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Model Checking Contest 2018
8th edition, Bratislava, Slovakia, June 26, 2018
Execution of r112-csrt-152666469300317
Last Updated
June 26, 2018

About the Execution of LoLA for NeoElection-PT-6

Execution Summary
Max Memory
Used (MB)		 Time wait (ms) CPU Usage (ms) I/O Wait (ms) Computed Result Execution
Status
900.790 3570597.00 3707193.00 595.50 6 0 0 30 6 6 36 ? 0 0 0 0 0 0 0 0 normal

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 13M
-rw-r--r-- 1 mcc users 164K May 15 18:54 CTLCardinality.txt
-rw-r--r-- 1 mcc users 400K May 15 18:54 CTLCardinality.xml
-rw-r--r-- 1 mcc users 321K May 15 18:54 CTLFireability.txt
-rw-r--r-- 1 mcc users 880K 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 129K May 15 18:54 LTLCardinality.txt
-rw-r--r-- 1 mcc users 300K May 15 18:54 LTLCardinality.xml
-rw-r--r-- 1 mcc users 18K May 15 18:54 LTLFireability.txt
-rw-r--r-- 1 mcc users 56K May 15 18:54 LTLFireability.xml
-rw-r--r-- 1 mcc users 296K May 15 18:54 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 667K 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 451K May 15 18:54 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 1.3M May 15 18:54 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 106K May 15 18:54 UpperBounds.txt
-rw-r--r-- 1 mcc users 202K 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 7.3M May 15 18:50 model.pnml
=====================================================================
Generated by BenchKit 2-3637
Executing tool lola
Input is NeoElection-PT-6, examination is UpperBounds
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r112-csrt-152666469300317
=====================================================================

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

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

The expected result is a vector of positive values
NUM_VECTOR

here is the order used to build the result vector(from text file)
FORMULA_NAME NeoElection-PT-6-UpperBounds-00
FORMULA_NAME NeoElection-PT-6-UpperBounds-01
FORMULA_NAME NeoElection-PT-6-UpperBounds-02
FORMULA_NAME NeoElection-PT-6-UpperBounds-03
FORMULA_NAME NeoElection-PT-6-UpperBounds-04
FORMULA_NAME NeoElection-PT-6-UpperBounds-05
FORMULA_NAME NeoElection-PT-6-UpperBounds-06
FORMULA_NAME NeoElection-PT-6-UpperBounds-07
FORMULA_NAME NeoElection-PT-6-UpperBounds-08
FORMULA_NAME NeoElection-PT-6-UpperBounds-09
FORMULA_NAME NeoElection-PT-6-UpperBounds-10
FORMULA_NAME NeoElection-PT-6-UpperBounds-11
FORMULA_NAME NeoElection-PT-6-UpperBounds-12
FORMULA_NAME NeoElection-PT-6-UpperBounds-13
FORMULA_NAME NeoElection-PT-6-UpperBounds-14
FORMULA_NAME NeoElection-PT-6-UpperBounds-15

=== Now, execution of the tool begins

BK_START 1527028471065

info: Time: 3600 - MCC
===========================================================================================
prep: translating NeoElection-PT-6 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-6 formula UpperBounds into LoLA format
===========================================================================================
prep: translating PT formula complete
vrfy: Checking UpperBounds @ NeoElection-PT-6 @ 3570 seconds
lola: LoLA will run for 3570 seconds at most (--timelimit)
lola: NET
lola: reading net from model.pnml.lola
lola: finished parsing
lola: closed net file model.pnml.lola
lola: 13265/65536 symbol table entries, 1397 collisions
lola: preprocessing...
lola: Size of bit vector: 4830
lola: finding significant places
lola: 4830 places, 8435 transitions, 1197 significant places
lola: computing forward-conflicting sets
lola: computing back-conflicting sets
lola: 2401 transition conflict sets
lola: TASK
lola: reading formula from NeoElection-PT-6-UpperBounds.task
lola: LP says that atomic proposition is always true: (P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (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_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_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_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_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_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_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_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_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_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_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + 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_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_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_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + 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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_3_3_RI_6 + P-poll__networl_3_3_RI_5 + P-poll__networl_3_3_RI_4 + P-poll__networl_3_3_RI_3 + 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_3_3_RI_2 + P-poll__networl_3_3_RI_1 + P-poll__networl_3_3_AnsP_0 + P-poll__networl_3_3_RI_0 + P-poll__networl_0_0_AskP_6 + P-poll__networl_0_0_AskP_5 + P-poll__networl_0_0_AskP_4 + P-poll__networl_0_0_AskP_3 + P-poll__networl_0_0_AskP_2 + P-poll__networl_0_0_AskP_1 + P-poll__networl_0_0_AskP_0 + P-poll__networl_3_0_AI_6 + P-poll__networl_3_0_AI_5 + P-poll__networl_3_0_AI_4 + 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_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_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_6_4_AnsP_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_4_RI_6 + P-poll__networl_1_4_RI_5 + 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_4_RI_4 + P-poll__networl_1_4_RI_3 + 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_1_4_RI_2 + P-poll__networl_1_4_RI_1 + P-poll__networl_1_4_RI_0 + 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_1_1_AI_2 + 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_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_1_1_AI_1 + P-poll__networl_1_1_AI_0 + 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_2_5_AskP_6 + P-poll__networl_0_3_AI_4 + P-poll__networl_2_5_AskP_5 + P-poll__networl_0_3_AI_5 + P-poll__networl_2_5_AskP_4 + P-poll__networl_0_3_AI_6 + P-poll__networl_2_5_AskP_3 + P-poll__networl_2_5_AskP_2 + P-poll__networl_2_5_AskP_1 + 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_2_5_AskP_0 + 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_2_2_AI_0 + 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_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_6_5_AI_6 + 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_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_6_5_AI_5 + 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_6_5_AI_4 + 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_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_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_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_4_2_AnsP_0 + P-poll__networl_4_0_RP_6 + P-poll__networl_4_0_RP_5 + P-poll__networl_4_0_RP_4 + 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_6 + 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_0_2_AnnP_5 + P-poll__networl_0_2_AnnP_4 + P-poll__networl_0_2_AnnP_3 + P-poll__networl_0_2_AnnP_2 + P-poll__networl_0_2_AnnP_1 + P-poll__networl_0_2_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_2_0_AnnP_0 + P-poll__networl_2_0_AnnP_1 + 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_3_6_AnsP_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_4_6_AI_6 + P-poll__networl_4_6_AI_5 + P-poll__networl_4_6_AI_4 + P-poll__networl_4_6_AI_3 + P-poll__networl_4_6_AI_2 + 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_6_AI_1 + 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_6_AI_0 + P-poll__networl_1_1_AnsP_0 + P-poll__networl_2_1_RP_6 + P-poll__networl_2_1_RP_5 + 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_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_2_1_RP_4 + 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_2_1_RP_3 + P-poll__networl_2_1_RP_2 + P-poll__networl_2_1_RP_1 + P-poll__networl_2_1_RP_0 + 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_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_3_3_AI_4 + P-poll__networl_3_3_AI_5 + P-poll__networl_3_3_AI_6 + 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_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_2_4_AnsP_0 + 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_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_0_2_RP_2 + 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_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_0_2_RP_1 + P-poll__networl_0_2_RP_0 + P-poll__networl_5_1_AnsP_0 + 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_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_6_AskP_6 + P-poll__networl_5_6_AskP_5 + P-poll__networl_5_6_AskP_4 + P-poll__networl_5_6_AskP_3 + 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_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_5_6_AskP_2 + P-poll__networl_5_6_AskP_1 + P-poll__networl_5_6_AskP_0 + P-poll__networl_4_5_AnsP_0 + 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_5_6_RP_6 + 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_6_RP_2 + P-poll__networl_5_6_RP_1 + P-poll__networl_5_6_RP_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_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_2_0_AnsP_0 + 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_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_3_3_AnnP_6 + 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_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_3_3_AnnP_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_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_1_4_AnsP_0 + P-poll__networl_6_0_RI_6 + P-poll__networl_2_5_AI_0 + P-poll__networl_6_0_RI_5 + 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_6_0_RI_4 + P-poll__networl_6_0_RI_3 + P-poll__networl_6_0_RI_2 + P-poll__networl_6_0_RI_1 + P-poll__networl_6_0_RI_0 + P-poll__networl_3_0_AnsP_0 + 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_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_6_0_AnsP_0 + P-poll__networl_6_2_AskP_6 + P-poll__networl_6_2_AskP_5 + 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_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_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_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_2_AskP_1 + P-poll__networl_6_2_AskP_0 + 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_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_5_5_AnsP_0 + 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_5_4_AnsP_0 + 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_2_2_RI_1 + 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_2_2_RI_0 + 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_1_6_AskP_6 + P-poll__networl_1_6_AskP_5 + P-poll__networl_5_0_RI_0 + P-poll__networl_5_0_RI_1 + P-poll__networl_5_0_RI_2 + P-poll__networl_5_0_RI_3 + P-poll__networl_5_0_RI_4 + P-poll__networl_5_0_RI_5 + P-poll__networl_5_0_RI_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_1_6_AskP_4 + P-poll__networl_1_6_AskP_3 + P-poll__networl_1_6_AskP_2 + 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_1_6_AskP_1 + P-poll__networl_1_6_AskP_0 + 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_6_4_AnnP_6 + P-poll__networl_6_4_AnnP_5 + 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_2_3_AnsP_0 + P-poll__networl_6_4_AnnP_4 + P-poll__networl_6_4_AnnP_3 + 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_6 + P-poll__networl_0_3_RI_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_0_3_RI_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_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_0_3_RI_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_0_3_RI_2 + P-poll__networl_0_3_RI_1 + 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_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_0_3_RI_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_0_0_AI_6 + P-poll__networl_0_0_AI_5 + P-poll__networl_0_0_AI_4 + P-poll__networl_0_0_AI_3 + P-poll__networl_0_0_AI_2 + P-poll__networl_0_0_AI_1 + P-poll__networl_0_0_AI_0 + 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_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_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_6_3_AnsP_0 + P-poll__networl_5_4_AI_6 + 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_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_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_5_4_AI_1 + 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_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_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_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_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_3_2_AnsP_0 + 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_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_AI_3 + 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_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_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_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_6_AnsP_0 + 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_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_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_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_0_1_AnsP_0 + 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_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_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_1_6_AI_2 + P-poll__networl_1_6_AI_1 + 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_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_6_AI_0 + P-poll__networl_6_4_RP_6 + P-poll__networl_6_4_RP_5 + P-poll__networl_6_4_RP_4 + P-poll__networl_6_4_RP_3 + P-poll__networl_6_4_RP_2 + 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_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_6_4_RP_1 + 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_6_4_RP_0 + P-poll__networl_6_6_AnsP_0 + P-poll__networl_2_4_AnnP_6 + P-poll__networl_2_4_AnnP_5 + 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_2_4_AnnP_4 + P-poll__networl_2_4_AnnP_3 + P-poll__networl_2_4_AnnP_2 + P-poll__networl_2_4_AnnP_1 + P-poll__networl_2_4_AnnP_0 + 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_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_2_1_AnsP_0 + 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_4_5_RP_1 + P-poll__networl_4_1_AnsP_0 + P-poll__networl_4_5_RP_0 + P-poll__networl_5_3_AskP_6 + 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_5_3_AskP_5 + 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_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_3_5_AnsP_0 + P-poll__networl_2_6_RP_1 + P-poll__networl_2_6_RP_0 + 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_4_6_AnsP_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_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_1_0_AnsP_0 + P-poll__networl_3_0_AnnP_6 + P-poll__networl_3_0_AnnP_5 + 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_3_0_AnnP_4 + 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_3_0_AnnP_3 + P-poll__networl_3_0_AnnP_2 + 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_3_0_AnnP_1 + P-poll__networl_3_0_AnnP_0 + P-poll__networl_3_0_RI_6 + P-poll__networl_3_0_RI_5 + P-poll__networl_3_0_RI_4 + P-poll__networl_3_0_RI_3 + P-poll__networl_3_0_RI_2 + 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_0_RI_1 + 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_3_0_RI_0 + 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_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_5_5_AnnP_6 + P-poll__networl_5_5_AnnP_5 + P-poll__networl_5_5_AnnP_4 + 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_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_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_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_5_0_AnsP_0 + P-poll__networl_1_1_RI_6 + 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_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_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_5_2_AnsP_0 + 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_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_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_4_4_AnsP_0 + P-poll__networl_6_5_RI_6 + P-poll__networl_6_5_RI_5 + 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_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_6_2_AI_6 + P-poll__networl_6_2_AI_5 + P-poll__networl_6_2_AI_4 + 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_6 + 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_1_3_AskP_5 + P-poll__networl_1_3_AskP_4 + P-poll__networl_1_3_AskP_3 + P-poll__networl_1_3_AskP_2 + P-poll__networl_1_3_AskP_1 + P-poll__networl_1_3_AskP_0 + 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_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_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_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_6_1_AnnP_6 + 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_1_AnnP_5 + P-poll__networl_1_3_AnsP_0 + P-poll__networl_6_1_AnnP_4 + P-poll__networl_6_1_AnnP_3 + P-poll__networl_6_1_AnnP_2 + P-poll__networl_6_1_AnnP_1 + P-poll__networl_6_1_AnnP_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_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_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_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_5_3_AI_0 + P-poll__networl_5_3_AI_1 + P-poll__networl_5_3_AI_2 + P-poll__networl_5_3_AI_3 + P-poll__networl_5_3_AI_4 + P-poll__networl_5_3_AI_5 + P-poll__networl_5_3_AI_6 + 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_4_6_RI_6 + 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_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_6 + P-poll__networl_4_3_AI_5 + 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_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_4_3_AI_4 + P-poll__networl_4_3_AI_3 + P-poll__networl_0_6_AnsP_0 + P-poll__networl_4_3_AI_2 + P-poll__networl_5_3_AnsP_0 + P-poll__networl_4_3_AI_1 + P-poll__networl_4_3_AI_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_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_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_4_0_RI_0 + P-poll__networl_4_0_RI_1 + P-poll__networl_4_0_RI_2 + P-poll__networl_4_0_RI_3 + P-poll__networl_4_0_RI_4 + P-poll__networl_4_0_RI_5 + P-poll__networl_4_0_RI_6 + 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_2_4_AI_6 + P-poll__networl_2_4_AI_5 + P-poll__networl_2_4_AI_4 + P-poll__networl_2_4_AI_3 + P-poll__networl_2_4_AI_2 + P-poll__networl_2_4_AI_1 + P-poll__networl_2_4_AI_0 + 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_1_5_AnnP_6 + P-poll__networl_1_5_AnnP_5 + P-poll__networl_1_5_AnnP_4 + P-poll__networl_1_5_AnnP_3 + 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_1_5_AnnP_2 + 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_2_2_AnsP_0 + P-poll__networl_1_5_AnnP_1 + P-poll__networl_1_5_AnnP_0 + 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_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_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_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_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_1_6_AnsP_0 + P-poll__networl_0_5_AI_6 + P-poll__networl_0_5_AI_5 + P-poll__networl_0_5_AI_4 + P-poll__networl_0_5_AI_3 + P-poll__networl_0_5_AI_2 + 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_0_5_AI_1 + P-poll__networl_0_5_AI_0 + P-poll__networl_1_2_AnsP_0 + 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_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_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_5_3_RP_1 + P-poll__networl_5_3_RP_0 + P-poll__networl_6_2_AnsP_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_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_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_4_4_AskP_6 + P-poll__networl_4_4_AskP_5 + P-poll__networl_4_4_AskP_4 + P-poll__networl_4_4_AskP_3 + P-poll__networl_4_4_AskP_2 + P-poll__networl_4_4_AskP_1 + P-poll__networl_4_4_AskP_0 + P-poll__networl_3_4_RP_6 + P-poll__networl_3_4_RP_5 + 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_4_RP_4 + P-poll__networl_3_4_RP_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_3_4_RP_2 + P-poll__networl_3_4_RP_1 + P-poll__networl_5_6_AnsP_0 + P-poll__networl_3_4_RP_0 + 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_2_1_AnnP_6 + 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_2_1_AnnP_5 + P-poll__networl_3_1_AnsP_0 + P-poll__networl_2_1_AnnP_4 + P-poll__networl_2_1_AnnP_3 + P-poll__networl_2_1_AnnP_2 + P-poll__networl_2_1_AnnP_1 + P-poll__networl_2_1_AnnP_0 + 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_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_1_5_RP_6 + P-poll__networl_1_5_RP_5 + P-poll__networl_1_5_RP_4 + 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_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_2_5_AnsP_0 + 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_5_0_AskP_0 + 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_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_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_0_0_AnsP_0 + 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_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_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_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_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_4_3_AnsP_0 + 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_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_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_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_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_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_0_AnsP_0 + P-poll__networl_0_0_RI_6 + P-poll__networl_0_0_RI_5 + P-poll__networl_0_0_RI_4 + 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_0_0_RI_3 + P-poll__networl_0_0_RI_2 + P-poll__networl_0_0_RI_1 + P-poll__networl_0_0_RI_0 + P-poll__networl_0_4_AskP_6 + P-poll__networl_0_4_AskP_5 + 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_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_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_3_4_AnsP_0 + 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_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_5_2_AnnP_0 + 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_5_4_RI_6 + 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_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_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_5_1_AI_6 + P-poll__networl_5_1_AI_5 + 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_5_1_AI_4 + P-poll__networl_5_1_AI_3 + P-poll__networl_5_1_AI_2 + P-poll__networl_5_1_AI_1 + P-poll__networl_5_1_AI_0 + 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_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_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_1_3_AI_4 + P-poll__networl_1_3_AI_5 + P-poll__networl_1_3_AI_6 + 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_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_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_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_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 <= 0)
lola: after: (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_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_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_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_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_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_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_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_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_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_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + 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_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_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_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + 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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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 <= 0)
lola: LP says that atomic proposition is always true: (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_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_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_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_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_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_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_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_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_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_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + 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_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_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_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + 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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (P-network_2_2_AnnP_0 + P-network_3_0_RI_0 + P-network_5_1_AskP_0 + P-network_2_6_RP_0 + P-network_1_1_RI_0 + 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_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_3_AI_0 + 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_5_0_AnsP_1 + P-network_5_0_AnsP_0 + P-network_4_5_AskP_0 + P-network_4_5_RP_0 + P-network_2_4_AI_0 + P-network_1_1_AskP_0 + 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_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_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_6 + P-network_6_4_RP_0 + 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_1_0_AnsP_1 + P-network_1_0_AnsP_0 + P-network_1_5_RP_0 + P-network_2_0_AskP_0 + P-network_4_2_AskP_0 + P-network_3_5_AnsP_6 + P-network_3_5_AnsP_5 + P-network_3_5_AnsP_4 + P-network_3_5_AnsP_3 + P-network_3_5_AnsP_2 + P-network_1_6_AI_0 + P-network_3_5_AnsP_1 + P-network_3_5_AnsP_0 + P-network_0_0_RI_0 + P-network_4_4_AnnP_0 + P-network_1_0_RP_0 + P-network_5_4_RI_0 + 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_4_1_AnsP_0 + P-network_5_1_AI_0 + P-network_3_5_RI_0 + P-network_3_5_AI_0 + P-network_0_2_AskP_0 + P-network_3_2_AI_0 + P-network_6_6_AnsP_6 + 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_6_2_AnnP_0 + P-network_5_0_AnnP_0 + P-network_1_6_RI_0 + P-network_1_3_AI_0 + P-network_6_1_RP_0 + P-network_4_2_RP_0 + P-network_0_4_AnnP_0 + P-network_1_4_AskP_0 + 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_4_AI_0 + P-network_0_1_AnsP_0 + P-network_2_3_RP_0 + P-network_3_3_AskP_0 + P-network_2_6_AnsP_6 + P-network_2_6_AnsP_5 + 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_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_1_0_AnnP_0 + P-network_0_0_AI_0 + P-network_3_5_AnnP_0 + P-network_0_3_RI_0 + P-network_6_2_RI_0 + 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_3_2_AnsP_2 + P-network_3_2_AnsP_1 + P-network_3_2_AnsP_0 + P-network_6_4_AskP_0 + P-network_5_6_AnnP_0 + P-network_4_3_RI_0 + P-network_4_0_AI_0 + P-network_4_1_AnnP_0 + P-network_2_4_RI_0 + P-network_2_1_AI_0 + P-network_6_0_AskP_0 + P-network_6_6_AnnP_0 + P-network_0_5_RI_0 + P-network_0_2_AI_0 + 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_2_2_RI_0 + 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_4_AskP_0 + P-network_3_1_AnnP_0 + P-network_3_1_RP_0 + P-network_4_1_RI_0 + P-network_1_2_RP_0 + P-network_0_1_AnnP_0 + P-network_6_6_RP_0 + P-network_3_0_AskP_0 + P-network_2_6_AnnP_0 + 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_5_5_AskP_0 + P-network_5_1_RI_0 + P-network_3_2_AnnP_0 + P-network_3_2_RI_0 + P-network_6_1_AskP_0 + P-network_1_3_RI_0 + P-network_1_0_AI_0 + P-network_5_4_AskP_0 + 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_6_0_RI_0 + P-network_5_4_AnsP_0 + 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_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_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_2_5_AnnP_0 + 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_5_6_RP_0 + 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_2_3_AnnP_0 + P-network_2_0_AnsP_6 + P-network_2_0_AnsP_5 + P-network_2_0_AnsP_4 + P-network_0_0_AnnP_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_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_5_2_AskP_0 + P-network_2_1_RI_0 + 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_0_2_RI_0 + P-network_0_6_AskP_0 + P-network_5_4_AnnP_0 + P-network_2_1_RP_0 + P-network_5_6_RI_0 + P-network_2_3_AskP_0 + P-network_5_3_AI_0 + 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_4_6_AI_0 + P-network_5_1_AnsP_0 + P-network_3_4_AI_0 + P-network_1_2_AskP_0 + P-network_4_0_RP_0 + P-network_6_0_AnnP_0 + P-network_0_5_AnsP_6 + P-network_0_5_AnsP_5 + P-network_0_5_AnsP_4 + 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_0_5_AnsP_3 + P-network_0_5_AnsP_2 + P-network_0_5_AnsP_1 + P-network_0_5_AnsP_0 + P-network_1_5_AI_0 + P-network_6_3_RP_0 + P-network_6_5_AI_0 + P-network_4_4_RP_0 + P-network_6_5_AnnP_0 + P-network_1_4_AnnP_0 + 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_1_1_AnsP_0 + P-network_2_5_RP_0 + P-network_1_1_AI_0 + P-network_4_3_AskP_0 + P-network_0_6_RP_0 + P-network_3_6_AnsP_6 + P-network_3_6_AnsP_5 + P-network_1_4_RI_0 + 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_3_6_AnsP_0 + P-network_2_0_AnnP_0 + P-network_1_0_RI_0 + P-network_4_5_AnnP_0 + P-network_4_0_AnnP_0 + P-network_6_4_RI_0 + P-network_4_2_AnsP_6 + 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_3_0_AI_0 + 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_2_AnsP_0 + P-network_6_1_AI_0 + P-network_4_5_RI_0 + P-network_3_3_RI_0 + P-network_0_3_AskP_0 + P-network_4_2_AI_0 + P-network_5_1_AnnP_0 + P-network_2_6_RI_0 + P-network_2_3_AI_0 + P-network_6_3_AskP_0 + P-network_0_4_AI_0 + P-network_5_2_RP_0 + P-network_0_5_AnnP_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_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_5_2_RI_0 + P-network_3_3_RP_0 + P-network_3_4_AskP_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_3_3_AnsP_6 + 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_1_5_RI_0 + P-network_0_0_AskP_0 + P-network_1_2_AI_0 + 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_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_6_0_RP_0 + P-network_6_6_AI_0 + P-network_2_5_AskP_0 + P-network_4_1_RP_0 + P-network_2_2_RP_0 + P-network_0_2_AnnP_0 + P-network_3_2_AskP_0 + P-network_0_3_RP_0 + P-network_3_1_AskP_0 + P-network_1_3_RP_0 + P-network_2_4_AnsP_6 + P-network_2_4_AnsP_5 + 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_2_4_AnsP_4 + P-network_2_4_AnsP_3 + P-network_2_4_AnsP_2 + P-network_2_4_AnsP_1 + P-network_2_4_AnsP_0 + P-network_0_3_AnnP_0 + P-network_5_6_AskP_0 + P-network_6_1_RI_0 + P-network_3_2_RP_0 + P-network_3_3_AnnP_0 + P-network_4_2_RI_0 + 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_2_3_RI_0 + P-network_2_0_AI_0 + 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_5_1_RP_0 + P-network_0_1_AI_0 + P-network_2_6_AskP_0 + P-network_1_6_AskP_0 + P-network_6_4_AnnP_0 + P-network_0_3_AI_0 + P-network_5_5_AI_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_0_6_RI_0 + P-network_3_0_RP_0 + P-network_3_6_AI_0 + P-network_2_2_AskP_0 + P-network_1_1_RP_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_1_5_AnsP_6 + P-network_1_5_AnsP_5 + P-network_1_5_AnsP_4 + P-network_1_5_AnsP_3 + P-network_2_2_AI_0 + P-network_1_5_AnsP_2 + P-network_1_5_AnsP_1 + P-network_1_5_AnsP_0 + P-network_6_5_RP_0 + P-network_0_1_AskP_0 + P-network_4_6_RP_0 + P-network_2_4_AnnP_0 + 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_5_RI_0 + P-network_2_1_AnsP_1 + P-network_2_1_AnsP_0 + P-network_5_0_RI_0 + P-network_5_3_AskP_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_3_1_RI_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_3_0_AnnP_0 + P-network_1_2_RI_0 + P-network_5_5_AnnP_0 + P-network_4_4_RI_0 + P-network_6_6_RI_0 + P-network_6_3_AI_0 + 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_4_3_AnnP_0 + P-network_4_4_AI_0 + P-network_1_3_AskP_0 + P-network_6_0_AI_0 + P-network_6_1_AnnP_0 + 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_0_6_AI_0 + P-network_6_3_RI_0 + P-network_5_4_RP_0 + P-network_1_5_AnnP_0 + 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_1_6_RP_0 + P-network_6_6_AskP_0 + P-network_2_1_AnnP_0 + P-network_2_0_RI_0 + P-network_5_0_AskP_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_4_6_AnnP_0 + P-network_0_1_RI_0 + 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_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_4_1_AskP_0 + P-network_3_3_AI_0 + P-network_0_5_RP_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_0_3_AnsP_6 + P-network_1_2_AnnP_0 + 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_2_4_RP_0 + P-network_4_3_RP_0 + P-network_3_5_AskP_0 + P-network_2_4_RP_5 + P-network_2_4_RP_6 + P-network_2_4_RP_4 + P-network_2_4_RP_3 + P-network_2_4_RP_2 + 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_2_4_RP_1 + 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_1_2_AnnP_6 + P-network_1_2_AnnP_5 + P-network_1_2_AnnP_4 + P-network_1_2_AnnP_3 + P-network_1_2_AnnP_2 + P-network_1_2_AnnP_1 + 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_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_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_4_AI_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_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_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_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_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_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_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_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_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_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_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_6_6_AskP_6 + 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_6_6_AskP_5 + 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_6_6_AskP_4 + P-network_6_6_AskP_3 + P-network_6_6_AskP_2 + P-network_6_6_AskP_1 + 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_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_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_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_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_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_6_3_RI_1 + 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_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_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_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_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_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_0_AI_2 + P-network_6_0_AI_1 + P-network_4_3_AnnP_6 + 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_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_4_3_AnnP_1 + P-network_4_4_AI_1 + P-network_4_4_AI_2 + P-network_4_4_AI_3 + P-network_4_4_AI_4 + P-network_4_4_AI_5 + P-network_4_4_AI_6 + 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_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_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_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_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_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_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_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_2_5_RI_6 + P-network_2_5_RI_5 + P-network_2_5_RI_4 + 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_2_5_RI_3 + P-network_5_0_RI_1 + P-network_5_0_RI_2 + P-network_5_0_RI_3 + P-network_5_0_RI_4 + P-network_5_0_RI_5 + P-network_5_0_RI_6 + P-network_2_5_RI_2 + P-network_2_5_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_0_1_AskP_6 + 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_0_1_AskP_5 + P-network_0_1_AskP_4 + P-network_0_1_AskP_3 + P-network_0_1_AskP_2 + P-network_0_1_AskP_1 + P-network_2_2_AI_6 + P-network_2_2_AI_5 + P-network_2_2_AI_4 + 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_2_2_AI_3 + P-network_2_2_AI_2 + P-network_2_2_AI_1 + 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_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_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_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_0_6_RI_1 + 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_0_3_AI_6 + 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_0_3_AI_5 + P-network_0_3_AI_4 + P-network_0_3_AI_3 + P-network_0_3_AI_2 + P-network_0_3_AI_1 + P-network_2_6_AskP_6 + P-network_2_6_AskP_5 + 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_2_6_AskP_4 + 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_2_6_AskP_3 + P-network_2_6_AskP_2 + P-network_2_6_AskP_1 + P-network_5_1_RP_6 + P-network_5_1_RP_5 + P-network_5_1_RP_4 + P-network_5_1_RP_3 + P-network_5_1_RP_2 + 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_5_1_RP_1 + 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_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_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_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_3_2_RP_6 + P-network_3_2_RP_5 + P-network_3_2_RP_4 + P-network_3_2_RP_3 + 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_3_2_RP_2 + P-network_3_2_RP_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_0_3_AnnP_6 + P-network_0_3_AnnP_5 + P-network_0_3_AnnP_4 + 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_0_3_AnnP_3 + 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_0_3_AnnP_2 + P-network_0_3_AnnP_1 + P-network_1_3_RP_6 + P-network_1_3_RP_5 + P-network_1_3_RP_4 + P-network_1_3_RP_3 + P-network_1_3_RP_2 + P-network_1_3_RP_1 + 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_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_2_AskP_2 + 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_3_2_AskP_1 + P-network_0_3_RP_6 + 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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_3_4_AnnP_6 + P-network_3_4_AnnP_5 + P-network_3_4_AnnP_4 + 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_4_AnnP_3 + 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_3_4_AnnP_2 + 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_5_2_RI_6 + 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_5_2_RI_5 + P-network_5_2_RI_4 + P-network_5_2_RI_3 + P-network_5_2_RI_2 + 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_5_2_RI_1 + 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_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_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_0_4_AI_1 + P-network_0_4_AI_2 + P-network_0_4_AI_3 + P-network_0_4_AI_4 + P-network_6_3_AskP_6 + P-network_0_4_AI_5 + P-network_6_3_AskP_5 + P-network_0_4_AI_6 + 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_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_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_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_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_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_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_3_3_RI_1 + 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_6_1_AI_1 + P-network_6_1_AI_2 + P-network_3_0_AI_6 + P-network_6_1_AI_3 + P-network_3_0_AI_5 + P-network_6_1_AI_4 + P-network_3_0_AI_4 + P-network_6_1_AI_5 + P-network_3_0_AI_3 + P-network_6_1_AI_6 + P-network_3_0_AI_2 + P-network_3_0_AI_1 + P-network_4_0_AnnP_6 + P-network_4_0_AnnP_5 + 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_4_0_AnnP_4 + P-network_4_0_AnnP_3 + P-network_4_0_AnnP_2 + P-network_4_0_AnnP_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_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_4_RI_6 + 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_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_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_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_1_1_AI_6 + P-network_1_1_AI_5 + P-network_1_1_AI_4 + P-network_1_1_AI_3 + P-network_1_1_AI_2 + P-network_1_1_AI_1 + 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_6_5_AnnP_6 + P-network_6_5_AnnP_5 + P-network_6_5_AnnP_4 + P-network_6_5_AnnP_3 + P-network_6_5_AnnP_2 + 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_6_5_AnnP_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_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_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_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_4_0_RP_6 + P-network_4_0_RP_5 + P-network_4_0_RP_4 + P-network_4_0_RP_3 + P-network_6_0_AnnP_1 + P-network_6_0_AnnP_2 + P-network_4_0_RP_2 + P-network_6_0_AnnP_3 + P-network_4_0_RP_1 + P-network_6_0_AnnP_4 + P-network_6_0_AnnP_5 + P-network_6_0_AnnP_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_3_4_AI_1 + P-network_4_6_AI_6 + P-network_3_4_AI_2 + P-network_4_6_AI_5 + P-network_3_4_AI_3 + P-network_4_6_AI_4 + P-network_3_4_AI_4 + P-network_4_6_AI_3 + P-network_3_4_AI_5 + P-network_4_6_AI_2 + P-network_3_4_AI_6 + P-network_4_6_AI_1 + 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_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_2_1_RP_6 + 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_2_1_RP_5 + P-network_2_1_RP_4 + P-network_2_1_RP_3 + P-network_2_1_RP_2 + P-network_2_1_RP_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_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_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_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_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_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_0_0_AnnP_6 + P-network_0_0_AnnP_5 + P-network_4_0_RI_1 + P-network_4_0_RI_2 + P-network_4_0_RI_3 + P-network_4_0_RI_4 + P-network_4_0_RI_5 + P-network_4_0_RI_6 + 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_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_5_6_RP_6 + 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_5_6_RP_5 + 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_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_6 + P-network_2_5_AnnP_5 + P-network_2_5_AnnP_4 + P-network_2_5_AnnP_3 + P-network_2_5_AnnP_2 + P-network_2_5_AnnP_1 + 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_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_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_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_6_0_RI_6 + 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_6_0_RI_5 + P-network_6_0_RI_4 + 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_0_RI_3 + 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_6_0_RI_2 + 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_0_RI_1 + 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_4_AskP_2 + P-network_5_4_AskP_1 + 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_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_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_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_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_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_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_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_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_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_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_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_4_1_RI_1 + 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_3_1_AnnP_6 + P-network_3_1_AnnP_5 + 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_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_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_2_RI_6 + P-network_2_2_RI_5 + 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_2_2_RI_4 + 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_2_2_RI_3 + P-network_2_2_RI_2 + P-network_2_2_RI_1 + 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_6_0_AskP_6 + P-network_6_0_AskP_5 + P-network_6_0_AskP_4 + P-network_6_0_AskP_3 + P-network_6_0_AskP_2 + 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_6_0_AskP_1 + 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_5_6_AnnP_6 + 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_5_6_AnnP_5 + 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_5_6_AnnP_4 + 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_5_6_AnnP_3 + 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_5_6_AnnP_2 + 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_5_6_AnnP_1 + 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_0_3_RI_6 + P-network_0_3_RI_5 + P-network_0_3_RI_4 + P-network_0_3_RI_3 + P-network_0_3_RI_2 + P-network_0_3_RI_1 + 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_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_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_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_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_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_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_1_4_AskP_6 + 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_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_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_6_2_AnnP_6 + P-network_6_2_AnnP_5 + 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_2_AnnP_4 + 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_6_2_AnnP_3 + 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_6_2_AnnP_2 + P-network_6_2_AnnP_1 + 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_3_5_AI_6 + 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_5_AI_5 + 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_3_5_AI_4 + P-network_3_5_AI_3 + P-network_3_5_AI_2 + P-network_3_5_AI_1 + 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_5_1_AI_1 + P-network_5_1_AI_2 + P-network_5_1_AI_3 + P-network_5_1_AI_4 + P-network_5_1_AI_5 + P-network_1_0_RP_6 + P-network_5_1_AI_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_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_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_1_6_AI_6 + P-network_1_6_AI_5 + P-network_1_6_AI_4 + P-network_1_6_AI_3 + 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_1_6_AI_2 + P-network_1_6_AI_1 + P-network_2_0_AskP_6 + 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_6_4_RP_6 + 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_6_4_RP_5 + P-network_6_4_RP_4 + P-network_6_4_RP_3 + P-network_6_4_RP_2 + P-network_6_4_RP_1 + 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_6_AnnP_4 + 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_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_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_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_4_5_RP_6 + P-network_4_5_RP_5 + P-network_4_5_RP_4 + P-network_4_5_RP_3 + P-network_4_5_RP_2 + 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_4_5_RP_1 + P-network_4_5_AskP_6 + P-network_2_4_AI_1 + P-network_4_5_AskP_5 + P-network_2_4_AI_2 + P-network_4_5_AskP_4 + P-network_2_4_AI_3 + P-network_4_5_AskP_3 + P-network_2_4_AI_4 + P-network_4_5_AskP_2 + P-network_2_4_AI_5 + P-network_4_5_AskP_1 + P-network_2_4_AI_6 + 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_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_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_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_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_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_2_6_RP_6 + P-network_2_6_RP_5 + P-network_2_6_RP_4 + P-network_2_6_RP_3 + 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_2_6_RP_2 + P-network_2_6_RP_1 + 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_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_2_2_AnnP_1 + P-network_3_0_RI_1 + P-network_3_0_RI_2 + P-network_3_0_RI_3 + P-network_3_0_RI_4 + P-network_3_0_RI_5 + P-network_3_0_RI_6 <= 0)
lola: after: (P-network_2_2_AnnP_0 + P-network_3_0_RI_0 + P-network_5_1_AskP_0 + P-network_2_6_RP_0 + P-network_1_1_RI_0 + 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_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_3_AI_0 + 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_5_0_AnsP_1 + P-network_5_0_AnsP_0 + P-network_4_5_AskP_0 + P-network_4_5_RP_0 + P-network_2_4_AI_0 + P-network_1_1_AskP_0 + 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_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_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_6 + P-network_6_4_RP_0 + 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_1_0_AnsP_1 + P-network_1_0_AnsP_0 + P-network_1_5_RP_0 + P-network_2_0_AskP_0 + P-network_4_2_AskP_0 + P-network_3_5_AnsP_6 + P-network_3_5_AnsP_5 + P-network_3_5_AnsP_4 + P-network_3_5_AnsP_3 + P-network_3_5_AnsP_2 + P-network_1_6_AI_0 + P-network_3_5_AnsP_1 + P-network_3_5_AnsP_0 + P-network_0_0_RI_0 + P-network_4_4_AnnP_0 + P-network_1_0_RP_0 + P-network_5_4_RI_0 + 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_4_1_AnsP_0 + P-network_5_1_AI_0 + P-network_3_5_RI_0 + P-network_3_5_AI_0 + P-network_0_2_AskP_0 + P-network_3_2_AI_0 + P-network_6_6_AnsP_6 + 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_6_2_AnnP_0 + P-network_5_0_AnnP_0 + P-network_1_6_RI_0 + P-network_1_3_AI_0 + P-network_6_1_RP_0 + P-network_4_2_RP_0 + P-network_0_4_AnnP_0 + P-network_1_4_AskP_0 + 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_4_AI_0 + P-network_0_1_AnsP_0 + P-network_2_3_RP_0 + P-network_3_3_AskP_0 + P-network_2_6_AnsP_6 + P-network_2_6_AnsP_5 + 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_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_1_0_AnnP_0 + P-network_0_0_AI_0 + P-network_3_5_AnnP_0 + P-network_0_3_RI_0 + P-network_6_2_RI_0 + 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_3_2_AnsP_2 + P-network_3_2_AnsP_1 + P-network_3_2_AnsP_0 + P-network_6_4_AskP_0 + P-network_5_6_AnnP_0 + P-network_4_3_RI_0 + P-network_4_0_AI_0 + P-network_4_1_AnnP_0 + P-network_2_4_RI_0 + P-network_2_1_AI_0 + P-network_6_0_AskP_0 + P-network_6_6_AnnP_0 + P-network_0_5_RI_0 + P-network_0_2_AI_0 + 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_2_2_RI_0 + 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_4_AskP_0 + P-network_3_1_AnnP_0 + P-network_3_1_RP_0 + P-network_4_1_RI_0 + P-network_1_2_RP_0 + P-network_0_1_AnnP_0 + P-network_6_6_RP_0 + P-network_3_0_AskP_0 + P-network_2_6_AnnP_0 + 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_5_5_AskP_0 + P-network_5_1_RI_0 + P-network_3_2_AnnP_0 + P-network_3_2_RI_0 + P-network_6_1_AskP_0 + P-network_1_3_RI_0 + P-network_1_0_AI_0 + P-network_5_4_AskP_0 + 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_6_0_RI_0 + P-network_5_4_AnsP_0 + 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_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_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_2_5_AnnP_0 + 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_5_6_RP_0 + 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_2_3_AnnP_0 + P-network_2_0_AnsP_6 + P-network_2_0_AnsP_5 + P-network_2_0_AnsP_4 + P-network_0_0_AnnP_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_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_5_2_AskP_0 + P-network_2_1_RI_0 + 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_0_2_RI_0 + P-network_0_6_AskP_0 + P-network_5_4_AnnP_0 + P-network_2_1_RP_0 + P-network_5_6_RI_0 + P-network_2_3_AskP_0 + P-network_5_3_AI_0 + 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_4_6_AI_0 + P-network_5_1_AnsP_0 + P-network_3_4_AI_0 + P-network_1_2_AskP_0 + P-network_4_0_RP_0 + P-network_6_0_AnnP_0 + P-network_0_5_AnsP_6 + P-network_0_5_AnsP_5 + P-network_0_5_AnsP_4 + 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_0_5_AnsP_3 + P-network_0_5_AnsP_2 + P-network_0_5_AnsP_1 + P-network_0_5_AnsP_0 + P-network_1_5_AI_0 + P-network_6_3_RP_0 + P-network_6_5_AI_0 + P-network_4_4_RP_0 + P-network_6_5_AnnP_0 + P-network_1_4_AnnP_0 + 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_1_1_AnsP_0 + P-network_2_5_RP_0 + P-network_1_1_AI_0 + P-network_4_3_AskP_0 + P-network_0_6_RP_0 + P-network_3_6_AnsP_6 + P-network_3_6_AnsP_5 + P-network_1_4_RI_0 + 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_3_6_AnsP_0 + P-network_2_0_AnnP_0 + P-network_1_0_RI_0 + P-network_4_5_AnnP_0 + P-network_4_0_AnnP_0 + P-network_6_4_RI_0 + P-network_4_2_AnsP_6 + 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_3_0_AI_0 + 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_2_AnsP_0 + P-network_6_1_AI_0 + P-network_4_5_RI_0 + P-network_3_3_RI_0 + P-network_0_3_AskP_0 + P-network_4_2_AI_0 + P-network_5_1_AnnP_0 + P-network_2_6_RI_0 + P-network_2_3_AI_0 + P-network_6_3_AskP_0 + P-network_0_4_AI_0 + P-network_5_2_RP_0 + P-network_0_5_AnnP_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_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_5_2_RI_0 + P-network_3_3_RP_0 + P-network_3_4_AskP_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_3_3_AnsP_6 + 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_1_5_RI_0 + P-network_0_0_AskP_0 + P-network_1_2_AI_0 + 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_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_6_0_RP_0 + P-network_6_6_AI_0 + P-network_2_5_AskP_0 + P-network_4_1_RP_0 + P-network_2_2_RP_0 + P-network_0_2_AnnP_0 + P-network_3_2_AskP_0 + P-network_0_3_RP_0 + P-network_3_1_AskP_0 + P-network_1_3_RP_0 + P-network_2_4_AnsP_6 + P-network_2_4_AnsP_5 + 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_2_4_AnsP_4 + P-network_2_4_AnsP_3 + P-network_2_4_AnsP_2 + P-network_2_4_AnsP_1 + P-network_2_4_AnsP_0 + P-network_0_3_AnnP_0 + P-network_5_6_AskP_0 + P-network_6_1_RI_0 + P-network_3_2_RP_0 + P-network_3_3_AnnP_0 + P-network_4_2_RI_0 + 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_2_3_RI_0 + P-network_2_0_AI_0 + 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_5_1_RP_0 + P-network_0_1_AI_0 + P-network_2_6_AskP_0 + P-network_1_6_AskP_0 + P-network_6_4_AnnP_0 + P-network_0_3_AI_0 + P-network_5_5_AI_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_0_6_RI_0 + P-network_3_0_RP_0 + P-network_3_6_AI_0 + P-network_2_2_AskP_0 + P-network_1_1_RP_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_1_5_AnsP_6 + P-network_1_5_AnsP_5 + P-network_1_5_AnsP_4 + P-network_1_5_AnsP_3 + P-network_2_2_AI_0 + P-network_1_5_AnsP_2 + P-network_1_5_AnsP_1 + P-network_1_5_AnsP_0 + P-network_6_5_RP_0 + P-network_0_1_AskP_0 + P-network_4_6_RP_0 + P-network_2_4_AnnP_0 + 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_5_RI_0 + P-network_2_1_AnsP_1 + P-network_2_1_AnsP_0 + P-network_5_0_RI_0 + P-network_5_3_AskP_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_3_1_RI_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_3_0_AnnP_0 + P-network_1_2_RI_0 + P-network_5_5_AnnP_0 + P-network_4_4_RI_0 + P-network_6_6_RI_0 + P-network_6_3_AI_0 + 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_4_3_AnnP_0 + P-network_4_4_AI_0 + P-network_1_3_AskP_0 + P-network_6_0_AI_0 + P-network_6_1_AnnP_0 + 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_0_6_AI_0 + P-network_6_3_RI_0 + P-network_5_4_RP_0 + P-network_1_5_AnnP_0 + 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_1_6_RP_0 + P-network_6_6_AskP_0 + P-network_2_1_AnnP_0 + P-network_2_0_RI_0 + P-network_5_0_AskP_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_4_6_AnnP_0 + P-network_0_1_RI_0 + 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_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_4_1_AskP_0 + P-network_3_3_AI_0 + P-network_0_5_RP_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_0_3_AnsP_6 + P-network_1_2_AnnP_0 + 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_2_4_RP_0 + P-network_4_3_RP_0 + P-network_3_5_AskP_0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (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_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_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_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_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_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_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_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_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_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_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_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_6 + P-masterState_2_F_6 + P-masterState_5_F_6 + P-masterState_0_F_6 + P-masterState_3_F_6 + P-masterState_1_T_6 + P-masterState_6_F_6 <= 0)
lola: after: (6 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (P-negotiation_6_4_NONE + P-negotiation_6_2_CO + P-negotiation_3_2_DONE + P-negotiation_1_0_NONE + P-negotiation_5_1_DONE + P-negotiation_1_3_CO + P-negotiation_5_6_CO + P-negotiation_3_1_CO + P-negotiation_4_3_CO + P-negotiation_0_5_DONE + P-negotiation_5_0_NONE + P-negotiation_5_6_NONE + P-negotiation_5_3_DONE + P-negotiation_3_4_DONE + P-negotiation_5_5_CO + P-negotiation_2_4_DONE + P-negotiation_1_5_DONE + P-negotiation_2_6_CO + P-negotiation_0_2_CO + P-negotiation_0_2_NONE + P-negotiation_4_3_DONE + P-negotiation_6_1_DONE + P-negotiation_2_0_NONE + P-negotiation_4_2_DONE + P-negotiation_2_1_NONE + P-negotiation_0_1_NONE + P-negotiation_6_2_DONE + P-negotiation_2_3_DONE + P-negotiation_4_5_CO + P-negotiation_0_0_CO + P-negotiation_4_0_NONE + P-negotiation_0_4_DONE + P-negotiation_2_1_CO + P-negotiation_1_2_CO + P-negotiation_6_4_CO + P-negotiation_5_0_DONE + P-negotiation_2_4_CO + P-negotiation_3_1_DONE + P-negotiation_6_3_NONE + P-negotiation_1_2_DONE + P-negotiation_4_4_NONE + P-negotiation_4_0_CO + P-negotiation_6_6_DONE + P-negotiation_2_5_NONE + P-negotiation_3_6_CO + P-negotiation_0_6_NONE + P-negotiation_1_6_DONE + P-negotiation_2_0_DONE + P-negotiation_1_5_CO + P-negotiation_5_2_NONE + P-negotiation_0_1_DONE + P-negotiation_3_3_NONE + P-negotiation_3_5_DONE + P-negotiation_5_5_DONE + P-negotiation_1_4_NONE + P-negotiation_1_3_NONE + P-negotiation_3_6_DONE + P-negotiation_5_4_DONE + P-negotiation_3_4_CO + P-negotiation_3_2_NONE + P-negotiation_1_0_CO + P-negotiation_0_0_DONE + P-negotiation_6_3_DONE + P-negotiation_2_2_NONE + P-negotiation_5_1_NONE + P-negotiation_0_5_CO + P-negotiation_4_4_DONE + P-negotiation_0_3_NONE + P-negotiation_2_5_DONE + P-negotiation_0_6_DONE + P-negotiation_5_3_CO + P-negotiation_4_1_CO + P-negotiation_6_1_CO + P-negotiation_5_2_DONE + P-negotiation_3_3_DONE + P-negotiation_6_5_NONE + P-negotiation_1_4_DONE + P-negotiation_4_6_NONE + P-negotiation_6_0_CO + P-negotiation_0_4_CO + P-negotiation_6_0_DONE + P-negotiation_4_1_DONE + P-negotiation_2_2_DONE + P-negotiation_4_6_DONE + P-negotiation_0_3_DONE + P-negotiation_2_3_CO + P-negotiation_3_5_NONE + P-negotiation_1_6_NONE + P-negotiation_1_1_CO + P-negotiation_6_5_DONE + P-negotiation_3_0_CO + P-negotiation_6_6_CO + P-negotiation_5_4_CO + P-negotiation_1_1_DONE + P-negotiation_3_0_DONE + P-negotiation_4_2_CO + P-negotiation_6_2_NONE + P-negotiation_4_3_NONE + P-negotiation_2_4_NONE + P-negotiation_5_4_NONE + P-negotiation_3_5_CO + P-negotiation_0_0_NONE + P-negotiation_0_5_NONE + P-negotiation_1_6_CO + P-negotiation_1_1_NONE + P-negotiation_3_0_NONE + P-negotiation_6_5_CO + P-negotiation_4_1_NONE + P-negotiation_6_0_NONE + P-negotiation_2_2_CO + P-negotiation_4_6_CO + P-negotiation_0_3_CO + P-negotiation_5_2_CO + P-negotiation_3_6_NONE + P-negotiation_3_3_CO + P-negotiation_5_5_NONE + P-negotiation_1_4_CO + P-negotiation_6_6_NONE + P-negotiation_1_2_NONE + P-negotiation_3_1_NONE + P-negotiation_5_1_CO + P-negotiation_6_3_CO + P-negotiation_2_6_DONE + P-negotiation_0_4_NONE + P-negotiation_4_5_DONE + P-negotiation_2_3_NONE + P-negotiation_6_4_DONE + P-negotiation_2_0_CO + P-negotiation_4_2_NONE + P-negotiation_1_0_DONE + P-negotiation_6_1_NONE + P-negotiation_3_2_CO + P-negotiation_4_4_CO + P-negotiation_0_1_CO + P-negotiation_1_5_NONE + P-negotiation_5_6_DONE + P-negotiation_3_4_NONE + P-negotiation_0_2_DONE + P-negotiation_5_3_NONE + P-negotiation_2_5_CO + P-negotiation_2_1_DONE + P-negotiation_4_0_DONE + P-negotiation_2_6_NONE + P-negotiation_0_6_CO + P-negotiation_5_0_CO + P-negotiation_4_5_NONE + P-negotiation_1_3_DONE <= 0)
lola: after: (36 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (P-network_4_5_RI_2 <= 0)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-masterList_2_6_0 <= 0)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-poll__networl_1_2_RI_1 <= 0)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-poll__networl_1_6_RP_6 <= 0)
lola: after: (0 <= 0)
lola: always true
lola: LP says that atomic proposition is always true: (P-stage_4_PRIM <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (P-network_4_2_RP_1 <= 0)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-network_0_6_AskP_1 <= 0)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (P-network_3_1_AskP_6 <= 0)
lola: after: (0 <= 0)
lola: always true
lola: MAX(P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_1 + 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_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_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_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_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_5 + P-startNeg__broadcasting_0_6 + P-startNeg__broadcasting_1_5 + P-startNeg__broadcasting_1_6) : MAX(P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0) : MAX(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_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_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_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_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_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_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_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_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_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_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + 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_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_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_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + 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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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_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) : MAX(P-network_2_2_AnnP_0 + P-network_3_0_RI_0 + P-network_5_1_AskP_0 + P-network_2_6_RP_0 + P-network_1_1_RI_0 + 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_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_3_AI_0 + 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_5_0_AnsP_1 + P-network_5_0_AnsP_0 + P-network_4_5_AskP_0 + P-network_4_5_RP_0 + P-network_2_4_AI_0 + P-network_1_1_AskP_0 + 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_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_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_6 + P-network_6_4_RP_0 + 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_1_0_AnsP_1 + P-network_1_0_AnsP_0 + P-network_1_5_RP_0 + P-network_2_0_AskP_0 + P-network_4_2_AskP_0 + P-network_3_5_AnsP_6 + P-network_3_5_AnsP_5 + P-network_3_5_AnsP_4 + P-network_3_5_AnsP_3 + P-network_3_5_AnsP_2 + P-network_1_6_AI_0 + P-network_3_5_AnsP_1 + P-network_3_5_AnsP_0 + P-network_0_0_RI_0 + P-network_4_4_AnnP_0 + P-network_1_0_RP_0 + P-network_5_4_RI_0 + 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_4_1_AnsP_0 + P-network_5_1_AI_0 + P-network_3_5_RI_0 + P-network_3_5_AI_0 + P-network_0_2_AskP_0 + P-network_3_2_AI_0 + P-network_6_6_AnsP_6 + 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_6_2_AnnP_0 + P-network_5_0_AnnP_0 + P-network_1_6_RI_0 + P-network_1_3_AI_0 + P-network_6_1_RP_0 + P-network_4_2_RP_0 + P-network_0_4_AnnP_0 + P-network_1_4_AskP_0 + 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_4_AI_0 + P-network_0_1_AnsP_0 + P-network_2_3_RP_0 + P-network_3_3_AskP_0 + P-network_2_6_AnsP_6 + P-network_2_6_AnsP_5 + 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_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_1_0_AnnP_0 + P-network_0_0_AI_0 + P-network_3_5_AnnP_0 + P-network_0_3_RI_0 + P-network_6_2_RI_0 + 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_3_2_AnsP_2 + P-network_3_2_AnsP_1 + P-network_3_2_AnsP_0 + P-network_6_4_AskP_0 + P-network_5_6_AnnP_0 + P-network_4_3_RI_0 + P-network_4_0_AI_0 + P-network_4_1_AnnP_0 + P-network_2_4_RI_0 + P-network_2_1_AI_0 + P-network_6_0_AskP_0 + P-network_6_6_AnnP_0 + P-network_0_5_RI_0 + P-network_0_2_AI_0 + 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_2_2_RI_0 + 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_4_AskP_0 + P-network_3_1_AnnP_0 + P-network_3_1_RP_0 + P-network_4_1_RI_0 + P-network_1_2_RP_0 + P-network_0_1_AnnP_0 + P-network_6_6_RP_0 + P-network_3_0_AskP_0 + P-network_2_6_AnnP_0 + 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_5_5_AskP_0 + P-network_5_1_RI_0 + P-network_3_2_AnnP_0 + P-network_3_2_RI_0 + P-network_6_1_AskP_0 + P-network_1_3_RI_0 + P-network_1_0_AI_0 + P-network_5_4_AskP_0 + 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_6_0_RI_0 + P-network_5_4_AnsP_0 + 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_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_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_2_5_AnnP_0 + 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_5_6_RP_0 + 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_2_3_AnnP_0 + P-network_2_0_AnsP_6 + P-network_2_0_AnsP_5 + P-network_2_0_AnsP_4 + P-network_0_0_AnnP_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_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_5_2_AskP_0 + P-network_2_1_RI_0 + 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_0_2_RI_0 + P-network_0_6_AskP_0 + P-network_5_4_AnnP_0 + P-network_2_1_RP_0 + P-network_5_6_RI_0 + P-network_2_3_AskP_0 + P-network_5_3_AI_0 + 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_4_6_AI_0 + P-network_5_1_AnsP_0 + P-network_3_4_AI_0 + P-network_1_2_AskP_0 + P-network_4_0_RP_0 + P-network_6_0_AnnP_0 + P-network_0_5_AnsP_6 + P-network_0_5_AnsP_5 + P-network_0_5_AnsP_4 + 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_0_5_AnsP_3 + P-network_0_5_AnsP_2 + P-network_0_5_AnsP_1 + P-network_0_5_AnsP_0 + P-network_1_5_AI_0 + P-network_6_3_RP_0 + P-network_6_5_AI_0 + P-network_4_4_RP_0 + P-network_6_5_AnnP_0 + P-network_1_4_AnnP_0 + 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_1_1_AnsP_0 + P-network_2_5_RP_0 + P-network_1_1_AI_0 + P-network_4_3_AskP_0 + P-network_0_6_RP_0 + P-network_3_6_AnsP_6 + P-network_3_6_AnsP_5 + P-network_1_4_RI_0 + 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_3_6_AnsP_0 + P-network_2_0_AnnP_0 + P-network_1_0_RI_0 + P-network_4_5_AnnP_0 + P-network_4_0_AnnP_0 + P-network_6_4_RI_0 + P-network_4_2_AnsP_6 + 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_3_0_AI_0 + 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_2_AnsP_0 + P-network_6_1_AI_0 + P-network_4_5_RI_0 + P-network_3_3_RI_0 + P-network_0_3_AskP_0 + P-network_4_2_AI_0 + P-network_5_1_AnnP_0 + P-network_2_6_RI_0 + P-network_2_3_AI_0 + P-network_6_3_AskP_0 + P-network_0_4_AI_0 + P-network_5_2_RP_0 + P-network_0_5_AnnP_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_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_5_2_RI_0 + P-network_3_3_RP_0 + P-network_3_4_AskP_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_3_3_AnsP_6 + 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_1_5_RI_0 + P-network_0_0_AskP_0 + P-network_1_2_AI_0 + 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_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_6_0_RP_0 + P-network_6_6_AI_0 + P-network_2_5_AskP_0 + P-network_4_1_RP_0 + P-network_2_2_RP_0 + P-network_0_2_AnnP_0 + P-network_3_2_AskP_0 + P-network_0_3_RP_0 + P-network_3_1_AskP_0 + P-network_1_3_RP_0 + P-network_2_4_AnsP_6 + P-network_2_4_AnsP_5 + 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_2_4_AnsP_4 + P-network_2_4_AnsP_3 + P-network_2_4_AnsP_2 + P-network_2_4_AnsP_1 + P-network_2_4_AnsP_0 + P-network_0_3_AnnP_0 + P-network_5_6_AskP_0 + P-network_6_1_RI_0 + P-network_3_2_RP_0 + P-network_3_3_AnnP_0 + P-network_4_2_RI_0 + 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_2_3_RI_0 + P-network_2_0_AI_0 + 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_5_1_RP_0 + P-network_0_1_AI_0 + P-network_2_6_AskP_0 + P-network_1_6_AskP_0 + P-network_6_4_AnnP_0 + P-network_0_3_AI_0 + P-network_5_5_AI_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_0_6_RI_0 + P-network_3_0_RP_0 + P-network_3_6_AI_0 + P-network_2_2_AskP_0 + P-network_1_1_RP_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_1_5_AnsP_6 + P-network_1_5_AnsP_5 + P-network_1_5_AnsP_4 + P-network_1_5_AnsP_3 + P-network_2_2_AI_0 + P-network_1_5_AnsP_2 + P-network_1_5_AnsP_1 + P-network_1_5_AnsP_0 + P-network_6_5_RP_0 + P-network_0_1_AskP_0 + P-network_4_6_RP_0 + P-network_2_4_AnnP_0 + 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_5_RI_0 + P-network_2_1_AnsP_1 + P-network_2_1_AnsP_0 + P-network_5_0_RI_0 + P-network_5_3_AskP_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_3_1_RI_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_3_0_AnnP_0 + P-network_1_2_RI_0 + P-network_5_5_AnnP_0 + P-network_4_4_RI_0 + P-network_6_6_RI_0 + P-network_6_3_AI_0 + 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_4_3_AnnP_0 + P-network_4_4_AI_0 + P-network_1_3_AskP_0 + P-network_6_0_AI_0 + P-network_6_1_AnnP_0 + 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_0_6_AI_0 + P-network_6_3_RI_0 + P-network_5_4_RP_0 + P-network_1_5_AnnP_0 + 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_1_6_RP_0 + P-network_6_6_AskP_0 + P-network_2_1_AnnP_0 + P-network_2_0_RI_0 + P-network_5_0_AskP_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_4_6_AnnP_0 + P-network_0_1_RI_0 + 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_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_4_1_AskP_0 + P-network_3_3_AI_0 + P-network_0_5_RP_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_0_3_AnsP_6 + P-network_1_2_AnnP_0 + 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_2_4_RP_0 + P-network_4_3_RP_0 + P-network_3_5_AskP_0) : MAX(P-electionInit_4 + P-electionInit_2 + P-electionInit_1 + P-electionInit_0 + P-electionInit_3 + P-electionInit_5 + P-electionInit_6) : MAX(0) : MAX(0) : MAX(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) : MAX(0) : MAX(0) : MAX(0) : MAX(0) : MAX(P-stage_4_PRIM) : MAX(0) : MAX(0) : MAX(0)
lola: computing a collection of formulas
lola: RUNNING
lola: subprocess 0 will run for 222 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0)
lola: processed formula length: 149
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-1 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 1 will run for 237 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(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_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_6 + P-poll__networl_4_0... (shortened)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(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_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_6 + P-poll__networl_4_0... (shortened)
lola: processed formula length: 8528
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-2 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 2 will run for 254 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 6
lola: SUBRESULT
lola: result: 6
lola: produced by: state space
lola: The maximum value of the given expression is 6
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-5 6 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 3 will run for 273 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 36
lola: SUBRESULT
lola: result: 36
lola: produced by: state space
lola: The maximum value of the given expression is 36
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-6 36 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 4 will run for 296 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-8 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 5 will run for 323 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-9 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 6 will run for 356 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-10 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 7 will run for 395 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-11 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 8 will run for 444 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(P-stage_4_PRIM)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(P-stage_4_PRIM)
lola: processed formula length: 19
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-12 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 9 will run for 508 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-13 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 10 will run for 592 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-14 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 11 will run for 711 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(0)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(0)
lola: processed formula length: 6
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 0
lola: SUBRESULT
lola: result: 0
lola: produced by: state space
lola: The maximum value of the given expression is 0
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-15 0 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 12 will run for 889 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(P-electionInit_4 + P-electionInit_2 + P-electionInit_1 + P-electionInit_0 + P-electionInit_3 + P-electionInit_5 + P-electionInit_6)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(P-electionInit_4 + P-electionInit_2 + P-electionInit_1 + P-electionInit_0 + P-electionInit_3 + P-electionInit_5 + P-electionInit_6)
lola: processed formula length: 135
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 6
lola: SUBRESULT
lola: result: 6
lola: produced by: state space
lola: The maximum value of the given expression is 6
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-4 6 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 13 will run for 1185 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(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: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(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: processed formula length: 142
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 6
lola: 6458 markings, 21411 edges, 1292 markings/sec, 0 secs
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lola: 3494762 markings, 18895068 edges, 3135 markings/sec, 1175 secs
lola: local time limit reached - aborting
lola:
preliminary result: unknown 0 0 unknown 6 6 36 unknown 0 0 0 0 0 0 0 0
lola: memory consumption: 384424 KB
lola: time consumption: 1200 seconds
lola: Child process aborted or communication problem between parent and child process
lola: subprocess 14 will run for 1185 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_1 + 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... (shortened)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_1 + 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... (shortened)
lola: processed formula length: 1304
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 6
lola: SUBRESULT
lola: result: 6
lola: produced by: state space
lola: The maximum value of the given expression is 6
lola: 7 markings, 6 edges
lola: ========================================

FORMULA NeoElection-PT-6-UpperBounds-0 6 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 15 will run for 2368 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: MAX(P-network_2_2_AnnP_0 + P-network_3_0_RI_0 + P-network_5_1_AskP_0 + P-network_2_6_RP_0 + P-network_1_1_RI_0 + 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_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_3_AI_... (shortened)
lola: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(P-network_2_2_AnnP_0 + P-network_3_0_RI_0 + P-network_5_1_AskP_0 + P-network_2_6_RP_0 + P-network_1_1_RI_0 + 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_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_3_AI_... (shortened)
lola: processed formula length: 13232
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 30
lola: SUBRESULT
lola: result: 30
lola: produced by: state space
lola: The maximum value of the given expression is 30
lola: 37 markings, 36 edges

FORMULA NeoElection-PT-6-UpperBounds-3 30 TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: ========================================
lola: ...considering subproblem: MAX(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: ========================================
lola: SUBTASK
lola: computing bound of an expression
lola: processed formula: MAX(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: processed formula length: 142
lola: 0 rewrites
lola: closed formula file NeoElection-PT-6-UpperBounds.task
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: SEARCH
lola: using bound preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: RUNNING
lola: Structural Bound: 6
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lola: 4266366 markings, 23159093 edges, 2374 markings/sec, 1485 secs
lola: 4278777 markings, 23227924 edges, 2482 markings/sec, 1490 secs
lola: 4290735 markings, 23304254 edges, 2392 markings/sec, 1495 secs
lola: 4303270 markings, 23380565 edges, 2507 markings/sec, 1500 secs
lola: 4316121 markings, 23462493 edges, 2570 markings/sec, 1505 secs
lola: 4329058 markings, 23558016 edges, 2587 markings/sec, 1510 secs
lola: 4341423 markings, 23643110 edges, 2473 markings/sec, 1515 secs
lola: 4353689 markings, 23744010 edges, 2453 markings/sec, 1520 secs
lola: 4365606 markings, 23842721 edges, 2383 markings/sec, 1525 secs
lola: 4377956 markings, 23934844 edges, 2470 markings/sec, 1530 secs
lola: 4390815 markings, 24020982 edges, 2572 markings/sec, 1535 secs
lola: 4403289 markings, 24113343 edges, 2495 markings/sec, 1540 secs
lola: 4416481 markings, 24200874 edges, 2638 markings/sec, 1545 secs
lola: 4429609 markings, 24272486 edges, 2626 markings/sec, 1550 secs
lola: 4442533 markings, 24349683 edges, 2585 markings/sec, 1555 secs
lola: 4455234 markings, 24427650 edges, 2540 markings/sec, 1560 secs
lola: 4467706 markings, 24506169 edges, 2494 markings/sec, 1565 secs
lola: 4480593 markings, 24589122 edges, 2577 markings/sec, 1570 secs
lola: 4492332 markings, 24684807 edges, 2348 markings/sec, 1575 secs
lola: 4504770 markings, 24757120 edges, 2488 markings/sec, 1580 secs
lola: 4517559 markings, 24833429 edges, 2558 markings/sec, 1585 secs
lola: 4530340 markings, 24912964 edges, 2556 markings/sec, 1590 secs
lola: 4543337 markings, 24994928 edges, 2599 markings/sec, 1595 secs
lola: 4555994 markings, 25086185 edges, 2531 markings/sec, 1600 secs
lola: 4568311 markings, 25172579 edges, 2463 markings/sec, 1605 secs
lola: 4581918 markings, 25258638 edges, 2721 markings/sec, 1610 secs
lola: 4595551 markings, 25338655 edges, 2727 markings/sec, 1615 secs
lola: 4609252 markings, 25424610 edges, 2740 markings/sec, 1620 secs
lola: 4623996 markings, 25509522 edges, 2949 markings/sec, 1625 secs
lola: 4639135 markings, 25595128 edges, 3028 markings/sec, 1630 secs
lola: 4653869 markings, 25683901 edges, 2947 markings/sec, 1635 secs
lola: 4667599 markings, 25768588 edges, 2746 markings/sec, 1640 secs
lola: 4680894 markings, 25864108 edges, 2659 markings/sec, 1645 secs
lola: 4694718 markings, 25960256 edges, 2765 markings/sec, 1650 secs
lola: 4709084 markings, 26049287 edges, 2873 markings/sec, 1655 secs
lola: 4722274 markings, 26134029 edges, 2638 markings/sec, 1660 secs
lola: 4736100 markings, 26212229 edges, 2765 markings/sec, 1665 secs
lola: 4749546 markings, 26295824 edges, 2689 markings/sec, 1670 secs
lola: 4764200 markings, 26388722 edges, 2931 markings/sec, 1675 secs
lola: 4778752 markings, 26480550 edges, 2910 markings/sec, 1680 secs
lola: 4793207 markings, 26574277 edges, 2891 markings/sec, 1685 secs
lola: 4807882 markings, 26660476 edges, 2935 markings/sec, 1690 secs
lola: 4822432 markings, 26744974 edges, 2910 markings/sec, 1695 secs
lola: 4836878 markings, 26834879 edges, 2889 markings/sec, 1700 secs
lola: 4850652 markings, 26934779 edges, 2755 markings/sec, 1705 secs
lola: 4865068 markings, 27034028 edges, 2883 markings/sec, 1710 secs
lola: 4879172 markings, 27126188 edges, 2821 markings/sec, 1715 secs
lola: 4894342 markings, 27213804 edges, 3034 markings/sec, 1720 secs
lola: 4908778 markings, 27312086 edges, 2887 markings/sec, 1725 secs
lola: 4922984 markings, 27400280 edges, 2841 markings/sec, 1730 secs
lola: 4937768 markings, 27495962 edges, 2957 markings/sec, 1735 secs
lola: 4952422 markings, 27586327 edges, 2931 markings/sec, 1740 secs
lola: 4966524 markings, 27687852 edges, 2820 markings/sec, 1745 secs
lola: 4980878 markings, 27790224 edges, 2871 markings/sec, 1750 secs
lola: 4995955 markings, 27882052 edges, 3015 markings/sec, 1755 secs
lola: 5010311 markings, 27977278 edges, 2871 markings/sec, 1760 secs
lola: 5024894 markings, 28074728 edges, 2917 markings/sec, 1765 secs
lola: 5039363 markings, 28166521 edges, 2894 markings/sec, 1770 secs
lola: 5053266 markings, 28273113 edges, 2781 markings/sec, 1775 secs
lola: 5067670 markings, 28370549 edges, 2881 markings/sec, 1780 secs
lola: 5080822 markings, 28470621 edges, 2630 markings/sec, 1785 secs
lola: 5094627 markings, 28575078 edges, 2761 markings/sec, 1790 secs
lola: 5108645 markings, 28689588 edges, 2804 markings/sec, 1795 secs
lola: 5123350 markings, 28782065 edges, 2941 markings/sec, 1800 secs
lola: 5137564 markings, 28883822 edges, 2843 markings/sec, 1805 secs
lola: 5151869 markings, 28979479 edges, 2861 markings/sec, 1810 secs
lola: 5166019 markings, 29083617 edges, 2830 markings/sec, 1815 secs
lola: 5179833 markings, 29183579 edges, 2763 markings/sec, 1820 secs
lola: 5194042 markings, 29292813 edges, 2842 markings/sec, 1825 secs
lola: 5207568 markings, 29397911 edges, 2705 markings/sec, 1830 secs
lola: 5220863 markings, 29516318 edges, 2659 markings/sec, 1835 secs
lola: 5233907 markings, 29635591 edges, 2609 markings/sec, 1840 secs
lola: 5247327 markings, 29755526 edges, 2684 markings/sec, 1845 secs
lola: 5260716 markings, 29860608 edges, 2678 markings/sec, 1850 secs
lola: 5274354 markings, 29974421 edges, 2728 markings/sec, 1855 secs
lola: 5288805 markings, 30083686 edges, 2890 markings/sec, 1860 secs
lola: 5303416 markings, 30179533 edges, 2922 markings/sec, 1865 secs
lola: 5317848 markings, 30279652 edges, 2886 markings/sec, 1870 secs
lola: 5331559 markings, 30379426 edges, 2742 markings/sec, 1875 secs
lola: 5345506 markings, 30481229 edges, 2789 markings/sec, 1880 secs
lola: 5358633 markings, 30590851 edges, 2625 markings/sec, 1885 secs
lola: 5372002 markings, 30697988 edges, 2674 markings/sec, 1890 secs
lola: 5386543 markings, 30794233 edges, 2908 markings/sec, 1895 secs
lola: 5399830 markings, 30892043 edges, 2657 markings/sec, 1900 secs
lola: 5413054 markings, 30985317 edges, 2645 markings/sec, 1905 secs
lola: 5426414 markings, 31091756 edges, 2672 markings/sec, 1910 secs
lola: 5440022 markings, 31201672 edges, 2722 markings/sec, 1915 secs
lola: 5454761 markings, 31310841 edges, 2948 markings/sec, 1920 secs
lola: 5469355 markings, 31413063 edges, 2919 markings/sec, 1925 secs
lola: 5483983 markings, 31509119 edges, 2926 markings/sec, 1930 secs
lola: 5498704 markings, 31594039 edges, 2944 markings/sec, 1935 secs
lola: 5513655 markings, 31678602 edges, 2990 markings/sec, 1940 secs
lola: 5528347 markings, 31765367 edges, 2938 markings/sec, 1945 secs
lola: 5542375 markings, 31856939 edges, 2806 markings/sec, 1950 secs
lola: 5556035 markings, 31953895 edges, 2732 markings/sec, 1955 secs
lola: 5570396 markings, 32051923 edges, 2872 markings/sec, 1960 secs
lola: 5585131 markings, 32146255 edges, 2947 markings/sec, 1965 secs
lola: 5600084 markings, 32235472 edges, 2991 markings/sec, 1970 secs
lola: 5615083 markings, 32322407 edges, 3000 markings/sec, 1975 secs
lola: 5629598 markings, 32420195 edges, 2903 markings/sec, 1980 secs
lola: 5644241 markings, 32506956 edges, 2929 markings/sec, 1985 secs
lola: 5658978 markings, 32601445 edges, 2947 markings/sec, 1990 secs
lola: 5674263 markings, 32698241 edges, 3057 markings/sec, 1995 secs
lola: 5689230 markings, 32784125 edges, 2993 markings/sec, 2000 secs
lola: 5704194 markings, 32874333 edges, 2993 markings/sec, 2005 secs
lola: 5718510 markings, 32971984 edges, 2863 markings/sec, 2010 secs
lola: 5732685 markings, 33074118 edges, 2835 markings/sec, 2015 secs
lola: 5747239 markings, 33169760 edges, 2911 markings/sec, 2020 secs
lola: 5762496 markings, 33259082 edges, 3051 markings/sec, 2025 secs
lola: 5776823 markings, 33355009 edges, 2865 markings/sec, 2030 secs
lola: 5791033 markings, 33442116 edges, 2842 markings/sec, 2035 secs
lola: 5804962 markings, 33535298 edges, 2786 markings/sec, 2040 secs
lola: 5819332 markings, 33623203 edges, 2874 markings/sec, 2045 secs
lola: 5833434 markings, 33716302 edges, 2820 markings/sec, 2050 secs
lola: 5846901 markings, 33816547 edges, 2693 markings/sec, 2055 secs
lola: 5861003 markings, 33908642 edges, 2820 markings/sec, 2060 secs
lola: 5875239 markings, 34002925 edges, 2847 markings/sec, 2065 secs
lola: 5889081 markings, 34092960 edges, 2768 markings/sec, 2070 secs
lola: 5903859 markings, 34191021 edges, 2956 markings/sec, 2075 secs
lola: 5918626 markings, 34284340 edges, 2953 markings/sec, 2080 secs
lola: 5932638 markings, 34394924 edges, 2802 markings/sec, 2085 secs
lola: 5947145 markings, 34493021 edges, 2901 markings/sec, 2090 secs
lola: 5961155 markings, 34596727 edges, 2802 markings/sec, 2095 secs
lola: 5975245 markings, 34707818 edges, 2818 markings/sec, 2100 secs
lola: 5989289 markings, 34807401 edges, 2809 markings/sec, 2105 secs
lola: 6003845 markings, 34910477 edges, 2911 markings/sec, 2110 secs
lola: 6018643 markings, 35011472 edges, 2960 markings/sec, 2115 secs
lola: 6032794 markings, 35114090 edges, 2830 markings/sec, 2120 secs
lola: 6047231 markings, 35215777 edges, 2887 markings/sec, 2125 secs
lola: 6061393 markings, 35320834 edges, 2832 markings/sec, 2130 secs
lola: 6075269 markings, 35432338 edges, 2775 markings/sec, 2135 secs
lola: 6088467 markings, 35546647 edges, 2640 markings/sec, 2140 secs
lola: 6101241 markings, 35661829 edges, 2555 markings/sec, 2145 secs
lola: 6114342 markings, 35779692 edges, 2620 markings/sec, 2150 secs
lola: 6127936 markings, 35890069 edges, 2719 markings/sec, 2155 secs
lola: 6141801 markings, 36001943 edges, 2773 markings/sec, 2160 secs
lola: 6155341 markings, 36111344 edges, 2708 markings/sec, 2165 secs
lola: 6169448 markings, 36202975 edges, 2821 markings/sec, 2170 secs
lola: 6183074 markings, 36298266 edges, 2725 markings/sec, 2175 secs
lola: 6196712 markings, 36401206 edges, 2728 markings/sec, 2180 secs
lola: 6210406 markings, 36495765 edges, 2739 markings/sec, 2185 secs
lola: 6224127 markings, 36600574 edges, 2744 markings/sec, 2190 secs
lola: 6236573 markings, 36711118 edges, 2489 markings/sec, 2195 secs
lola: 6249702 markings, 36800586 edges, 2626 markings/sec, 2200 secs
lola: 6263257 markings, 36896002 edges, 2711 markings/sec, 2205 secs
lola: 6276293 markings, 36992549 edges, 2607 markings/sec, 2210 secs
lola: 6288888 markings, 37081702 edges, 2519 markings/sec, 2215 secs
lola: 6301731 markings, 37187536 edges, 2569 markings/sec, 2220 secs
lola: 6314107 markings, 37288768 edges, 2475 markings/sec, 2225 secs
lola: 6327389 markings, 37383288 edges, 2656 markings/sec, 2230 secs
lola: 6340476 markings, 37474030 edges, 2617 markings/sec, 2235 secs
lola: 6353062 markings, 37564105 edges, 2517 markings/sec, 2240 secs
lola: 6365944 markings, 37648070 edges, 2576 markings/sec, 2245 secs
lola: 6379218 markings, 37733802 edges, 2655 markings/sec, 2250 secs
lola: 6392945 markings, 37808579 edges, 2745 markings/sec, 2255 secs
lola: 6405422 markings, 37886289 edges, 2495 markings/sec, 2260 secs
lola: 6418166 markings, 37962011 edges, 2549 markings/sec, 2265 secs
lola: 6430617 markings, 38035851 edges, 2490 markings/sec, 2270 secs
lola: 6443945 markings, 38116400 edges, 2666 markings/sec, 2275 secs
lola: 6457419 markings, 38204401 edges, 2695 markings/sec, 2280 secs
lola: 6470733 markings, 38290101 edges, 2663 markings/sec, 2285 secs
lola: 6483589 markings, 38379138 edges, 2571 markings/sec, 2290 secs
lola: 6496520 markings, 38480974 edges, 2586 markings/sec, 2295 secs
lola: 6509306 markings, 38580495 edges, 2557 markings/sec, 2300 secs
lola: 6522051 markings, 38672422 edges, 2549 markings/sec, 2305 secs
lola: 6535053 markings, 38756585 edges, 2600 markings/sec, 2310 secs
lola: 6547918 markings, 38847585 edges, 2573 markings/sec, 2315 secs
lola: 6561206 markings, 38932847 edges, 2658 markings/sec, 2320 secs
lola: 6574660 markings, 39010701 edges, 2691 markings/sec, 2325 secs
lola: 6587963 markings, 39089301 edges, 2661 markings/sec, 2330 secs
lola: 6600122 markings, 39165262 edges, 2432 markings/sec, 2335 secs
lola: 6611729 markings, 39251091 edges, 2321 markings/sec, 2340 secs
lola: 6623649 markings, 39329157 edges, 2384 markings/sec, 2345 secs
lola: 6635789 markings, 39402531 edges, 2428 markings/sec, 2350 secs
lola: 6647674 markings, 39471996 edges, 2377 markings/sec, 2355 secs
lola: 6659819 markings, 39555870 edges, 2429 markings/sec, 2360 secs
lola: time limit reached - aborting
lola:
preliminary result: 6 0 0 30 6 6 36 unknown 0 0 0 0 0 0 0 0
lola:
preliminary result: 6 0 0 30 6 6 36 unknown 0 0 0 0 0 0 0 0 lola:
caught signal User defined signal 1 - aborting LoLA
lola:
preliminary result: 6 0 0 30 6 6 36 unknown 0 0 0 0 0 0 0 0
lola: memory consumption: 695276 KB
lola: time consumption: 3570 seconds
lola: memory consumption: 695276 KB
lola: time consumption: 3570 seconds

BK_STOP 1527032041662

--------------------
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-6"
export BK_EXAMINATION="UpperBounds"
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-6.tgz
mv NeoElection-PT-6 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-6, examination is UpperBounds"
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-152666469300317"
echo "====================================================================="
echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "UpperBounds" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "UpperBounds" != "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 "UpperBounds.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property UpperBounds.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "UpperBounds.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 '' UpperBounds.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 ;