 + P-poll__networl_5_6_RP_7 + P-poll__networl_5_2_AI_0 + P-poll__networl_5_2_AI_1 + P-poll__networl_5_2_AI_2 + P-poll__networl_5_2_AI_3 + P-poll__networl_5_2_AI_4 + P-poll__networl_5_2_AI_5 + P-poll__networl_5_2_AI_6 + P-poll__networl_5_2_AI_7 + P-poll__networl_5_6_RP_6 + P-poll__networl_5_5_RI_0 + P-poll__networl_5_5_RI_1 + P-poll__networl_5_5_RI_2 + P-poll__networl_5_5_RI_3 + P-poll__networl_5_5_RI_4 + P-poll__networl_5_5_RI_5 + P-poll__networl_5_5_RI_6 + P-poll__networl_5_5_RI_7 + P-poll__networl_5_6_RP_5 + P-poll__networl_5_6_RP_4 + P-poll__networl_5_6_RP_3 + P-poll__networl_5_1_AnsP_0 + P-poll__networl_5_6_RP_2 + P-poll__networl_5_6_RP_1 + P-poll__networl_5_6_RP_0 + P-poll__networl_7_1_AI_0 + P-poll__networl_7_1_AI_1 + P-poll__networl_7_1_AI_2 + P-poll__networl_7_1_AI_3 + P-poll__networl_7_1_AI_4 + P-poll__networl_7_1_AI_5 + P-poll__networl_7_1_AI_6 + P-poll__networl_7_1_AI_7 + P-poll__networl_7_4_RI_0 + P-poll__networl_7_4_RI_1 + P-poll__networl_7_4_RI_2 + P-poll__networl_7_4_RI_3 + P-poll__networl_7_4_RI_4 + P-poll__networl_7_4_RI_5 + P-poll__networl_7_4_RI_6 + P-poll__networl_7_4_RI_7 + P-poll__networl_0_1_RI_0 + P-poll__networl_0_1_RI_1 + P-poll__networl_0_1_RI_2 + P-poll__networl_0_1_RI_3 + P-poll__networl_0_1_RI_4 + P-poll__networl_0_1_RI_5 + P-poll__networl_0_1_RI_6 + P-poll__networl_0_1_RI_7 + P-poll__networl_5_4_AnnP_0 + P-poll__networl_5_4_AnnP_1 + P-poll__networl_5_4_AnnP_2 + P-poll__networl_5_4_AnnP_3 + P-poll__networl_5_4_AnnP_4 + P-poll__networl_5_4_AnnP_5 + P-poll__networl_5_4_AnnP_6 + P-poll__networl_5_4_AnnP_7 + P-poll__networl_0_6_AskP_0 + P-poll__networl_0_6_AskP_1 + P-poll__networl_0_6_AskP_2 + P-poll__networl_0_6_AskP_3 + P-poll__networl_0_6_AskP_4 + P-poll__networl_0_6_AskP_5 + P-poll__networl_0_6_AskP_6 + P-poll__networl_0_6_AskP_7 + P-poll__networl_2_0_RI_0 + P-poll__networl_2_0_RI_1 + P-poll__networl_2_0_RI_2 + P-poll__networl_2_0_RI_3 + P-poll__networl_2_0_RI_4 + P-poll__networl_2_0_RI_5 + P-poll__networl_2_0_RI_6 + P-poll__networl_2_0_RI_7 + P-poll__networl_7_7_AskP_0 + P-poll__networl_7_7_AskP_1 + P-poll__networl_7_7_AskP_2 + P-poll__networl_7_7_AskP_3 + P-poll__networl_7_7_AskP_4 + P-poll__networl_7_7_AskP_5 + P-poll__networl_7_7_AskP_6 + P-poll__networl_7_7_AskP_7 + P-poll__networl_4_5_AnsP_0 + P-poll__networl_3_3_AnnP_7 + P-poll__networl_3_3_AnnP_6 + P-poll__networl_3_3_AnnP_5 + P-poll__networl_3_3_AnnP_4 + P-poll__networl_3_3_AnnP_3 + P-poll__networl_3_3_AnnP_2 + P-poll__networl_3_3_AnnP_1 + P-poll__networl_1_6_RP_0 + P-poll__networl_1_6_RP_1 + P-poll__networl_1_6_RP_2 + P-poll__networl_1_6_RP_3 + P-poll__networl_1_6_RP_4 + P-poll__networl_1_6_RP_5 + P-poll__networl_1_6_RP_6 + P-poll__networl_1_6_RP_7 + P-poll__networl_3_3_AnnP_0 + P-poll__networl_5_2_AskP_0 + P-poll__networl_5_2_AskP_1 + P-poll__networl_5_2_AskP_2 + P-poll__networl_5_2_AskP_3 + P-poll__networl_5_2_AskP_4 + P-poll__networl_5_2_AskP_5 + P-poll__networl_5_2_AskP_6 + P-poll__networl_5_2_AskP_7 + P-poll__networl_3_5_RP_0 + P-poll__networl_3_5_RP_1 + P-poll__networl_3_5_RP_2 + P-poll__networl_3_5_RP_3 + P-poll__networl_3_5_RP_4 + P-poll__networl_3_5_RP_5 + P-poll__networl_3_5_RP_6 + P-poll__networl_3_5_RP_7 + P-poll__networl_2_0_AnsP_0 + P-poll__networl_3_7_RP_7 + P-poll__networl_2_3_AnnP_0 + P-poll__networl_2_3_AnnP_1 + P-poll__networl_2_3_AnnP_2 + P-poll__networl_2_3_AnnP_3 + P-poll__networl_2_3_AnnP_4 + P-poll__networl_2_3_AnnP_5 + P-poll__networl_2_3_AnnP_6 + P-poll__networl_2_3_AnnP_7 + P-poll__networl_3_7_RP_6 + P-poll__networl_3_7_RP_5 + P-poll__networl_6_0_RI_7 + P-poll__networl_3_7_RP_4 + P-poll__networl_6_0_RI_6 + P-poll__networl_3_7_RP_3 + P-poll__networl_6_0_RI_5 + P-poll__networl_3_7_RP_2 + P-poll__networl_6_0_RI_4 + P-poll__networl_3_7_RP_1 + P-poll__networl_6_0_RI_3 + P-poll__networl_5_4_RP_0 + P-poll__networl_5_4_RP_1 + P-poll__networl_5_4_RP_2 + P-poll__networl_5_4_RP_3 + P-poll__networl_5_4_RP_4 + P-poll__networl_5_4_RP_5 + P-poll__networl_5_4_RP_6 + P-poll__networl_5_4_RP_7 + P-poll__networl_3_7_RP_0 + P-poll__networl_6_0_RI_2 + P-poll__networl_6_0_RI_1 + P-poll__networl_0_6_AI_0 + P-poll__networl_0_6_AI_1 + P-poll__networl_0_6_AI_2 + P-poll__networl_0_6_AI_3 + P-poll__networl_0_6_AI_4 + P-poll__networl_0_6_AI_5 + P-poll__networl_0_6_AI_6 + P-poll__networl_0_6_AI_7 + P-poll__networl_6_0_RI_0 + P-poll__networl_3_0_AnsP_0 + P-poll__networl_4_6_AskP_0 + P-poll__networl_4_6_AskP_1 + P-poll__networl_4_6_AskP_2 + P-poll__networl_4_6_AskP_3 + P-poll__networl_4_6_AskP_4 + P-poll__networl_4_6_AskP_5 + P-poll__networl_4_6_AskP_6 + P-poll__networl_4_6_AskP_7 + P-poll__networl_7_3_RP_0 + P-poll__networl_7_3_RP_1 + P-poll__networl_7_3_RP_2 + P-poll__networl_7_3_RP_3 + P-poll__networl_7_3_RP_4 + P-poll__networl_7_3_RP_5 + P-poll__networl_7_3_RP_6 + P-poll__networl_7_3_RP_7 + P-poll__networl_0_0_RP_0 + P-poll__networl_0_0_RP_1 + P-poll__networl_0_0_RP_2 + P-poll__networl_0_0_RP_3 + P-poll__networl_0_0_RP_4 + P-poll__networl_0_0_RP_5 + P-poll__networl_0_0_RP_6 + P-poll__networl_0_0_RP_7 + P-poll__networl_1_4_AnsP_0 + P-poll__networl_6_2_AskP_7 + P-poll__networl_2_5_AI_0 + P-poll__networl_6_2_AskP_6 + P-poll__networl_2_5_AI_1 + P-poll__networl_2_5_AI_2 + P-poll__networl_2_5_AI_3 + P-poll__networl_2_5_AI_4 + P-poll__networl_2_5_AI_5 + P-poll__networl_2_5_AI_6 + P-poll__networl_2_5_AI_7 + P-poll__networl_6_2_AskP_5 + P-poll__networl_1_7_AnnP_0 + P-poll__networl_1_7_AnnP_1 + P-poll__networl_1_7_AnnP_2 + P-poll__networl_1_7_AnnP_3 + P-poll__networl_1_7_AnnP_4 + P-poll__networl_1_7_AnnP_5 + P-poll__networl_1_7_AnnP_6 + P-poll__networl_1_7_AnnP_7 + P-poll__networl_6_2_AskP_4 + P-poll__networl_6_2_AskP_3 + P-poll__networl_6_2_AskP_2 + P-poll__networl_6_2_AskP_1 + P-poll__networl_2_1_AskP_0 + P-poll__networl_2_1_AskP_1 + P-poll__networl_2_1_AskP_2 + P-poll__networl_2_1_AskP_3 + P-poll__networl_2_1_AskP_4 + P-poll__networl_2_1_AskP_5 + P-poll__networl_2_1_AskP_6 + P-poll__networl_2_1_AskP_7 + P-poll__networl_6_2_AskP_0 + P-poll__networl_4_4_AI_0 + P-poll__networl_4_4_AI_1 + P-poll__networl_4_4_AI_2 + P-poll__networl_4_4_AI_3 + P-poll__networl_4_4_AI_4 + P-poll__networl_4_4_AI_5 + P-poll__networl_4_4_AI_6 + P-poll__networl_4_4_AI_7 + P-poll__networl_4_7_RI_0 + P-poll__networl_4_7_RI_1 + P-poll__networl_4_7_RI_2 + P-poll__networl_4_7_RI_3 + P-poll__networl_4_7_RI_4 + P-poll__networl_4_7_RI_5 + P-poll__networl_4_7_RI_6 + P-poll__networl_4_7_RI_7 + P-poll__networl_6_0_AnsP_0 + P-poll__networl_4_1_RI_7 + P-poll__networl_4_1_RI_6 + P-poll__networl_4_1_RI_5 + P-poll__networl_4_1_RI_4 + P-poll__networl_4_1_RI_3 + P-poll__networl_4_1_RI_2 + P-poll__networl_4_1_RI_1 + P-poll__networl_4_1_RI_0 + P-poll__networl_6_3_AI_0 + P-poll__networl_6_3_AI_1 + P-poll__networl_6_3_AI_2 + P-poll__networl_6_3_AI_3 + P-poll__networl_6_3_AI_4 + P-poll__networl_6_3_AI_5 + P-poll__networl_6_3_AI_6 + P-poll__networl_6_3_AI_7 + P-poll__networl_6_6_RI_0 + P-poll__networl_6_6_RI_1 + P-poll__networl_6_6_RI_2 + P-poll__networl_6_6_RI_3 + P-poll__networl_6_6_RI_4 + P-poll__networl_6_6_RI_5 + P-poll__networl_6_6_RI_6 + P-poll__networl_6_6_RI_7 + P-poll__networl_5_5_AnsP_0 + P-poll__networl_6_3_AnnP_0 + P-poll__networl_6_3_AnnP_1 + P-poll__networl_6_3_AnnP_2 + P-poll__networl_6_3_AnnP_3 + P-poll__networl_6_3_AnnP_4 + P-poll__networl_6_3_AnnP_5 + P-poll__networl_6_3_AnnP_6 + P-poll__networl_6_3_AnnP_7 + P-poll__networl_2_2_RI_7 + P-poll__networl_2_2_RI_6 + P-poll__networl_2_2_RI_5 + P-poll__networl_2_2_RI_4 + P-poll__networl_2_2_RI_3 + P-poll__networl_2_2_RI_2 + P-poll__networl_1_5_AskP_0 + P-poll__networl_1_5_AskP_1 + P-poll__networl_1_5_AskP_2 + P-poll__networl_1_5_AskP_3 + P-poll__networl_1_5_AskP_4 + P-poll__networl_1_5_AskP_5 + P-poll__networl_1_5_AskP_6 + P-poll__networl_1_5_AskP_7 + P-poll__networl_2_2_RI_1 + P-poll__networl_2_2_RI_0 + P-poll__networl_1_6_AskP_7 + P-poll__networl_1_6_AskP_6 + P-poll__networl_1_6_AskP_5 + P-poll__networl_1_6_AskP_4 + P-poll__networl_1_6_AskP_3 + P-poll__networl_1_6_AskP_2 + P-poll__networl_1_2_RI_0 + P-poll__networl_1_2_RI_1 + P-poll__networl_1_2_RI_2 + P-poll__networl_1_2_RI_3 + P-poll__networl_1_2_RI_4 + P-poll__networl_1_2_RI_5 + P-poll__networl_1_2_RI_6 + P-poll__networl_1_2_RI_7 + P-poll__networl_1_6_AskP_1 + P-poll__networl_1_6_AskP_0 + P-poll__networl_5_4_AnsP_0 + P-poll__networl_3_1_RI_0 + P-poll__networl_3_1_RI_1 + P-poll__networl_3_1_RI_2 + P-poll__networl_3_1_RI_3 + P-poll__networl_3_1_RI_4 + P-poll__networl_3_1_RI_5 + P-poll__networl_3_1_RI_6 + P-poll__networl_3_1_RI_7 + P-poll__networl_5_7_AnnP_0 + P-poll__networl_5_7_AnnP_1 + P-poll__networl_5_7_AnnP_2 + P-poll__networl_5_7_AnnP_3 + P-poll__networl_5_7_AnnP_4 + P-poll__networl_5_7_AnnP_5 + P-poll__networl_5_7_AnnP_6 + P-poll__networl_5_7_AnnP_7 + P-poll__networl_6_1_AskP_0 + P-poll__networl_6_1_AskP_1 + P-poll__networl_6_1_AskP_2 + P-poll__networl_6_1_AskP_3 + P-poll__networl_6_1_AskP_4 + P-poll__networl_6_1_AskP_5 + P-poll__networl_6_1_AskP_6 + P-poll__networl_6_1_AskP_7 + P-poll__networl_6_4_AnnP_7 + P-poll__networl_5_0_RI_0 + P-poll__networl_5_0_RI_1 + P-poll__networl_5_0_RI_2 + P-poll__networl_2_7_RP_0 + P-poll__networl_5_0_RI_3 + P-poll__networl_2_7_RP_1 + P-poll__networl_5_0_RI_4 + P-poll__networl_2_7_RP_2 + P-poll__networl_5_0_RI_5 + P-poll__networl_2_7_RP_3 + P-poll__networl_5_0_RI_6 + P-poll__networl_2_7_RP_4 + P-poll__networl_5_0_RI_7 + P-poll__networl_2_7_RP_5 + P-poll__networl_2_7_RP_6 + P-poll__networl_2_7_RP_7 + P-poll__networl_6_4_AnnP_6 + P-poll__networl_3_2_AnnP_0 + P-poll__networl_3_2_AnnP_1 + P-poll__networl_3_2_AnnP_2 + P-poll__networl_3_2_AnnP_3 + P-poll__networl_3_2_AnnP_4 + P-poll__networl_3_2_AnnP_5 + P-poll__networl_3_2_AnnP_6 + P-poll__networl_3_2_AnnP_7 + P-poll__networl_6_4_AnnP_5 + P-poll__networl_6_4_AnnP_4 + P-poll__networl_6_4_AnnP_3 + P-poll__networl_4_6_RP_0 + P-poll__networl_4_6_RP_1 + P-poll__networl_4_6_RP_2 + P-poll__networl_4_6_RP_3 + P-poll__networl_4_6_RP_4 + P-poll__networl_4_6_RP_5 + P-poll__networl_4_6_RP_6 + P-poll__networl_4_6_RP_7 + P-poll__networl_6_4_AnnP_2 + P-poll__networl_6_4_AnnP_1 + P-poll__networl_6_4_AnnP_0 + P-poll__networl_0_3_RI_7 + P-poll__networl_0_3_RI_6 + P-poll__networl_0_3_RI_5 + P-poll__networl_0_3_RI_4 + P-poll__networl_0_3_RI_3 + P-poll__networl_0_3_RI_2 + P-poll__networl_0_3_RI_1 + P-poll__networl_5_5_AskP_0 + P-poll__networl_5_5_AskP_1 + P-poll__networl_5_5_AskP_2 + P-poll__networl_5_5_AskP_3 + P-poll__networl_5_5_AskP_4 + P-poll__networl_5_5_AskP_5 + P-poll__networl_5_5_AskP_6 + P-poll__networl_5_5_AskP_7 + P-poll__networl_0_3_RI_0 + P-poll__networl_7_6_RI_7 + P-poll__networl_6_5_RP_0 + P-poll__networl_6_5_RP_1 + P-poll__networl_6_5_RP_2 + P-poll__networl_6_5_RP_3 + P-poll__networl_6_5_RP_4 + P-poll__networl_6_5_RP_5 + P-poll__networl_6_5_RP_6 + P-poll__networl_6_5_RP_7 + P-poll__networl_2_3_AnsP_0 + P-poll__networl_7_6_RI_6 + P-poll__networl_7_6_RI_5 + P-poll__networl_7_6_RI_4 + P-poll__networl_7_6_RI_3 + P-poll__networl_7_6_RI_2 + P-poll__networl_7_6_RI_1 + P-poll__networl_7_6_RI_0 + P-poll__networl_0_0_AI_7 + P-poll__networl_1_7_AI_0 + P-poll__networl_1_7_AI_1 + P-poll__networl_1_7_AI_2 + P-poll__networl_1_7_AI_3 + P-poll__networl_1_7_AI_4 + P-poll__networl_1_7_AI_5 + P-poll__networl_1_7_AI_6 + P-poll__networl_1_7_AI_7 + P-poll__networl_0_0_AI_6 + P-poll__networl_0_0_AI_5 + P-poll__networl_2_6_AnnP_0 + P-poll__networl_2_6_AnnP_1 + P-poll__networl_2_6_AnnP_2 + P-poll__networl_2_6_AnnP_3 + P-poll__networl_2_6_AnnP_4 + P-poll__networl_2_6_AnnP_5 + P-poll__networl_2_6_AnnP_6 + P-poll__networl_2_6_AnnP_7 + P-poll__networl_0_0_AI_4 + P-poll__networl_3_0_AskP_0 + P-poll__networl_3_0_AskP_1 + P-poll__networl_3_0_AskP_2 + P-poll__networl_3_0_AskP_3 + P-poll__networl_3_0_AskP_4 + P-poll__networl_3_0_AskP_5 + P-poll__networl_3_0_AskP_6 + P-poll__networl_3_0_AskP_7 + P-poll__networl_1_1_RP_0 + P-poll__networl_1_1_RP_1 + P-poll__networl_1_1_RP_2 + P-poll__networl_1_1_RP_3 + P-poll__networl_1_1_RP_4 + P-poll__networl_1_1_RP_5 + P-poll__networl_1_1_RP_6 + P-poll__networl_1_1_RP_7 + P-poll__networl_0_0_AI_3 + P-poll__networl_3_6_AI_0 + P-poll__networl_3_6_AI_1 + P-poll__networl_3_6_AI_2 + P-poll__networl_3_6_AI_3 + P-poll__networl_3_6_AI_4 + P-poll__networl_3_6_AI_5 + P-poll__networl_3_6_AI_6 + P-poll__networl_3_6_AI_7 + P-poll__networl_0_0_AI_2 + P-poll__networl_0_0_AI_1 + P-poll__networl_0_0_AI_0 + P-poll__networl_0_1_AnnP_0 + P-poll__networl_0_1_AnnP_1 + P-poll__networl_0_1_AnnP_2 + P-poll__networl_0_1_AnnP_3 + P-poll__networl_0_1_AnnP_4 + P-poll__networl_0_1_AnnP_5 + P-poll__networl_0_1_AnnP_6 + P-poll__networl_0_1_AnnP_7 + P-poll__networl_3_0_RP_0 + P-poll__networl_3_0_RP_1 + P-poll__networl_3_0_RP_2 + P-poll__networl_3_0_RP_3 + P-poll__networl_3_0_RP_4 + P-poll__networl_3_0_RP_5 + P-poll__networl_3_0_RP_6 + P-poll__networl_3_0_RP_7 + P-poll__networl_7_3_AI_7 + P-poll__networl_1_7_AnsP_0 + P-poll__networl_7_3_AI_6 + P-poll__networl_7_3_AI_5 + P-poll__networl_7_3_AI_4 + P-poll__networl_7_3_AI_3 + P-poll__networl_7_3_AI_2 + P-poll__networl_7_3_AI_1 + P-poll__networl_7_3_AI_0 + P-poll__networl_5_5_AI_0 + P-poll__networl_5_5_AI_1 + P-poll__networl_5_5_AI_2 + P-poll__networl_5_5_AI_3 + P-poll__networl_5_5_AI_4 + P-poll__networl_5_5_AI_5 + P-poll__networl_5_5_AI_6 + P-poll__networl_5_5_AI_7 + P-poll__networl_7_2_AnnP_0 + P-poll__networl_7_2_AnnP_1 + P-poll__networl_7_2_AnnP_2 + P-poll__networl_7_2_AnnP_3 + P-poll__networl_7_2_AnnP_4 + P-poll__networl_7_2_AnnP_5 + P-poll__networl_7_2_AnnP_6 + P-poll__networl_7_2_AnnP_7 + P-poll__networl_6_1_AnsP_0 + P-poll__networl_2_4_AskP_0 + P-poll__networl_2_4_AskP_1 + P-poll__networl_2_4_AskP_2 + P-poll__networl_2_4_AskP_3 + P-poll__networl_2_4_AskP_4 + P-poll__networl_2_4_AskP_5 + P-poll__networl_2_4_AskP_6 + P-poll__networl_2_4_AskP_7 + P-poll__networl_7_4_AI_0 + P-poll__networl_7_4_AI_1 + P-poll__networl_7_4_AI_2 + P-poll__networl_7_4_AI_3 + P-poll__networl_7_4_AI_4 + P-poll__networl_7_4_AI_5 + P-poll__networl_7_4_AI_6 + P-poll__networl_7_4_AI_7 + P-poll__networl_0_1_AI_0 + P-poll__networl_0_1_AI_1 + P-poll__networl_0_1_AI_2 + P-poll__networl_0_1_AI_3 + P-poll__networl_0_1_AI_4 + P-poll__networl_0_1_AI_5 + P-poll__networl_0_1_AI_6 + P-poll__networl_0_1_AI_7 + P-poll__networl_7_7_RI_0 + P-poll__networl_7_7_RI_1 + P-poll__networl_7_7_RI_2 + P-poll__networl_7_7_RI_3 + P-poll__networl_7_7_RI_4 + P-poll__networl_7_7_RI_5 + P-poll__networl_7_7_RI_6 + P-poll__networl_7_7_RI_7 + P-poll__networl_0_4_RI_0 + P-poll__networl_0_4_RI_1 + P-poll__networl_0_4_RI_2 + P-poll__networl_0_4_RI_3 + P-poll__networl_0_4_RI_4 + P-poll__networl_0_4_RI_5 + P-poll__networl_0_4_RI_6 + P-poll__networl_0_4_RI_7 + P-poll__networl_6_3_AnsP_0 + P-poll__networl_5_7_RI_7 + P-poll__networl_5_7_RI_6 + P-poll__networl_5_7_RI_5 + P-poll__networl_5_7_RI_4 + P-poll__networl_5_7_RI_3 + P-poll__networl_5_7_RI_2 + P-poll__networl_5_7_RI_1 + P-poll__networl_2_0_AI_0 + P-poll__networl_2_0_AI_1 + P-poll__networl_2_0_AI_2 + P-poll__networl_2_0_AI_3 + P-poll__networl_2_0_AI_4 + P-poll__networl_2_0_AI_5 + P-poll__networl_2_0_AI_6 + P-poll__networl_2_0_AI_7 + P-poll__networl_2_3_RI_0 + P-poll__networl_2_3_RI_1 + P-poll__networl_2_3_RI_2 + P-poll__networl_2_3_RI_3 + P-poll__networl_2_3_RI_4 + P-poll__networl_2_3_RI_5 + P-poll__networl_2_3_RI_6 + P-poll__networl_2_3_RI_7 + P-poll__networl_5_7_RI_0 + P-poll__networl_5_4_AI_7 + P-poll__networl_6_6_AnnP_0 + P-poll__networl_6_6_AnnP_1 + P-poll__networl_6_6_AnnP_2 + P-poll__networl_6_6_AnnP_3 + P-poll__networl_6_6_AnnP_4 + P-poll__networl_6_6_AnnP_5 + P-poll__networl_6_6_AnnP_6 + P-poll__networl_6_6_AnnP_7 + P-poll__networl_5_4_AI_6 + P-poll__networl_7_0_AskP_0 + P-poll__networl_7_0_AskP_1 + P-poll__networl_7_0_AskP_2 + P-poll__networl_7_0_AskP_3 + P-poll__networl_7_0_AskP_4 + P-poll__networl_7_0_AskP_5 + P-poll__networl_7_0_AskP_6 + P-poll__networl_7_0_AskP_7 + P-poll__networl_5_4_AI_5 + P-poll__networl_5_4_AI_4 + P-poll__networl_5_4_AI_3 + P-poll__networl_5_4_AI_2 + P-poll__networl_5_4_AI_1 + P-poll__networl_5_4_AI_0 + P-poll__networl_4_2_RI_0 + P-poll__networl_4_2_RI_1 + P-poll__networl_4_2_RI_2 + P-poll__networl_4_2_RI_3 + P-poll__networl_4_2_RI_4 + P-poll__networl_4_2_RI_5 + P-poll__networl_4_2_RI_6 + P-poll__networl_4_2_RI_7 + P-poll__networl_4_1_AnnP_0 + P-poll__networl_4_1_AnnP_1 + P-poll__networl_4_1_AnnP_2 + P-poll__networl_4_1_AnnP_3 + P-poll__networl_4_1_AnnP_4 + P-poll__networl_4_1_AnnP_5 + P-poll__networl_4_1_AnnP_6 + P-poll__networl_4_1_AnnP_7 + P-poll__networl_2_2_AskP_7 + P-poll__networl_5_7_AnsP_0 + P-poll__networl_2_2_AskP_6 + P-poll__networl_2_2_AskP_5 + P-poll__networl_2_2_AskP_4 + P-poll__networl_2_2_AskP_3 + P-poll__networl_2_2_AskP_2 + P-poll__networl_2_2_AskP_1 + P-poll__networl_2_2_AskP_0 + P-poll__networl_6_1_RI_0 + P-poll__networl_6_1_RI_1 + P-poll__networl_6_1_RI_2 + P-poll__networl_6_1_RI_3 + P-poll__networl_6_1_RI_4 + P-poll__networl_6_1_RI_5 + P-poll__networl_6_1_RI_6 + P-poll__networl_6_1_RI_7 + P-poll__networl_7_0_AnnP_7 + P-poll__networl_7_0_AnnP_6 + P-poll__networl_7_0_AnnP_5 + P-poll__networl_6_4_AskP_0 + P-poll__networl_6_4_AskP_1 + P-poll__networl_6_4_AskP_2 + P-poll__networl_6_4_AskP_3 + P-poll__networl_6_4_AskP_4 + P-poll__networl_6_4_AskP_5 + P-poll__networl_6_4_AskP_6 + P-poll__networl_6_4_AskP_7 + P-poll__networl_7_0_AnnP_4 + P-poll__networl_7_0_AnnP_3 + P-poll__networl_3_2_AnsP_0 + P-poll__networl_7_0_AnnP_2 + P-poll__networl_7_0_AnnP_1 + P-poll__networl_7_0_AnnP_0 + P-poll__networl_3_5_AI_7 + P-poll__networl_3_5_AI_6 + P-poll__networl_3_5_AI_5 + P-poll__networl_3_5_AI_4 + P-poll__networl_3_5_AI_3 + P-poll__networl_5_7_RP_0 + P-poll__networl_5_7_RP_1 + P-poll__networl_5_7_RP_2 + P-poll__networl_5_7_RP_3 + P-poll__networl_5_7_RP_4 + P-poll__networl_5_7_RP_5 + P-poll__networl_5_7_RP_6 + P-poll__networl_5_7_RP_7 + P-poll__networl_3_5_AI_2 + P-poll__networl_3_5_AI_1 + P-poll__networl_3_5_AI_0 + P-poll__networl_1_5_AnsP_0 + P-poll__networl_3_5_AnnP_0 + P-poll__networl_3_5_AnnP_1 + P-poll__networl_3_5_AnnP_2 + P-poll__networl_3_5_AnnP_3 + P-poll__networl_3_5_AnnP_4 + P-poll__networl_3_5_AnnP_5 + P-poll__networl_3_5_AnnP_6 + P-poll__networl_3_5_AnnP_7 + P-poll__networl_7_6_RP_0 + P-poll__networl_7_6_RP_1 + P-poll__networl_7_6_RP_2 + P-poll__networl_7_6_RP_3 + P-poll__networl_7_6_RP_4 + P-poll__networl_7_6_RP_5 + P-poll__networl_7_6_RP_6 + P-poll__networl_7_6_RP_7 + P-poll__networl_0_3_RP_0 + P-poll__networl_0_3_RP_1 + P-poll__networl_0_3_RP_2 + P-poll__networl_0_3_RP_3 + P-poll__networl_0_3_RP_4 + P-poll__networl_0_3_RP_5 + P-poll__networl_0_3_RP_6 + P-poll__networl_0_3_RP_7 + P-poll__networl_1_0_RP_7 + P-poll__networl_1_0_RP_6 + P-poll__networl_1_0_RP_5 + P-poll__networl_1_0_RP_4 + P-poll__networl_1_0_RP_3 + P-poll__networl_1_0_RP_2 + P-poll__networl_1_0_RP_1 + P-poll__networl_1_0_RP_0 + P-poll__networl_1_0_AnnP_0 + P-poll__networl_1_0_AnnP_1 + P-poll__networl_1_0_AnnP_2 + P-poll__networl_1_0_AnnP_3 + P-poll__networl_1_0_AnnP_4 + P-poll__networl_1_0_AnnP_5 + P-poll__networl_1_0_AnnP_6 + P-poll__networl_1_0_AnnP_7 + P-poll__networl_4_7_AskP_7 + P-poll__networl_4_7_AskP_6 + P-poll__networl_4_7_AskP_5 + P-poll__networl_4_7_AskP_4 + P-poll__networl_2_2_RP_0 + P-poll__networl_2_2_RP_1 + P-poll__networl_2_2_RP_2 + P-poll__networl_2_2_RP_3 + P-poll__networl_2_2_RP_4 + P-poll__networl_2_2_RP_5 + P-poll__networl_2_2_RP_6 + P-poll__networl_2_2_RP_7 + P-poll__networl_2_6_AnsP_0 + P-poll__networl_4_7_AskP_3 + P-poll__networl_4_7_AskP_2 + P-poll__networl_4_7_AskP_1 + P-poll__networl_4_7_AskP_0 + P-poll__networl_4_7_AI_0 + P-poll__networl_4_7_AI_1 + P-poll__networl_4_7_AI_2 + P-poll__networl_4_7_AI_3 + P-poll__networl_4_7_AI_4 + P-poll__networl_4_7_AI_5 + P-poll__networl_4_7_AI_6 + P-poll__networl_4_7_AI_7 + P-poll__networl_1_6_AI_7 + P-poll__networl_1_6_AI_6 + P-poll__networl_1_6_AI_5 + P-poll__networl_1_6_AI_4 + P-poll__networl_1_6_AI_3 + P-poll__networl_1_6_AI_2 + P-poll__networl_1_6_AI_1 + P-poll__networl_3_3_AskP_0 + P-poll__networl_3_3_AskP_1 + P-poll__networl_3_3_AskP_2 + P-poll__networl_3_3_AskP_3 + P-poll__networl_3_3_AskP_4 + P-poll__networl_3_3_AskP_5 + P-poll__networl_3_3_AskP_6 + P-poll__networl_3_3_AskP_7 + P-poll__networl_4_1_RP_0 + P-poll__networl_4_1_RP_1 + P-poll__networl_4_1_RP_2 + P-poll__networl_4_1_RP_3 + P-poll__networl_4_1_RP_4 + P-poll__networl_4_1_RP_5 + P-poll__networl_4_1_RP_6 + P-poll__networl_4_1_RP_7 + P-poll__networl_1_6_AI_0 + P-poll__networl_6_6_AI_0 + P-poll__networl_6_6_AI_1 + P-poll__networl_6_6_AI_2 + P-poll__networl_6_6_AI_3 + P-poll__networl_6_6_AI_4 + P-poll__networl_6_6_AI_5 + P-poll__networl_6_6_AI_6 + P-poll__networl_6_6_AI_7 + P-poll__networl_0_1_AnsP_0 + P-poll__networl_6_4_RP_7 + P-poll__networl_6_4_RP_6 + P-poll__networl_6_4_RP_5 + P-poll__networl_7_2_AnsP_0 + P-poll__networl_6_4_RP_4 + P-poll__networl_6_4_RP_3 + P-poll__networl_6_4_RP_2 + P-poll__networl_6_4_RP_1 + P-poll__networl_6_4_RP_0 + P-poll__networl_0_4_AnnP_0 + P-poll__networl_0_4_AnnP_1 + P-poll__networl_0_4_AnnP_2 + P-poll__networl_0_4_AnnP_3 + P-poll__networl_0_4_AnnP_4 + P-poll__networl_0_4_AnnP_5 + P-poll__networl_0_4_AnnP_6 + P-poll__networl_0_4_AnnP_7 + P-poll__networl_6_0_RP_0 + P-poll__networl_6_0_RP_1 + P-poll__networl_6_0_RP_2 + P-poll__networl_6_0_RP_3 + P-poll__networl_6_0_RP_4 + P-poll__networl_6_0_RP_5 + P-poll__networl_6_0_RP_6 + P-poll__networl_6_0_RP_7 + P-poll__networl_1_2_AI_0 + P-poll__networl_1_2_AI_1 + P-poll__networl_1_2_AI_2 + P-poll__networl_1_2_AI_3 + P-poll__networl_1_2_AI_4 + P-poll__networl_1_2_AI_5 + P-poll__networl_1_2_AI_6 + P-poll__networl_1_2_AI_7 + P-poll__networl_1_5_RI_0 + P-poll__networl_1_5_RI_1 + P-poll__networl_1_5_RI_2 + P-poll__networl_1_5_RI_3 + P-poll__networl_1_5_RI_4 + P-poll__networl_1_5_RI_5 + P-poll__networl_1_5_RI_6 + P-poll__networl_1_5_RI_7 + P-poll__networl_7_5_AnnP_0 + P-poll__networl_7_5_AnnP_1 + P-poll__networl_7_5_AnnP_2 + P-poll__networl_7_5_AnnP_3 + P-poll__networl_7_5_AnnP_4 + P-poll__networl_7_5_AnnP_5 + P-poll__networl_7_5_AnnP_6 + P-poll__networl_7_5_AnnP_7 + P-poll__networl_2_7_AskP_0 + P-poll__networl_2_7_AskP_1 + P-poll__networl_2_7_AskP_2 + P-poll__networl_2_7_AskP_3 + P-poll__networl_2_7_AskP_4 + P-poll__networl_2_7_AskP_5 + P-poll__networl_2_7_AskP_6 + P-poll__networl_2_7_AskP_7 + P-poll__networl_2_4_AnnP_7 + P-poll__networl_2_4_AnnP_6 + P-poll__networl_2_4_AnnP_5 + P-poll__networl_3_1_AI_0 + P-poll__networl_3_1_AI_1 + P-poll__networl_3_1_AI_2 + P-poll__networl_3_1_AI_3 + P-poll__networl_3_1_AI_4 + P-poll__networl_3_1_AI_5 + P-poll__networl_3_1_AI_6 + P-poll__networl_3_1_AI_7 + P-poll__networl_3_4_RI_0 + P-poll__networl_3_4_RI_1 + P-poll__networl_3_4_RI_2 + P-poll__networl_3_4_RI_3 + P-poll__networl_3_4_RI_4 + P-poll__networl_3_4_RI_5 + P-poll__networl_3_4_RI_6 + P-poll__networl_3_4_RI_7 + P-poll__networl_2_4_AnnP_4 + P-poll__networl_5_0_AnnP_0 + P-poll__networl_5_0_AnnP_1 + P-poll__networl_5_0_AnnP_2 + P-poll__networl_5_0_AnnP_3 + P-poll__networl_5_0_AnnP_4 + P-poll__networl_5_0_AnnP_5 + P-poll__networl_5_0_AnnP_6 + P-poll__networl_5_0_AnnP_7 + P-poll__networl_2_4_AnnP_3 + P-poll__networl_6_6_AnsP_0 + P-poll__networl_2_4_AnnP_2 + P-poll__networl_2_4_AnnP_1 + P-poll__networl_2_4_AnnP_0 + P-poll__networl_5_0_AI_0 + P-poll__networl_5_0_AI_1 + P-poll__networl_5_0_AI_2 + P-poll__networl_5_0_AI_3 + P-poll__networl_5_0_AI_4 + P-poll__networl_5_0_AI_5 + P-poll__networl_5_0_AI_6 + P-poll__networl_5_0_AI_7 + P-poll__networl_2_1_AnsP_0 + P-poll__networl_4_5_RP_7 + P-poll__networl_4_5_RP_6 + P-poll__networl_4_5_RP_5 + P-poll__networl_4_5_RP_4 + P-poll__networl_4_5_RP_3 + P-poll__networl_4_5_RP_2 + P-poll__networl_0_2_AskP_0 + P-poll__networl_0_2_AskP_1 + P-poll__networl_0_2_AskP_2 + P-poll__networl_0_2_AskP_3 + P-poll__networl_0_2_AskP_4 + P-poll__networl_0_2_AskP_5 + P-poll__networl_0_2_AskP_6 + P-poll__networl_0_2_AskP_7 + P-poll__networl_5_3_RI_0 + P-poll__networl_5_3_RI_1 + P-poll__networl_5_3_RI_2 + P-poll__networl_5_3_RI_3 + P-poll__networl_5_3_RI_4 + P-poll__networl_5_3_RI_5 + P-poll__networl_5_3_RI_6 + P-poll__networl_5_3_RI_7 + P-poll__networl_4_5_RP_1 + P-poll__networl_4_5_RP_0 + P-poll__networl_7_3_AskP_0 + P-poll__networl_7_3_AskP_1 + P-poll__networl_7_3_AskP_2 + P-poll__networl_7_3_AskP_3 + P-poll__networl_7_3_AskP_4 + P-poll__networl_7_3_AskP_5 + P-poll__networl_7_3_AskP_6 + P-poll__networl_7_3_AskP_7 + P-poll__networl_5_3_AskP_7 + P-poll__networl_5_3_AskP_6 + P-poll__networl_5_3_AskP_5 + P-poll__networl_4_1_AnsP_0 + P-poll__networl_5_3_AskP_4 + P-poll__networl_5_3_AskP_3 + P-poll__networl_5_3_AskP_2 + P-poll__networl_5_3_AskP_1 + P-poll__networl_5_3_AskP_0 + P-poll__networl_7_2_RI_0 + P-poll__networl_7_2_RI_1 + P-poll__networl_7_2_RI_2 + P-poll__networl_7_2_RI_3 + P-poll__networl_7_2_RI_4 + P-poll__networl_7_2_RI_5 + P-poll__networl_7_2_RI_6 + P-poll__networl_7_2_RI_7 + P-poll__networl_4_4_AnnP_0 + P-poll__networl_4_4_AnnP_1 + P-poll__networl_4_4_AnnP_2 + P-poll__networl_4_4_AnnP_3 + P-poll__networl_4_4_AnnP_4 + P-poll__networl_4_4_AnnP_5 + P-poll__networl_4_4_AnnP_6 + P-poll__networl_4_4_AnnP_7 + P-poll__networl_2_6_RP_7 + P-poll__networl_2_6_RP_6 + P-poll__networl_2_6_RP_5 + P-poll__networl_2_6_RP_4 + P-poll__networl_2_6_RP_3 + P-poll__networl_2_6_RP_2 + P-poll__networl_2_6_RP_1 + P-poll__networl_2_6_RP_0 + P-poll__networl_4_6_AnsP_0 + P-poll__networl_6_7_AskP_0 + P-poll__networl_6_7_AskP_1 + P-poll__networl_6_7_AskP_2 + P-poll__networl_6_7_AskP_3 + P-poll__networl_6_7_AskP_4 + P-poll__networl_6_7_AskP_5 + P-poll__networl_6_7_AskP_6 + P-poll__networl_6_7_AskP_7 + P-poll__networl_3_5_AnsP_0 + P-poll__networl_3_0_AnnP_7 + P-poll__networl_3_0_AnnP_6 + P-poll__networl_3_0_AnnP_5 + P-poll__networl_1_4_RP_0 + P-poll__networl_1_4_RP_1 + P-poll__networl_1_4_RP_2 + P-poll__networl_1_4_RP_3 + P-poll__networl_1_4_RP_4 + P-poll__networl_1_4_RP_5 + P-poll__networl_1_4_RP_6 + P-poll__networl_1_4_RP_7 + P-poll__networl_3_0_AnnP_4 + P-poll__networl_3_0_AnnP_3 + P-poll__networl_3_0_AnnP_2 + P-poll__networl_3_0_AnnP_1 + P-poll__networl_3_0_AnnP_0 + P-poll__networl_4_2_AskP_0 + P-poll__networl_4_2_AskP_1 + P-poll__networl_4_2_AskP_2 + P-poll__networl_4_2_AskP_3 + P-poll__networl_4_2_AskP_4 + P-poll__networl_4_2_AskP_5 + P-poll__networl_4_2_AskP_6 + P-poll__networl_4_2_AskP_7 + P-poll__networl_3_3_RP_0 + P-poll__networl_3_3_RP_1 + P-poll__networl_3_3_RP_2 + P-poll__networl_3_3_RP_3 + P-poll__networl_3_3_RP_4 + P-poll__networl_3_3_RP_5 + P-poll__networl_3_3_RP_6 + P-poll__networl_3_3_RP_7 + P-poll__networl_1_0_AnsP_0 + P-poll__networl_0_7_RP_7 + P-poll__networl_0_7_RP_6 + P-poll__networl_0_7_RP_5 + P-poll__networl_3_0_RI_7 + P-poll__networl_0_7_RP_4 + P-poll__networl_3_0_RI_6 + P-poll__networl_0_7_RP_3 + P-poll__networl_1_3_AnnP_0 + P-poll__networl_1_3_AnnP_1 + P-poll__networl_1_3_AnnP_2 + P-poll__networl_1_3_AnnP_3 + P-poll__networl_1_3_AnnP_4 + P-poll__networl_1_3_AnnP_5 + P-poll__networl_1_3_AnnP_6 + P-poll__networl_1_3_AnnP_7 + P-poll__networl_3_0_RI_5 + P-poll__networl_0_7_RP_2 + P-poll__networl_5_2_RP_0 + P-poll__networl_5_2_RP_1 + P-poll__networl_5_2_RP_2 + P-poll__networl_5_2_RP_3 + P-poll__networl_5_2_RP_4 + P-poll__networl_5_2_RP_5 + P-poll__networl_5_2_RP_6 + P-poll__networl_5_2_RP_7 + P-poll__networl_3_0_RI_4 + P-poll__networl_0_7_RP_1 + P-poll__networl_3_0_RI_3 + P-poll__networl_7_7_AI_0 + P-poll__networl_7_7_AI_1 + P-poll__networl_7_7_AI_2 + P-poll__networl_7_7_AI_3 + P-poll__networl_7_7_AI_4 + P-poll__networl_7_7_AI_5 + P-poll__networl_7_7_AI_6 + P-poll__networl_7_7_AI_7 + P-poll__networl_0_4_AI_0 + P-poll__networl_0_4_AI_1 + P-poll__networl_0_4_AI_2 + P-poll__networl_0_4_AI_3 + P-poll__networl_0_4_AI_4 + P-poll__networl_0_4_AI_5 + P-poll__networl_0_4_AI_6 + P-poll__networl_0_4_AI_7 + P-poll__networl_0_7_RI_0 + P-poll__networl_0_7_RI_1 + P-poll__networl_0_7_RI_2 + P-poll__networl_0_7_RI_3 + P-poll__networl_0_7_RI_4 + P-poll__networl_0_7_RI_5 + P-poll__networl_0_7_RI_6 + P-poll__networl_0_7_RI_7 + P-poll__networl_0_7_RP_0 + P-poll__networl_3_0_RI_2 + P-poll__networl_3_0_RI_1 + P-poll__networl_3_0_RI_0 + P-poll__networl_3_6_AskP_0 + P-poll__networl_3_6_AskP_1 + P-poll__networl_3_6_AskP_2 + P-poll__networl_3_6_AskP_3 + P-poll__networl_3_6_AskP_4 + P-poll__networl_3_6_AskP_5 + P-poll__networl_3_6_AskP_6 + P-poll__networl_3_6_AskP_7 + P-poll__networl_7_1_RP_0 + P-poll__networl_7_1_RP_1 + P-poll__networl_7_1_RP_2 + P-poll__networl_7_1_RP_3 + P-poll__networl_7_1_RP_4 + P-poll__networl_7_1_RP_5 + P-poll__networl_7_1_RP_6 + P-poll__networl_7_1_RP_7 + P-poll__networl_2_3_AI_0 + P-poll__networl_2_3_AI_1 + P-poll__networl_2_3_AI_2 + P-poll__networl_0_4_AnsP_0 + P-poll__networl_2_3_AI_3 + P-poll__networl_2_3_AI_4 + P-poll__networl_2_3_AI_5 + P-poll__networl_2_3_AI_6 + P-poll__networl_2_3_AI_7 + P-poll__networl_2_6_RI_0 + P-poll__networl_2_6_RI_1 + P-poll__networl_2_6_RI_2 + P-poll__networl_2_6_RI_3 + P-poll__networl_2_6_RI_4 + P-poll__networl_2_6_RI_5 + P-poll__networl_2_6_RI_6 + P-poll__networl_2_6_RI_7 + P-poll__networl_0_7_AskP_7 + P-poll__networl_0_7_AskP_6 + P-poll__networl_0_7_AskP_5 + P-poll__networl_0_7_AskP_4 + P-poll__networl_0_7_AskP_3 + P-poll__networl_0_7_AskP_2 + P-poll__networl_0_7_AskP_1 + P-poll__networl_0_7_AskP_0 + P-poll__networl_7_5_AnsP_0 + P-poll__networl_0_7_AnnP_0 + P-poll__networl_0_7_AnnP_1 + P-poll__networl_0_7_AnnP_2 + P-poll__networl_0_7_AnnP_3 + P-poll__networl_0_7_AnnP_4 + P-poll__networl_0_7_AnnP_5 + P-poll__networl_0_7_AnnP_6 + P-poll__networl_0_7_AnnP_7 + P-poll__networl_1_1_AskP_0 + P-poll__networl_1_1_AskP_1 + P-poll__networl_1_1_AskP_2 + P-poll__networl_1_1_AskP_3 + P-poll__networl_1_1_AskP_4 + P-poll__networl_1_1_AskP_5 + P-poll__networl_1_1_AskP_6 + P-poll__networl_1_1_AskP_7 + P-poll__networl_4_2_AI_0 + P-poll__networl_4_2_AI_1 + P-poll__networl_4_2_AI_2 + P-poll__networl_4_2_AI_3 + P-poll__networl_4_2_AI_4 + P-poll__networl_4_2_AI_5 + P-poll__networl_4_2_AI_6 + P-poll__networl_4_2_AI_7 + P-poll__networl_4_5_RI_0 + P-poll__networl_4_5_RI_1 + P-poll__networl_4_5_RI_2 + P-poll__networl_4_5_RI_3 + P-poll__networl_4_5_RI_4 + P-poll__networl_4_5_RI_5 + P-poll__networl_4_5_RI_6 + P-poll__networl_4_5_RI_7 + P-poll__networl_5_5_AnnP_7 + P-poll__networl_5_0_AnsP_0 + P-poll__networl_5_5_AnnP_6 + P-poll__networl_5_5_AnnP_5 + P-poll__networl_5_5_AnnP_4 + P-poll__networl_5_5_AnnP_3 + P-poll__networl_5_5_AnnP_2 + P-poll__networl_5_5_AnnP_1 + P-poll__networl_5_5_AnnP_0 + P-poll__networl_1_1_RI_7 + P-poll__networl_6_1_AI_0 + P-poll__networl_6_1_AI_1 + P-poll__networl_6_1_AI_2 + P-poll__networl_6_1_AI_3 + P-poll__networl_6_1_AI_4 + P-poll__networl_6_1_AI_5 + P-poll__networl_6_1_AI_6 + P-poll__networl_6_1_AI_7 + P-poll__networl_6_4_RI_0 + P-poll__networl_6_4_RI_1 + P-poll__networl_6_4_RI_2 + P-poll__networl_6_4_RI_3 + P-poll__networl_6_4_RI_4 + P-poll__networl_6_4_RI_5 + P-poll__networl_6_4_RI_6 + P-poll__networl_6_4_RI_7 + P-poll__networl_1_1_RI_6 + P-poll__networl_5_3_AnnP_0 + P-poll__networl_5_3_AnnP_1 + P-poll__networl_5_3_AnnP_2 + P-poll__networl_5_3_AnnP_3 + P-poll__networl_5_3_AnnP_4 + P-poll__networl_5_3_AnnP_5 + P-poll__networl_5_3_AnnP_6 + P-poll__networl_5_3_AnnP_7 + P-poll__networl_1_1_RI_5 + P-poll__networl_1_1_RI_4 + P-poll__networl_1_1_RI_3 + P-poll__networl_1_1_RI_2 + P-poll__networl_1_1_RI_1 + P-poll__networl_1_1_RI_0 + P-poll__networl_5_2_AnsP_0 + P-poll__networl_0_5_AskP_0 + P-poll__networl_0_5_AskP_1 + P-poll__networl_0_5_AskP_2 + P-poll__networl_0_5_AskP_3 + P-poll__networl_0_5_AskP_4 + P-poll__networl_0_5_AskP_5 + P-poll__networl_0_5_AskP_6 + P-poll__networl_0_5_AskP_7 + P-poll__networl_1_0_RI_0 + P-poll__networl_1_0_RI_1 + P-poll__networl_1_0_RI_2 + P-poll__networl_1_0_RI_3 + P-poll__networl_1_0_RI_4 + P-poll__networl_1_0_RI_5 + P-poll__networl_1_0_RI_6 + P-poll__networl_1_0_RI_7 + P-poll__networl_7_6_AskP_0 + P-poll__networl_7_6_AskP_1 + P-poll__networl_7_6_AskP_2 + P-poll__networl_7_6_AskP_3 + P-poll__networl_7_6_AskP_4 + P-poll__networl_7_6_AskP_5 + P-poll__networl_7_6_AskP_6 + P-poll__networl_7_6_AskP_7 + P-poll__networl_4_4_AnsP_0 + P-poll__networl_6_5_RI_7 + P-poll__networl_6_5_RI_6 + P-poll__networl_6_5_RI_5 + P-poll__networl_0_6_RP_0 + P-poll__networl_0_6_RP_1 + P-poll__networl_0_6_RP_2 + P-poll__networl_0_6_RP_3 + P-poll__networl_0_6_RP_4 + P-poll__networl_0_6_RP_5 + P-poll__networl_0_6_RP_6 + P-poll__networl_0_6_RP_7 + P-poll__networl_4_7_AnnP_0 + P-poll__networl_4_7_AnnP_1 + P-poll__networl_4_7_AnnP_2 + P-poll__networl_4_7_AnnP_3 + P-poll__networl_4_7_AnnP_4 + P-poll__networl_4_7_AnnP_5 + P-poll__networl_4_7_AnnP_6 + P-poll__networl_4_7_AnnP_7 + P-poll__networl_6_5_RI_4 + P-poll__networl_6_5_RI_3 + P-poll__networl_6_5_RI_2 + P-poll__networl_6_5_RI_1 + P-poll__networl_6_5_RI_0 + P-poll__networl_6_2_AI_7 + P-poll__networl_6_2_AI_6 + P-poll__networl_6_2_AI_5 + P-poll__networl_6_2_AI_4 + P-poll__networl_5_1_AskP_0 + P-poll__networl_5_1_AskP_1 + P-poll__networl_5_1_AskP_2 + P-poll__networl_5_1_AskP_3 + P-poll__networl_5_1_AskP_4 + P-poll__networl_5_1_AskP_5 + P-poll__networl_5_1_AskP_6 + P-poll__networl_5_1_AskP_7 + P-poll__networl_6_2_AI_3 + P-poll__networl_6_2_AI_2 + P-poll__networl_6_2_AI_1 + P-poll__networl_6_2_AI_0 + P-poll__networl_1_3_AskP_7 + P-poll__networl_1_3_AskP_6 + P-poll__networl_1_3_AskP_5 + P-poll__networl_1_3_AskP_4 + P-poll__networl_1_3_AskP_3 + P-poll__networl_2_5_RP_0 + P-poll__networl_2_5_RP_1 + P-poll__networl_2_5_RP_2 + P-poll__networl_2_5_RP_3 + P-poll__networl_2_5_RP_4 + P-poll__networl_2_5_RP_5 + P-poll__networl_2_5_RP_6 + P-poll__networl_2_5_RP_7 + P-poll__networl_1_3_AskP_2 + P-poll__networl_2_2_AnnP_0 + P-poll__networl_2_2_AnnP_1 + P-poll__networl_2_2_AnnP_2 + P-poll__networl_2_2_AnnP_3 + P-poll__networl_2_2_AnnP_4 + P-poll__networl_2_2_AnnP_5 + P-poll__networl_2_2_AnnP_6 + P-poll__networl_2_2_AnnP_7 + P-poll__networl_1_3_AskP_1 + P-poll__networl_1_3_AskP_0 + P-poll__networl_4_4_RP_0 + P-poll__networl_4_4_RP_1 + P-poll__networl_4_4_RP_2 + P-poll__networl_4_4_RP_3 + P-poll__networl_4_4_RP_4 + P-poll__networl_4_4_RP_5 + P-poll__networl_4_4_RP_6 + P-poll__networl_4_4_RP_7 + P-poll__networl_4_5_AskP_0 + P-poll__networl_4_5_AskP_1 + P-poll__networl_4_5_AskP_2 + P-poll__networl_4_5_AskP_3 + P-poll__networl_4_5_AskP_4 + P-poll__networl_4_5_AskP_5 + P-poll__networl_4_5_AskP_6 + P-poll__networl_4_5_AskP_7 + P-poll__networl_6_3_RP_0 + P-poll__networl_6_3_RP_1 + P-poll__networl_6_3_RP_2 + P-poll__networl_6_3_RP_3 + P-poll__networl_6_3_RP_4 + P-poll__networl_6_3_RP_5 + P-poll__networl_6_3_RP_6 + P-poll__networl_6_3_RP_7 + P-poll__networl_1_3_AnsP_0 + P-poll__networl_7_7_AnsP_0 + P-poll__networl_1_5_AI_0 + P-poll__networl_1_5_AI_1 + P-poll__networl_1_5_AI_2 + P-poll__networl_1_5_AI_3 + P-poll__networl_1_5_AI_4 + P-poll__networl_1_5_AI_5 + P-poll__networl_1_5_AI_6 + P-poll__networl_1_5_AI_7 + P-poll__networl_1_6_AnnP_0 + P-poll__networl_1_6_AnnP_1 + P-poll__networl_1_6_AnnP_2 + P-poll__networl_1_6_AnnP_3 + P-poll__networl_1_6_AnnP_4 + P-poll__networl_1_6_AnnP_5 + P-poll__networl_1_6_AnnP_6 + P-poll__networl_1_6_AnnP_7 + P-poll__networl_2_0_AskP_0 + P-poll__networl_2_0_AskP_1 + P-poll__networl_2_0_AskP_2 + P-poll__networl_2_0_AskP_3 + P-poll__networl_2_0_AskP_4 + P-poll__networl_2_0_AskP_5 + P-poll__networl_2_0_AskP_6 + P-poll__networl_2_0_AskP_7 + P-poll__networl_3_4_AI_0 + P-poll__networl_3_4_AI_1 + P-poll__networl_3_4_AI_2 + P-poll__networl_3_4_AI_3 + P-poll__networl_3_4_AI_4 + P-poll__networl_3_4_AI_5 + P-poll__networl_3_4_AI_6 + P-poll__networl_3_4_AI_7 + P-poll__networl_3_7_RI_0 + P-poll__networl_3_7_RI_1 + P-poll__networl_3_7_RI_2 + P-poll__networl_3_7_RI_3 + P-poll__networl_3_7_RI_4 + P-poll__networl_3_7_RI_5 + P-poll__networl_3_7_RI_6 + P-poll__networl_3_7_RI_7 + P-poll__networl_6_1_AnnP_7 + P-poll__networl_6_1_AnnP_6 + P-poll__networl_6_1_AnnP_5 + P-poll__networl_5_3_AI_0 + P-poll__networl_5_3_AI_1 + P-poll__networl_5_3_AI_2 + P-poll__networl_0_7_AnsP_0 + P-poll__networl_5_3_AI_3 + P-poll__networl_6_1_AnnP_4 + P-poll__networl_5_3_AI_4 + P-poll__networl_6_1_AnnP_3 + P-poll__networl_5_3_AI_5 + P-poll__networl_6_1_AnnP_2 + P-poll__networl_5_3_AI_6 + P-poll__networl_6_1_AnnP_1 + P-poll__networl_5_3_AI_7 + P-poll__networl_6_1_AnnP_0 + P-poll__networl_5_6_RI_0 + P-poll__networl_5_6_RI_1 + P-poll__networl_5_6_RI_2 + P-poll__networl_5_6_RI_3 + P-poll__networl_5_6_RI_4 + P-poll__networl_5_6_RI_5 + P-poll__networl_5_6_RI_6 + P-poll__networl_5_6_RI_7 + P-poll__networl_6_2_AnnP_0 + P-poll__networl_6_2_AnnP_1 + P-poll__networl_6_2_AnnP_2 + P-poll__networl_6_2_AnnP_3 + P-poll__networl_6_2_AnnP_4 + P-poll__networl_6_2_AnnP_5 + P-poll__networl_6_2_AnnP_6 + P-poll__networl_6_2_AnnP_7 + P-poll__networl_4_6_RI_7 + P-poll__networl_4_6_RI_6 + P-poll__networl_4_6_RI_5 + P-poll__networl_4_6_RI_4 + P-poll__networl_4_6_RI_3 + P-poll__networl_4_6_RI_2 + P-poll__networl_4_6_RI_1 + P-poll__networl_4_6_RI_0 + P-poll__networl_4_3_AI_7 + P-poll__networl_4_3_AI_6 + P-poll__networl_4_3_AI_5 + P-poll__networl_4_3_AI_4 + P-poll__networl_4_3_AI_3 + P-poll__networl_1_4_AskP_0 + P-poll__networl_1_4_AskP_1 + P-poll__networl_1_4_AskP_2 + P-poll__networl_1_4_AskP_3 + P-poll__networl_1_4_AskP_4 + P-poll__networl_1_4_AskP_5 + P-poll__networl_1_4_AskP_6 + P-poll__networl_1_4_AskP_7 + P-poll__networl_7_2_AI_0 + P-poll__networl_7_2_AI_1 + P-poll__networl_7_2_AI_2 + P-poll__networl_7_2_AI_3 + P-poll__networl_7_2_AI_4 + P-poll__networl_7_2_AI_5 + P-poll__networl_7_2_AI_6 + P-poll__networl_7_2_AI_7 + P-poll__networl_7_5_RI_0 + P-poll__networl_7_5_RI_1 + P-poll__networl_7_5_RI_2 + P-poll__networl_7_5_RI_3 + P-poll__networl_7_5_RI_4 + P-poll__networl_7_5_RI_5 + P-poll__networl_7_5_RI_6 + P-poll__networl_7_5_RI_7 + P-poll__networl_0_2_RI_0 + P-poll__networl_0_2_RI_1 + P-poll__networl_0_2_RI_2 + P-poll__networl_0_2_RI_3 + P-poll__networl_0_2_RI_4 + P-poll__networl_0_2_RI_5 + P-poll__networl_0_2_RI_6 + P-poll__networl_0_2_RI_7 + P-poll__networl_0_6_AnsP_0 + P-poll__networl_4_3_AI_2 + P-poll__networl_4_3_AI_1 + P-poll__networl_4_3_AI_0 + P-poll__networl_5_3_AnsP_0 + P-poll__networl_2_1_RI_0 + P-poll__networl_2_1_RI_1 + P-poll__networl_2_1_RI_2 + P-poll__networl_2_1_RI_3 + P-poll__networl_2_1_RI_4 + P-poll__networl_2_1_RI_5 + P-poll__networl_2_1_RI_6 + P-poll__networl_2_1_RI_7 + P-poll__networl_5_6_AnnP_0 + P-poll__networl_5_6_AnnP_1 + P-poll__networl_5_6_AnnP_2 + P-poll__networl_5_6_AnnP_3 + P-poll__networl_5_6_AnnP_4 + P-poll__networl_5_6_AnnP_5 + P-poll__networl_5_6_AnnP_6 + P-poll__networl_5_6_AnnP_7 + P-poll__networl_6_0_AskP_0 + P-poll__networl_6_0_AskP_1 + P-poll__networl_6_0_AskP_2 + P-poll__networl_6_0_AskP_3 + P-poll__networl_6_0_AskP_4 + P-poll__networl_6_0_AskP_5 + P-poll__networl_6_0_AskP_6 + P-poll__networl_6_0_AskP_7 + P-poll__networl_2_7_RI_7 + P-poll__networl_2_7_RI_6 + P-poll__networl_2_7_RI_5 + P-poll__networl_2_7_RI_4 + P-poll__networl_2_7_RI_3 + P-poll__networl_2_7_RI_2 + P-poll__networl_4_0_RI_0 + P-poll__networl_4_0_RI_1 + P-poll__networl_4_0_RI_2 + P-poll__networl_1_7_RP_0 + P-poll__networl_4_0_RI_3 + P-poll__networl_1_7_RP_1 + P-poll__networl_4_0_RI_4 + P-poll__networl_1_7_RP_2 + P-poll__networl_4_0_RI_5 + P-poll__networl_1_7_RP_3 + P-poll__networl_4_0_RI_6 + P-poll__networl_1_7_RP_4 + P-poll__networl_4_0_RI_7 + P-poll__networl_1_7_RP_5 + P-poll__networl_1_7_RP_6 + P-poll__networl_1_7_RP_7 + P-poll__networl_2_7_RI_1 + P-poll__networl_2_7_RI_0 + P-poll__networl_2_4_AI_7 + P-poll__networl_2_4_AI_6 + P-poll__networl_2_4_AI_5 + P-poll__networl_3_1_AnnP_0 + P-poll__networl_3_1_AnnP_1 + P-poll__networl_3_1_AnnP_2 + P-poll__networl_3_1_AnnP_3 + P-poll__networl_3_1_AnnP_4 + P-poll__networl_3_1_AnnP_5 + P-poll__networl_3_1_AnnP_6 + P-poll__networl_3_1_AnnP_7 + P-poll__networl_2_4_AI_4 + P-poll__networl_2_4_AI_3 + P-poll__networl_4_7_AnsP_0 + P-poll__networl_2_4_AI_2 + P-poll__networl_2_4_AI_1 + P-poll__networl_2_4_AI_0 + P-poll__networl_7_2_RP_7 + P-poll__networl_7_2_RP_6 + P-poll__networl_7_2_RP_5 + P-poll__networl_7_2_RP_4 + P-poll__networl_7_2_RP_3 + P-poll__networl_7_2_RP_2 + P-poll__networl_3_6_RP_0 + P-poll__networl_3_6_RP_1 + P-poll__networl_3_6_RP_2 + P-poll__networl_3_6_RP_3 + P-poll__networl_3_6_RP_4 + P-poll__networl_3_6_RP_5 + P-poll__networl_3_6_RP_6 + P-poll__networl_3_6_RP_7 + P-poll__networl_7_2_RP_1 + P-poll__networl_7_2_RP_0 + P-poll__networl_5_4_AskP_0 + P-poll__networl_5_4_AskP_1 + P-poll__networl_5_4_AskP_2 + P-poll__networl_5_4_AskP_3 + P-poll__networl_5_4_AskP_4 + P-poll__networl_5_4_AskP_5 + P-poll__networl_5_4_AskP_6 + P-poll__networl_5_4_AskP_7 + P-poll__networl_1_5_AnnP_7 + P-poll__networl_1_5_AnnP_6 + P-poll__networl_5_5_RP_0 + P-poll__networl_5_5_RP_1 + P-poll__networl_5_5_RP_2 + P-poll__networl_5_5_RP_3 + P-poll__networl_5_5_RP_4 + P-poll__networl_5_5_RP_5 + P-poll__networl_5_5_RP_6 + P-poll__networl_5_5_RP_7 + P-poll__networl_2_2_AnsP_0 + P-poll__networl_1_5_AnnP_5 + P-poll__networl_1_5_AnnP_4 + P-poll__networl_1_5_AnnP_3 + P-poll__networl_1_5_AnnP_2 + P-poll__networl_1_5_AnnP_1 + P-poll__networl_1_5_AnnP_0 + P-poll__networl_0_7_AI_0 + P-poll__networl_0_7_AI_1 + P-poll__networl_0_7_AI_2 + P-poll__networl_0_7_AI_3 + P-poll__networl_0_7_AI_4 + P-poll__networl_0_7_AI_5 + P-poll__networl_0_7_AI_6 + P-poll__networl_0_7_AI_7 + P-poll__networl_2_5_AnnP_0 + P-poll__networl_2_5_AnnP_1 + P-poll__networl_2_5_AnnP_2 + P-poll__networl_2_5_AnnP_3 + P-poll__networl_2_5_AnnP_4 + P-poll__networl_2_5_AnnP_5 + P-poll__networl_2_5_AnnP_6 + P-poll__networl_2_5_AnnP_7 + P-poll__networl_7_4_RP_0 + P-poll__networl_7_4_RP_1 + P-poll__networl_7_4_RP_2 + P-poll__networl_7_4_RP_3 + P-poll__networl_7_4_RP_4 + P-poll__networl_7_4_RP_5 + P-poll__networl_7_4_RP_6 + P-poll__networl_7_4_RP_7 + P-poll__networl_0_1_RP_0 + P-poll__networl_0_1_RP_1 + P-poll__networl_0_1_RP_2 + P-poll__networl_0_1_RP_3 + P-poll__networl_0_1_RP_4 + P-poll__networl_0_1_RP_5 + P-poll__networl_0_1_RP_6 + P-poll__networl_0_1_RP_7 + P-poll__networl_2_6_AI_0 + P-poll__networl_2_6_AI_1 + P-poll__networl_2_6_AI_2 + P-poll__networl_2_6_AI_3 + P-poll__networl_2_6_AI_4 + P-poll__networl_2_6_AI_5 + P-poll__networl_2_6_AI_6 + P-poll__networl_2_6_AI_7 + P-poll__networl_0_5_AI_7 + P-poll__networl_0_5_AI_6 + P-poll__networl_0_5_AI_5 + P-poll__networl_0_0_AnnP_0 + P-poll__networl_0_0_AnnP_1 + P-poll__networl_0_0_AnnP_2 + P-poll__networl_0_0_AnnP_3 + P-poll__networl_0_0_AnnP_4 + P-poll__networl_0_0_AnnP_5 + P-poll__networl_0_0_AnnP_6 + P-poll__networl_0_0_AnnP_7 + P-poll__networl_2_0_RP_0 + P-poll__networl_2_0_RP_1 + P-poll__networl_2_0_RP_2 + P-poll__networl_2_0_RP_3 + P-poll__networl_2_0_RP_4 + P-poll__networl_2_0_RP_5 + P-poll__networl_2_0_RP_6 + P-poll__networl_2_0_RP_7 + P-poll__networl_0_5_AI_4 + P-poll__networl_1_6_AnsP_0 + P-poll__networl_0_5_AI_3 + P-poll__networl_0_5_AI_2 + P-poll__networl_0_5_AI_1 + P-poll__networl_0_5_AI_0 + P-poll__networl_1_2_AnsP_0 + P-poll__networl_4_5_AI_0 + P-poll__networl_4_5_AI_1 + P-poll__networl_4_5_AI_2 + P-poll__networl_4_5_AI_3 + P-poll__networl_4_5_AI_4 + P-poll__networl_4_5_AI_5 + P-poll__networl_4_5_AI_6 + P-poll__networl_4_5_AI_7 + P-poll__networl_7_1_AnnP_0 + P-poll__networl_7_1_AnnP_1 + P-poll__networl_7_1_AnnP_2 + P-poll__networl_7_1_AnnP_3 + P-poll__networl_7_1_AnnP_4 + P-poll__networl_7_1_AnnP_5 + P-poll__networl_7_1_AnnP_6 + P-poll__networl_7_1_AnnP_7 + P-poll__networl_2_3_AskP_0 + P-poll__networl_2_3_AskP_1 + P-poll__networl_2_3_AskP_2 + P-poll__networl_2_3_AskP_3 + P-poll__networl_2_3_AskP_4 + P-poll__networl_2_3_AskP_5 + P-poll__networl_2_3_AskP_6 + P-poll__networl_2_3_AskP_7 + P-poll__networl_6_4_AI_0 + P-poll__networl_6_4_AI_1 + P-poll__networl_6_4_AI_2 + P-poll__networl_6_4_AI_3 + P-poll__networl_6_4_AI_4 + P-poll__networl_6_4_AI_5 + P-poll__networl_6_4_AI_6 + P-poll__networl_6_4_AI_7 + P-poll__networl_5_3_RP_7 + P-poll__networl_5_3_RP_6 + P-poll__networl_5_3_RP_5 + P-poll__networl_5_3_RP_4 + P-poll__networl_5_3_RP_3 + P-poll__networl_5_3_RP_2 + P-poll__networl_6_7_RI_0 + P-poll__networl_6_7_RI_1 + P-poll__networl_6_7_RI_2 + P-poll__networl_6_7_RI_3 + P-poll__networl_6_7_RI_4 + P-poll__networl_6_7_RI_5 + P-poll__networl_6_7_RI_6 + P-poll__networl_6_7_RI_7 + P-poll__networl_5_3_RP_1 + P-poll__networl_6_2_AnsP_0 + P-poll__networl_5_3_RP_0 + P-poll__networl_1_0_AI_0 + P-poll__networl_1_0_AI_1 + P-poll__networl_1_0_AI_2 + P-poll__networl_1_0_AI_3 + P-poll__networl_1_0_AI_4 + P-poll__networl_1_0_AI_5 + P-poll__networl_1_0_AI_6 + P-poll__networl_1_0_AI_7 + P-poll__networl_1_3_RI_0 + P-poll__networl_1_3_RI_1 + P-poll__networl_1_3_RI_2 + P-poll__networl_1_3_RI_3 + P-poll__networl_1_3_RI_4 + P-poll__networl_1_3_RI_5 + P-poll__networl_1_3_RI_6 + P-poll__networl_1_3_RI_7 + P-poll__networl_6_5_AnnP_0 + P-poll__networl_6_5_AnnP_1 + P-poll__networl_6_5_AnnP_2 + P-poll__networl_6_5_AnnP_3 + P-poll__networl_6_5_AnnP_4 + P-poll__networl_6_5_AnnP_5 + P-poll__networl_6_5_AnnP_6 + P-poll__networl_6_5_AnnP_7 + P-poll__networl_4_4_AskP_7 + P-poll__networl_4_4_AskP_6 + P-poll__networl_4_4_AskP_5 + P-poll__networl_1_7_AskP_0 + P-poll__networl_1_7_AskP_1 + P-poll__networl_1_7_AskP_2 + P-poll__networl_1_7_AskP_3 + P-poll__networl_1_7_AskP_4 + P-poll__networl_1_7_AskP_5 + P-poll__networl_1_7_AskP_6 + P-poll__networl_1_7_AskP_7 + P-poll__networl_3_2_RI_0 + P-poll__networl_3_2_RI_1 + P-poll__networl_3_2_RI_2 + P-poll__networl_3_2_RI_3 + P-poll__networl_3_2_RI_4 + P-poll__networl_3_2_RI_5 + P-poll__networl_3_2_RI_6 + P-poll__networl_3_2_RI_7 + P-poll__networl_4_4_AskP_4 + P-poll__networl_4_4_AskP_3 + P-poll__networl_4_0_AnnP_0 + P-poll__networl_4_0_AnnP_1 + P-poll__networl_4_0_AnnP_2 + P-poll__networl_4_0_AnnP_3 + P-poll__networl_4_0_AnnP_4 + P-poll__networl_4_0_AnnP_5 + P-poll__networl_4_0_AnnP_6 + P-poll__networl_4_0_AnnP_7 + P-poll__networl_4_4_AskP_2 + P-poll__networl_4_4_AskP_1 + P-poll__networl_5_6_AnsP_0 + P-poll__networl_4_4_AskP_0 + P-poll__networl_3_4_RP_7 + P-poll__networl_3_4_RP_6 + P-poll__networl_3_4_RP_5 + P-poll__networl_3_4_RP_4 + P-poll__networl_3_4_RP_3 + P-poll__networl_3_4_RP_2 + P-poll__networl_3_4_RP_1 + P-poll__networl_5_1_RI_0 + P-poll__networl_5_1_RI_1 + P-poll__networl_5_1_RI_2 + P-poll__networl_5_1_RI_3 + P-poll__networl_5_1_RI_4 + P-poll__networl_5_1_RI_5 + P-poll__networl_5_1_RI_6 + P-poll__networl_5_1_RI_7 + P-poll__networl_3_4_RP_0 + P-poll__networl_3_7_AnsP_0 + P-poll__networl_6_3_AskP_0 + P-poll__networl_6_3_AskP_1 + P-poll__networl_6_3_AskP_2 + P-poll__networl_6_3_AskP_3 + P-poll__networl_6_3_AskP_4 + P-poll__networl_6_3_AskP_5 + P-poll__networl_6_3_AskP_6 + P-poll__networl_6_3_AskP_7 + P-poll__networl_3_1_AnsP_0 + P-poll__networl_2_1_AnnP_7 + P-poll__networl_2_1_AnnP_6 + P-poll__networl_7_0_RI_0 + P-poll__networl_7_0_RI_1 + P-poll__networl_7_0_RI_2 + P-poll__networl_4_7_RP_0 + P-poll__networl_7_0_RI_3 + P-poll__networl_4_7_RP_1 + P-poll__networl_7_0_RI_4 + P-poll__networl_4_7_RP_2 + P-poll__networl_7_0_RI_5 + P-poll__networl_4_7_RP_3 + P-poll__networl_7_0_RI_6 + P-poll__networl_4_7_RP_4 + P-poll__networl_7_0_RI_7 + P-poll__networl_4_7_RP_5 + P-poll__networl_4_7_RP_6 + P-poll__networl_4_7_RP_7 + P-poll__networl_2_1_AnnP_5 + P-poll__networl_3_4_AnnP_0 + P-poll__networl_3_4_AnnP_1 + P-poll__networl_3_4_AnnP_2 + P-poll__networl_3_4_AnnP_3 + P-poll__networl_3_4_AnnP_4 + P-poll__networl_3_4_AnnP_5 + P-poll__networl_3_4_AnnP_6 + P-poll__networl_3_4_AnnP_7 + P-poll__networl_2_1_AnnP_4 + P-poll__networl_2_1_AnnP_3 + P-poll__networl_2_1_AnnP_2 + P-poll__networl_6_6_RP_0 + P-poll__networl_6_6_RP_1 + P-poll__networl_6_6_RP_2 + P-poll__networl_6_6_RP_3 + P-poll__networl_6_6_RP_4 + P-poll__networl_6_6_RP_5 + P-poll__networl_6_6_RP_6 + P-poll__networl_6_6_RP_7 + P-poll__networl_2_1_AnnP_1 + P-poll__networl_2_1_AnnP_0 + P-poll__networl_1_5_RP_7 + P-poll__networl_1_5_RP_6 + P-poll__networl_5_7_AskP_0 + P-poll__networl_5_7_AskP_1 + P-poll__networl_5_7_AskP_2 + P-poll__networl_5_7_AskP_3 + P-poll__networl_5_7_AskP_4 + P-poll__networl_5_7_AskP_5 + P-poll__networl_5_7_AskP_6 + P-poll__networl_5_7_AskP_7 + P-poll__networl_1_5_RP_5 + P-poll__networl_1_5_RP_4 + P-poll__networl_1_2_RP_0 + P-poll__networl_1_2_RP_1 + P-poll__networl_1_2_RP_2 + P-poll__networl_1_2_RP_3 + P-poll__networl_1_2_RP_4 + P-poll__networl_1_2_RP_5 + P-poll__networl_1_2_RP_6 + P-poll__networl_1_2_RP_7 + P-poll__networl_2_5_AnsP_0 + P-poll__networl_1_5_RP_3 + P-poll__networl_1_5_RP_2 + P-poll__networl_1_5_RP_1 + P-poll__networl_1_5_RP_0 + P-poll__networl_3_7_AI_0 + P-poll__networl_3_7_AI_1 + P-poll__networl_3_7_AI_2 + P-poll__networl_3_7_AI_3 + P-poll__networl_3_7_AI_4 + P-poll__networl_3_7_AI_5 + P-poll__networl_3_7_AI_6 + P-poll__networl_3_7_AI_7 + P-poll__networl_5_0_AskP_7 + P-poll__networl_5_0_AskP_6 + P-poll__networl_5_0_AskP_5 + P-poll__networl_5_0_AskP_4 + P-poll__networl_5_0_AskP_3 + P-poll__networl_5_0_AskP_2 + P-poll__networl_5_0_AskP_1 + P-poll__networl_3_2_AskP_0 + P-poll__networl_3_2_AskP_1 + P-poll__networl_3_2_AskP_2 + P-poll__networl_3_2_AskP_3 + P-poll__networl_3_2_AskP_4 + P-poll__networl_3_2_AskP_5 + P-poll__networl_3_2_AskP_6 + P-poll__networl_3_2_AskP_7 + P-poll__networl_3_1_RP_0 + P-poll__networl_3_1_RP_1 + P-poll__networl_3_1_RP_2 + P-poll__networl_3_1_RP_3 + P-poll__networl_3_1_RP_4 + P-poll__networl_3_1_RP_5 + P-poll__networl_3_1_RP_6 + P-poll__networl_3_1_RP_7 + P-poll__networl_5_0_AskP_0 + P-poll__networl_5_6_AI_0 + P-poll__networl_5_6_AI_1 + P-poll__networl_5_6_AI_2 + P-poll__networl_5_6_AI_3 + P-poll__networl_5_6_AI_4 + P-poll__networl_5_6_AI_5 + P-poll__networl_5_6_AI_6 + P-poll__networl_5_6_AI_7 + P-poll__networl_0_0_AnsP_0 + P-poll__networl_4_6_AnnP_7 + P-poll__networl_4_6_AnnP_6 + P-poll__networl_4_6_AnnP_5 + P-poll__networl_4_6_AnnP_4 + P-poll__networl_4_6_AnnP_3 + P-poll__networl_4_6_AnnP_2 + P-poll__networl_4_6_AnnP_1 + P-poll__networl_7_1_AnsP_0 + P-poll__networl_4_6_AnnP_0 + P-poll__networl_0_3_AnnP_0 + P-poll__networl_0_3_AnnP_1 + P-poll__networl_0_3_AnnP_2 + P-poll__networl_0_3_AnnP_3 + P-poll__networl_0_3_AnnP_4 + P-poll__networl_0_3_AnnP_5 + P-poll__networl_0_3_AnnP_6 + P-poll__networl_0_3_AnnP_7 + P-poll__networl_5_0_RP_0 + P-poll__networl_5_0_RP_1 + P-poll__networl_5_0_RP_2 + P-poll__networl_5_0_RP_3 + P-poll__networl_5_0_RP_4 + P-poll__networl_5_0_RP_5 + P-poll__networl_5_0_RP_6 + P-poll__networl_5_0_RP_7 + P-poll__networl_4_3_AnsP_0 + P-poll__networl_7_5_AI_0 + P-poll__networl_7_5_AI_1 + P-poll__networl_7_5_AI_2 + P-poll__networl_7_5_AI_3 + P-poll__networl_7_5_AI_4 + P-poll__networl_7_5_AI_5 + P-poll__networl_7_5_AI_6 + P-poll__networl_7_5_AI_7 + P-poll__networl_0_2_AI_0 + P-poll__networl_0_2_AI_1 + P-poll__networl_0_2_AI_2 + P-poll__networl_0_2_AI_3 + P-poll__networl_0_2_AI_4 + P-poll__networl_0_2_AI_5 + P-poll__networl_0_2_AI_6 + P-poll__networl_0_2_AI_7 + P-poll__networl_0_5_RI_0 + P-poll__networl_0_5_RI_1 + P-poll__networl_0_5_RI_2 + P-poll__networl_0_5_RI_3 + P-poll__networl_0_5_RI_4 + P-poll__networl_0_5_RI_5 + P-poll__networl_0_5_RI_6 + P-poll__networl_0_5_RI_7 + P-poll__networl_7_4_AnnP_0 + P-poll__networl_7_4_AnnP_1 + P-poll__networl_7_4_AnnP_2 + P-poll__networl_7_4_AnnP_3 + P-poll__networl_7_4_AnnP_4 + P-poll__networl_7_4_AnnP_5 + P-poll__networl_7_4_AnnP_6 + P-poll__networl_7_4_AnnP_7 + P-poll__networl_2_6_AskP_0 + P-poll__networl_2_6_AskP_1 + P-poll__networl_2_6_AskP_2 + P-poll__networl_2_6_AskP_3 + P-poll__networl_2_6_AskP_4 + P-poll__networl_2_6_AskP_5 + P-poll__networl_2_6_AskP_6 + P-poll__networl_2_6_AskP_7 + P-poll__networl_2_1_AI_0 + P-poll__networl_2_1_AI_1 + P-poll__networl_2_1_AI_2 + P-poll__networl_2_1_AI_3 + P-poll__networl_2_1_AI_4 + P-poll__networl_2_1_AI_5 + P-poll__networl_2_1_AI_6 + P-poll__networl_2_1_AI_7 + P-poll__networl_2_4_RI_0 + P-poll__networl_2_4_RI_1 + P-poll__networl_2_4_RI_2 + P-poll__networl_2_4_RI_3 + P-poll__networl_2_4_RI_4 + P-poll__networl_2_4_RI_5 + P-poll__networl_2_4_RI_6 + P-poll__networl_2_4_RI_7 + P-poll__networl_6_5_AnsP_0 + P-poll__networl_4_0_AI_0 + P-poll__networl_4_0_AI_1 + P-poll__networl_4_0_AI_2 + P-poll__networl_4_0_AI_3 + P-poll__networl_4_0_AI_4 + P-poll__networl_4_0_AI_5 + P-poll__networl_4_0_AI_6 + P-poll__networl_4_0_AI_7 + P-poll__networl_7_5_AskP_7 + P-poll__networl_7_5_AskP_6 + P-poll__networl_7_5_AskP_5 + P-poll__networl_7_5_AskP_4 + P-poll__networl_0_1_AskP_0 + P-poll__networl_0_1_AskP_1 + P-poll__networl_0_1_AskP_2 + P-poll__networl_0_1_AskP_3 + P-poll__networl_0_1_AskP_4 + P-poll__networl_0_1_AskP_5 + P-poll__networl_0_1_AskP_6 + P-poll__networl_0_1_AskP_7 + P-poll__networl_4_3_RI_0 + P-poll__networl_4_3_RI_1 + P-poll__networl_4_3_RI_2 + P-poll__networl_4_3_RI_3 + P-poll__networl_4_3_RI_4 + P-poll__networl_4_3_RI_5 + P-poll__networl_4_3_RI_6 + P-poll__networl_4_3_RI_7 + P-poll__networl_7_2_AskP_0 + P-poll__networl_7_2_AskP_1 + P-poll__networl_7_2_AskP_2 + P-poll__networl_7_2_AskP_3 + P-poll__networl_7_2_AskP_4 + P-poll__networl_7_2_AskP_5 + P-poll__networl_7_2_AskP_6 + P-poll__networl_7_2_AskP_7 + P-poll__networl_7_5_AskP_3 + P-poll__networl_4_0_AnsP_0 + P-poll__networl_7_5_AskP_2 + P-poll__networl_7_5_AskP_1 + P-poll__networl_7_5_AskP_0 + P-poll__networl_6_2_RI_0 + P-poll__networl_6_2_RI_1 + P-poll__networl_6_2_RI_2 + P-poll__networl_6_2_RI_3 + P-poll__networl_6_2_RI_4 + P-poll__networl_6_2_RI_5 + P-poll__networl_6_2_RI_6 + P-poll__networl_6_2_RI_7 + P-poll__networl_0_0_RI_7 + P-poll__networl_0_0_RI_6 + P-poll__networl_0_0_RI_5 + P-poll__networl_0_0_RI_4 + P-poll__networl_0_0_RI_3 + P-poll__networl_0_0_RI_2 + P-poll__networl_0_0_RI_1 + P-poll__networl_4_3_AnnP_0 + P-poll__networl_4_3_AnnP_1 + P-poll__networl_4_3_AnnP_2 + P-poll__networl_4_3_AnnP_3 + P-poll__networl_4_3_AnnP_4 + P-poll__networl_4_3_AnnP_5 + P-poll__networl_4_3_AnnP_6 + P-poll__networl_4_3_AnnP_7 + P-poll__networl_0_0_RI_0 + P-poll__networl_7_3_RI_7 + P-poll__networl_7_3_RI_6 + P-poll__networl_7_3_RI_5 + P-poll__networl_7_3_RI_4 + P-poll__networl_7_3_RI_3 + P-poll__networl_7_3_RI_2 + P-poll__networl_7_3_RI_1 + P-poll__networl_7_3_RI_0 + P-poll__networl_0_4_AskP_7 + P-poll__networl_0_4_AskP_6 + P-poll__networl_0_4_AskP_5 + P-poll__networl_0_4_AskP_4 + P-poll__networl_0_4_AskP_3 + P-poll__networl_0_4_AskP_2 + P-poll__networl_0_4_AskP_1 + P-poll__networl_0_4_AskP_0 + P-poll__networl_7_0_AI_7 + P-poll__networl_7_0_AI_6 + P-poll__networl_7_0_AI_5 + P-poll__networl_7_0_AI_4 + P-poll__networl_7_0_AI_3 + P-poll__networl_7_0_AI_2 + P-poll__networl_7_0_AI_1 + P-poll__networl_7_0_AI_0 + P-poll__networl_6_6_AskP_0 + P-poll__networl_6_6_AskP_1 + P-poll__networl_6_6_AskP_2 + P-poll__networl_6_6_AskP_3 + P-poll__networl_6_6_AskP_4 + P-poll__networl_6_6_AskP_5 + P-poll__networl_6_6_AskP_6 + P-poll__networl_6_6_AskP_7 + P-poll__networl_3_4_AnsP_0 + P-poll__networl_7_7_RP_0 + P-poll__networl_7_7_RP_1 + P-poll__networl_7_7_RP_2 + P-poll__networl_7_7_RP_3 + P-poll__networl_7_7_RP_4 + P-poll__networl_7_7_RP_5 + P-poll__networl_7_7_RP_6 + P-poll__networl_7_7_RP_7 + P-poll__networl_0_4_RP_0 + P-poll__networl_0_4_RP_1 + P-poll__networl_0_4_RP_2 + P-poll__networl_0_4_RP_3 + P-poll__networl_0_4_RP_4 + P-poll__networl_0_4_RP_5 + P-poll__networl_0_4_RP_6 + P-poll__networl_0_4_RP_7 + P-poll__networl_3_7_AnnP_0 + P-poll__networl_3_7_AnnP_1 + P-poll__networl_3_7_AnnP_2 + P-poll__networl_3_7_AnnP_3 + P-poll__networl_3_7_AnnP_4 + P-poll__networl_3_7_AnnP_5 + P-poll__networl_3_7_AnnP_6 + P-poll__networl_3_7_AnnP_7 + P-poll__networl_4_1_AskP_0 + P-poll__networl_4_1_AskP_1 + P-poll__networl_4_1_AskP_2 + P-poll__networl_4_1_AskP_3 + P-poll__networl_4_1_AskP_4 + P-poll__networl_4_1_AskP_5 + P-poll__networl_4_1_AskP_6 + P-poll__networl_4_1_AskP_7 + P-poll__networl_2_3_RP_0 + P-poll__networl_2_3_RP_1 + P-poll__networl_2_3_RP_2 + P-poll__networl_2_3_RP_3 + P-poll__networl_2_3_RP_4 + P-poll__networl_2_3_RP_5 + P-poll__networl_2_3_RP_6 + P-poll__networl_2_3_RP_7 + P-poll__networl_5_2_AnnP_7 + P-poll__networl_5_2_AnnP_6 + P-poll__networl_5_2_AnnP_5 + P-poll__networl_5_2_AnnP_4 + P-poll__networl_5_2_AnnP_3 + P-poll__networl_5_2_AnnP_2 + P-poll__networl_5_2_AnnP_1 + P-poll__networl_1_2_AnnP_0 + P-poll__networl_1_2_AnnP_1 + P-poll__networl_1_2_AnnP_2 + P-poll__networl_1_2_AnnP_3 + P-poll__networl_1_2_AnnP_4 + P-poll__networl_1_2_AnnP_5 + P-poll__networl_1_2_AnnP_6 + P-poll__networl_1_2_AnnP_7 + P-poll__networl_5_2_AnnP_0 + P-poll__networl_5_4_RI_7 + P-poll__networl_4_2_RP_0 + P-poll__networl_4_2_RP_1 + P-poll__networl_4_2_RP_2 + P-poll__networl_4_2_RP_3 + P-poll__networl_4_2_RP_4 + P-poll__networl_4_2_RP_5 + P-poll__networl_4_2_RP_6 + P-poll__networl_4_2_RP_7 + P-poll__networl_5_4_RI_6 + P-poll__networl_6_7_AI_0 + P-poll__networl_6_7_AI_1 + P-poll__networl_6_7_AI_2 + P-poll__networl_6_7_AI_3 + P-poll__networl_6_7_AI_4 + P-poll__networl_6_7_AI_5 + P-poll__networl_6_7_AI_6 + P-poll__networl_6_7_AI_7 + P-poll__networl_5_4_RI_5 + P-poll__networl_5_4_RI_4 + P-poll__networl_5_4_RI_3 + P-poll__networl_5_4_RI_2 + P-poll__networl_5_4_RI_1 + P-poll__networl_5_4_RI_0 + P-poll__networl_5_1_AI_7 + P-poll__networl_5_1_AI_6 + P-poll__networl_5_1_AI_5 + P-poll__networl_3_5_AskP_0 + P-poll__networl_3_5_AskP_1 + P-poll__networl_3_5_AskP_2 + P-poll__networl_3_5_AskP_3 + P-poll__networl_3_5_AskP_4 + P-poll__networl_3_5_AskP_5 + P-poll__networl_3_5_AskP_6 + P-poll__networl_3_5_AskP_7 + P-poll__networl_6_1_RP_0 + P-poll__networl_6_1_RP_1 + P-poll__networl_6_1_RP_2 + P-poll__networl_6_1_RP_3 + P-poll__networl_6_1_RP_4 + P-poll__networl_6_1_RP_5 + P-poll__networl_6_1_RP_6 + P-poll__networl_6_1_RP_7 + P-poll__networl_5_1_AI_4 + P-poll__networl_1_3_AI_0 + P-poll__networl_1_3_AI_1 + P-poll__networl_1_3_AI_2 + P-poll__networl_0_3_AnsP_0 + P-poll__networl_1_3_AI_3 + P-poll__networl_5_1_AI_3 + P-poll__networl_1_3_AI_4 + P-poll__networl_5_1_AI_2 + P-poll__networl_1_3_AI_5 + P-poll__networl_5_1_AI_1 + P-poll__networl_1_3_AI_6 + P-poll__networl_5_1_AI_0 + P-poll__networl_1_3_AI_7 + P-poll__networl_1_6_RI_0 + P-poll__networl_1_6_RI_1 + P-poll__networl_1_6_RI_2 + P-poll__networl_1_6_RI_3 + P-poll__networl_1_6_RI_4 + P-poll__networl_1_6_RI_5 + P-poll__networl_1_6_RI_6 + P-poll__networl_1_6_RI_7 + P-poll__networl_7_4_AnsP_0 + P-poll__networl_0_6_AnnP_0 + P-poll__networl_0_6_AnnP_1 + P-poll__networl_0_6_AnnP_2 + P-poll__networl_0_6_AnnP_3 + P-poll__networl_0_6_AnnP_4 + P-poll__networl_0_6_AnnP_5 + P-poll__networl_0_6_AnnP_6 + P-poll__networl_0_6_AnnP_7 + P-poll__networl_1_0_AskP_0 + P-poll__networl_1_0_AskP_1 + P-poll__networl_1_0_AskP_2 + P-poll__networl_1_0_AskP_3 + P-poll__networl_1_0_AskP_4 + P-poll__networl_1_0_AskP_5 + P-poll__networl_1_0_AskP_6 + P-poll__networl_1_0_AskP_7 + P-poll__networl_3_2_AI_0 + P-poll__networl_3_2_AI_1 + P-poll__networl_3_2_AI_2 + P-poll__networl_3_2_AI_3 + P-poll__networl_3_2_AI_4 + P-poll__networl_3_2_AI_5 + P-poll__networl_3_2_AI_6 + P-poll__networl_3_2_AI_7 + P-poll__networl_3_5_RI_0 + P-poll__networl_3_5_RI_1 + P-poll__networl_3_5_RI_2 + P-poll__networl_3_5_RI_3 + P-poll__networl_3_5_RI_4 + P-poll__networl_3_5_RI_5 + P-poll__networl_3_5_RI_6 + P-poll__networl_3_5_RI_7 + P-poll__networl_7_7_AnnP_0 + P-poll__networl_7_7_AnnP_1 + P-poll__networl_7_7_AnnP_2 + P-poll__networl_7_7_AnnP_3 + P-poll__networl_7_7_AnnP_4 + P-poll__networl_7_7_AnnP_5 + P-poll__networl_7_7_AnnP_6 + P-poll__networl_7_7_AnnP_7)
lola: after: (P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7 <= P-poll__networl_7_4_AnsP_7 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_1_6_AnsP_4 + P-poll__networl_1_6_AnsP_3 + P-poll__networl_1_6_AnsP_2 + P-poll__networl_1_6_AnsP_1 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_7)
lola: place invariant simplifies atomic proposition
lola: before: (P-masterState_6_F_6 + P-masterState_6_F_5 + P-masterState_6_F_4 + P-masterState_6_F_3 + P-masterState_6_F_2 + P-masterState_6_F_1 + P-masterState_6_F_0 + P-masterState_1_T_6 + P-masterState_1_T_5 + P-masterState_1_T_4 + P-masterState_1_T_3 + P-masterState_1_T_2 + P-masterState_1_T_1 + P-masterState_1_T_0 + P-masterState_3_F_6 + P-masterState_3_F_5 + P-masterState_3_F_4 + P-masterState_3_F_3 + P-masterState_3_F_2 + P-masterState_3_F_1 + P-masterState_3_F_0 + P-masterState_4_T_0 + P-masterState_4_T_1 + P-masterState_4_T_2 + P-masterState_4_T_3 + P-masterState_4_T_4 + P-masterState_4_T_5 + P-masterState_4_T_6 + P-masterState_4_T_7 + P-masterState_6_T_7 + P-masterState_6_T_6 + P-masterState_6_T_5 + P-masterState_6_T_4 + P-masterState_6_T_3 + P-masterState_6_T_2 + P-masterState_6_T_1 + P-masterState_6_T_0 + P-masterState_0_F_6 + P-masterState_0_F_5 + P-masterState_0_F_4 + P-masterState_0_F_3 + P-masterState_0_F_2 + P-masterState_0_F_1 + P-masterState_0_F_0 + P-masterState_3_T_7 + P-masterState_3_T_6 + P-masterState_3_T_5 + P-masterState_3_T_4 + P-masterState_3_T_3 + P-masterState_3_T_2 + P-masterState_3_T_1 + P-masterState_3_T_0 + P-masterState_1_F_0 + P-masterState_1_F_1 + P-masterState_1_F_2 + P-masterState_1_F_3 + P-masterState_1_F_4 + P-masterState_1_F_5 + P-masterState_1_F_6 + P-masterState_1_F_7 + P-masterState_5_F_6 + P-masterState_5_F_5 + P-masterState_5_F_4 + P-masterState_5_F_3 + P-masterState_5_F_2 + P-masterState_5_F_1 + P-masterState_5_F_0 + P-masterState_0_T_7 + P-masterState_0_T_6 + P-masterState_0_T_5 + P-masterState_0_T_4 + P-masterState_0_T_3 + P-masterState_0_T_2 + P-masterState_0_T_1 + P-masterState_0_T_0 + P-masterState_2_F_6 + P-masterState_2_F_5 + P-masterState_2_F_4 + P-masterState_2_F_3 + P-masterState_2_F_2 + P-masterState_2_F_1 + P-masterState_2_F_0 + P-masterState_7_T_0 + P-masterState_7_T_1 + P-masterState_7_T_2 + P-masterState_7_T_3 + P-masterState_7_T_4 + P-masterState_7_T_5 + P-masterState_7_T_6 + P-masterState_7_T_7 + P-masterState_5_T_7 + P-masterState_5_T_6 + P-masterState_5_T_5 + P-masterState_5_T_4 + P-masterState_5_T_3 + P-masterState_5_T_2 + P-masterState_5_T_1 + P-masterState_5_T_0 + P-masterState_7_F_6 + P-masterState_7_F_5 + P-masterState_7_F_4 + P-masterState_7_F_3 + P-masterState_7_F_2 + P-masterState_7_F_1 + P-masterState_7_F_0 + P-masterState_4_F_0 + P-masterState_4_F_1 + P-masterState_4_F_2 + P-masterState_4_F_3 + P-masterState_4_F_4 + P-masterState_4_F_5 + P-masterState_4_F_6 + P-masterState_2_T_7 + P-masterState_2_T_6 + P-masterState_2_T_5 + P-masterState_2_T_4 + P-masterState_2_T_3 + P-masterState_2_T_2 + P-masterState_2_T_1 + P-masterState_2_T_0 + P-masterState_4_F_7 + P-masterState_7_F_7 + P-masterState_2_F_7 + P-masterState_5_F_7 + P-masterState_0_F_7 + P-masterState_3_F_7 + P-masterState_1_T_7 + P-masterState_6_F_7 <= P-electedPrimary_7 + P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0)
lola: after: (7 <= P-electedPrimary_7 + P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0)
lola: LP says that atomic proposition is always false: (7 <= P-electedPrimary_7 + P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0)
lola: place invariant simplifies atomic proposition
lola: before: (P-startNeg__broadcasting_1_5 + P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_1 + P-startNeg__broadcasting_0_5 + P-startNeg__broadcasting_0_4 + P-startNeg__broadcasting_0_3 + P-startNeg__broadcasting_0_2 + P-startNeg__broadcasting_0_1 + P-startNeg__broadcasting_2_1 + P-startNeg__broadcasting_2_2 + P-startNeg__broadcasting_2_3 + P-startNeg__broadcasting_2_4 + P-startNeg__broadcasting_2_5 + P-startNeg__broadcasting_2_6 + P-startNeg__broadcasting_2_7 + P-startNeg__broadcasting_3_1 + P-startNeg__broadcasting_3_2 + P-startNeg__broadcasting_3_3 + P-startNeg__broadcasting_3_4 + P-startNeg__broadcasting_3_5 + P-startNeg__broadcasting_3_6 + P-startNeg__broadcasting_3_7 + P-startNeg__broadcasting_4_1 + P-startNeg__broadcasting_4_2 + P-startNeg__broadcasting_4_3 + P-startNeg__broadcasting_4_4 + P-startNeg__broadcasting_4_5 + P-startNeg__broadcasting_4_6 + P-startNeg__broadcasting_4_7 + P-startNeg__broadcasting_7_7 + P-startNeg__broadcasting_7_6 + P-startNeg__broadcasting_7_5 + P-startNeg__broadcasting_7_4 + P-startNeg__broadcasting_7_3 + P-startNeg__broadcasting_7_2 + P-startNeg__broadcasting_7_1 + P-startNeg__broadcasting_5_1 + P-startNeg__broadcasting_5_2 + P-startNeg__broadcasting_5_3 + P-startNeg__broadcasting_5_4 + P-startNeg__broadcasting_5_5 + P-startNeg__broadcasting_5_6 + P-startNeg__broadcasting_5_7 + P-startNeg__broadcasting_6_7 + P-startNeg__broadcasting_6_6 + P-startNeg__broadcasting_6_5 + P-startNeg__broadcasting_6_4 + P-startNeg__broadcasting_6_3 + P-startNeg__broadcasting_6_2 + P-startNeg__broadcasting_6_1 + P-startNeg__broadcasting_0_6 + P-startNeg__broadcasting_0_7 + P-startNeg__broadcasting_1_6 + P-startNeg__broadcasting_1_7 <= P-masterList_5_6_0 + P-masterList_5_6_1 + P-masterList_5_6_2 + P-masterList_5_6_3 + P-masterList_5_6_4 + P-masterList_5_6_5 + P-masterList_5_6_6 + P-masterList_5_6_7 + P-masterList_3_2_0 + P-masterList_3_2_1 + P-masterList_3_2_2 + P-masterList_3_2_3 + P-masterList_3_2_4 + P-masterList_3_2_5 + P-masterList_3_2_6 + P-masterList_3_2_7 + P-masterList_0_4_0 + P-masterList_0_4_1 + P-masterList_0_4_2 + P-masterList_0_4_3 + P-masterList_0_4_4 + P-masterList_0_4_5 + P-masterList_0_4_6 + P-masterList_0_4_7 + P-masterList_0_3_7 + P-masterList_0_3_6 + P-masterList_0_3_5 + P-masterList_0_3_4 + P-masterList_0_3_3 + P-masterList_0_3_2 + P-masterList_0_3_1 + P-masterList_0_3_0 + P-masterList_3_1_7 + P-masterList_3_1_6 + P-masterList_3_1_5 + P-masterList_3_1_4 + P-masterList_5_7_0 + P-masterList_5_7_1 + P-masterList_5_7_2 + P-masterList_5_7_3 + P-masterList_5_7_4 + P-masterList_5_7_5 + P-masterList_5_7_6 + P-masterList_5_7_7 + P-masterList_3_1_3 + P-masterList_3_1_2 + P-masterList_3_1_1 + P-masterList_3_1_0 + P-masterList_6_1_0 + P-masterList_6_1_1 + P-masterList_6_1_2 + P-masterList_6_1_3 + P-masterList_6_1_4 + P-masterList_6_1_5 + P-masterList_6_1_6 + P-masterList_6_1_7 + P-masterList_3_3_0 + P-masterList_3_3_1 + P-masterList_3_3_2 + P-masterList_3_3_3 + P-masterList_3_3_4 + P-masterList_3_3_5 + P-masterList_3_3_6 + P-masterList_3_3_7 + P-masterList_0_5_0 + P-masterList_0_5_1 + P-masterList_0_5_2 + P-masterList_0_5_3 + P-masterList_0_5_4 + P-masterList_0_5_5 + P-masterList_0_5_6 + P-masterList_0_5_7 + P-masterList_2_7_7 + P-masterList_2_7_6 + P-masterList_2_7_5 + P-masterList_2_7_4 + P-masterList_2_7_3 + P-masterList_2_7_2 + P-masterList_2_7_1 + P-masterList_2_7_0 + P-masterList_5_5_7 + P-masterList_5_5_6 + P-masterList_5_5_5 + P-masterList_5_5_4 + P-masterList_5_5_3 + P-masterList_5_5_2 + P-masterList_5_5_1 + P-masterList_5_5_0 + P-masterList_6_2_0 + P-masterList_6_2_1 + P-masterList_6_2_2 + P-masterList_6_2_3 + P-masterList_6_2_4 + P-masterList_6_2_5 + P-masterList_6_2_6 + P-masterList_6_2_7 + P-masterList_3_4_0 + P-masterList_3_4_1 + P-masterList_3_4_2 + P-masterList_3_4_3 + P-masterList_3_4_4 + P-masterList_3_4_5 + P-masterList_3_4_6 + P-masterList_3_4_7 + P-masterList_0_6_0 + P-masterList_0_6_1 + P-masterList_0_6_2 + P-masterList_0_6_3 + P-masterList_0_6_4 + P-masterList_0_6_5 + P-masterList_0_6_6 + P-masterList_0_6_7 + P-masterList_6_3_0 + P-masterList_6_3_1 + P-masterList_6_3_2 + P-masterList_6_3_3 + P-masterList_6_3_4 + P-masterList_6_3_5 + P-masterList_6_3_6 + P-masterList_6_3_7 + P-masterList_3_5_0 + P-masterList_3_5_1 + P-masterList_3_5_2 + P-masterList_3_5_3 + P-masterList_3_5_4 + P-masterList_3_5_5 + P-masterList_3_5_6 + P-masterList_3_5_7 + P-masterList_0_7_0 + P-masterList_0_7_1 + P-masterList_0_7_2 + P-masterList_0_7_3 + P-masterList_0_7_4 + P-masterList_0_7_5 + P-masterList_0_7_6 + P-masterList_0_7_7 + P-masterList_1_1_0 + P-masterList_1_1_1 + P-masterList_1_1_2 + P-masterList_1_1_3 + P-masterList_1_1_4 + P-masterList_1_1_5 + P-masterList_1_1_6 + P-masterList_1_1_7 + P-masterList_0_2_7 + P-masterList_0_2_6 + P-masterList_0_2_5 + P-masterList_0_2_4 + P-masterList_0_2_3 + P-masterList_0_2_2 + P-masterList_0_2_1 + P-masterList_0_2_0 + P-masterList_6_4_0 + P-masterList_6_4_1 + P-masterList_6_4_2 + P-masterList_6_4_3 + P-masterList_6_4_4 + P-masterList_6_4_5 + P-masterList_6_4_6 + P-masterList_6_4_7 + P-masterList_3_6_0 + P-masterList_3_6_1 + P-masterList_3_6_2 + P-masterList_3_6_3 + P-masterList_3_6_4 + P-masterList_3_6_5 + P-masterList_3_6_6 + P-masterList_3_6_7 + P-masterList_1_2_0 + P-masterList_1_2_1 + P-masterList_1_2_2 + P-masterList_1_2_3 + P-masterList_1_2_4 + P-masterList_1_2_5 + P-masterList_1_2_6 + P-masterList_1_2_7 + P-masterList_2_6_7 + P-masterList_2_6_6 + P-masterList_2_6_5 + P-masterList_2_6_4 + P-masterList_2_6_3 + P-masterList_2_6_2 + P-masterList_2_6_1 + P-masterList_2_6_0 + P-masterList_6_5_0 + P-masterList_6_5_1 + P-masterList_6_5_2 + P-masterList_6_5_3 + P-masterList_6_5_4 + P-masterList_6_5_5 + P-masterList_6_5_6 + P-masterList_6_5_7 + P-masterList_5_4_7 + P-masterList_5_4_6 + P-masterList_5_4_5 + P-masterList_5_4_4 + P-masterList_5_4_3 + P-masterList_5_4_2 + P-masterList_3_7_0 + P-masterList_3_7_1 + P-masterList_3_7_2 + P-masterList_3_7_3 + P-masterList_3_7_4 + P-masterList_3_7_5 + P-masterList_3_7_6 + P-masterList_3_7_7 + P-masterList_5_4_1 + P-masterList_5_4_0 + P-masterList_4_1_0 + P-masterList_4_1_1 + P-masterList_4_1_2 + P-masterList_4_1_3 + P-masterList_4_1_4 + P-masterList_4_1_5 + P-masterList_4_1_6 + P-masterList_4_1_7 + P-masterList_1_3_0 + P-masterList_1_3_1 + P-masterList_1_3_2 + P-masterList_1_3_3 + P-masterList_1_3_4 + P-masterList_1_3_5 + P-masterList_1_3_6 + P-masterList_1_3_7 + P-masterList_6_6_0 + P-masterList_6_6_1 + P-masterList_6_6_2 + P-masterList_6_6_3 + P-masterList_6_6_4 + P-masterList_6_6_5 + P-masterList_6_6_6 + P-masterList_6_6_7 + P-masterList_4_2_0 + P-masterList_4_2_1 + P-masterList_4_2_2 + P-masterList_4_2_3 + P-masterList_4_2_4 + P-masterList_4_2_5 + P-masterList_4_2_6 + P-masterList_4_2_7 + P-masterList_1_4_0 + P-masterList_1_4_1 + P-masterList_1_4_2 + P-masterList_1_4_3 + P-masterList_1_4_4 + P-masterList_1_4_5 + P-masterList_1_4_6 + P-masterList_1_4_7 + P-masterList_0_1_7 + P-masterList_0_1_6 + P-masterList_0_1_5 + P-masterList_0_1_4 + P-masterList_0_1_3 + P-masterList_0_1_2 + P-masterList_0_1_1 + P-masterList_0_1_0 + P-masterList_6_7_0 + P-masterList_6_7_1 + P-masterList_6_7_2 + P-masterList_6_7_3 + P-masterList_6_7_4 + P-masterList_6_7_5 + P-masterList_6_7_6 + P-masterList_6_7_7 + P-masterList_7_1_0 + P-masterList_7_1_1 + P-masterList_7_1_2 + P-masterList_7_1_3 + P-masterList_7_1_4 + P-masterList_7_1_5 + P-masterList_7_1_6 + P-masterList_7_1_7 + P-masterList_4_3_0 + P-masterList_4_3_1 + P-masterList_4_3_2 + P-masterList_4_3_3 + P-masterList_4_3_4 + P-masterList_4_3_5 + P-masterList_4_3_6 + P-masterList_4_3_7 + P-masterList_1_5_0 + P-masterList_1_5_1 + P-masterList_1_5_2 + P-masterList_1_5_3 + P-masterList_1_5_4 + P-masterList_1_5_5 + P-masterList_1_5_6 + P-masterList_1_5_7 + P-masterList_2_5_7 + P-masterList_2_5_6 + P-masterList_2_5_5 + P-masterList_2_5_4 + P-masterList_2_5_3 + P-masterList_2_5_2 + P-masterList_2_5_1 + P-masterList_2_5_0 + P-masterList_7_2_0 + P-masterList_7_2_1 + P-masterList_7_2_2 + P-masterList_7_2_3 + P-masterList_7_2_4 + P-masterList_7_2_5 + P-masterList_7_2_6 + P-masterList_7_2_7 + P-masterList_4_4_0 + P-masterList_4_4_1 + P-masterList_4_4_2 + P-masterList_4_4_3 + P-masterList_4_4_4 + P-masterList_4_4_5 + P-masterList_4_4_6 + P-masterList_4_4_7 + P-masterList_5_3_7 + P-masterList_5_3_6 + P-masterList_5_3_5 + P-masterList_5_3_4 + P-masterList_5_3_3 + P-masterList_5_3_2 + P-masterList_5_3_1 + P-masterList_5_3_0 + P-masterList_1_6_0 + P-masterList_1_6_1 + P-masterList_1_6_2 + P-masterList_1_6_3 + P-masterList_1_6_4 + P-masterList_1_6_5 + P-masterList_1_6_6 + P-masterList_1_6_7 + P-masterList_7_7_7 + P-masterList_7_7_6 + P-masterList_7_7_5 + P-masterList_7_7_4 + P-masterList_7_7_3 + P-masterList_7_7_2 + P-masterList_7_7_1 + P-masterList_7_7_0 + P-masterList_7_3_0 + P-masterList_7_3_1 + P-masterList_7_3_2 + P-masterList_7_3_3 + P-masterList_7_3_4 + P-masterList_7_3_5 + P-masterList_7_3_6 + P-masterList_7_3_7 + P-masterList_4_5_0 + P-masterList_4_5_1 + P-masterList_4_5_2 + P-masterList_4_5_3 + P-masterList_4_5_4 + P-masterList_4_5_5 + P-masterList_4_5_6 + P-masterList_4_5_7 + P-masterList_1_7_0 + P-masterList_1_7_1 + P-masterList_1_7_2 + P-masterList_1_7_3 + P-masterList_1_7_4 + P-masterList_1_7_5 + P-masterList_1_7_6 + P-masterList_1_7_7 + P-masterList_2_1_0 + P-masterList_2_1_1 + P-masterList_2_1_2 + P-masterList_2_1_3 + P-masterList_2_1_4 + P-masterList_2_1_5 + P-masterList_2_1_6 + P-masterList_2_1_7 + P-masterList_7_4_0 + P-masterList_7_4_1 + P-masterList_7_4_2 + P-masterList_7_4_3 + P-masterList_7_4_4 + P-masterList_7_4_5 + P-masterList_7_4_6 + P-masterList_7_4_7 + P-masterList_4_6_0 + P-masterList_4_6_1 + P-masterList_4_6_2 + P-masterList_4_6_3 + P-masterList_4_6_4 + P-masterList_4_6_5 + P-masterList_4_6_6 + P-masterList_4_6_7 + P-masterList_2_2_0 + P-masterList_2_2_1 + P-masterList_2_2_2 + P-masterList_2_2_3 + P-masterList_2_2_4 + P-masterList_2_2_5 + P-masterList_2_2_6 + P-masterList_2_2_7 + P-masterList_2_4_7 + P-masterList_2_4_6 + P-masterList_2_4_5 + P-masterList_2_4_4 + P-masterList_2_4_3 + P-masterList_2_4_2 + P-masterList_2_4_1 + P-masterList_2_4_0 + P-masterList_7_5_0 + P-masterList_7_5_1 + P-masterList_7_5_2 + P-masterList_7_5_3 + P-masterList_7_5_4 + P-masterList_7_5_5 + P-masterList_7_5_6 + P-masterList_7_5_7 + P-masterList_4_7_0 + P-masterList_4_7_1 + P-masterList_4_7_2 + P-masterList_4_7_3 + P-masterList_4_7_4 + P-masterList_4_7_5 + P-masterList_4_7_6 + P-masterList_4_7_7 + P-masterList_5_1_0 + P-masterList_5_1_1 + P-masterList_5_1_2 + P-masterList_5_1_3 + P-masterList_5_1_4 + P-masterList_5_1_5 + P-masterList_5_1_6 + P-masterList_5_1_7 + P-masterList_5_2_7 + P-masterList_5_2_6 + P-masterList_5_2_5 + P-masterList_5_2_4 + P-masterList_5_2_3 + P-masterList_5_2_2 + P-masterList_5_2_1 + P-masterList_5_2_0 + P-masterList_2_3_0 + P-masterList_2_3_1 + P-masterList_2_3_2 + P-masterList_2_3_3 + P-masterList_2_3_4 + P-masterList_2_3_5 + P-masterList_2_3_6 + P-masterList_2_3_7 + P-masterList_7_6_0 + P-masterList_7_6_1 + P-masterList_7_6_2 + P-masterList_7_6_3 + P-masterList_7_6_4 + P-masterList_7_6_5 + P-masterList_7_6_6 + P-masterList_7_6_7)
lola: after: (P-startNeg__broadcasting_1_5 + P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_1 + P-startNeg__broadcasting_0_5 + P-startNeg__broadcasting_0_4 + P-startNeg__broadcasting_0_3 + P-startNeg__broadcasting_0_2 + P-startNeg__broadcasting_0_1 + P-startNeg__broadcasting_2_1 + P-startNeg__broadcasting_2_2 + P-startNeg__broadcasting_2_3 + P-startNeg__broadcasting_2_4 + P-startNeg__broadcasting_2_5 + P-startNeg__broadcasting_2_6 + P-startNeg__broadcasting_2_7 + P-startNeg__broadcasting_3_1 + P-startNeg__broadcasting_3_2 + P-startNeg__broadcasting_3_3 + P-startNeg__broadcasting_3_4 + P-startNeg__broadcasting_3_5 + P-startNeg__broadcasting_3_6 + P-startNeg__broadcasting_3_7 + P-startNeg__broadcasting_4_1 + P-startNeg__broadcasting_4_2 + P-startNeg__broadcasting_4_3 + P-startNeg__broadcasting_4_4 + P-startNeg__broadcasting_4_5 + P-startNeg__broadcasting_4_6 + P-startNeg__broadcasting_4_7 + P-startNeg__broadcasting_7_7 + P-startNeg__broadcasting_7_6 + P-startNeg__broadcasting_7_5 + P-startNeg__broadcasting_7_4 + P-startNeg__broadcasting_7_3 + P-startNeg__broadcasting_7_2 + P-startNeg__broadcasting_7_1 + P-startNeg__broadcasting_5_1 + P-startNeg__broadcasting_5_2 + P-startNeg__broadcasting_5_3 + P-startNeg__broadcasting_5_4 + P-startNeg__broadcasting_5_5 + P-startNeg__broadcasting_5_6 + P-startNeg__broadcasting_5_7 + P-startNeg__broadcasting_6_7 + P-startNeg__broadcasting_6_6 + P-startNeg__broadcasting_6_5 + P-startNeg__broadcasting_6_4 + P-startNeg__broadcasting_6_3 + P-startNeg__broadcasting_6_2 + P-startNeg__broadcasting_6_1 + P-startNeg__broadcasting_0_6 + P-startNeg__broadcasting_0_7 + P-startNeg__broadcasting_1_6 + P-startNeg__broadcasting_1_7 <= 42)
lola: LP says that atomic proposition is always true: (P-startNeg__broadcasting_1_5 + P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_1 + P-startNeg__broadcasting_0_5 + P-startNeg__broadcasting_0_4 + P-startNeg__broadcasting_0_3 + P-startNeg__broadcasting_0_2 + P-startNeg__broadcasting_0_1 + P-startNeg__broadcasting_2_1 + P-startNeg__broadcasting_2_2 + P-startNeg__broadcasting_2_3 + P-startNeg__broadcasting_2_4 + P-startNeg__broadcasting_2_5 + P-startNeg__broadcasting_2_6 + P-startNeg__broadcasting_2_7 + P-startNeg__broadcasting_3_1 + P-startNeg__broadcasting_3_2 + P-startNeg__broadcasting_3_3 + P-startNeg__broadcasting_3_4 + P-startNeg__broadcasting_3_5 + P-startNeg__broadcasting_3_6 + P-startNeg__broadcasting_3_7 + P-startNeg__broadcasting_4_1 + P-startNeg__broadcasting_4_2 + P-startNeg__broadcasting_4_3 + P-startNeg__broadcasting_4_4 + P-startNeg__broadcasting_4_5 + P-startNeg__broadcasting_4_6 + P-startNeg__broadcasting_4_7 + P-startNeg__broadcasting_7_7 + P-startNeg__broadcasting_7_6 + P-startNeg__broadcasting_7_5 + P-startNeg__broadcasting_7_4 + P-startNeg__broadcasting_7_3 + P-startNeg__broadcasting_7_2 + P-startNeg__broadcasting_7_1 + P-startNeg__broadcasting_5_1 + P-startNeg__broadcasting_5_2 + P-startNeg__broadcasting_5_3 + P-startNeg__broadcasting_5_4 + P-startNeg__broadcasting_5_5 + P-startNeg__broadcasting_5_6 + P-startNeg__broadcasting_5_7 + P-startNeg__broadcasting_6_7 + P-startNeg__broadcasting_6_6 + P-startNeg__broadcasting_6_5 + P-startNeg__broadcasting_6_4 + P-startNeg__broadcasting_6_3 + P-startNeg__broadcasting_6_2 + P-startNeg__broadcasting_6_1 + P-startNeg__broadcasting_0_6 + P-startNeg__broadcasting_0_7 + P-startNeg__broadcasting_1_6 + P-startNeg__broadcasting_1_7 <= 42)
lola: place invariant simplifies atomic proposition
lola: before: (2 <= P-masterList_3_1_4)
lola: after: (2 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (P-poll__networl_3_0_RI_5 <= P-network_5_3_AnnP_1)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-network_7_7_RI_5 <= P-network_5_6_AnnP_0)
lola: after: (0 <= P-network_5_6_AnnP_0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-poll__networl_1_0_RI_1 <= P-poll__networl_6_6_AnnP_1)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (2 <= P-poll__networl_2_3_AI_5)
lola: after: (2 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-poll__networl_7_2_AskP_1)
lola: after: (3 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-network_2_0_RI_5)
lola: after: (3 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (2 <= P-network_0_2_RP_7)
lola: after: (2 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (P-network_7_7_AI_6 <= P-network_0_7_RP_6)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-network_2_2_AnnP_6 <= P-network_5_4_RI_3)
lola: after: (0 <= 0)
lola: always true
lola: LP says that atomic proposition is always false: (2 <= P-negotiation_7_1_NONE)
lola: LP says that atomic proposition is always true: (P-electedPrimary_6 <= P-sendAnnPs__broadcasting_6_2)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= P-poll__networl_5_1_AI_0)
lola: after: (1 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (P-network_2_2_AnnP_6 <= P-poll__networl_2_1_AnsP_0)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-poll__networl_1_2_RI_3)
lola: after: (3 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (1 <= P-poll__networl_6_1_AskP_4)
lola: after: (1 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (2 <= P-poll__networl_2_0_AI_1)
lola: after: (2 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (P-poll__networl_5_4_AnnP_6 <= P-poll__networl_2_5_AI_4)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-network_0_3_AskP_6)
lola: after: (3 <= 0)
lola: always false
lola: LP says that atomic proposition is always false: (3 <= P-network_7_6_AI_0)
lola: place invariant simplifies atomic proposition
lola: before: (P-poll__networl_2_1_AnnP_3 <= P-network_7_1_AnsP_1)
lola: after: (0 <= P-network_7_1_AnsP_1)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-poll__networl_4_2_AI_6 <= P-network_1_5_AI_3)
lola: after: (0 <= 0)
lola: always true
lola: A (G (((P-poll__handlingMessage_1 + P-poll__handlingMessage_0 + P-poll__handlingMessage_2 + P-poll__handlingMessage_3 + P-poll__handlingMessage_4 + P-poll__handlingMessage_5 + P-poll__handlingMessage_6 + P-poll__handlingMessage_7 <= 6) OR (7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)))) : E (F (FALSE)) : A (G (())) : A (G (())) : A (G (())) : E (F (())) : E (F (())) : A (G ((P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7))) : A (G (TRUE)) : A (G (())) : E (F (())) : A (G (())) : A (G (())) : E (F (FALSE)) : E (F (FALSE)) : E (F (()))
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:148
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:148
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:148
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:148
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:148
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:148
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:148
lola: computing a collection of formulas
lola: RUNNING
lola: subprocess 0 will run for 217 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-1 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 1 will run for 232 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola:
FORMULA NeoElection-PT-7-ReachabilityCardinality-2 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
========================================
lola: subprocess 2 will run for 248 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges

FORMULA NeoElection-PT-7-ReachabilityCardinality-3 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 3 will run for 267 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-4 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 4 will run for 290 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-5 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 5 will run for 316 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-6 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 6 will run for 348 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges

FORMULA NeoElection-PT-7-ReachabilityCardinality-8 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 7 will run for 386 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-9 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 8 will run for 435 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-10 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 9 will run for 497 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges

FORMULA NeoElection-PT-7-ReachabilityCardinality-11 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 10 will run for 580 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-12 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 11 will run for 696 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-13 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 12 will run for 870 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-14 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 13 will run for 1160 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 42 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-15 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 14 will run for 1740 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (G (((P-poll__handlingMessage_1 + P-poll__handlingMessage_0 + P-poll__handlingMessage_2 + P-poll__handlingMessage_3 + P-poll__handlingMessage_4 + P-poll__handlingMessage_5 + P-poll__handlingMessage_6 + P-poll__handlingMessage_7 <= 6) OR (7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEn... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: rewrite Frontend/Parser/formula_rewrite.k:631
lola: rewrite Frontend/Parser/formula_rewrite.k:694
lola: processed formula: A (G (((P-poll__handlingMessage_1 + P-poll__handlingMessage_0 + P-poll__handlingMessage_2 + P-poll__handlingMessage_3 + P-poll__handlingMessage_4 + P-poll__handlingMessage_5 + P-poll__handlingMessage_6 + P-poll__handlingMessage_7 <= 6) OR (7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEn... (shortened)
lola: processed formula length: 407
lola: 44 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: rewrite Frontend/Parser/formula_rewrite.k:631
lola: rewrite Frontend/Parser/formula_rewrite.k:694
lola: formula 0: ((7 <= P-poll__handlingMessage_1 + P-poll__handlingMessage_0 + P-poll__handlingMessage_2 + P-poll__handlingMessage_3 + P-poll__handlingMessage_4 + P-poll__handlingMessage_5 + P-poll__handlingMessage_6 + P-poll__handlingMessage_7) AND (P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0 <= 6))
lola: state equation: Generated DNF with 2 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to NeoElection-PT-7-ReachabilityCardinality-14-0.sara
lola: state equation: calling and running sara
sara: try reading problem file NeoElection-PT-7-ReachabilityCardinality-14-0.sara.
lola: SUBRESULT
lola: result: no
lola: produced by: state space
lola: The predicate is not invariant.
lola: 439 markings, 438 edges
lola: ========================================

FORMULA NeoElection-PT-7-ReachabilityCardinality-0 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 15 will run for 3480 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (G ((P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7)))
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: rewrite Frontend/Parser/formula_rewrite.k:631
lola: rewrite Frontend/Parser/formula_rewrite.k:694
lola: processed formula: A (G ((P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7)))
lola: processed formula length: 280
lola: 44 rewrites
lola: closed formula file NeoElection-PT-7-ReachabilityCardinality.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: rewrite Frontend/Parser/formula_rewrite.k:631
lola: rewrite Frontend/Parser/formula_rewrite.k:694
lola: formula 0: (P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7 + 1 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: state equation: Generated DNF with 1 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to NeoElection-PT-7-ReachabilityCardinality-15-0.sara
lola: state equation: calling and running sara
lola: SUBRESULT
lola: result: no
lola: produced by: state space
lola: The predicate is not invariant.
lola: 13 markings, 12 edges
lola: ========================================
sara: try reading problem file NeoElection-PT-7-ReachabilityCardinality-15-0.sara.

FORMULA NeoElection-PT-7-ReachabilityCardinality-7 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: RESULT
lola:
SUMMARY: no no yes yes yes no no no yes yes no yes yes no no no
lola:
preliminary result: no no yes yes yes no no no yes yes no yes yes no no no
lola: memory consumption: 60352 KB
lola: time consumption: 89 seconds
sara: place or transition ordering is non-deterministic

BK_TIME_CONFINEMENT_REACHED

--------------------
content from stderr:

Sequence of Actions to be Executed by the VM

This is useful if one wants to reexecute the tool in the VM from the submitted image disk.

set -x
# this is for BenchKit: configuration of major elements for the test
export BK_INPUT="NeoElection-PT-7"
export BK_EXAMINATION="ReachabilityCardinality"
export BK_TOOL="lola"
export BK_RESULT_DIR="/tmp/BK_RESULTS/OUTPUTS"
export BK_TIME_CONFINEMENT="3600"
export BK_MEMORY_CONFINEMENT="16384"

# this is specific to your benchmark or test

export BIN_DIR="$HOME/BenchKit/bin"

# remove the execution directoty if it exists (to avoid increse of .vmdk images)
if [ -d execution ] ; then
rm -rf execution
fi

tar xzf /home/mcc/BenchKit/INPUTS/NeoElection-PT-7.tgz
mv NeoElection-PT-7 execution
cd execution
pwd
ls -lh

# this is for BenchKit: explicit launching of the test
echo "====================================================================="
echo " Generated by BenchKit 2-3637"
echo " Executing tool lola"
echo " Input is NeoElection-PT-7, examination is ReachabilityCardinality"
echo " Time confinement is $BK_TIME_CONFINEMENT seconds"
echo " Memory confinement is 16384 MBytes"
echo " Number of cores is 4"
echo " Run identifier is r112-csrt-152666469300327"
echo "====================================================================="
echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "ReachabilityCardinality" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "ReachabilityCardinality" != "StateSpace" ] ; then
echo "The expected result is a vector of booleans"
echo BOOL_VECTOR
else
echo "no data necessary for post analysis"
fi
echo
if [ -f "ReachabilityCardinality.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property ReachabilityCardinality.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "ReachabilityCardinality.xml" ] ; then # for cunf (txt files deleted;-)
echo echo "here is the order used to build the result vector(from xml file)"
for x in $(grep '' ReachabilityCardinality.xml | cut -d '>' -f 2 | cut -d '<' -f 1 | sort -u) ; do
echo "FORMULA_NAME $x"
done
fi
echo
echo "=== Now, execution of the tool begins"
echo
echo -n "BK_START "
date -u +%s%3N
echo
timeout -s 9 $BK_TIME_CONFINEMENT bash -c "/home/mcc/BenchKit/BenchKit_head.sh 2> STDERR ; echo ; echo -n \"BK_STOP \" ; date -u +%s%3N"
if [ $? -eq 137 ] ; then
echo
echo "BK_TIME_CONFINEMENT_REACHED"
fi
echo
echo "--------------------"
echo "content from stderr:"
echo
cat STDERR ;