Execution Chart

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

Trace from the execution

Formatting '/local/x2003239/mcc2020-input.r120-csrt-158961292500079.qcow2', fmt=qcow2 size=4294967296 backing_file=/local/x2003239/mcc2020-input.qcow2 encryption=off cluster_size=65536 lazy_refcounts=off refcount_bits=16
Waiting for the VM to be ready (probing ssh)
..................
=====================================================================
Generated by BenchKit 2-4028
Executing tool win2019
Input is NeoElection-PT-7, examination is LTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r120-csrt-158961292500079
=====================================================================

--------------------
preparation of the directory to be used:
/home/mcc/execution
total 20M
-rw-r--r-- 1 mcc users 312K Apr 30 13:04 CTLCardinality.txt
-rw-r--r-- 1 mcc users 722K Apr 30 13:04 CTLCardinality.xml
-rw-r--r-- 1 mcc users 352K Apr 30 13:04 CTLFireability.txt
-rw-r--r-- 1 mcc users 981K Apr 30 13:04 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.0K Apr 30 13:04 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 6.1K Apr 30 13:04 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 195K Apr 30 13:04 LTLCardinality.txt
-rw-r--r-- 1 mcc users 524K Apr 30 13:04 LTLCardinality.xml
-rw-r--r-- 1 mcc users 128K Apr 30 13:04 LTLFireability.txt
-rw-r--r-- 1 mcc users 387K Apr 30 13:04 LTLFireability.xml
-rw-r--r-- 1 mcc users 462K Apr 30 13:04 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 1.2M Apr 30 13:04 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 536K Apr 30 13:04 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 1.4M Apr 30 13:04 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 78K Apr 30 13:04 UpperBounds.txt
-rw-r--r-- 1 mcc users 158K Apr 30 13:04 UpperBounds.xml
-rw-r--r-- 1 mcc users 5 Apr 30 13:04 equiv_col
-rw-r--r-- 1 mcc users 2 Apr 30 13:04 instance
-rw-r--r-- 1 mcc users 6 Apr 30 13:04 iscolored
-rw-r--r-- 1 mcc users 13M Apr 30 13:04 model.pnml

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

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

The expected result is a vector of booleans
BOOL_VECTOR

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

=== Now, execution of the tool begins

BK_START 1590338663791

info: Time: 3600 - MCC
vrfy: Checking LTLCardinality @ NeoElection-PT-7 @ 3570 seconds

FORMULA NeoElection-PT-7-00 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-01 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-07 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-10 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-12 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-14 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-06 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-02 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-08 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-09 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-03 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-11 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-04 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-05 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT

FORMULA NeoElection-PT-7-15 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
vrfy: finished
info: timeLeft: 0
rslt: Output for LTLCardinality @ NeoElection-PT-7

{
"exit":
{
"memory": 556220,
"runtime": 3571.000000,
"signal": "User defined signal 1"
},
"formula":
{
"count":
{
"A": 1,
"E": 0,
"F": 2,
"G": 2,
"U": 0,
"X": 0,
"aconj": 0,
"adisj": 0,
"aneg": 3,
"comp": 3,
"cont": 0,
"dl": 0,
"fir": 0,
"nodl": 0,
"place_references": 6,
"taut": 0,
"tconj": 1,
"tdisj": 1,
"tneg": 0,
"transition_references": 0,
"unfir": 0,
"visible_places": 2,
"visible_transitions": 0
},
"processed": "A (G (F (((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3) AND (F ((P-poll__networl_6_6_AnsP_3 + 1 <= P-poll__handlingMessage_5)) OR G ((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3)))))))",
"processed_size": 208,
"rewrites": 143
},
"result":
{
"preliminary_value": "no no yes yes yes no no no yes yes yes yes no unknown yes yes "
},
"task":
{
"buchi":
{
"states": 4
},
"compoundnumber": 16,
"search":
{
"store":
{
"encoder": "simple compression",
"type": "prefix"
},
"stubborn":
{
"type": "ltl preserving/insertion"
},
"type": "product automaton/dfs"
},
"type": "LTL",
"workflow": "product automaton"
}
}
lola: LoLA will run for 3570 seconds at most (--timelimit)
lola: NET
lola: input: PNML file (--pnml)
lola: reading net from model.pnml
lola: reading pnml
lola: PNML file contains place/transition net
lola: finished parsing
lola: closed net file model.pnml
lola: 21240/268435456 symbol table entries, 0 collisions
lola: preprocessing...
lola: Size of bit vector: 7128
lola: finding significant places
lola: 7128 places, 14112 transitions, 1688 significant places
lola: compute conflict clusters
lola: computed conflict clusters
lola: Computing conflicting sets
lola: Computing back conflicting sets
lola: TASK
lola: Reading formula in XML format (--xmlformula)
lola: reading pnml
lola: reading formula from LTLCardinality.xml
lola: place invariant simplifies atomic proposition
lola: before: (P-crashed_0 + P-crashed_1 + P-crashed_2 + P-crashed_3 + P-crashed_4 + P-crashed_5 + P-crashed_6 + P-crashed_7 <= P-negotiation_2_0_NONE + P-negotiation_3_6_CO + P-negotiation_0_1_NONE + P-negotiation_6_6_DONE + P-negotiation_7_1_CO + P-negotiation_4_7_DONE + P-negotiation_0_4_CO + P-negotiation_3_2_DONE + P-negotiation_7_3_DONE + P-negotiation_5_4_DONE + P-negotiation_3_5_DONE + P-negotiation_1_6_DONE + P-negotiation_0_6_DONE + P-negotiation_5_3_CO + P-negotiation_0_6_CO + P-negotiation_3_7_DONE + P-negotiation_5_6_DONE + P-negotiation_7_5_DONE + P-negotiation_6_7_CO + P-negotiation_1_0_CO + P-negotiation_5_6_CO + P-negotiation_2_2_NONE + P-negotiation_4_1_NONE + P-negotiation_6_1_DONE + P-negotiation_2_1_CO + P-negotiation_4_2_DONE + P-negotiation_7_2_NONE + P-negotiation_1_0_DONE + P-negotiation_2_3_DONE + P-negotiation_0_4_DONE + P-negotiation_6_6_NONE + P-negotiation_6_0_CO + P-negotiation_4_7_NONE + P-negotiation_2_5_CO + P-negotiation_0_3_DONE + P-negotiation_2_2_DONE + P-negotiation_4_1_DONE + P-negotiation_3_5_CO + P-negotiation_6_0_DONE + P-negotiation_7_0_CO + P-negotiation_1_5_DONE + P-negotiation_3_4_DONE + P-negotiation_5_3_DONE + P-negotiation_7_2_DONE + P-negotiation_7_5_CO + P-negotiation_3_0_DONE + P-negotiation_1_1_DONE + P-negotiation_7_3_NONE + P-negotiation_2_7_DONE + P-negotiation_4_6_DONE + P-negotiation_6_5_DONE + P-negotiation_5_4_NONE + P-negotiation_0_3_CO + P-negotiation_1_6_NONE + P-negotiation_7_7_DONE + P-negotiation_1_2_NONE + P-negotiation_4_4_CO + P-negotiation_0_5_NONE + P-negotiation_2_4_NONE + P-negotiation_4_3_NONE + P-negotiation_0_0_DONE + P-negotiation_6_2_CO + P-negotiation_1_7_CO + P-negotiation_2_7_CO + P-negotiation_5_2_CO + P-negotiation_1_3_CO + P-negotiation_5_5_NONE + P-negotiation_7_4_NONE + P-negotiation_1_2_DONE + P-negotiation_3_1_DONE + P-negotiation_5_0_DONE + P-negotiation_0_5_DONE + P-negotiation_2_4_DONE + P-negotiation_6_1_NONE + P-negotiation_4_3_DONE + P-negotiation_3_1_CO + P-negotiation_6_2_DONE + P-negotiation_4_2_NONE + P-negotiation_7_7_CO + P-negotiation_2_3_NONE + P-negotiation_6_3_CO + P-negotiation_1_7_DONE + P-negotiation_3_6_DONE + P-negotiation_5_5_DONE + P-negotiation_7_4_DONE + P-negotiation_2_0_CO + P-negotiation_0_0_CO + P-negotiation_6_7_DONE + P-negotiation_4_6_CO + P-negotiation_4_0_NONE + P-negotiation_3_2_CO + P-negotiation_3_4_CO + P-negotiation_1_4_NONE + P-negotiation_5_0_CO + P-negotiation_3_0_NONE + P-negotiation_1_5_CO + P-negotiation_0_7_NONE + P-negotiation_2_6_NONE + P-negotiation_4_5_NONE + P-negotiation_6_4_NONE + P-negotiation_0_2_DONE + P-negotiation_2_1_DONE + P-negotiation_4_0_DONE + P-negotiation_1_1_NONE + P-negotiation_7_6_DONE + P-negotiation_5_7_DONE + P-negotiation_0_1_CO + P-negotiation_3_3_CO + P-negotiation_5_7_NONE + P-negotiation_7_6_NONE + P-negotiation_1_4_DONE + P-negotiation_3_3_DONE + P-negotiation_5_2_DONE + P-negotiation_7_1_DONE + P-negotiation_0_2_CO + P-negotiation_6_5_CO + P-negotiation_0_7_DONE + P-negotiation_2_6_DONE + P-negotiation_4_5_DONE + P-negotiation_5_1_CO + P-negotiation_6_4_DONE + P-negotiation_1_6_CO + P-negotiation_4_7_CO + P-negotiation_6_4_CO + P-negotiation_7_1_NONE + P-negotiation_5_2_NONE + P-negotiation_3_3_NONE + P-negotiation_2_1_NONE + P-negotiation_0_2_NONE + P-negotiation_1_4_CO + P-negotiation_0_4_NONE + P-negotiation_6_6_CO + P-negotiation_6_7_NONE + P-negotiation_4_5_CO + P-negotiation_3_6_NONE + P-negotiation_1_7_NONE + P-negotiation_6_2_NONE + P-negotiation_7_6_CO + P-negotiation_3_0_CO + P-negotiation_5_0_NONE + P-negotiation_3_1_NONE + P-negotiation_1_2_CO + P-negotiation_3_5_NONE + P-negotiation_2_6_CO + P-negotiation_0_0_NONE + P-negotiation_6_1_CO + P-negotiation_7_7_NONE + P-negotiation_4_3_CO + P-negotiation_5_7_CO + P-negotiation_1_1_CO + P-negotiation_6_5_NONE + P-negotiation_4_6_NONE + P-negotiation_2_7_NONE + P-negotiation_7_4_CO + P-negotiation_5_3_NONE + P-negotiation_3_4_NONE + P-negotiation_1_5_NONE + P-negotiation_0_7_CO + P-negotiation_4_2_CO + P-negotiation_6_0_NONE + P-negotiation_0_3_NONE + P-negotiation_2_4_CO + P-negotiation_1_0_NONE + P-negotiation_7_3_CO + P-negotiation_6_3_DONE + P-negotiation_4_1_CO + P-negotiation_4_4_DONE + P-negotiation_2_5_DONE + P-negotiation_5_5_CO + P-negotiation_7_0_DONE + P-negotiation_5_1_DONE + P-negotiation_1_3_DONE + P-negotiation_7_5_NONE + P-negotiation_5_6_NONE + P-negotiation_2_3_CO + P-negotiation_3_7_NONE + P-negotiation_3_7_CO + P-negotiation_7_2_CO + P-negotiation_2_0_DONE + P-negotiation_0_1_DONE + P-negotiation_6_3_NONE + P-negotiation_4_4_NONE + P-negotiation_2_5_NONE + P-negotiation_0_6_NONE + P-negotiation_0_5_CO + P-negotiation_4_0_CO + P-negotiation_5_4_CO + P-negotiation_7_0_NONE + P-negotiation_5_1_NONE + P-negotiation_3_2_NONE + P-negotiation_1_3_NONE + P-negotiation_2_2_CO)
lola: after: (0 <= 49)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-dead_7 + P-dead_6 + P-dead_5 + P-dead_4 + P-dead_3 + P-dead_2 + P-dead_1 + P-dead_0)
lola: after: (3 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-dead_7 + P-dead_6 + P-dead_5 + P-dead_4 + P-dead_3 + P-dead_2 + P-dead_1 + P-dead_0)
lola: after: (3 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (P-stage_3_PRIM + P-stage_7_SEC + P-stage_3_SEC + P-stage_2_PRIM + P-stage_5_SEC + P-stage_7_PRIM + P-stage_1_NEG + P-stage_5_NEG + P-stage_6_PRIM + P-stage_0_SEC + P-stage_4_SEC + P-stage_4_NEG + P-stage_0_NEG + P-stage_1_PRIM + P-stage_4_PRIM + P-stage_1_SEC + P-stage_6_NEG + P-stage_2_NEG + P-stage_5_PRIM + P-stage_0_PRIM + P-stage_6_SEC + P-stage_2_SEC + P-stage_7_NEG + P-stage_3_NEG <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: after: (7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: place invariant simplifies atomic proposition
lola: before: (P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7 <= P-masterList_5_1_0 + P-masterList_5_1_1 + P-masterList_5_1_2 + P-masterList_5_1_3 + P-masterList_5_1_4 + P-masterList_5_1_5 + P-masterList_5_1_6 + P-masterList_5_1_7 + P-masterList_1_1_0 + P-masterList_1_1_1 + P-masterList_1_1_2 + P-masterList_1_1_3 + P-masterList_1_1_4 + P-masterList_1_1_5 + P-masterList_1_1_6 + P-masterList_1_1_7 + P-masterList_5_2_0 + P-masterList_5_2_1 + P-masterList_5_2_2 + P-masterList_5_2_3 + P-masterList_5_2_4 + P-masterList_5_2_5 + P-masterList_5_2_6 + P-masterList_5_2_7 + P-masterList_1_2_0 + P-masterList_1_2_1 + P-masterList_1_2_2 + P-masterList_1_2_3 + P-masterList_1_2_4 + P-masterList_1_2_5 + P-masterList_1_2_6 + P-masterList_1_2_7 + P-masterList_0_7_7 + P-masterList_0_7_6 + P-masterList_0_7_5 + P-masterList_0_7_4 + P-masterList_0_7_3 + P-masterList_0_7_2 + P-masterList_0_7_1 + P-masterList_0_7_0 + P-masterList_5_3_0 + P-masterList_5_3_1 + P-masterList_5_3_2 + P-masterList_5_3_3 + P-masterList_5_3_4 + P-masterList_5_3_5 + P-masterList_5_3_6 + P-masterList_5_3_7 + P-masterList_1_3_0 + P-masterList_1_3_1 + P-masterList_1_3_2 + P-masterList_1_3_3 + P-masterList_1_3_4 + P-masterList_1_3_5 + P-masterList_1_3_6 + P-masterList_1_3_7 + P-masterList_5_4_0 + P-masterList_5_4_1 + P-masterList_5_4_2 + P-masterList_5_4_3 + P-masterList_5_4_4 + P-masterList_5_4_5 + P-masterList_5_4_6 + P-masterList_5_4_7 + P-masterList_1_4_0 + P-masterList_1_4_1 + P-masterList_1_4_2 + P-masterList_1_4_3 + P-masterList_1_4_4 + P-masterList_1_4_5 + P-masterList_1_4_6 + P-masterList_1_4_7 + P-masterList_4_7_7 + P-masterList_4_7_6 + P-masterList_4_7_5 + P-masterList_4_7_4 + P-masterList_4_7_3 + P-masterList_4_7_2 + P-masterList_4_7_1 + P-masterList_5_5_0 + P-masterList_5_5_1 + P-masterList_5_5_2 + P-masterList_5_5_3 + P-masterList_5_5_4 + P-masterList_5_5_5 + P-masterList_5_5_6 + P-masterList_5_5_7 + P-masterList_4_7_0 + P-masterList_1_5_0 + P-masterList_1_5_1 + P-masterList_1_5_2 + P-masterList_1_5_3 + P-masterList_1_5_4 + P-masterList_1_5_5 + P-masterList_1_5_6 + P-masterList_1_5_7 + P-masterList_5_6_0 + P-masterList_5_6_1 + P-masterList_5_6_2 + P-masterList_5_6_3 + P-masterList_5_6_4 + P-masterList_5_6_5 + P-masterList_5_6_6 + P-masterList_5_6_7 + P-masterList_0_6_7 + P-masterList_0_6_6 + P-masterList_0_6_5 + P-masterList_0_6_4 + P-masterList_0_6_3 + P-masterList_0_6_2 + P-masterList_0_6_1 + P-masterList_0_6_0 + P-masterList_1_6_0 + P-masterList_1_6_1 + P-masterList_1_6_2 + P-masterList_1_6_3 + P-masterList_1_6_4 + P-masterList_1_6_5 + P-masterList_1_6_6 + P-masterList_1_6_7 + P-masterList_5_7_0 + P-masterList_5_7_1 + P-masterList_5_7_2 + P-masterList_5_7_3 + P-masterList_5_7_4 + P-masterList_5_7_5 + P-masterList_5_7_6 + P-masterList_5_7_7 + P-masterList_1_7_0 + P-masterList_1_7_1 + P-masterList_1_7_2 + P-masterList_1_7_3 + P-masterList_1_7_4 + P-masterList_1_7_5 + P-masterList_1_7_6 + P-masterList_1_7_7 + P-masterList_4_6_7 + P-masterList_4_6_6 + P-masterList_4_6_5 + P-masterList_4_6_4 + P-masterList_4_6_3 + P-masterList_4_6_2 + P-masterList_4_6_1 + P-masterList_4_6_0 + P-masterList_6_1_0 + P-masterList_6_1_1 + P-masterList_6_1_2 + P-masterList_6_1_3 + P-masterList_6_1_4 + P-masterList_6_1_5 + P-masterList_6_1_6 + P-masterList_6_1_7 + P-masterList_2_1_0 + P-masterList_2_1_1 + P-masterList_2_1_2 + P-masterList_2_1_3 + P-masterList_2_1_4 + P-masterList_2_1_5 + P-masterList_2_1_6 + P-masterList_2_1_7 + P-masterList_0_5_7 + P-masterList_0_5_6 + P-masterList_6_2_0 + P-masterList_6_2_1 + P-masterList_6_2_2 + P-masterList_6_2_3 + P-masterList_6_2_4 + P-masterList_6_2_5 + P-masterList_6_2_6 + P-masterList_6_2_7 + P-masterList_0_5_5 + P-masterList_0_5_4 + P-masterList_0_5_3 + P-masterList_0_5_2 + P-masterList_0_5_1 + P-masterList_0_5_0 + P-masterList_2_2_0 + P-masterList_2_2_1 + P-masterList_2_2_2 + P-masterList_2_2_3 + P-masterList_2_2_4 + P-masterList_2_2_5 + P-masterList_2_2_6 + P-masterList_2_2_7 + P-masterList_6_3_0 + P-masterList_6_3_1 + P-masterList_6_3_2 + P-masterList_6_3_3 + P-masterList_6_3_4 + P-masterList_6_3_5 + P-masterList_6_3_6 + P-masterList_6_3_7 + P-masterList_2_3_0 + P-masterList_2_3_1 + P-masterList_2_3_2 + P-masterList_2_3_3 + P-masterList_2_3_4 + P-masterList_2_3_5 + P-masterList_2_3_6 + P-masterList_2_3_7 + P-masterList_6_4_0 + P-masterList_6_4_1 + P-masterList_6_4_2 + P-masterList_6_4_3 + P-masterList_6_4_4 + P-masterList_6_4_5 + P-masterList_6_4_6 + P-masterList_6_4_7 + P-masterList_2_4_0 + P-masterList_2_4_1 + P-masterList_2_4_2 + P-masterList_2_4_3 + P-masterList_2_4_4 + P-masterList_2_4_5 + P-masterList_2_4_6 + P-masterList_2_4_7 + P-masterList_4_5_7 + P-masterList_4_5_6 + P-masterList_4_5_5 + P-masterList_4_5_4 + P-masterList_4_5_3 + P-masterList_4_5_2 + P-masterList_4_5_1 + P-masterList_4_5_0 + P-masterList_6_5_0 + P-masterList_6_5_1 + P-masterList_6_5_2 + P-masterList_6_5_3 + P-masterList_6_5_4 + P-masterList_6_5_5 + P-masterList_6_5_6 + P-masterList_6_5_7 + P-masterList_2_5_0 + P-masterList_2_5_1 + P-masterList_2_5_2 + P-masterList_2_5_3 + P-masterList_2_5_4 + P-masterList_2_5_5 + P-masterList_2_5_6 + P-masterList_2_5_7 + P-masterList_6_6_0 + P-masterList_6_6_1 + P-masterList_6_6_2 + P-masterList_6_6_3 + P-masterList_6_6_4 + P-masterList_6_6_5 + P-masterList_6_6_6 + P-masterList_6_6_7 + P-masterList_0_4_7 + P-masterList_0_4_6 + P-masterList_0_4_5 + P-masterList_0_4_4 + P-masterList_0_4_3 + P-masterList_0_4_2 + P-masterList_0_4_1 + P-masterList_0_4_0 + P-masterList_2_6_0 + P-masterList_2_6_1 + P-masterList_2_6_2 + P-masterList_2_6_3 + P-masterList_2_6_4 + P-masterList_2_6_5 + P-masterList_2_6_6 + P-masterList_2_6_7 + P-masterList_6_7_0 + P-masterList_6_7_1 + P-masterList_6_7_2 + P-masterList_6_7_3 + P-masterList_6_7_4 + P-masterList_6_7_5 + P-masterList_6_7_6 + P-masterList_6_7_7 + P-masterList_2_7_0 + P-masterList_2_7_1 + P-masterList_2_7_2 + P-masterList_2_7_3 + P-masterList_2_7_4 + P-masterList_2_7_5 + P-masterList_2_7_6 + P-masterList_2_7_7 + P-masterList_4_4_7 + P-masterList_4_4_6 + P-masterList_4_4_5 + P-masterList_4_4_4 + P-masterList_4_4_3 + P-masterList_4_4_2 + P-masterList_4_4_1 + P-masterList_4_4_0 + P-masterList_0_3_7 + P-masterList_0_3_6 + P-masterList_0_3_5 + P-masterList_0_3_4 + P-masterList_0_3_3 + P-masterList_0_3_2 + P-masterList_0_3_1 + P-masterList_7_1_0 + P-masterList_7_1_1 + P-masterList_7_1_2 + P-masterList_7_1_3 + P-masterList_7_1_4 + P-masterList_7_1_5 + P-masterList_7_1_6 + P-masterList_7_1_7 + P-masterList_0_3_0 + P-masterList_3_1_0 + P-masterList_3_1_1 + P-masterList_3_1_2 + P-masterList_3_1_3 + P-masterList_3_1_4 + P-masterList_3_1_5 + P-masterList_3_1_6 + P-masterList_3_1_7 + P-masterList_7_2_0 + P-masterList_7_2_1 + P-masterList_7_2_2 + P-masterList_7_2_3 + P-masterList_7_2_4 + P-masterList_7_2_5 + P-masterList_7_2_6 + P-masterList_7_2_7 + P-masterList_3_2_0 + P-masterList_3_2_1 + P-masterList_3_2_2 + P-masterList_3_2_3 + P-masterList_3_2_4 + P-masterList_3_2_5 + P-masterList_3_2_6 + P-masterList_3_2_7 + P-masterList_7_3_0 + P-masterList_7_3_1 + P-masterList_7_3_2 + P-masterList_7_3_3 + P-masterList_7_3_4 + P-masterList_7_3_5 + P-masterList_7_3_6 + P-masterList_7_3_7 + P-masterList_3_3_0 + P-masterList_3_3_1 + P-masterList_3_3_2 + P-masterList_3_3_3 + P-masterList_3_3_4 + P-masterList_3_3_5 + P-masterList_3_3_6 + P-masterList_3_3_7 + P-masterList_4_3_7 + P-masterList_4_3_6 + P-masterList_4_3_5 + P-masterList_7_4_0 + P-masterList_7_4_1 + P-masterList_7_4_2 + P-masterList_7_4_3 + P-masterList_7_4_4 + P-masterList_7_4_5 + P-masterList_7_4_6 + P-masterList_7_4_7 + P-masterList_4_3_4 + P-masterList_4_3_3 + P-masterList_4_3_2 + P-masterList_4_3_1 + P-masterList_4_3_0 + P-masterList_3_4_0 + P-masterList_3_4_1 + P-masterList_3_4_2 + P-masterList_3_4_3 + P-masterList_3_4_4 + P-masterList_3_4_5 + P-masterList_3_4_6 + P-masterList_3_4_7 + P-masterList_7_5_0 + P-masterList_7_5_1 + P-masterList_7_5_2 + P-masterList_7_5_3 + P-masterList_7_5_4 + P-masterList_7_5_5 + P-masterList_7_5_6 + P-masterList_7_5_7 + P-masterList_0_2_7 + P-masterList_0_2_6 + P-masterList_0_2_5 + P-masterList_0_2_4 + P-masterList_0_2_3 + P-masterList_0_2_2 + P-masterList_0_2_1 + P-masterList_0_2_0 + P-masterList_3_5_0 + P-masterList_3_5_1 + P-masterList_3_5_2 + P-masterList_3_5_3 + P-masterList_3_5_4 + P-masterList_3_5_5 + P-masterList_3_5_6 + P-masterList_3_5_7 + P-masterList_7_6_0 + P-masterList_7_6_1 + P-masterList_7_6_2 + P-masterList_7_6_3 + P-masterList_7_6_4 + P-masterList_7_6_5 + P-masterList_7_6_6 + P-masterList_7_6_7 + P-masterList_4_2_7 + P-masterList_4_2_6 + P-masterList_4_2_5 + P-masterList_4_2_4 + P-masterList_4_2_3 + P-masterList_4_2_2 + P-masterList_4_2_1 + P-masterList_4_2_0 + P-masterList_3_6_0 + P-masterList_3_6_1 + P-masterList_3_6_2 + P-masterList_3_6_3 + P-masterList_3_6_4 + P-masterList_3_6_5 + P-masterList_3_6_6 + P-masterList_3_6_7 + P-masterList_7_7_0 + P-masterList_7_7_1 + P-masterList_7_7_2 + P-masterList_7_7_3 + P-masterList_7_7_4 + P-masterList_7_7_5 + P-masterList_7_7_6 + P-masterList_7_7_7 + P-masterList_0_1_7 + P-masterList_0_1_6 + P-masterList_0_1_5 + P-masterList_0_1_4 + P-masterList_0_1_3 + P-masterList_0_1_2 + P-masterList_0_1_1 + P-masterList_0_1_0 + P-masterList_3_7_0 + P-masterList_3_7_1 + P-masterList_3_7_2 + P-masterList_3_7_3 + P-masterList_3_7_4 + P-masterList_3_7_5 + P-masterList_3_7_6 + P-masterList_3_7_7 + P-masterList_4_1_0 + P-masterList_4_1_1 + P-masterList_4_1_2 + P-masterList_4_1_3 + P-masterList_4_1_4 + P-masterList_4_1_5 + P-masterList_4_1_6 + P-masterList_4_1_7)
lola: after: (P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7 <= 42)
lola: LP says that atomic proposition is always true: (P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7 <= 42)
lola: place invariant simplifies atomic proposition
lola: before: (P-masterList_5_1_0 + P-masterList_5_1_1 + P-masterList_5_1_2 + P-masterList_5_1_3 + P-masterList_5_1_4 + P-masterList_5_1_5 + P-masterList_5_1_6 + P-masterList_5_1_7 + P-masterList_1_1_0 + P-masterList_1_1_1 + P-masterList_1_1_2 + P-masterList_1_1_3 + P-masterList_1_1_4 + P-masterList_1_1_5 + P-masterList_1_1_6 + P-masterList_1_1_7 + P-masterList_5_2_0 + P-masterList_5_2_1 + P-masterList_5_2_2 + P-masterList_5_2_3 + P-masterList_5_2_4 + P-masterList_5_2_5 + P-masterList_5_2_6 + P-masterList_5_2_7 + P-masterList_1_2_0 + P-masterList_1_2_1 + P-masterList_1_2_2 + P-masterList_1_2_3 + P-masterList_1_2_4 + P-masterList_1_2_5 + P-masterList_1_2_6 + P-masterList_1_2_7 + P-masterList_0_7_7 + P-masterList_0_7_6 + P-masterList_0_7_5 + P-masterList_0_7_4 + P-masterList_0_7_3 + P-masterList_0_7_2 + P-masterList_0_7_1 + P-masterList_0_7_0 + P-masterList_5_3_0 + P-masterList_5_3_1 + P-masterList_5_3_2 + P-masterList_5_3_3 + P-masterList_5_3_4 + P-masterList_5_3_5 + P-masterList_5_3_6 + P-masterList_5_3_7 + P-masterList_1_3_0 + P-masterList_1_3_1 + P-masterList_1_3_2 + P-masterList_1_3_3 + P-masterList_1_3_4 + P-masterList_1_3_5 + P-masterList_1_3_6 + P-masterList_1_3_7 + P-masterList_5_4_0 + P-masterList_5_4_1 + P-masterList_5_4_2 + P-masterList_5_4_3 + P-masterList_5_4_4 + P-masterList_5_4_5 + P-masterList_5_4_6 + P-masterList_5_4_7 + P-masterList_1_4_0 + P-masterList_1_4_1 + P-masterList_1_4_2 + P-masterList_1_4_3 + P-masterList_1_4_4 + P-masterList_1_4_5 + P-masterList_1_4_6 + P-masterList_1_4_7 + P-masterList_4_7_7 + P-masterList_4_7_6 + P-masterList_4_7_5 + P-masterList_4_7_4 + P-masterList_4_7_3 + P-masterList_4_7_2 + P-masterList_4_7_1 + P-masterList_5_5_0 + P-masterList_5_5_1 + P-masterList_5_5_2 + P-masterList_5_5_3 + P-masterList_5_5_4 + P-masterList_5_5_5 + P-masterList_5_5_6 + P-masterList_5_5_7 + P-masterList_4_7_0 + P-masterList_1_5_0 + P-masterList_1_5_1 + P-masterList_1_5_2 + P-masterList_1_5_3 + P-masterList_1_5_4 + P-masterList_1_5_5 + P-masterList_1_5_6 + P-masterList_1_5_7 + P-masterList_5_6_0 + P-masterList_5_6_1 + P-masterList_5_6_2 + P-masterList_5_6_3 + P-masterList_5_6_4 + P-masterList_5_6_5 + P-masterList_5_6_6 + P-masterList_5_6_7 + P-masterList_0_6_7 + P-masterList_0_6_6 + P-masterList_0_6_5 + P-masterList_0_6_4 + P-masterList_0_6_3 + P-masterList_0_6_2 + P-masterList_0_6_1 + P-masterList_0_6_0 + P-masterList_1_6_0 + P-masterList_1_6_1 + P-masterList_1_6_2 + P-masterList_1_6_3 + P-masterList_1_6_4 + P-masterList_1_6_5 + P-masterList_1_6_6 + P-masterList_1_6_7 + P-masterList_5_7_0 + P-masterList_5_7_1 + P-masterList_5_7_2 + P-masterList_5_7_3 + P-masterList_5_7_4 + P-masterList_5_7_5 + P-masterList_5_7_6 + P-masterList_5_7_7 + P-masterList_1_7_0 + P-masterList_1_7_1 + P-masterList_1_7_2 + P-masterList_1_7_3 + P-masterList_1_7_4 + P-masterList_1_7_5 + P-masterList_1_7_6 + P-masterList_1_7_7 + P-masterList_4_6_7 + P-masterList_4_6_6 + P-masterList_4_6_5 + P-masterList_4_6_4 + P-masterList_4_6_3 + P-masterList_4_6_2 + P-masterList_4_6_1 + P-masterList_4_6_0 + P-masterList_6_1_0 + P-masterList_6_1_1 + P-masterList_6_1_2 + P-masterList_6_1_3 + P-masterList_6_1_4 + P-masterList_6_1_5 + P-masterList_6_1_6 + P-masterList_6_1_7 + P-masterList_2_1_0 + P-masterList_2_1_1 + P-masterList_2_1_2 + P-masterList_2_1_3 + P-masterList_2_1_4 + P-masterList_2_1_5 + P-masterList_2_1_6 + P-masterList_2_1_7 + P-masterList_0_5_7 + P-masterList_0_5_6 + P-masterList_6_2_0 + P-masterList_6_2_1 + P-masterList_6_2_2 + P-masterList_6_2_3 + P-masterList_6_2_4 + P-masterList_6_2_5 + P-masterList_6_2_6 + P-masterList_6_2_7 + P-masterList_0_5_5 + P-masterList_0_5_4 + P-masterList_0_5_3 + P-masterList_0_5_2 + P-masterList_0_5_1 + P-masterList_0_5_0 + P-masterList_2_2_0 + P-masterList_2_2_1 + P-masterList_2_2_2 + P-masterList_2_2_3 + P-masterList_2_2_4 + P-masterList_2_2_5 + P-masterList_2_2_6 + P-masterList_2_2_7 + P-masterList_6_3_0 + P-masterList_6_3_1 + P-masterList_6_3_2 + P-masterList_6_3_3 + P-masterList_6_3_4 + P-masterList_6_3_5 + P-masterList_6_3_6 + P-masterList_6_3_7 + P-masterList_2_3_0 + P-masterList_2_3_1 + P-masterList_2_3_2 + P-masterList_2_3_3 + P-masterList_2_3_4 + P-masterList_2_3_5 + P-masterList_2_3_6 + P-masterList_2_3_7 + P-masterList_6_4_0 + P-masterList_6_4_1 + P-masterList_6_4_2 + P-masterList_6_4_3 + P-masterList_6_4_4 + P-masterList_6_4_5 + P-masterList_6_4_6 + P-masterList_6_4_7 + P-masterList_2_4_0 + P-masterList_2_4_1 + P-masterList_2_4_2 + P-masterList_2_4_3 + P-masterList_2_4_4 + P-masterList_2_4_5 + P-masterList_2_4_6 + P-masterList_2_4_7 + P-masterList_4_5_7 + P-masterList_4_5_6 + P-masterList_4_5_5 + P-masterList_4_5_4 + P-masterList_4_5_3 + P-masterList_4_5_2 + P-masterList_4_5_1 + P-masterList_4_5_0 + P-masterList_6_5_0 + P-masterList_6_5_1 + P-masterList_6_5_2 + P-masterList_6_5_3 + P-masterList_6_5_4 + P-masterList_6_5_5 + P-masterList_6_5_6 + P-masterList_6_5_7 + P-masterList_2_5_0 + P-masterList_2_5_1 + P-masterList_2_5_2 + P-masterList_2_5_3 + P-masterList_2_5_4 + P-masterList_2_5_5 + P-masterList_2_5_6 + P-masterList_2_5_7 + P-masterList_6_6_0 + P-masterList_6_6_1 + P-masterList_6_6_2 + P-masterList_6_6_3 + P-masterList_6_6_4 + P-masterList_6_6_5 + P-masterList_6_6_6 + P-masterList_6_6_7 + P-masterList_0_4_7 + P-masterList_0_4_6 + P-masterList_0_4_5 + P-masterList_0_4_4 + P-masterList_0_4_3 + P-masterList_0_4_2 + P-masterList_0_4_1 + P-masterList_0_4_0 + P-masterList_2_6_0 + P-masterList_2_6_1 + P-masterList_2_6_2 + P-masterList_2_6_3 + P-masterList_2_6_4 + P-masterList_2_6_5 + P-masterList_2_6_6 + P-masterList_2_6_7 + P-masterList_6_7_0 + P-masterList_6_7_1 + P-masterList_6_7_2 + P-masterList_6_7_3 + P-masterList_6_7_4 + P-masterList_6_7_5 + P-masterList_6_7_6 + P-masterList_6_7_7 + P-masterList_2_7_0 + P-masterList_2_7_1 + P-masterList_2_7_2 + P-masterList_2_7_3 + P-masterList_2_7_4 + P-masterList_2_7_5 + P-masterList_2_7_6 + P-masterList_2_7_7 + P-masterList_4_4_7 + P-masterList_4_4_6 + P-masterList_4_4_5 + P-masterList_4_4_4 + P-masterList_4_4_3 + P-masterList_4_4_2 + P-masterList_4_4_1 + P-masterList_4_4_0 + P-masterList_0_3_7 + P-masterList_0_3_6 + P-masterList_0_3_5 + P-masterList_0_3_4 + P-masterList_0_3_3 + P-masterList_0_3_2 + P-masterList_0_3_1 + P-masterList_7_1_0 + P-masterList_7_1_1 + P-masterList_7_1_2 + P-masterList_7_1_3 + P-masterList_7_1_4 + P-masterList_7_1_5 + P-masterList_7_1_6 + P-masterList_7_1_7 + P-masterList_0_3_0 + P-masterList_3_1_0 + P-masterList_3_1_1 + P-masterList_3_1_2 + P-masterList_3_1_3 + P-masterList_3_1_4 + P-masterList_3_1_5 + P-masterList_3_1_6 + P-masterList_3_1_7 + P-masterList_7_2_0 + P-masterList_7_2_1 + P-masterList_7_2_2 + P-masterList_7_2_3 + P-masterList_7_2_4 + P-masterList_7_2_5 + P-masterList_7_2_6 + P-masterList_7_2_7 + P-masterList_3_2_0 + P-masterList_3_2_1 + P-masterList_3_2_2 + P-masterList_3_2_3 + P-masterList_3_2_4 + P-masterList_3_2_5 + P-masterList_3_2_6 + P-masterList_3_2_7 + P-masterList_7_3_0 + P-masterList_7_3_1 + P-masterList_7_3_2 + P-masterList_7_3_3 + P-masterList_7_3_4 + P-masterList_7_3_5 + P-masterList_7_3_6 + P-masterList_7_3_7 + P-masterList_3_3_0 + P-masterList_3_3_1 + P-masterList_3_3_2 + P-masterList_3_3_3 + P-masterList_3_3_4 + P-masterList_3_3_5 + P-masterList_3_3_6 + P-masterList_3_3_7 + P-masterList_4_3_7 + P-masterList_4_3_6 + P-masterList_4_3_5 + P-masterList_7_4_0 + P-masterList_7_4_1 + P-masterList_7_4_2 + P-masterList_7_4_3 + P-masterList_7_4_4 + P-masterList_7_4_5 + P-masterList_7_4_6 + P-masterList_7_4_7 + P-masterList_4_3_4 + P-masterList_4_3_3 + P-masterList_4_3_2 + P-masterList_4_3_1 + P-masterList_4_3_0 + P-masterList_3_4_0 + P-masterList_3_4_1 + P-masterList_3_4_2 + P-masterList_3_4_3 + P-masterList_3_4_4 + P-masterList_3_4_5 + P-masterList_3_4_6 + P-masterList_3_4_7 + P-masterList_7_5_0 + P-masterList_7_5_1 + P-masterList_7_5_2 + P-masterList_7_5_3 + P-masterList_7_5_4 + P-masterList_7_5_5 + P-masterList_7_5_6 + P-masterList_7_5_7 + P-masterList_0_2_7 + P-masterList_0_2_6 + P-masterList_0_2_5 + P-masterList_0_2_4 + P-masterList_0_2_3 + P-masterList_0_2_2 + P-masterList_0_2_1 + P-masterList_0_2_0 + P-masterList_3_5_0 + P-masterList_3_5_1 + P-masterList_3_5_2 + P-masterList_3_5_3 + P-masterList_3_5_4 + P-masterList_3_5_5 + P-masterList_3_5_6 + P-masterList_3_5_7 + P-masterList_7_6_0 + P-masterList_7_6_1 + P-masterList_7_6_2 + P-masterList_7_6_3 + P-masterList_7_6_4 + P-masterList_7_6_5 + P-masterList_7_6_6 + P-masterList_7_6_7 + P-masterList_4_2_7 + P-masterList_4_2_6 + P-masterList_4_2_5 + P-masterList_4_2_4 + P-masterList_4_2_3 + P-masterList_4_2_2 + P-masterList_4_2_1 + P-masterList_4_2_0 + P-masterList_3_6_0 + P-masterList_3_6_1 + P-masterList_3_6_2 + P-masterList_3_6_3 + P-masterList_3_6_4 + P-masterList_3_6_5 + P-masterList_3_6_6 + P-masterList_3_6_7 + P-masterList_7_7_0 + P-masterList_7_7_1 + P-masterList_7_7_2 + P-masterList_7_7_3 + P-masterList_7_7_4 + P-masterList_7_7_5 + P-masterList_7_7_6 + P-masterList_7_7_7 + P-masterList_0_1_7 + P-masterList_0_1_6 + P-masterList_0_1_5 + P-masterList_0_1_4 + P-masterList_0_1_3 + P-masterList_0_1_2 + P-masterList_0_1_1 + P-masterList_0_1_0 + P-masterList_3_7_0 + P-masterList_3_7_1 + P-masterList_3_7_2 + P-masterList_3_7_3 + P-masterList_3_7_4 + P-masterList_3_7_5 + P-masterList_3_7_6 + P-masterList_3_7_7 + P-masterList_4_1_0 + P-masterList_4_1_1 + P-masterList_4_1_2 + P-masterList_4_1_3 + P-masterList_4_1_4 + P-masterList_4_1_5 + P-masterList_4_1_6 + P-masterList_4_1_7 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7)
lola: after: (42 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7)
lola: LP says that atomic proposition is always false: (42 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7)
lola: place invariant simplifies atomic proposition
lola: before: (P-masterState_0_F_6 + P-masterState_0_F_5 + P-masterState_0_F_4 + P-masterState_0_F_3 + P-masterState_0_F_2 + P-masterState_0_F_1 + P-masterState_0_F_0 + P-masterState_4_F_6 + P-masterState_4_F_5 + P-masterState_4_F_4 + P-masterState_4_F_3 + P-masterState_4_F_2 + P-masterState_4_F_1 + P-masterState_4_F_0 + 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_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_7_T_0 + P-masterState_7_T_1 + P-masterState_7_T_2 + P-masterState_7_T_3 + P-masterState_7_T_4 + P-masterState_7_T_5 + P-masterState_7_T_6 + P-masterState_7_T_7 + P-masterState_3_T_0 + P-masterState_3_T_1 + P-masterState_3_T_2 + P-masterState_3_T_3 + P-masterState_3_T_4 + P-masterState_3_T_5 + P-masterState_3_T_6 + P-masterState_3_T_7 + P-masterState_3_F_6 + P-masterState_3_F_5 + P-masterState_3_F_4 + P-masterState_3_F_3 + P-masterState_3_F_2 + P-masterState_3_F_1 + P-masterState_3_F_0 + P-masterState_7_F_6 + P-masterState_7_F_5 + P-masterState_7_F_4 + P-masterState_7_F_3 + P-masterState_7_F_2 + P-masterState_7_F_1 + P-masterState_7_F_0 + P-masterState_1_T_6 + P-masterState_1_T_5 + P-masterState_1_T_4 + P-masterState_1_T_3 + P-masterState_1_T_2 + P-masterState_1_T_1 + P-masterState_1_T_0 + P-masterState_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_5_F_0 + P-masterState_5_F_1 + P-masterState_5_F_2 + P-masterState_5_F_3 + P-masterState_5_F_4 + P-masterState_5_F_5 + P-masterState_5_F_6 + P-masterState_5_F_7 + P-masterState_2_F_7 + P-masterState_2_F_6 + P-masterState_2_F_5 + P-masterState_2_F_4 + P-masterState_2_F_3 + P-masterState_2_F_2 + P-masterState_2_F_1 + P-masterState_2_F_0 + P-masterState_6_F_7 + P-masterState_6_F_6 + P-masterState_6_F_5 + P-masterState_6_F_4 + P-masterState_6_F_3 + P-masterState_6_F_2 + P-masterState_6_F_1 + P-masterState_6_F_0 + P-masterState_1_F_0 + P-masterState_1_F_1 + P-masterState_1_F_2 + P-masterState_1_F_3 + P-masterState_1_F_4 + P-masterState_1_F_5 + P-masterState_1_F_6 + P-masterState_1_F_7 + P-masterState_0_T_7 + P-masterState_0_T_6 + P-masterState_0_T_5 + P-masterState_0_T_4 + P-masterState_0_T_3 + P-masterState_0_T_2 + P-masterState_0_T_1 + P-masterState_0_T_0 + P-masterState_4_T_7 + P-masterState_4_T_6 + P-masterState_4_T_5 + P-masterState_4_T_4 + P-masterState_4_T_3 + P-masterState_4_T_2 + P-masterState_4_T_1 + P-masterState_4_T_0 + P-masterState_5_T_7 + P-masterState_1_T_7 + P-masterState_7_F_7 + P-masterState_3_F_7 + P-masterState_6_T_7 + P-masterState_2_T_7 + P-masterState_4_F_7 + P-masterState_0_F_7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: after: (7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)
lola: place invariant simplifies atomic proposition
lola: before: (P-network_2_7_AskP_0 + P-network_1_0_RI_0 + P-network_1_2_AnsP_7 + P-network_1_2_AnsP_6 + P-network_1_2_AnsP_5 + P-network_1_2_AnsP_4 + P-network_1_2_AnsP_3 + P-network_1_2_AnsP_2 + P-network_1_2_AnsP_1 + P-network_1_2_AnsP_0 + P-network_6_0_AskP_0 + P-network_6_5_AnsP_7 + P-network_6_5_AnsP_6 + P-network_6_5_AnsP_5 + P-network_6_5_AnsP_4 + P-network_6_5_AnsP_3 + P-network_6_5_AnsP_2 + P-network_3_4_AnnP_0 + P-network_6_5_AnsP_1 + P-network_6_5_AnsP_0 + P-network_0_0_AnnP_0 + P-network_1_2_RP_0 + P-network_5_3_AnnP_0 + P-network_4_6_AnsP_0 + P-network_4_6_AnsP_1 + P-network_4_6_AnsP_2 + P-network_4_6_AnsP_3 + P-network_4_6_AnsP_4 + P-network_4_6_AnsP_5 + P-network_4_6_AnsP_6 + P-network_4_6_AnsP_7 + P-network_3_1_RP_0 + P-network_5_0_RP_0 + P-network_4_6_AskP_0 + P-network_3_1_AnsP_7 + P-network_3_1_AnsP_6 + P-network_3_1_AnsP_5 + P-network_3_1_AnsP_4 + P-network_3_1_AnsP_3 + P-network_3_1_AnsP_2 + P-network_3_1_AnsP_1 + P-network_3_1_AnsP_0 + P-network_0_3_RI_0 + P-network_2_2_RI_0 + P-network_1_2_AskP_0 + P-network_7_2_AnnP_0 + P-network_4_1_RI_0 + P-network_4_1_AskP_0 + P-network_6_0_RI_0 + P-network_1_7_AnsP_7 + P-network_1_7_AnsP_6 + P-network_1_7_AnsP_5 + P-network_1_7_AnsP_4 + P-network_1_7_AnsP_3 + P-network_1_7_AnsP_2 + P-network_1_7_AnsP_1 + P-network_1_7_AnsP_0 + P-network_6_5_AskP_0 + P-network_0_5_RP_0 + P-network_0_5_AnnP_0 + P-network_1_1_AI_0 + P-network_5_0_AnsP_7 + P-network_5_0_AnsP_6 + P-network_0_0_RP_0 + 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_2_4_RP_0 + P-network_3_0_AI_0 + P-network_4_3_RP_0 + P-network_6_2_RP_0 + P-network_3_1_AskP_0 + P-network_3_6_AnsP_7 + P-network_3_6_AnsP_6 + P-network_3_6_AnsP_5 + P-network_3_6_AnsP_4 + P-network_3_6_AnsP_3 + P-network_3_6_AnsP_2 + P-network_3_6_AnsP_1 + P-network_3_6_AnsP_0 + P-network_1_5_RI_0 + P-network_2_4_AnnP_0 + P-network_3_4_RI_0 + P-network_5_3_RI_0 + P-network_7_6_AI_0 + P-network_7_2_RI_0 + P-network_1_7_AskP_0 + P-network_7_7_AnnP_0 + P-network_5_7_AI_0 + P-network_6_0_AnsP_0 + P-network_6_0_AnsP_1 + P-network_6_0_AnsP_2 + P-network_6_0_AnsP_3 + P-network_6_0_AnsP_4 + P-network_6_0_AnsP_5 + P-network_6_0_AnsP_6 + P-network_6_0_AnsP_7 + P-network_0_4_AI_0 + P-network_1_7_RP_0 + P-network_0_2_AnsP_7 + P-network_0_2_AnsP_6 + P-network_0_2_AnsP_5 + P-network_0_2_AnsP_4 + P-network_0_2_AnsP_3 + P-network_0_2_AnsP_2 + P-network_1_5_AnnP_0 + P-network_0_2_AnsP_1 + P-network_0_2_AnsP_0 + P-network_2_3_AI_0 + P-network_3_6_RP_0 + P-network_5_0_AskP_0 + P-network_4_2_AI_0 + P-network_5_5_RP_0 + P-network_6_1_AI_0 + P-network_5_5_AnsP_7 + P-network_5_5_AnsP_6 + P-network_5_5_AnsP_5 + P-network_5_5_AnsP_4 + P-network_5_5_AnsP_3 + P-network_5_5_AnsP_2 + P-network_5_5_AnsP_1 + P-network_5_5_AnsP_0 + P-network_7_4_RP_0 + P-network_7_5_AskP_0 + P-network_4_3_AnnP_0 + P-network_3_6_AskP_0 + P-network_2_7_RI_0 + P-network_2_1_AnsP_7 + P-network_2_1_AnsP_6 + P-network_2_1_AnsP_5 + P-network_2_7_AnsP_0 + P-network_2_7_AnsP_1 + P-network_2_7_AnsP_2 + P-network_2_7_AnsP_3 + P-network_2_7_AnsP_4 + P-network_2_7_AnsP_5 + P-network_2_7_AnsP_6 + P-network_2_7_AnsP_7 + P-network_2_1_AnsP_4 + P-network_2_1_AnsP_3 + P-network_2_1_AnsP_2 + P-network_2_1_AnsP_1 + P-network_2_1_AnsP_0 + P-network_4_6_RI_0 + P-network_6_5_RI_0 + P-network_7_4_AnsP_7 + P-network_2_2_AskP_0 + P-network_7_4_AnsP_6 + P-network_7_4_AnsP_5 + P-network_7_4_AnsP_4 + P-network_7_4_AnsP_3 + P-network_7_4_AnsP_2 + P-network_7_4_AnsP_1 + P-network_7_4_AnsP_0 + P-network_1_6_AI_0 + P-network_0_2_AskP_0 + P-network_6_2_AnnP_0 + P-network_3_5_AI_0 + P-network_5_4_AI_0 + P-network_6_7_RP_0 + P-network_0_7_AnsP_7 + P-network_0_7_AnsP_6 + P-network_0_7_AnsP_5 + P-network_0_7_AnsP_4 + P-network_0_7_AnsP_3 + P-network_0_7_AnsP_2 + P-network_0_7_AnsP_1 + P-network_0_7_AnsP_0 + P-network_7_3_AI_0 + P-network_5_5_AskP_0 + P-network_4_0_AnsP_7 + P-network_4_0_AnsP_6 + P-network_4_0_AnsP_5 + P-network_4_0_AnsP_4 + P-network_4_0_AnsP_3 + P-network_4_0_AnsP_2 + P-network_4_0_AnsP_1 + P-network_4_0_AnsP_0 + P-network_4_1_AnsP_0 + P-network_4_1_AnsP_1 + P-network_4_1_AnsP_2 + P-network_4_1_AnsP_3 + P-network_4_1_AnsP_4 + P-network_4_1_AnsP_5 + P-network_4_1_AnsP_6 + P-network_4_1_AnsP_7 + P-network_2_1_AskP_0 + P-network_7_7_RI_0 + P-network_2_6_AnsP_7 + P-network_5_6_AskP_0 + P-network_2_6_AnsP_6 + P-network_2_6_AnsP_5 + 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_7_4_AskP_0 + P-network_7_7_RP_0 + P-network_1_4_AnnP_0 + P-network_4_7_AI_0 + P-network_6_4_AI_0 + P-network_6_6_AI_0 + P-network_0_7_AskP_0 + P-network_6_7_AnnP_0 + P-network_4_0_AskP_0 + P-network_4_5_AnsP_7 + P-network_4_5_AnsP_6 + P-network_4_5_AI_0 + 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_6_3_AnnP_0 + P-network_3_3_AnnP_0 + P-network_0_3_AskP_0 + P-network_2_6_AskP_0 + P-network_0_0_RI_0 + P-network_1_1_AnsP_7 + P-network_1_1_AnsP_6 + P-network_2_6_AI_0 + 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_6_4_AnsP_7 + P-network_6_4_AnsP_6 + P-network_0_7_AI_0 + 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_1_0_AnnP_0 + P-network_0_2_RP_0 + P-network_7_5_AnsP_0 + P-network_7_5_AnsP_1 + P-network_7_5_AnsP_2 + P-network_7_5_AnsP_3 + P-network_7_5_AnsP_4 + P-network_7_5_AnsP_5 + P-network_7_5_AnsP_6 + P-network_7_5_AnsP_7 + P-network_5_2_AnnP_0 + P-network_2_1_RP_0 + P-network_7_5_RI_0 + P-network_4_0_RP_0 + P-network_4_5_AskP_0 + P-network_3_0_AnsP_7 + P-network_3_0_AnsP_6 + P-network_3_0_AnsP_5 + P-network_3_0_AnsP_4 + P-network_3_0_AnsP_3 + P-network_3_0_AnsP_2 + P-network_3_0_AnsP_1 + P-network_3_0_AnsP_0 + P-network_7_0_AskP_0 + P-network_5_6_RI_0 + P-network_1_2_RI_0 + P-network_1_1_AskP_0 + P-network_7_1_AnnP_0 + P-network_3_1_RI_0 + P-network_5_0_RI_0 + P-network_1_6_AnsP_7 + P-network_1_6_AnsP_6 + P-network_1_6_AnsP_5 + P-network_1_6_AnsP_4 + P-network_1_6_AnsP_3 + P-network_1_6_AnsP_2 + P-network_1_6_AnsP_1 + P-network_1_6_AnsP_0 + P-network_6_4_AskP_0 + P-network_2_2_AnsP_0 + P-network_2_2_AnsP_1 + P-network_2_2_AnsP_2 + P-network_2_2_AnsP_3 + P-network_2_2_AnsP_4 + P-network_2_2_AnsP_5 + P-network_2_2_AnsP_6 + P-network_2_2_AnsP_7 + P-network_0_4_AnnP_0 + P-network_0_1_AI_0 + P-network_1_4_RP_0 + P-network_2_0_AI_0 + P-network_3_3_RP_0 + P-network_3_7_RI_0 + P-network_5_2_RP_0 + P-network_5_7_AnnP_0 + P-network_7_1_RP_0 + P-network_3_0_AskP_0 + P-network_3_5_AnsP_7 + 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_3_5_AnsP_1 + P-network_3_7_AskP_0 + P-network_3_5_AnsP_0 + P-network_0_5_RI_0 + P-network_2_3_AnnP_0 + P-network_2_4_RI_0 + P-network_4_3_RI_0 + P-network_6_2_RI_0 + P-network_1_6_AskP_0 + P-network_7_6_AnnP_0 + P-network_0_7_RP_0 + P-network_0_1_AnsP_7 + P-network_0_1_AnsP_6 + P-network_0_1_AnsP_5 + P-network_0_1_AnsP_4 + P-network_0_1_AnsP_3 + P-network_0_1_AnsP_2 + P-network_4_4_AnnP_0 + P-network_0_1_AnsP_1 + P-network_0_1_AnsP_0 + P-network_1_3_AI_0 + P-network_2_6_RP_0 + P-network_3_2_AI_0 + P-network_4_5_RP_0 + P-network_5_1_AI_0 + P-network_5_4_AnsP_7 + P-network_5_4_AnsP_6 + P-network_5_4_AnsP_5 + P-network_5_4_AnsP_4 + P-network_5_4_AnsP_3 + P-network_5_4_AnsP_2 + P-network_5_4_AnsP_1 + P-network_5_6_AnsP_0 + P-network_5_6_AnsP_1 + P-network_5_6_AnsP_2 + P-network_5_6_AnsP_3 + P-network_5_6_AnsP_4 + P-network_5_6_AnsP_5 + P-network_5_6_AnsP_6 + P-network_5_6_AnsP_7 + P-network_7_1_AI_0 + P-network_5_4_AnsP_0 + P-network_6_4_RP_0 + P-network_7_0_AI_0 + P-network_4_2_AnnP_0 + P-network_3_5_AskP_0 + P-network_1_7_RI_0 + P-network_6_5_RP_0 + P-network_2_0_AnsP_7 + P-network_2_0_AnsP_6 + P-network_2_0_AnsP_5 + P-network_2_0_AnsP_4 + P-network_2_0_AnsP_3 + P-network_2_0_AnsP_2 + P-network_2_0_AnsP_1 + P-network_5_2_AI_0 + P-network_2_0_AnsP_0 + P-network_3_6_RI_0 + P-network_5_5_RI_0 + P-network_7_4_RI_0 + P-network_7_3_AnsP_7 + P-network_7_3_AnsP_6 + P-network_5_1_AskP_0 + P-network_7_3_AnsP_5 + P-network_7_3_AnsP_4 + P-network_7_3_AnsP_3 + P-network_7_3_AnsP_2 + P-network_7_3_AnsP_1 + P-network_7_3_AnsP_0 + P-network_0_6_AI_0 + P-network_4_6_RP_0 + P-network_0_1_AskP_0 + P-network_6_1_AnnP_0 + P-network_2_5_AI_0 + P-network_4_4_AI_0 + P-network_5_7_RP_0 + P-network_0_6_AnsP_7 + P-network_0_6_AnsP_6 + P-network_3_3_AI_0 + 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_0_3_AnsP_0 + P-network_0_3_AnsP_1 + P-network_0_3_AnsP_2 + P-network_0_3_AnsP_3 + P-network_0_3_AnsP_4 + P-network_0_3_AnsP_5 + P-network_0_3_AnsP_6 + P-network_0_3_AnsP_7 + P-network_2_7_RP_0 + P-network_6_3_AI_0 + P-network_7_6_RP_0 + P-network_5_4_AskP_0 + P-network_1_4_AI_0 + P-network_6_3_RI_0 + P-network_4_7_AnnP_0 + P-network_2_0_AskP_0 + P-network_6_7_RI_0 + P-network_7_0_AnsP_0 + P-network_7_0_AnsP_1 + P-network_7_0_AnsP_2 + P-network_7_0_AnsP_3 + P-network_7_0_AnsP_4 + P-network_7_0_AnsP_5 + P-network_7_0_AnsP_6 + P-network_7_0_AnsP_7 + P-network_4_4_RI_0 + P-network_2_5_AnsP_7 + P-network_2_5_AnsP_6 + P-network_2_5_AnsP_5 + P-network_2_5_AnsP_4 + P-network_2_5_AnsP_3 + P-network_2_5_AnsP_2 + P-network_2_5_AnsP_1 + P-network_2_5_AnsP_0 + P-network_7_3_AskP_0 + P-network_1_3_AnnP_0 + P-network_3_7_AI_0 + P-network_2_5_AnnP_0 + P-network_5_6_AI_0 + P-network_0_6_AskP_0 + P-network_6_6_AnnP_0 + P-network_7_5_AI_0 + P-network_2_5_RI_0 + P-network_0_6_RI_0 + P-network_3_7_AnsP_0 + P-network_3_7_AnsP_1 + P-network_3_7_AnsP_2 + P-network_3_7_AnsP_3 + P-network_3_7_AnsP_4 + P-network_3_7_AnsP_5 + P-network_3_7_AnsP_6 + P-network_3_7_AnsP_7 + P-network_4_4_AnsP_7 + P-network_4_4_AnsP_6 + P-network_4_4_AnsP_5 + P-network_4_4_AnsP_4 + P-network_4_4_AnsP_3 + P-network_4_4_AnsP_2 + P-network_4_4_AnsP_1 + P-network_4_4_AnsP_0 + P-network_3_2_AnnP_0 + P-network_3_2_AskP_0 + P-network_2_5_AskP_0 + P-network_1_0_AnsP_7 + P-network_1_0_AnsP_6 + P-network_1_0_AnsP_5 + P-network_1_0_AnsP_4 + P-network_1_0_AnsP_3 + P-network_1_0_AnsP_2 + P-network_1_0_AnsP_1 + P-network_1_0_AnsP_0 + P-network_6_3_AnsP_7 + P-network_6_3_AnsP_6 + P-network_6_3_AnsP_5 + P-network_6_3_AnsP_4 + P-network_6_3_AnsP_3 + P-network_6_3_AnsP_2 + P-network_6_3_AnsP_1 + P-network_6_3_AnsP_0 + P-network_5_1_AnnP_0 + P-network_1_1_RP_0 + P-network_3_0_RP_0 + P-network_4_4_AskP_0 + P-network_7_2_RP_0 + P-network_3_7_AnnP_0 + P-network_5_3_RP_0 + P-network_0_2_RI_0 + P-network_1_0_AskP_0 + P-network_7_0_AnnP_0 + P-network_2_1_RI_0 + P-network_4_0_RI_0 + P-network_4_0_AI_0 + P-network_1_5_AnsP_7 + P-network_1_5_AnsP_6 + P-network_1_5_AnsP_5 + P-network_1_5_AnsP_4 + P-network_1_5_AnsP_3 + P-network_1_5_AnsP_2 + P-network_1_5_AnsP_1 + P-network_1_5_AnsP_0 + P-network_6_3_AskP_0 + P-network_0_3_AnnP_0 + P-network_0_4_RP_0 + P-network_1_0_AI_0 + P-network_2_3_RP_0 + P-network_3_4_RP_0 + P-network_5_1_AnsP_0 + P-network_5_1_AnsP_1 + P-network_5_1_AnsP_2 + P-network_5_1_AnsP_3 + P-network_5_1_AnsP_4 + P-network_5_1_AnsP_5 + P-network_5_1_AnsP_6 + P-network_5_1_AnsP_7 + P-network_2_1_AI_0 + P-network_4_2_RP_0 + P-network_5_6_AnnP_0 + P-network_6_1_RP_0 + P-network_3_4_AnsP_7 + P-network_3_4_AnsP_6 + P-network_0_6_AnnP_0 + P-network_3_4_AnsP_5 + P-network_3_4_AnsP_4 + P-network_3_4_AnsP_3 + P-network_3_4_AnsP_2 + P-network_3_4_AnsP_1 + P-network_3_4_AnsP_0 + P-network_1_5_RP_0 + P-network_2_2_AnnP_0 + P-network_1_4_RI_0 + P-network_3_3_RI_0 + P-network_0_2_AI_0 + P-network_5_2_RI_0 + P-network_1_5_AskP_0 + P-network_7_5_AnnP_0 + P-network_6_6_AskP_0 + P-network_7_1_RI_0 + P-network_0_0_AnsP_7 + P-network_0_0_AnsP_6 + P-network_0_0_AnsP_5 + P-network_0_0_AnsP_4 + P-network_0_0_AnsP_3 + P-network_0_0_AnsP_2 + P-network_0_0_AnsP_1 + P-network_0_0_AnsP_0 + P-network_0_3_AI_0 + P-network_1_6_RP_0 + P-network_2_2_AI_0 + P-network_3_5_RP_0 + P-network_4_1_AI_0 + P-network_7_0_RI_0 + P-network_5_3_AnsP_7 + P-network_5_3_AnsP_6 + P-network_5_3_AnsP_5 + P-network_5_3_AnsP_4 + P-network_5_3_AnsP_3 + P-network_5_3_AnsP_2 + P-network_5_3_AnsP_1 + P-network_5_1_RI_0 + P-network_5_3_AnsP_0 + P-network_5_4_RP_0 + P-network_6_0_AI_0 + P-network_7_3_RP_0 + P-network_7_3_AnnP_0 + P-network_4_1_AnnP_0 + P-network_1_3_AskP_0 + P-network_3_2_RI_0 + P-network_3_4_AskP_0 + P-network_0_7_RI_0 + P-network_2_6_RI_0 + P-network_4_5_RI_0 + P-network_1_3_RI_0 + P-network_2_7_AnnP_0 + P-network_6_4_RI_0 + P-network_7_2_AnsP_7 + P-network_7_2_AnsP_6 + P-network_7_2_AnsP_5 + P-network_7_2_AnsP_4 + P-network_7_2_AnsP_3 + P-network_2_0_AnnP_0 + P-network_7_2_AnsP_2 + P-network_7_2_AnsP_1 + P-network_7_2_AnsP_0 + P-network_0_0_AskP_0 + P-network_6_0_AnnP_0 + P-network_1_5_AI_0 + P-network_3_4_AI_0 + P-network_4_7_RP_0 + P-network_0_5_AnsP_7 + P-network_0_5_AnsP_6 + P-network_0_5_AnsP_5 + P-network_0_5_AnsP_4 + P-network_0_5_AnsP_3 + P-network_0_5_AnsP_2 + P-network_0_5_AnsP_1 + P-network_0_5_AnsP_0 + P-network_5_3_AI_0 + P-network_6_6_RP_0 + P-network_5_3_AskP_0 + P-network_7_2_AI_0 + P-network_4_6_AnnP_0 + P-network_5_7_RI_0 + P-network_2_4_AnsP_7 + P-network_2_4_AnsP_6 + P-network_2_4_AnsP_5 + P-network_2_4_AnsP_4 + P-network_2_4_AnsP_3 + P-network_2_4_AnsP_2 + P-network_2_4_AnsP_1 + P-network_3_2_AnsP_0 + P-network_3_2_AnsP_1 + P-network_3_2_AnsP_2 + P-network_3_2_AnsP_3 + P-network_3_2_AnsP_4 + P-network_3_2_AnsP_5 + P-network_3_2_AnsP_6 + P-network_3_2_AnsP_7 + P-network_2_4_AnsP_0 + P-network_7_6_RI_0 + P-network_7_2_AskP_0 + P-network_7_7_AnsP_7 + P-network_7_7_AnsP_6 + P-network_7_7_AnsP_5 + P-network_7_7_AnsP_4 + P-network_7_7_AnsP_3 + P-network_7_7_AnsP_2 + P-network_4_7_AskP_0 + P-network_7_7_AnsP_1 + P-network_7_7_AnsP_0 + P-network_1_2_AnnP_0 + P-network_2_7_AI_0 + P-network_4_6_AI_0 + P-network_0_5_AskP_0 + P-network_6_5_AnnP_0 + P-network_6_5_AI_0 + P-network_6_0_RP_0 + P-network_4_3_AnsP_7 + P-network_4_3_AnsP_6 + P-network_4_3_AnsP_5 + P-network_4_3_AnsP_4 + P-network_4_3_AnsP_3 + P-network_4_3_AnsP_2 + P-network_4_3_AnsP_1 + P-network_4_3_AnsP_0 + P-network_4_1_RP_0 + P-network_3_1_AnnP_0 + P-network_2_4_AskP_0 + P-network_5_4_AnnP_0 + P-network_7_7_AskP_0 + P-network_1_7_AnnP_0 + P-network_2_2_RP_0 + P-network_6_2_AnsP_7 + P-network_6_2_AnsP_6 + P-network_6_2_AnsP_5 + P-network_6_2_AnsP_4 + P-network_6_2_AnsP_3 + P-network_6_2_AnsP_2 + P-network_6_2_AnsP_1 + P-network_6_2_AnsP_0 + P-network_7_7_AI_0 + P-network_5_0_AnnP_0 + P-network_0_1_RP_0 + P-network_0_3_RP_0 + P-network_2_0_RP_0 + P-network_4_3_AskP_0 + P-network_3_6_AnnP_0 + P-network_0_1_AnnP_0 + P-network_6_6_AnsP_0 + P-network_6_6_AnsP_1 + P-network_6_6_AnsP_2 + P-network_6_6_AnsP_3 + P-network_6_6_AnsP_4 + P-network_6_6_AnsP_5 + P-network_6_6_AnsP_6 + P-network_6_6_AnsP_7 + P-network_1_1_RI_0 + P-network_3_0_RI_0 + P-network_1_4_AnsP_7 + P-network_1_4_AnsP_6 + P-network_1_4_AnsP_5 + P-network_1_4_AnsP_4 + P-network_6_1_AskP_0 + P-network_1_4_AnsP_3 + P-network_1_4_AnsP_2 + P-network_1_4_AnsP_1 + P-network_1_4_AnsP_0 + P-network_6_2_AskP_0 + P-network_6_7_AnsP_7 + P-network_1_3_AnsP_0 + P-network_1_3_AnsP_1 + P-network_1_3_AnsP_2 + P-network_1_3_AnsP_3 + P-network_1_3_AnsP_4 + P-network_1_3_AnsP_5 + P-network_1_3_AnsP_6 + P-network_1_3_AnsP_7 + P-network_2_0_RI_0 + P-network_6_7_AnsP_6 + P-network_6_7_AnsP_5 + P-network_6_7_AnsP_4 + P-network_6_7_AnsP_3 + P-network_6_7_AnsP_2 + P-network_6_7_AnsP_1 + P-network_6_7_AnsP_0 + P-network_0_2_AnnP_0 + P-network_0_0_AI_0 + P-network_1_3_RP_0 + P-network_3_2_RP_0 + P-network_5_5_AnnP_0 + P-network_0_1_RI_0 + P-network_5_1_RP_0 + P-network_7_0_RP_0 + P-network_3_3_AnsP_7 + 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_2_1_AnnP_0 + P-network_0_4_RI_0 + P-network_2_3_RI_0 + P-network_4_2_RI_0 + P-network_1_4_AskP_0 + P-network_7_4_AnnP_0 + P-network_6_1_RI_0 + P-network_6_7_AskP_0 + P-network_0_6_RP_0 + P-network_1_2_AI_0 + P-network_2_5_RP_0 + P-network_0_7_AnnP_0 + P-network_3_1_AI_0 + P-network_5_2_AnsP_7 + P-network_5_2_AnsP_6 + P-network_5_2_AnsP_5 + P-network_5_2_AnsP_4 + P-network_5_2_AnsP_3 + P-network_3_5_AnnP_0 + P-network_5_2_AnsP_2 + P-network_5_2_AnsP_1 + P-network_5_2_AnsP_0 + P-network_4_4_RP_0 + P-network_5_0_AI_0 + P-network_6_3_RP_0 + P-network_4_0_AnnP_0 + P-network_3_3_AskP_0 + P-network_4_7_AnsP_0 + P-network_4_7_AnsP_1 + P-network_4_7_AnsP_2 + P-network_4_7_AnsP_3 + P-network_4_7_AnsP_4 + P-network_4_7_AnsP_5 + P-network_4_7_AnsP_6 + P-network_4_7_AnsP_7 + P-network_1_6_RI_0 + P-network_3_5_RI_0 + P-network_2_6_AnnP_0 + P-network_5_4_RI_0 + P-network_7_1_AnsP_7 + P-network_7_1_AnsP_6 + P-network_7_1_AnsP_5 + P-network_7_1_AnsP_4 + P-network_7_1_AnsP_3 + P-network_7_1_AnsP_2 + P-network_7_1_AnsP_1 + P-network_7_1_AnsP_0 + P-network_7_3_RI_0 + P-network_0_5_AI_0 + P-network_2_4_AI_0 + P-network_3_7_RP_0 + P-network_4_2_AskP_0 + P-network_0_4_AnsP_7 + P-network_0_4_AnsP_6 + P-network_0_4_AnsP_5 + P-network_0_4_AnsP_4 + P-network_0_4_AnsP_3 + P-network_0_4_AnsP_2 + P-network_0_4_AnsP_1 + P-network_0_4_AnsP_0 + P-network_1_0_RP_0 + P-network_4_3_AI_0 + P-network_5_6_RP_0 + P-network_5_2_AskP_0 + P-network_6_2_AI_0 + P-network_7_5_RP_0 + P-network_5_7_AnsP_7 + P-network_5_7_AnsP_6 + P-network_5_7_AnsP_5 + P-network_5_7_AnsP_4 + P-network_5_7_AnsP_3 + P-network_5_7_AnsP_2 + P-network_5_7_AnsP_1 + P-network_5_7_AnsP_0 + P-network_4_5_AnnP_0 + P-network_4_7_RI_0 + P-network_2_3_AnsP_7 + P-network_2_3_AnsP_6 + P-network_2_3_AnsP_5 + P-network_2_3_AnsP_4 + P-network_2_3_AnsP_3 + P-network_6_7_AI_0 + P-network_2_3_AnsP_2 + P-network_2_3_AnsP_1 + P-network_2_3_AnsP_0 + P-network_6_6_RI_0 + P-network_7_1_AskP_0 + P-network_7_6_AnsP_7 + P-network_7_6_AnsP_6 + P-network_6_1_AnsP_0 + P-network_6_1_AnsP_1 + P-network_6_1_AnsP_2 + P-network_6_1_AnsP_3 + P-network_6_1_AnsP_4 + P-network_6_1_AnsP_5 + P-network_6_1_AnsP_6 + P-network_6_1_AnsP_7 + P-network_7_6_AnsP_5 + P-network_7_6_AnsP_4 + P-network_7_6_AnsP_3 + P-network_7_6_AnsP_2 + P-network_7_6_AnsP_1 + P-network_7_6_AnsP_0 + P-network_1_1_AnnP_0 + P-network_1_7_AI_0 + P-network_1_6_AnnP_0 + P-network_7_6_AskP_0 + P-network_3_6_AI_0 + P-network_0_4_AskP_0 + P-network_6_4_AnnP_0 + P-network_5_5_AI_0 + P-network_7_4_AI_0 + P-network_5_7_AskP_0 + P-network_4_2_AnsP_7 + P-network_4_2_AnsP_6 + P-network_4_2_AnsP_5 + P-network_4_2_AnsP_4 + P-network_4_2_AnsP_3 + P-network_4_2_AnsP_2 + P-network_4_2_AnsP_1 + P-network_4_2_AnsP_0 + P-network_2_3_AskP_0 + P-network_3_0_AnnP_0 + P-network_2_3_AskP_7 + P-network_2_3_AskP_6 + P-network_2_3_AskP_5 + P-network_2_3_AskP_4 + P-network_3_0_AnnP_1 + P-network_3_0_AnnP_2 + P-network_3_0_AnnP_3 + P-network_3_0_AnnP_4 + P-network_3_0_AnnP_5 + P-network_3_0_AnnP_6 + P-network_3_0_AnnP_7 + P-network_2_3_AskP_3 + P-network_2_3_AskP_2 + P-network_2_3_AskP_1 + P-network_5_7_AskP_1 + P-network_5_7_AskP_2 + P-network_5_7_AskP_3 + P-network_5_7_AskP_4 + P-network_5_7_AskP_5 + P-network_5_7_AskP_6 + P-network_5_7_AskP_7 + P-network_7_6_AskP_7 + P-network_7_6_AskP_6 + P-network_7_4_AI_1 + P-network_7_4_AI_2 + P-network_7_4_AI_3 + P-network_7_4_AI_4 + P-network_7_4_AI_5 + P-network_7_4_AI_6 + P-network_7_4_AI_7 + P-network_7_6_AskP_5 + P-network_7_6_AskP_4 + P-network_5_5_AI_1 + P-network_5_5_AI_2 + P-network_5_5_AI_3 + P-network_5_5_AI_4 + P-network_5_5_AI_5 + P-network_5_5_AI_6 + P-network_5_5_AI_7 + P-network_7_6_AskP_3 + P-network_6_4_AnnP_1 + P-network_6_4_AnnP_2 + P-network_6_4_AnnP_3 + P-network_6_4_AnnP_4 + P-network_6_4_AnnP_5 + P-network_6_4_AnnP_6 + P-network_6_4_AnnP_7 + P-network_7_6_AskP_2 + P-network_0_4_AskP_1 + P-network_0_4_AskP_2 + P-network_0_4_AskP_3 + P-network_0_4_AskP_4 + P-network_0_4_AskP_5 + P-network_0_4_AskP_6 + P-network_0_4_AskP_7 + P-network_7_6_AskP_1 + P-network_3_6_AI_1 + P-network_3_6_AI_2 + P-network_3_6_AI_3 + P-network_3_6_AI_4 + P-network_3_6_AI_5 + P-network_3_6_AI_6 + P-network_3_6_AI_7 + P-network_1_6_AnnP_7 + P-network_1_6_AnnP_6 + P-network_1_6_AnnP_5 + P-network_1_6_AnnP_4 + P-network_1_6_AnnP_3 + P-network_1_6_AnnP_2 + P-network_1_6_AnnP_1 + P-network_1_7_AI_1 + P-network_1_7_AI_2 + P-network_1_7_AI_3 + P-network_1_7_AI_4 + P-network_1_7_AI_5 + P-network_1_7_AI_6 + P-network_1_7_AI_7 + P-network_1_1_AnnP_1 + P-network_1_1_AnnP_2 + P-network_1_1_AnnP_3 + P-network_1_1_AnnP_4 + P-network_1_1_AnnP_5 + P-network_1_1_AnnP_6 + P-network_1_1_AnnP_7 + P-network_6_7_AI_7 + P-network_6_7_AI_6 + P-network_6_7_AI_5 + P-network_7_1_AskP_1 + P-network_7_1_AskP_2 + P-network_7_1_AskP_3 + P-network_7_1_AskP_4 + P-network_7_1_AskP_5 + P-network_7_1_AskP_6 + P-network_7_1_AskP_7 + P-network_6_7_AI_4 + P-network_6_6_RI_1 + P-network_6_6_RI_2 + P-network_6_6_RI_3 + P-network_6_6_RI_4 + P-network_6_6_RI_5 + P-network_6_6_RI_6 + P-network_6_6_RI_7 + P-network_6_7_AI_3 + P-network_6_7_AI_2 + P-network_6_7_AI_1 + P-network_4_7_RI_1 + P-network_4_7_RI_2 + P-network_4_7_RI_3 + P-network_4_7_RI_4 + P-network_4_7_RI_5 + P-network_4_7_RI_6 + P-network_4_7_RI_7 + P-network_4_5_AnnP_1 + P-network_4_5_AnnP_2 + P-network_4_5_AnnP_3 + P-network_4_5_AnnP_4 + P-network_4_5_AnnP_5 + P-network_4_5_AnnP_6 + P-network_4_5_AnnP_7 + P-network_1_0_RP_7 + P-network_1_0_RP_6 + P-network_1_0_RP_5 + P-network_7_5_RP_1 + P-network_7_5_RP_2 + P-network_7_5_RP_3 + P-network_7_5_RP_4 + P-network_7_5_RP_5 + P-network_7_5_RP_6 + P-network_7_5_RP_7 + P-network_1_0_RP_4 + P-network_6_2_AI_1 + P-network_6_2_AI_2 + P-network_6_2_AI_3 + P-network_6_2_AI_4 + P-network_6_2_AI_5 + P-network_6_2_AI_6 + P-network_6_2_AI_7 + P-network_1_0_RP_3 + P-network_5_2_AskP_1 + P-network_5_2_AskP_2 + P-network_5_2_AskP_3 + P-network_5_2_AskP_4 + P-network_5_2_AskP_5 + P-network_5_2_AskP_6 + P-network_5_2_AskP_7 + P-network_1_0_RP_2 + P-network_5_6_RP_1 + P-network_5_6_RP_2 + P-network_5_6_RP_3 + P-network_5_6_RP_4 + P-network_5_6_RP_5 + P-network_5_6_RP_6 + P-network_5_6_RP_7 + P-network_1_0_RP_1 + P-network_4_3_AI_1 + P-network_4_3_AI_2 + P-network_4_3_AI_3 + P-network_4_3_AI_4 + P-network_4_3_AI_5 + P-network_4_3_AI_6 + P-network_4_3_AI_7 + P-network_4_2_AskP_7 + P-network_4_2_AskP_6 + P-network_4_2_AskP_5 + P-network_4_2_AskP_4 + P-network_4_2_AskP_3 + P-network_4_2_AskP_2 + P-network_4_2_AskP_1 + P-network_3_7_RP_1 + P-network_3_7_RP_2 + P-network_3_7_RP_3 + P-network_3_7_RP_4 + P-network_3_7_RP_5 + P-network_3_7_RP_6 + P-network_3_7_RP_7 + P-network_2_4_AI_1 + P-network_2_4_AI_2 + P-network_2_4_AI_3 + P-network_2_4_AI_4 + P-network_2_4_AI_5 + P-network_2_4_AI_6 + P-network_2_4_AI_7 + P-network_0_5_AI_1 + P-network_0_5_AI_2 + P-network_0_5_AI_3 + P-network_0_5_AI_4 + P-network_0_5_AI_5 + P-network_0_5_AI_6 + P-network_0_5_AI_7 + P-network_7_3_RI_1 + P-network_7_3_RI_2 + P-network_7_3_RI_3 + P-network_7_3_RI_4 + P-network_7_3_RI_5 + P-network_7_3_RI_6 + P-network_7_3_RI_7 + P-network_5_4_RI_1 + P-network_5_4_RI_2 + P-network_5_4_RI_3 + P-network_5_4_RI_4 + P-network_5_4_RI_5 + P-network_5_4_RI_6 + P-network_5_4_RI_7 + P-network_2_6_AnnP_1 + P-network_2_6_AnnP_2 + P-network_2_6_AnnP_3 + P-network_2_6_AnnP_4 + P-network_2_6_AnnP_5 + P-network_2_6_AnnP_6 + P-network_2_6_AnnP_7 + P-network_3_5_RI_1 + P-network_3_5_RI_2 + P-network_3_5_RI_3 + P-network_3_5_RI_4 + P-network_3_5_RI_5 + P-network_3_5_RI_6 + P-network_3_5_RI_7 + P-network_1_6_RI_1 + P-network_1_6_RI_2 + P-network_1_6_RI_3 + P-network_1_6_RI_4 + P-network_1_6_RI_5 + P-network_1_6_RI_6 + P-network_1_6_RI_7 + P-network_3_3_AskP_1 + P-network_3_3_AskP_2 + P-network_3_3_AskP_3 + P-network_3_3_AskP_4 + P-network_3_3_AskP_5 + P-network_3_3_AskP_6 + P-network_3_3_AskP_7 + P-network_4_0_AnnP_1 + P-network_4_0_AnnP_2 + P-network_4_0_AnnP_3 + P-network_4_0_AnnP_4 + P-network_4_0_AnnP_5 + P-network_4_0_AnnP_6 + P-network_4_0_AnnP_7 + P-network_3_5_AnnP_7 + P-network_6_3_RP_1 + P-network_6_3_RP_2 + P-network_6_3_RP_3 + P-network_6_3_RP_4 + P-network_6_3_RP_5 + P-network_6_3_RP_6 + P-network_6_3_RP_7 + P-network_3_5_AnnP_6 + P-network_3_5_AnnP_5 + P-network_5_0_AI_1 + P-network_5_0_AI_2 + P-network_5_0_AI_3 + P-network_5_0_AI_4 + P-network_5_0_AI_5 + P-network_5_0_AI_6 + P-network_5_0_AI_7 + P-network_3_5_AnnP_4 + P-network_4_4_RP_1 + P-network_4_4_RP_2 + P-network_4_4_RP_3 + P-network_4_4_RP_4 + P-network_4_4_RP_5 + P-network_4_4_RP_6 + P-network_4_4_RP_7 + P-network_3_5_AnnP_3 + P-network_3_5_AnnP_2 + P-network_3_5_AnnP_1 + P-network_3_1_AI_1 + P-network_3_1_AI_2 + P-network_3_1_AI_3 + P-network_3_1_AI_4 + P-network_3_1_AI_5 + P-network_3_1_AI_6 + P-network_3_1_AI_7 + P-network_0_7_AnnP_1 + P-network_0_7_AnnP_2 + P-network_0_7_AnnP_3 + P-network_0_7_AnnP_4 + P-network_0_7_AnnP_5 + P-network_0_7_AnnP_6 + P-network_0_7_AnnP_7 + P-network_2_5_RP_1 + P-network_2_5_RP_2 + P-network_2_5_RP_3 + P-network_2_5_RP_4 + P-network_2_5_RP_5 + P-network_2_5_RP_6 + P-network_2_5_RP_7 + P-network_1_2_AI_1 + P-network_1_2_AI_2 + P-network_1_2_AI_3 + P-network_1_2_AI_4 + P-network_1_2_AI_5 + P-network_1_2_AI_6 + P-network_1_2_AI_7 + P-network_0_6_RP_1 + P-network_0_6_RP_2 + P-network_0_6_RP_3 + P-network_0_6_RP_4 + P-network_0_6_RP_5 + P-network_0_6_RP_6 + P-network_0_6_RP_7 + P-network_6_7_AskP_1 + P-network_6_7_AskP_2 + P-network_6_7_AskP_3 + P-network_6_7_AskP_4 + P-network_6_7_AskP_5 + P-network_6_7_AskP_6 + P-network_6_7_AskP_7 + P-network_6_1_RI_1 + P-network_6_1_RI_2 + P-network_6_1_RI_3 + P-network_6_1_RI_4 + P-network_6_1_RI_5 + P-network_6_1_RI_6 + P-network_6_1_RI_7 + P-network_7_4_AnnP_1 + P-network_7_4_AnnP_2 + P-network_7_4_AnnP_3 + P-network_7_4_AnnP_4 + P-network_7_4_AnnP_5 + P-network_7_4_AnnP_6 + P-network_7_4_AnnP_7 + P-network_1_4_AskP_1 + P-network_1_4_AskP_2 + P-network_1_4_AskP_3 + P-network_1_4_AskP_4 + P-network_1_4_AskP_5 + P-network_1_4_AskP_6 + P-network_1_4_AskP_7 + P-network_4_2_RI_1 + P-network_4_2_RI_2 + P-network_4_2_RI_3 + P-network_4_2_RI_4 + P-network_4_2_RI_5 + P-network_4_2_RI_6 + P-network_4_2_RI_7 + P-network_2_3_RI_1 + P-network_2_3_RI_2 + P-network_2_3_RI_3 + P-network_2_3_RI_4 + P-network_2_3_RI_5 + P-network_2_3_RI_6 + P-network_2_3_RI_7 + P-network_0_4_RI_1 + P-network_0_4_RI_2 + P-network_0_4_RI_3 + P-network_0_4_RI_4 + P-network_0_4_RI_5 + P-network_0_4_RI_6 + P-network_0_4_RI_7 + P-network_2_1_AnnP_1 + P-network_2_1_AnnP_2 + P-network_2_1_AnnP_3 + P-network_2_1_AnnP_4 + P-network_2_1_AnnP_5 + P-network_2_1_AnnP_6 + P-network_2_1_AnnP_7 + P-network_7_0_RP_1 + P-network_7_0_RP_2 + P-network_7_0_RP_3 + P-network_7_0_RP_4 + P-network_7_0_RP_5 + P-network_7_0_RP_6 + P-network_7_0_RP_7 + P-network_5_1_RP_1 + P-network_5_1_RP_2 + P-network_5_1_RP_3 + P-network_5_1_RP_4 + P-network_5_1_RP_5 + P-network_5_1_RP_6 + P-network_5_1_RP_7 + P-network_0_1_RI_7 + P-network_0_1_RI_6 + P-network_0_1_RI_5 + P-network_0_1_RI_4 + P-network_0_1_RI_3 + P-network_0_1_RI_2 + P-network_0_1_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_5_5_AnnP_7 + P-network_3_2_RP_1 + P-network_3_2_RP_2 + P-network_3_2_RP_3 + P-network_3_2_RP_4 + P-network_3_2_RP_5 + P-network_3_2_RP_6 + P-network_3_2_RP_7 + P-network_1_3_RP_1 + P-network_1_3_RP_2 + P-network_1_3_RP_3 + P-network_1_3_RP_4 + P-network_1_3_RP_5 + P-network_1_3_RP_6 + P-network_1_3_RP_7 + P-network_0_0_AI_1 + P-network_0_0_AI_2 + P-network_0_0_AI_3 + P-network_0_0_AI_4 + P-network_0_0_AI_5 + P-network_0_0_AI_6 + P-network_0_0_AI_7 + P-network_0_2_AnnP_1 + P-network_0_2_AnnP_2 + P-network_0_2_AnnP_3 + P-network_0_2_AnnP_4 + P-network_0_2_AnnP_5 + P-network_0_2_AnnP_6 + P-network_0_2_AnnP_7 + P-network_2_0_RI_7 + P-network_2_0_RI_6 + P-network_2_0_RI_5 + P-network_2_0_RI_4 + P-network_2_0_RI_3 + P-network_2_0_RI_2 + P-network_2_0_RI_1 + P-network_6_1_AskP_7 + P-network_6_1_AskP_6 + P-network_6_1_AskP_5 + P-network_6_2_AskP_1 + P-network_6_2_AskP_2 + P-network_6_2_AskP_3 + P-network_6_2_AskP_4 + P-network_6_2_AskP_5 + P-network_6_2_AskP_6 + P-network_6_2_AskP_7 + P-network_6_1_AskP_4 + P-network_6_1_AskP_3 + P-network_6_1_AskP_2 + P-network_6_1_AskP_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 + P-network_3_0_RI_7 + P-network_1_1_RI_1 + P-network_1_1_RI_2 + P-network_1_1_RI_3 + P-network_1_1_RI_4 + P-network_1_1_RI_5 + P-network_1_1_RI_6 + P-network_1_1_RI_7 + P-network_0_1_AnnP_7 + P-network_0_1_AnnP_6 + P-network_0_1_AnnP_5 + P-network_0_1_AnnP_4 + P-network_0_1_AnnP_3 + P-network_0_1_AnnP_2 + P-network_0_1_AnnP_1 + P-network_3_6_AnnP_1 + P-network_3_6_AnnP_2 + P-network_3_6_AnnP_3 + P-network_3_6_AnnP_4 + P-network_3_6_AnnP_5 + P-network_3_6_AnnP_6 + P-network_3_6_AnnP_7 + P-network_0_3_RP_7 + P-network_0_3_RP_6 + P-network_0_3_RP_5 + P-network_4_3_AskP_1 + P-network_4_3_AskP_2 + P-network_4_3_AskP_3 + P-network_4_3_AskP_4 + P-network_4_3_AskP_5 + P-network_4_3_AskP_6 + P-network_4_3_AskP_7 + P-network_0_3_RP_4 + P-network_0_3_RP_3 + P-network_2_0_RP_1 + P-network_2_0_RP_2 + P-network_2_0_RP_3 + P-network_2_0_RP_4 + P-network_2_0_RP_5 + P-network_2_0_RP_6 + P-network_2_0_RP_7 + P-network_0_3_RP_2 + P-network_0_3_RP_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_0_1_RP_7 + P-network_5_0_AnnP_1 + P-network_5_0_AnnP_2 + P-network_5_0_AnnP_3 + P-network_5_0_AnnP_4 + P-network_5_0_AnnP_5 + P-network_5_0_AnnP_6 + P-network_5_0_AnnP_7 + P-network_7_7_AI_1 + P-network_7_7_AI_2 + P-network_7_7_AI_3 + P-network_7_7_AI_4 + P-network_7_7_AI_5 + P-network_7_7_AI_6 + P-network_7_7_AI_7 + P-network_2_2_RP_7 + P-network_2_2_RP_6 + P-network_2_2_RP_5 + P-network_2_2_RP_4 + P-network_2_2_RP_3 + P-network_2_2_RP_2 + P-network_2_2_RP_1 + P-network_5_4_AnnP_7 + P-network_1_7_AnnP_1 + P-network_1_7_AnnP_2 + P-network_1_7_AnnP_3 + P-network_1_7_AnnP_4 + P-network_1_7_AnnP_5 + P-network_1_7_AnnP_6 + P-network_1_7_AnnP_7 + P-network_5_4_AnnP_6 + P-network_7_7_AskP_1 + P-network_7_7_AskP_2 + P-network_7_7_AskP_3 + P-network_7_7_AskP_4 + P-network_7_7_AskP_5 + P-network_7_7_AskP_6 + P-network_7_7_AskP_7 + P-network_5_4_AnnP_5 + P-network_5_4_AnnP_4 + P-network_5_4_AnnP_3 + P-network_5_4_AnnP_2 + P-network_5_4_AnnP_1 + P-network_2_4_AskP_1 + P-network_2_4_AskP_2 + P-network_2_4_AskP_3 + P-network_2_4_AskP_4 + P-network_2_4_AskP_5 + P-network_2_4_AskP_6 + P-network_2_4_AskP_7 + P-network_4_1_RP_7 + P-network_4_1_RP_6 + P-network_4_1_RP_5 + P-network_4_1_RP_4 + P-network_3_1_AnnP_1 + P-network_3_1_AnnP_2 + P-network_3_1_AnnP_3 + P-network_3_1_AnnP_4 + P-network_3_1_AnnP_5 + P-network_3_1_AnnP_6 + P-network_3_1_AnnP_7 + P-network_4_1_RP_3 + P-network_4_1_RP_2 + P-network_4_1_RP_1 + P-network_6_0_RP_7 + P-network_6_0_RP_6 + P-network_6_0_RP_5 + P-network_6_0_RP_4 + P-network_6_0_RP_3 + P-network_6_0_RP_2 + P-network_6_0_RP_1 + P-network_6_5_AI_1 + P-network_6_5_AI_2 + P-network_6_5_AI_3 + P-network_6_5_AI_4 + P-network_6_5_AI_5 + P-network_6_5_AI_6 + P-network_6_5_AI_7 + P-network_6_5_AnnP_1 + P-network_6_5_AnnP_2 + P-network_6_5_AnnP_3 + P-network_6_5_AnnP_4 + P-network_6_5_AnnP_5 + P-network_6_5_AnnP_6 + P-network_6_5_AnnP_7 + P-network_0_5_AskP_1 + P-network_0_5_AskP_2 + P-network_0_5_AskP_3 + P-network_0_5_AskP_4 + P-network_0_5_AskP_5 + P-network_0_5_AskP_6 + P-network_0_5_AskP_7 + P-network_4_6_AI_1 + P-network_4_6_AI_2 + P-network_4_6_AI_3 + P-network_4_6_AI_4 + P-network_4_6_AI_5 + P-network_4_6_AI_6 + P-network_4_6_AI_7 + P-network_4_7_AskP_7 + P-network_4_7_AskP_6 + P-network_4_7_AskP_5 + P-network_4_7_AskP_4 + P-network_2_7_AI_1 + P-network_2_7_AI_2 + P-network_2_7_AI_3 + P-network_2_7_AI_4 + P-network_2_7_AI_5 + P-network_2_7_AI_6 + P-network_2_7_AI_7 + P-network_4_7_AskP_3 + P-network_1_2_AnnP_1 + P-network_1_2_AnnP_2 + P-network_1_2_AnnP_3 + P-network_1_2_AnnP_4 + P-network_1_2_AnnP_5 + P-network_1_2_AnnP_6 + P-network_1_2_AnnP_7 + P-network_4_7_AskP_2 + P-network_4_7_AskP_1 + P-network_7_2_AskP_1 + P-network_7_2_AskP_2 + P-network_7_2_AskP_3 + P-network_7_2_AskP_4 + P-network_7_2_AskP_5 + P-network_7_2_AskP_6 + P-network_7_2_AskP_7 + P-network_7_6_RI_1 + P-network_7_6_RI_2 + P-network_7_6_RI_3 + P-network_7_6_RI_4 + P-network_7_6_RI_5 + P-network_7_6_RI_6 + P-network_7_6_RI_7 + P-network_5_7_RI_1 + P-network_5_7_RI_2 + P-network_5_7_RI_3 + P-network_5_7_RI_4 + P-network_5_7_RI_5 + P-network_5_7_RI_6 + P-network_5_7_RI_7 + P-network_4_6_AnnP_1 + P-network_4_6_AnnP_2 + P-network_4_6_AnnP_3 + P-network_4_6_AnnP_4 + P-network_4_6_AnnP_5 + P-network_4_6_AnnP_6 + P-network_4_6_AnnP_7 + P-network_7_2_AI_1 + P-network_7_2_AI_2 + P-network_7_2_AI_3 + P-network_7_2_AI_4 + P-network_7_2_AI_5 + P-network_7_2_AI_6 + P-network_7_2_AI_7 + P-network_5_3_AskP_1 + P-network_5_3_AskP_2 + P-network_5_3_AskP_3 + P-network_5_3_AskP_4 + P-network_5_3_AskP_5 + P-network_5_3_AskP_6 + P-network_5_3_AskP_7 + P-network_6_6_RP_1 + P-network_6_6_RP_2 + P-network_6_6_RP_3 + P-network_6_6_RP_4 + P-network_6_6_RP_5 + P-network_6_6_RP_6 + P-network_6_6_RP_7 + P-network_5_3_AI_1 + P-network_5_3_AI_2 + P-network_5_3_AI_3 + P-network_5_3_AI_4 + P-network_5_3_AI_5 + P-network_5_3_AI_6 + P-network_5_3_AI_7 + P-network_4_7_RP_1 + P-network_4_7_RP_2 + P-network_4_7_RP_3 + P-network_4_7_RP_4 + P-network_4_7_RP_5 + P-network_4_7_RP_6 + P-network_4_7_RP_7 + P-network_2_0_AnnP_7 + P-network_3_4_AI_1 + P-network_3_4_AI_2 + P-network_3_4_AI_3 + P-network_3_4_AI_4 + P-network_3_4_AI_5 + P-network_3_4_AI_6 + P-network_3_4_AI_7 + P-network_2_0_AnnP_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_1_5_AI_7 + P-network_2_0_AnnP_5 + P-network_6_0_AnnP_1 + P-network_6_0_AnnP_2 + P-network_6_0_AnnP_3 + P-network_6_0_AnnP_4 + P-network_6_0_AnnP_5 + P-network_6_0_AnnP_6 + P-network_6_0_AnnP_7 + P-network_2_0_AnnP_4 + P-network_0_0_AskP_1 + P-network_0_0_AskP_2 + P-network_0_0_AskP_3 + P-network_0_0_AskP_4 + P-network_0_0_AskP_5 + P-network_0_0_AskP_6 + P-network_0_0_AskP_7 + P-network_2_0_AnnP_3 + P-network_2_0_AnnP_2 + P-network_2_0_AnnP_1 + P-network_1_3_RI_7 + P-network_1_3_RI_6 + P-network_1_3_RI_5 + P-network_1_3_RI_4 + P-network_1_3_RI_3 + P-network_1_3_RI_2 + P-network_6_4_RI_1 + P-network_6_4_RI_2 + P-network_6_4_RI_3 + P-network_6_4_RI_4 + P-network_6_4_RI_5 + P-network_6_4_RI_6 + P-network_6_4_RI_7 + P-network_1_3_RI_1 + P-network_2_7_AnnP_1 + P-network_2_7_AnnP_2 + P-network_2_7_AnnP_3 + P-network_2_7_AnnP_4 + P-network_2_7_AnnP_5 + P-network_2_7_AnnP_6 + P-network_2_7_AnnP_7 + P-network_4_5_RI_1 + P-network_4_5_RI_2 + P-network_4_5_RI_3 + P-network_4_5_RI_4 + P-network_4_5_RI_5 + P-network_4_5_RI_6 + P-network_4_5_RI_7 + P-network_3_2_RI_7 + P-network_2_6_RI_1 + P-network_2_6_RI_2 + P-network_2_6_RI_3 + P-network_2_6_RI_4 + P-network_2_6_RI_5 + P-network_2_6_RI_6 + P-network_2_6_RI_7 + P-network_3_2_RI_6 + P-network_3_2_RI_5 + P-network_0_7_RI_1 + P-network_0_7_RI_2 + P-network_0_7_RI_3 + P-network_0_7_RI_4 + P-network_0_7_RI_5 + P-network_0_7_RI_6 + P-network_0_7_RI_7 + P-network_3_2_RI_4 + P-network_3_2_RI_3 + P-network_3_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_3_4_AskP_7 + P-network_3_2_RI_1 + P-network_1_3_AskP_7 + P-network_1_3_AskP_6 + P-network_1_3_AskP_5 + P-network_1_3_AskP_4 + P-network_1_3_AskP_3 + P-network_1_3_AskP_2 + P-network_1_3_AskP_1 + P-network_7_3_AnnP_7 + P-network_7_3_AnnP_6 + P-network_7_3_AnnP_5 + P-network_4_1_AnnP_1 + P-network_4_1_AnnP_2 + P-network_4_1_AnnP_3 + P-network_4_1_AnnP_4 + P-network_4_1_AnnP_5 + P-network_4_1_AnnP_6 + P-network_4_1_AnnP_7 + P-network_7_3_AnnP_4 + P-network_7_3_AnnP_3 + P-network_7_3_AnnP_2 + P-network_7_3_AnnP_1 + P-network_5_1_RI_7 + P-network_5_1_RI_6 + P-network_5_1_RI_5 + P-network_5_1_RI_4 + P-network_7_3_RP_1 + P-network_7_3_RP_2 + P-network_7_3_RP_3 + P-network_7_3_RP_4 + P-network_7_3_RP_5 + P-network_7_3_RP_6 + P-network_7_3_RP_7 + P-network_5_1_RI_3 + P-network_6_0_AI_1 + P-network_6_0_AI_2 + P-network_6_0_AI_3 + P-network_6_0_AI_4 + P-network_6_0_AI_5 + P-network_6_0_AI_6 + P-network_6_0_AI_7 + P-network_5_1_RI_2 + P-network_5_4_RP_1 + P-network_5_4_RP_2 + P-network_5_4_RP_3 + P-network_5_4_RP_4 + P-network_5_4_RP_5 + P-network_5_4_RP_6 + P-network_5_4_RP_7 + P-network_5_1_RI_1 + P-network_7_0_RI_7 + P-network_7_0_RI_6 + P-network_7_0_RI_5 + P-network_7_0_RI_4 + P-network_7_0_RI_3 + P-network_7_0_RI_2 + P-network_7_0_RI_1 + P-network_4_1_AI_1 + P-network_4_1_AI_2 + P-network_4_1_AI_3 + P-network_4_1_AI_4 + P-network_4_1_AI_5 + P-network_4_1_AI_6 + P-network_4_1_AI_7 + P-network_3_5_RP_1 + P-network_3_5_RP_2 + P-network_3_5_RP_3 + P-network_3_5_RP_4 + P-network_3_5_RP_5 + P-network_3_5_RP_6 + P-network_3_5_RP_7 + P-network_2_2_AI_1 + P-network_2_2_AI_2 + P-network_2_2_AI_3 + P-network_2_2_AI_4 + P-network_2_2_AI_5 + P-network_2_2_AI_6 + P-network_2_2_AI_7 + P-network_1_6_RP_1 + P-network_1_6_RP_2 + P-network_1_6_RP_3 + P-network_1_6_RP_4 + P-network_1_6_RP_5 + P-network_1_6_RP_6 + P-network_1_6_RP_7 + P-network_0_3_AI_1 + P-network_0_3_AI_2 + P-network_0_3_AI_3 + P-network_0_3_AI_4 + P-network_0_3_AI_5 + P-network_0_3_AI_6 + P-network_0_3_AI_7 + P-network_6_6_AskP_7 + P-network_6_6_AskP_6 + P-network_6_6_AskP_5 + P-network_6_6_AskP_4 + P-network_6_6_AskP_3 + P-network_6_6_AskP_2 + P-network_6_6_AskP_1 + P-network_7_1_RI_1 + P-network_7_1_RI_2 + P-network_7_1_RI_3 + P-network_7_1_RI_4 + P-network_7_1_RI_5 + P-network_7_1_RI_6 + P-network_7_1_RI_7 + P-network_0_2_AI_7 + P-network_7_5_AnnP_1 + P-network_7_5_AnnP_2 + P-network_7_5_AnnP_3 + P-network_7_5_AnnP_4 + P-network_7_5_AnnP_5 + P-network_7_5_AnnP_6 + P-network_7_5_AnnP_7 + P-network_0_2_AI_6 + P-network_0_2_AI_5 + P-network_1_5_AskP_1 + P-network_1_5_AskP_2 + P-network_1_5_AskP_3 + P-network_1_5_AskP_4 + P-network_1_5_AskP_5 + P-network_1_5_AskP_6 + P-network_1_5_AskP_7 + P-network_0_2_AI_4 + P-network_5_2_RI_1 + P-network_5_2_RI_2 + P-network_5_2_RI_3 + P-network_5_2_RI_4 + P-network_5_2_RI_5 + P-network_5_2_RI_6 + P-network_5_2_RI_7 + P-network_0_2_AI_3 + P-network_0_2_AI_2 + P-network_0_2_AI_1 + P-network_1_5_RP_7 + P-network_1_5_RP_6 + P-network_1_5_RP_5 + P-network_1_5_RP_4 + P-network_1_5_RP_3 + P-network_3_3_RI_1 + P-network_3_3_RI_2 + P-network_3_3_RI_3 + P-network_3_3_RI_4 + P-network_3_3_RI_5 + P-network_3_3_RI_6 + P-network_3_3_RI_7 + P-network_1_5_RP_2 + P-network_1_4_RI_1 + P-network_1_4_RI_2 + P-network_1_4_RI_3 + P-network_1_4_RI_4 + P-network_1_4_RI_5 + P-network_1_4_RI_6 + P-network_1_4_RI_7 + P-network_1_5_RP_1 + P-network_2_2_AnnP_1 + P-network_2_2_AnnP_2 + P-network_2_2_AnnP_3 + P-network_2_2_AnnP_4 + P-network_2_2_AnnP_5 + P-network_2_2_AnnP_6 + P-network_2_2_AnnP_7 + P-network_0_6_AnnP_7 + P-network_0_6_AnnP_6 + P-network_0_6_AnnP_5 + P-network_0_6_AnnP_4 + P-network_0_6_AnnP_3 + P-network_0_6_AnnP_2 + P-network_0_6_AnnP_1 + P-network_2_1_AI_7 + P-network_2_1_AI_6 + P-network_2_1_AI_5 + P-network_2_1_AI_4 + P-network_2_1_AI_3 + P-network_6_1_RP_1 + P-network_6_1_RP_2 + P-network_6_1_RP_3 + P-network_6_1_RP_4 + P-network_6_1_RP_5 + P-network_6_1_RP_6 + P-network_6_1_RP_7 + P-network_2_1_AI_2 + P-network_5_6_AnnP_1 + P-network_5_6_AnnP_2 + P-network_5_6_AnnP_3 + P-network_5_6_AnnP_4 + P-network_5_6_AnnP_5 + P-network_5_6_AnnP_6 + P-network_5_6_AnnP_7 + P-network_2_1_AI_1 + P-network_4_2_RP_1 + P-network_4_2_RP_2 + P-network_4_2_RP_3 + P-network_4_2_RP_4 + P-network_4_2_RP_5 + P-network_4_2_RP_6 + P-network_4_2_RP_7 + P-network_3_4_RP_7 + P-network_3_4_RP_6 + P-network_3_4_RP_5 + P-network_3_4_RP_4 + P-network_3_4_RP_3 + P-network_3_4_RP_2 + P-network_3_4_RP_1 + 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_2_3_RP_7 + P-network_1_0_AI_1 + P-network_1_0_AI_2 + P-network_1_0_AI_3 + P-network_1_0_AI_4 + P-network_1_0_AI_5 + P-network_1_0_AI_6 + P-network_1_0_AI_7 + P-network_0_4_RP_1 + P-network_0_4_RP_2 + P-network_0_4_RP_3 + P-network_0_4_RP_4 + P-network_0_4_RP_5 + P-network_0_4_RP_6 + P-network_0_4_RP_7 + P-network_0_3_AnnP_1 + P-network_0_3_AnnP_2 + P-network_0_3_AnnP_3 + P-network_0_3_AnnP_4 + P-network_0_3_AnnP_5 + P-network_0_3_AnnP_6 + P-network_0_3_AnnP_7 + P-network_6_3_AskP_1 + P-network_6_3_AskP_2 + P-network_6_3_AskP_3 + P-network_6_3_AskP_4 + P-network_6_3_AskP_5 + P-network_6_3_AskP_6 + P-network_6_3_AskP_7 + P-network_4_0_AI_7 + P-network_4_0_AI_6 + P-network_4_0_AI_5 + P-network_4_0_AI_4 + P-network_4_0_AI_3 + P-network_4_0_AI_2 + P-network_4_0_AI_1 + P-network_5_3_RP_7 + 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_4_0_RI_7 + P-network_5_3_RP_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_2_1_RI_7 + P-network_5_3_RP_5 + P-network_7_0_AnnP_1 + P-network_7_0_AnnP_2 + P-network_7_0_AnnP_3 + P-network_7_0_AnnP_4 + P-network_7_0_AnnP_5 + P-network_7_0_AnnP_6 + P-network_7_0_AnnP_7 + P-network_5_3_RP_4 + P-network_1_0_AskP_1 + P-network_1_0_AskP_2 + P-network_1_0_AskP_3 + P-network_1_0_AskP_4 + P-network_1_0_AskP_5 + P-network_1_0_AskP_6 + P-network_1_0_AskP_7 + P-network_5_3_RP_3 + P-network_0_2_RI_1 + P-network_0_2_RI_2 + P-network_0_2_RI_3 + P-network_0_2_RI_4 + P-network_0_2_RI_5 + P-network_0_2_RI_6 + P-network_0_2_RI_7 + P-network_5_3_RP_2 + P-network_5_3_RP_1 + P-network_3_7_AnnP_1 + P-network_3_7_AnnP_2 + P-network_3_7_AnnP_3 + P-network_3_7_AnnP_4 + P-network_3_7_AnnP_5 + P-network_3_7_AnnP_6 + P-network_3_7_AnnP_7 + P-network_7_2_RP_7 + P-network_7_2_RP_6 + P-network_7_2_RP_5 + P-network_7_2_RP_4 + P-network_7_2_RP_3 + P-network_7_2_RP_2 + P-network_7_2_RP_1 + P-network_4_4_AskP_1 + P-network_4_4_AskP_2 + P-network_4_4_AskP_3 + P-network_4_4_AskP_4 + P-network_4_4_AskP_5 + P-network_4_4_AskP_6 + P-network_4_4_AskP_7 + P-network_3_0_RP_1 + P-network_3_0_RP_2 + P-network_3_0_RP_3 + P-network_3_0_RP_4 + P-network_3_0_RP_5 + P-network_3_0_RP_6 + P-network_3_0_RP_7 + P-network_1_1_RP_1 + P-network_1_1_RP_2 + P-network_1_1_RP_3 + P-network_1_1_RP_4 + P-network_1_1_RP_5 + P-network_1_1_RP_6 + P-network_1_1_RP_7 + P-network_5_1_AnnP_1 + P-network_5_1_AnnP_2 + P-network_5_1_AnnP_3 + P-network_5_1_AnnP_4 + P-network_5_1_AnnP_5 + P-network_5_1_AnnP_6 + P-network_5_1_AnnP_7 + P-network_3_2_AskP_7 + P-network_3_2_AskP_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_2_5_AskP_7 + P-network_3_2_AskP_5 + P-network_3_2_AskP_4 + P-network_3_2_AskP_3 + P-network_3_2_AskP_2 + P-network_3_2_AskP_1 + P-network_3_2_AnnP_1 + P-network_3_2_AnnP_2 + P-network_3_2_AnnP_3 + P-network_3_2_AnnP_4 + P-network_3_2_AnnP_5 + P-network_3_2_AnnP_6 + P-network_3_2_AnnP_7 + P-network_0_6_RI_7 + P-network_0_6_RI_6 + P-network_0_6_RI_5 + P-network_0_6_RI_4 + P-network_0_6_RI_3 + P-network_0_6_RI_2 + P-network_0_6_RI_1 + P-network_2_5_RI_7 + P-network_2_5_RI_6 + P-network_2_5_RI_5 + P-network_2_5_RI_4 + P-network_2_5_RI_3 + P-network_2_5_RI_2 + P-network_2_5_RI_1 + P-network_2_5_AnnP_7 + P-network_7_5_AI_1 + P-network_7_5_AI_2 + P-network_7_5_AI_3 + P-network_7_5_AI_4 + P-network_7_5_AI_5 + P-network_7_5_AI_6 + P-network_7_5_AI_7 + P-network_2_5_AnnP_6 + P-network_6_6_AnnP_1 + P-network_6_6_AnnP_2 + P-network_6_6_AnnP_3 + P-network_6_6_AnnP_4 + P-network_6_6_AnnP_5 + P-network_6_6_AnnP_6 + P-network_6_6_AnnP_7 + P-network_2_5_AnnP_5 + P-network_0_6_AskP_1 + P-network_0_6_AskP_2 + P-network_0_6_AskP_3 + P-network_0_6_AskP_4 + P-network_0_6_AskP_5 + P-network_0_6_AskP_6 + P-network_0_6_AskP_7 + P-network_2_5_AnnP_4 + P-network_2_5_AnnP_3 + P-network_5_6_AI_1 + P-network_5_6_AI_2 + P-network_5_6_AI_3 + P-network_5_6_AI_4 + P-network_5_6_AI_5 + P-network_5_6_AI_6 + P-network_5_6_AI_7 + P-network_2_5_AnnP_2 + P-network_2_5_AnnP_1 + P-network_3_7_AI_1 + P-network_3_7_AI_2 + P-network_3_7_AI_3 + P-network_3_7_AI_4 + P-network_3_7_AI_5 + P-network_3_7_AI_6 + P-network_3_7_AI_7 + P-network_1_3_AnnP_1 + P-network_1_3_AnnP_2 + P-network_1_3_AnnP_3 + P-network_1_3_AnnP_4 + P-network_1_3_AnnP_5 + P-network_1_3_AnnP_6 + P-network_1_3_AnnP_7 + P-network_7_3_AskP_1 + P-network_7_3_AskP_2 + P-network_7_3_AskP_3 + P-network_7_3_AskP_4 + P-network_7_3_AskP_5 + P-network_7_3_AskP_6 + P-network_7_3_AskP_7 + P-network_4_4_RI_7 + P-network_4_4_RI_6 + P-network_4_4_RI_5 + P-network_4_4_RI_4 + P-network_4_4_RI_3 + P-network_4_4_RI_2 + P-network_4_4_RI_1 + P-network_6_3_RI_7 + P-network_6_7_RI_1 + P-network_6_7_RI_2 + P-network_6_7_RI_3 + P-network_6_7_RI_4 + P-network_6_7_RI_5 + P-network_6_7_RI_6 + P-network_6_7_RI_7 + P-network_6_3_RI_6 + P-network_2_0_AskP_1 + P-network_2_0_AskP_2 + P-network_2_0_AskP_3 + P-network_2_0_AskP_4 + P-network_2_0_AskP_5 + P-network_2_0_AskP_6 + P-network_2_0_AskP_7 + P-network_6_3_RI_5 + P-network_6_3_RI_4 + P-network_6_3_RI_3 + P-network_6_3_RI_2 + P-network_6_3_RI_1 + P-network_4_7_AnnP_1 + P-network_4_7_AnnP_2 + P-network_4_7_AnnP_3 + P-network_4_7_AnnP_4 + P-network_4_7_AnnP_5 + P-network_4_7_AnnP_6 + P-network_4_7_AnnP_7 + P-network_1_4_AI_7 + P-network_1_4_AI_6 + P-network_1_4_AI_5 + P-network_1_4_AI_4 + P-network_1_4_AI_3 + P-network_1_4_AI_2 + P-network_1_4_AI_1 + P-network_5_4_AskP_1 + P-network_5_4_AskP_2 + P-network_5_4_AskP_3 + P-network_5_4_AskP_4 + P-network_5_4_AskP_5 + P-network_5_4_AskP_6 + P-network_5_4_AskP_7 + P-network_7_6_RP_1 + P-network_7_6_RP_2 + P-network_7_6_RP_3 + P-network_7_6_RP_4 + P-network_7_6_RP_5 + P-network_7_6_RP_6 + P-network_7_6_RP_7 + P-network_2_7_RP_7 + P-network_6_3_AI_1 + P-network_6_3_AI_2 + P-network_6_3_AI_3 + P-network_6_3_AI_4 + P-network_6_3_AI_5 + P-network_6_3_AI_6 + P-network_6_3_AI_7 + P-network_2_7_RP_6 + P-network_2_7_RP_5 + P-network_2_7_RP_4 + P-network_2_7_RP_3 + P-network_2_7_RP_2 + P-network_2_7_RP_1 + P-network_3_3_AI_7 + P-network_3_3_AI_6 + P-network_3_3_AI_5 + P-network_3_3_AI_4 + P-network_3_3_AI_3 + P-network_3_3_AI_2 + P-network_3_3_AI_1 + P-network_4_6_RP_7 + P-network_4_6_RP_6 + P-network_4_6_RP_5 + P-network_5_7_RP_1 + P-network_5_7_RP_2 + P-network_5_7_RP_3 + P-network_5_7_RP_4 + P-network_5_7_RP_5 + P-network_5_7_RP_6 + P-network_5_7_RP_7 + P-network_4_6_RP_4 + 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_4_4_AI_7 + P-network_4_6_RP_3 + 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_2_5_AI_7 + P-network_4_6_RP_2 + P-network_6_1_AnnP_1 + P-network_6_1_AnnP_2 + P-network_6_1_AnnP_3 + P-network_6_1_AnnP_4 + P-network_6_1_AnnP_5 + P-network_6_1_AnnP_6 + P-network_6_1_AnnP_7 + P-network_4_6_RP_1 + P-network_0_1_AskP_1 + P-network_0_1_AskP_2 + P-network_0_1_AskP_3 + P-network_0_1_AskP_4 + P-network_0_1_AskP_5 + P-network_0_1_AskP_6 + P-network_0_1_AskP_7 + P-network_5_1_AskP_7 + P-network_0_6_AI_1 + P-network_0_6_AI_2 + P-network_0_6_AI_3 + P-network_0_6_AI_4 + P-network_0_6_AI_5 + P-network_0_6_AI_6 + P-network_0_6_AI_7 + P-network_5_1_AskP_6 + P-network_5_1_AskP_5 + P-network_5_1_AskP_4 + P-network_5_1_AskP_3 + P-network_5_1_AskP_2 + P-network_5_1_AskP_1 + P-network_5_2_AI_7 + P-network_5_2_AI_6 + P-network_5_2_AI_5 + P-network_7_4_RI_1 + P-network_7_4_RI_2 + P-network_7_4_RI_3 + P-network_7_4_RI_4 + P-network_7_4_RI_5 + P-network_7_4_RI_6 + P-network_7_4_RI_7 + P-network_5_2_AI_4 + P-network_5_5_RI_1 + P-network_5_5_RI_2 + P-network_5_5_RI_3 + P-network_5_5_RI_4 + P-network_5_5_RI_5 + P-network_5_5_RI_6 + P-network_5_5_RI_7 + P-network_5_2_AI_3 + P-network_3_6_RI_1 + P-network_3_6_RI_2 + P-network_3_6_RI_3 + P-network_3_6_RI_4 + P-network_3_6_RI_5 + P-network_3_6_RI_6 + P-network_3_6_RI_7 + P-network_5_2_AI_2 + P-network_5_2_AI_1 + P-network_6_5_RP_7 + P-network_6_5_RP_6 + P-network_6_5_RP_5 + P-network_6_5_RP_4 + P-network_6_5_RP_3 + P-network_6_5_RP_2 + P-network_6_5_RP_1 + P-network_1_7_RI_1 + P-network_1_7_RI_2 + P-network_1_7_RI_3 + P-network_1_7_RI_4 + P-network_1_7_RI_5 + P-network_1_7_RI_6 + P-network_1_7_RI_7 + P-network_3_5_AskP_1 + P-network_3_5_AskP_2 + P-network_3_5_AskP_3 + P-network_3_5_AskP_4 + P-network_3_5_AskP_5 + P-network_3_5_AskP_6 + P-network_3_5_AskP_7 + P-network_4_2_AnnP_1 + P-network_4_2_AnnP_2 + P-network_4_2_AnnP_3 + P-network_4_2_AnnP_4 + P-network_4_2_AnnP_5 + P-network_4_2_AnnP_6 + P-network_4_2_AnnP_7 + P-network_7_1_AI_7 + P-network_7_1_AI_6 + P-network_7_1_AI_5 + P-network_7_1_AI_4 + P-network_7_1_AI_3 + P-network_7_0_AI_1 + P-network_7_0_AI_2 + P-network_7_0_AI_3 + P-network_7_0_AI_4 + P-network_7_0_AI_5 + P-network_7_0_AI_6 + P-network_7_0_AI_7 + P-network_7_1_AI_2 + P-network_6_4_RP_1 + P-network_6_4_RP_2 + P-network_6_4_RP_3 + P-network_6_4_RP_4 + P-network_6_4_RP_5 + P-network_6_4_RP_6 + P-network_6_4_RP_7 + P-network_7_1_AI_1 + 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_5_1_AI_6 + P-network_5_1_AI_7 + P-network_4_4_AnnP_7 + P-network_4_5_RP_1 + P-network_4_5_RP_2 + P-network_4_5_RP_3 + P-network_4_5_RP_4 + P-network_4_5_RP_5 + P-network_4_5_RP_6 + P-network_4_5_RP_7 + P-network_4_4_AnnP_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_2_AI_7 + P-network_4_4_AnnP_5 + P-network_4_4_AnnP_4 + P-network_2_6_RP_1 + P-network_2_6_RP_2 + P-network_2_6_RP_3 + P-network_2_6_RP_4 + P-network_2_6_RP_5 + P-network_2_6_RP_6 + P-network_2_6_RP_7 + P-network_4_4_AnnP_3 + P-network_1_3_AI_1 + P-network_1_3_AI_2 + P-network_1_3_AI_3 + P-network_1_3_AI_4 + P-network_1_3_AI_5 + P-network_1_3_AI_6 + P-network_1_3_AI_7 + P-network_4_4_AnnP_2 + P-network_4_4_AnnP_1 + P-network_0_7_RP_1 + P-network_0_7_RP_2 + P-network_0_7_RP_3 + P-network_0_7_RP_4 + P-network_0_7_RP_5 + P-network_0_7_RP_6 + P-network_0_7_RP_7 + P-network_7_6_AnnP_1 + P-network_7_6_AnnP_2 + P-network_7_6_AnnP_3 + P-network_7_6_AnnP_4 + P-network_7_6_AnnP_5 + P-network_7_6_AnnP_6 + P-network_7_6_AnnP_7 + P-network_1_6_AskP_1 + P-network_1_6_AskP_2 + P-network_1_6_AskP_3 + P-network_1_6_AskP_4 + P-network_1_6_AskP_5 + P-network_1_6_AskP_6 + P-network_1_6_AskP_7 + P-network_6_2_RI_1 + P-network_6_2_RI_2 + P-network_6_2_RI_3 + P-network_6_2_RI_4 + P-network_6_2_RI_5 + P-network_6_2_RI_6 + P-network_6_2_RI_7 + P-network_3_7_AskP_7 + P-network_4_3_RI_1 + P-network_4_3_RI_2 + P-network_4_3_RI_3 + P-network_4_3_RI_4 + P-network_4_3_RI_5 + P-network_4_3_RI_6 + P-network_4_3_RI_7 + P-network_3_7_AskP_6 + P-network_2_4_RI_1 + P-network_2_4_RI_2 + P-network_2_4_RI_3 + P-network_2_4_RI_4 + P-network_2_4_RI_5 + P-network_2_4_RI_6 + P-network_2_4_RI_7 + P-network_3_7_AskP_5 + P-network_2_3_AnnP_1 + P-network_2_3_AnnP_2 + P-network_2_3_AnnP_3 + P-network_2_3_AnnP_4 + P-network_2_3_AnnP_5 + P-network_2_3_AnnP_6 + P-network_2_3_AnnP_7 + P-network_3_7_AskP_4 + P-network_0_5_RI_1 + P-network_0_5_RI_2 + P-network_0_5_RI_3 + P-network_0_5_RI_4 + P-network_0_5_RI_5 + P-network_0_5_RI_6 + P-network_0_5_RI_7 + P-network_3_7_AskP_3 + P-network_3_7_AskP_2 + P-network_3_7_AskP_1 + P-network_3_0_AskP_1 + P-network_3_0_AskP_2 + P-network_3_0_AskP_3 + P-network_3_0_AskP_4 + P-network_3_0_AskP_5 + P-network_3_0_AskP_6 + P-network_3_0_AskP_7 + P-network_3_7_RI_7 + P-network_7_1_RP_1 + P-network_7_1_RP_2 + P-network_7_1_RP_3 + P-network_7_1_RP_4 + P-network_7_1_RP_5 + P-network_7_1_RP_6 + P-network_7_1_RP_7 + P-network_3_7_RI_6 + P-network_5_7_AnnP_1 + P-network_5_7_AnnP_2 + P-network_5_7_AnnP_3 + P-network_5_7_AnnP_4 + P-network_5_7_AnnP_5 + P-network_5_7_AnnP_6 + P-network_5_7_AnnP_7 + P-network_3_7_RI_5 + P-network_5_2_RP_1 + P-network_5_2_RP_2 + P-network_5_2_RP_3 + P-network_5_2_RP_4 + P-network_5_2_RP_5 + P-network_5_2_RP_6 + P-network_5_2_RP_7 + P-network_3_7_RI_4 + P-network_3_7_RI_3 + P-network_3_7_RI_2 + P-network_3_7_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_3_3_RP_7 + P-network_2_0_AI_1 + P-network_2_0_AI_2 + P-network_2_0_AI_3 + P-network_2_0_AI_4 + P-network_2_0_AI_5 + P-network_2_0_AI_6 + P-network_2_0_AI_7 + P-network_1_4_RP_1 + P-network_1_4_RP_2 + P-network_1_4_RP_3 + P-network_1_4_RP_4 + P-network_1_4_RP_5 + P-network_1_4_RP_6 + P-network_1_4_RP_7 + P-network_0_1_AI_1 + P-network_0_1_AI_2 + P-network_0_1_AI_3 + P-network_0_1_AI_4 + P-network_0_1_AI_5 + P-network_0_1_AI_6 + P-network_0_1_AI_7 + P-network_0_4_AnnP_1 + P-network_0_4_AnnP_2 + P-network_0_4_AnnP_3 + P-network_0_4_AnnP_4 + P-network_0_4_AnnP_5 + P-network_0_4_AnnP_6 + P-network_0_4_AnnP_7 + P-network_6_4_AskP_1 + P-network_6_4_AskP_2 + P-network_6_4_AskP_3 + P-network_6_4_AskP_4 + P-network_6_4_AskP_5 + P-network_6_4_AskP_6 + P-network_6_4_AskP_7 + P-network_5_6_RI_7 + P-network_5_6_RI_6 + 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_5_0_RI_7 + P-network_5_6_RI_5 + P-network_3_1_RI_1 + P-network_3_1_RI_2 + P-network_3_1_RI_3 + P-network_3_1_RI_4 + P-network_3_1_RI_5 + P-network_3_1_RI_6 + P-network_3_1_RI_7 + P-network_5_6_RI_4 + P-network_7_1_AnnP_1 + P-network_7_1_AnnP_2 + P-network_7_1_AnnP_3 + P-network_7_1_AnnP_4 + P-network_7_1_AnnP_5 + P-network_7_1_AnnP_6 + P-network_7_1_AnnP_7 + P-network_5_6_RI_3 + P-network_1_1_AskP_1 + P-network_1_1_AskP_2 + P-network_1_1_AskP_3 + P-network_1_1_AskP_4 + P-network_1_1_AskP_5 + P-network_1_1_AskP_6 + P-network_1_1_AskP_7 + P-network_5_6_RI_2 + P-network_1_2_RI_1 + P-network_1_2_RI_2 + P-network_1_2_RI_3 + P-network_1_2_RI_4 + P-network_1_2_RI_5 + P-network_1_2_RI_6 + P-network_1_2_RI_7 + P-network_5_6_RI_1 + P-network_7_0_AskP_7 + P-network_7_0_AskP_6 + P-network_7_0_AskP_5 + P-network_7_0_AskP_4 + P-network_7_0_AskP_3 + P-network_7_0_AskP_2 + P-network_7_0_AskP_1 + P-network_7_5_RI_7 + P-network_7_5_RI_6 + P-network_7_5_RI_5 + P-network_7_5_RI_4 + P-network_4_5_AskP_1 + P-network_4_5_AskP_2 + P-network_4_5_AskP_3 + P-network_4_5_AskP_4 + P-network_4_5_AskP_5 + P-network_4_5_AskP_6 + P-network_4_5_AskP_7 + P-network_7_5_RI_3 + P-network_4_0_RP_1 + P-network_4_0_RP_2 + P-network_4_0_RP_3 + P-network_4_0_RP_4 + P-network_4_0_RP_5 + P-network_4_0_RP_6 + P-network_4_0_RP_7 + P-network_7_5_RI_2 + P-network_7_5_RI_1 + P-network_2_1_RP_1 + P-network_2_1_RP_2 + P-network_2_1_RP_3 + P-network_2_1_RP_4 + P-network_2_1_RP_5 + P-network_2_1_RP_6 + P-network_2_1_RP_7 + P-network_5_2_AnnP_1 + P-network_5_2_AnnP_2 + P-network_5_2_AnnP_3 + P-network_5_2_AnnP_4 + P-network_5_2_AnnP_5 + P-network_5_2_AnnP_6 + P-network_5_2_AnnP_7 + P-network_1_0_AnnP_7 + P-network_0_2_RP_1 + P-network_0_2_RP_2 + P-network_0_2_RP_3 + P-network_0_2_RP_4 + P-network_0_2_RP_5 + P-network_0_2_RP_6 + P-network_0_2_RP_7 + P-network_1_0_AnnP_6 + P-network_1_0_AnnP_5 + P-network_1_0_AnnP_4 + P-network_1_0_AnnP_3 + P-network_1_0_AnnP_2 + P-network_1_0_AnnP_1 + P-network_0_7_AI_7 + P-network_0_7_AI_6 + P-network_0_7_AI_5 + P-network_0_7_AI_4 + P-network_0_7_AI_3 + P-network_0_7_AI_2 + P-network_0_7_AI_1 + P-network_2_6_AI_7 + P-network_2_6_AI_6 + P-network_2_6_AI_5 + P-network_2_6_AI_4 + P-network_2_6_AI_3 + P-network_2_6_AI_2 + P-network_2_6_AI_1 + P-network_0_3_AskP_7 + P-network_0_3_AskP_6 + P-network_0_3_AskP_5 + P-network_0_0_RI_1 + P-network_0_0_RI_2 + P-network_0_0_RI_3 + P-network_0_0_RI_4 + P-network_0_0_RI_5 + P-network_0_0_RI_6 + P-network_0_0_RI_7 + P-network_0_3_AskP_4 + P-network_2_6_AskP_1 + P-network_2_6_AskP_2 + P-network_2_6_AskP_3 + P-network_2_6_AskP_4 + P-network_2_6_AskP_5 + P-network_2_6_AskP_6 + P-network_2_6_AskP_7 + P-network_0_3_AskP_3 + P-network_0_3_AskP_2 + P-network_0_3_AskP_1 + P-network_6_3_AnnP_7 + P-network_6_3_AnnP_6 + P-network_6_3_AnnP_5 + P-network_6_3_AnnP_4 + P-network_6_3_AnnP_3 + P-network_3_3_AnnP_1 + P-network_3_3_AnnP_2 + P-network_3_3_AnnP_3 + P-network_3_3_AnnP_4 + P-network_3_3_AnnP_5 + P-network_3_3_AnnP_6 + P-network_3_3_AnnP_7 + P-network_6_3_AnnP_2 + P-network_6_3_AnnP_1 + P-network_4_5_AI_7 + P-network_4_5_AI_6 + P-network_4_5_AI_5 + P-network_4_5_AI_4 + P-network_4_5_AI_3 + P-network_4_5_AI_2 + P-network_4_5_AI_1 + P-network_4_0_AskP_1 + P-network_4_0_AskP_2 + P-network_4_0_AskP_3 + P-network_4_0_AskP_4 + P-network_4_0_AskP_5 + P-network_4_0_AskP_6 + P-network_4_0_AskP_7 + P-network_6_7_AnnP_1 + P-network_6_7_AnnP_2 + P-network_6_7_AnnP_3 + P-network_6_7_AnnP_4 + P-network_6_7_AnnP_5 + P-network_6_7_AnnP_6 + P-network_6_7_AnnP_7 + P-network_0_7_AskP_1 + P-network_0_7_AskP_2 + P-network_0_7_AskP_3 + P-network_0_7_AskP_4 + P-network_0_7_AskP_5 + P-network_0_7_AskP_6 + P-network_0_7_AskP_7 + P-network_6_6_AI_1 + P-network_6_6_AI_2 + P-network_6_6_AI_3 + P-network_6_6_AI_4 + P-network_6_6_AI_5 + P-network_6_6_AI_6 + P-network_6_6_AI_7 + P-network_6_4_AI_7 + P-network_6_4_AI_6 + P-network_6_4_AI_5 + P-network_6_4_AI_4 + P-network_6_4_AI_3 + P-network_6_4_AI_2 + P-network_6_4_AI_1 + P-network_7_7_RP_7 + P-network_7_7_RP_6 + P-network_7_7_RP_5 + P-network_7_7_RP_4 + P-network_7_7_RP_3 + P-network_7_7_RP_2 + P-network_4_7_AI_1 + P-network_4_7_AI_2 + P-network_4_7_AI_3 + P-network_4_7_AI_4 + P-network_4_7_AI_5 + P-network_4_7_AI_6 + P-network_4_7_AI_7 + P-network_7_7_RP_1 + P-network_1_4_AnnP_1 + P-network_1_4_AnnP_2 + P-network_1_4_AnnP_3 + P-network_1_4_AnnP_4 + P-network_1_4_AnnP_5 + P-network_1_4_AnnP_6 + P-network_1_4_AnnP_7 + P-network_7_4_AskP_1 + P-network_7_4_AskP_2 + P-network_7_4_AskP_3 + P-network_7_4_AskP_4 + P-network_7_4_AskP_5 + P-network_7_4_AskP_6 + P-network_7_4_AskP_7 + P-network_5_6_AskP_7 + P-network_5_6_AskP_6 + P-network_5_6_AskP_5 + P-network_5_6_AskP_4 + P-network_5_6_AskP_3 + P-network_5_6_AskP_2 + P-network_5_6_AskP_1 + P-network_7_7_RI_1 + P-network_7_7_RI_2 + P-network_7_7_RI_3 + P-network_7_7_RI_4 + P-network_7_7_RI_5 + P-network_7_7_RI_6 + P-network_7_7_RI_7 + P-network_2_1_AskP_1 + P-network_2_1_AskP_2 + P-network_2_1_AskP_3 + P-network_2_1_AskP_4 + P-network_2_1_AskP_5 + P-network_2_1_AskP_6 + P-network_2_1_AskP_7 + P-network_5_5_AskP_1 + P-network_5_5_AskP_2 + P-network_5_5_AskP_3 + P-network_5_5_AskP_4 + P-network_5_5_AskP_5 + P-network_5_5_AskP_6 + P-network_5_5_AskP_7 + P-network_7_3_AI_1 + P-network_7_3_AI_2 + P-network_7_3_AI_3 + P-network_7_3_AI_4 + P-network_7_3_AI_5 + P-network_7_3_AI_6 + P-network_7_3_AI_7 + P-network_6_7_RP_1 + P-network_6_7_RP_2 + P-network_6_7_RP_3 + P-network_6_7_RP_4 + P-network_6_7_RP_5 + P-network_6_7_RP_6 + P-network_6_7_RP_7 + P-network_5_4_AI_1 + P-network_5_4_AI_2 + P-network_5_4_AI_3 + P-network_5_4_AI_4 + P-network_5_4_AI_5 + P-network_5_4_AI_6 + P-network_5_4_AI_7 + P-network_3_5_AI_1 + P-network_3_5_AI_2 + P-network_3_5_AI_3 + P-network_3_5_AI_4 + P-network_3_5_AI_5 + P-network_3_5_AI_6 + P-network_3_5_AI_7 + P-network_6_2_AnnP_1 + P-network_6_2_AnnP_2 + P-network_6_2_AnnP_3 + P-network_6_2_AnnP_4 + P-network_6_2_AnnP_5 + P-network_6_2_AnnP_6 + P-network_6_2_AnnP_7 + P-network_0_2_AskP_1 + P-network_0_2_AskP_2 + P-network_0_2_AskP_3 + P-network_0_2_AskP_4 + P-network_0_2_AskP_5 + P-network_0_2_AskP_6 + P-network_0_2_AskP_7 + P-network_1_6_AI_1 + P-network_1_6_AI_2 + P-network_1_6_AI_3 + P-network_1_6_AI_4 + P-network_1_6_AI_5 + P-network_1_6_AI_6 + P-network_1_6_AI_7 + P-network_2_2_AskP_7 + P-network_2_2_AskP_6 + P-network_2_2_AskP_5 + P-network_2_2_AskP_4 + P-network_2_2_AskP_3 + P-network_2_2_AskP_2 + P-network_2_2_AskP_1 + P-network_6_5_RI_1 + P-network_6_5_RI_2 + P-network_6_5_RI_3 + P-network_6_5_RI_4 + P-network_6_5_RI_5 + P-network_6_5_RI_6 + P-network_6_5_RI_7 + P-network_4_6_RI_1 + P-network_4_6_RI_2 + P-network_4_6_RI_3 + P-network_4_6_RI_4 + P-network_4_6_RI_5 + P-network_4_6_RI_6 + P-network_4_6_RI_7 + P-network_2_7_RI_1 + P-network_2_7_RI_2 + P-network_2_7_RI_3 + P-network_2_7_RI_4 + P-network_2_7_RI_5 + P-network_2_7_RI_6 + P-network_2_7_RI_7 + P-network_3_6_AskP_1 + P-network_3_6_AskP_2 + P-network_3_6_AskP_3 + P-network_3_6_AskP_4 + P-network_3_6_AskP_5 + P-network_3_6_AskP_6 + P-network_3_6_AskP_7 + P-network_7_5_AskP_7 + P-network_7_5_AskP_6 + P-network_7_5_AskP_5 + P-network_7_5_AskP_4 + P-network_7_5_AskP_3 + P-network_7_5_AskP_2 + P-network_4_3_AnnP_1 + P-network_4_3_AnnP_2 + P-network_4_3_AnnP_3 + P-network_4_3_AnnP_4 + P-network_4_3_AnnP_5 + P-network_4_3_AnnP_6 + P-network_4_3_AnnP_7 + P-network_7_5_AskP_1 + P-network_7_4_RP_1 + P-network_7_4_RP_2 + P-network_7_4_RP_3 + P-network_7_4_RP_4 + P-network_7_4_RP_5 + P-network_7_4_RP_6 + P-network_7_4_RP_7 + P-network_6_1_AI_1 + P-network_6_1_AI_2 + P-network_6_1_AI_3 + P-network_6_1_AI_4 + P-network_6_1_AI_5 + P-network_6_1_AI_6 + P-network_6_1_AI_7 + P-network_1_5_AnnP_7 + P-network_5_5_RP_1 + P-network_5_5_RP_2 + P-network_5_5_RP_3 + P-network_5_5_RP_4 + P-network_5_5_RP_5 + P-network_5_5_RP_6 + P-network_5_5_RP_7 + P-network_1_5_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_4_2_AI_7 + P-network_1_5_AnnP_5 + P-network_5_0_AskP_1 + P-network_5_0_AskP_2 + P-network_5_0_AskP_3 + P-network_5_0_AskP_4 + P-network_5_0_AskP_5 + P-network_5_0_AskP_6 + P-network_5_0_AskP_7 + P-network_1_5_AnnP_4 + P-network_3_6_RP_1 + P-network_3_6_RP_2 + P-network_3_6_RP_3 + P-network_3_6_RP_4 + P-network_3_6_RP_5 + P-network_3_6_RP_6 + P-network_3_6_RP_7 + P-network_1_5_AnnP_3 + P-network_2_3_AI_1 + P-network_2_3_AI_2 + P-network_2_3_AI_3 + P-network_2_3_AI_4 + P-network_2_3_AI_5 + P-network_2_3_AI_6 + P-network_2_3_AI_7 + P-network_1_5_AnnP_2 + P-network_1_5_AnnP_1 + P-network_1_7_RP_1 + P-network_1_7_RP_2 + P-network_1_7_RP_3 + P-network_1_7_RP_4 + P-network_1_7_RP_5 + P-network_1_7_RP_6 + P-network_1_7_RP_7 + P-network_0_4_AI_1 + P-network_0_4_AI_2 + P-network_0_4_AI_3 + P-network_0_4_AI_4 + P-network_0_4_AI_5 + P-network_0_4_AI_6 + P-network_0_4_AI_7 + P-network_5_7_AI_7 + P-network_5_7_AI_6 + P-network_5_7_AI_5 + P-network_5_7_AI_4 + P-network_5_7_AI_3 + P-network_5_7_AI_2 + P-network_5_7_AI_1 + P-network_7_7_AnnP_1 + P-network_7_7_AnnP_2 + P-network_7_7_AnnP_3 + P-network_7_7_AnnP_4 + P-network_7_7_AnnP_5 + P-network_7_7_AnnP_6 + P-network_7_7_AnnP_7 + P-network_7_6_AI_7 + P-network_1_7_AskP_1 + P-network_1_7_AskP_2 + P-network_1_7_AskP_3 + P-network_1_7_AskP_4 + P-network_1_7_AskP_5 + P-network_1_7_AskP_6 + P-network_1_7_AskP_7 + P-network_7_6_AI_6 + P-network_7_2_RI_1 + P-network_7_2_RI_2 + P-network_7_2_RI_3 + P-network_7_2_RI_4 + P-network_7_2_RI_5 + P-network_7_2_RI_6 + P-network_7_2_RI_7 + P-network_7_6_AI_5 + P-network_7_6_AI_4 + P-network_7_6_AI_3 + P-network_7_6_AI_2 + P-network_7_6_AI_1 + P-network_5_3_RI_1 + P-network_5_3_RI_2 + P-network_5_3_RI_3 + P-network_5_3_RI_4 + P-network_5_3_RI_5 + P-network_5_3_RI_6 + P-network_5_3_RI_7 + P-network_3_4_RI_1 + P-network_3_4_RI_2 + P-network_3_4_RI_3 + P-network_3_4_RI_4 + P-network_3_4_RI_5 + P-network_3_4_RI_6 + P-network_3_4_RI_7 + P-network_2_4_AnnP_1 + P-network_2_4_AnnP_2 + P-network_2_4_AnnP_3 + P-network_2_4_AnnP_4 + P-network_2_4_AnnP_5 + P-network_2_4_AnnP_6 + P-network_2_4_AnnP_7 + P-network_1_5_RI_1 + P-network_1_5_RI_2 + P-network_1_5_RI_3 + P-network_1_5_RI_4 + P-network_1_5_RI_5 + P-network_1_5_RI_6 + P-network_1_5_RI_7 + P-network_3_1_AskP_1 + P-network_3_1_AskP_2 + P-network_3_1_AskP_3 + P-network_3_1_AskP_4 + P-network_3_1_AskP_5 + P-network_3_1_AskP_6 + P-network_3_1_AskP_7 + P-network_6_2_RP_1 + P-network_6_2_RP_2 + P-network_6_2_RP_3 + P-network_6_2_RP_4 + P-network_6_2_RP_5 + P-network_6_2_RP_6 + P-network_6_2_RP_7 + P-network_4_3_RP_1 + P-network_4_3_RP_2 + P-network_4_3_RP_3 + P-network_4_3_RP_4 + P-network_4_3_RP_5 + P-network_4_3_RP_6 + P-network_4_3_RP_7 + P-network_3_0_AI_1 + P-network_3_0_AI_2 + P-network_3_0_AI_3 + P-network_3_0_AI_4 + P-network_3_0_AI_5 + P-network_3_0_AI_6 + P-network_3_0_AI_7 + P-network_0_0_RP_7 + P-network_2_4_RP_1 + P-network_2_4_RP_2 + P-network_2_4_RP_3 + P-network_2_4_RP_4 + P-network_2_4_RP_5 + P-network_2_4_RP_6 + P-network_2_4_RP_7 + P-network_0_0_RP_6 + P-network_0_0_RP_5 + P-network_0_0_RP_4 + P-network_0_0_RP_3 + P-network_0_0_RP_2 + P-network_0_0_RP_1 + P-network_1_1_AI_1 + P-network_1_1_AI_2 + P-network_1_1_AI_3 + P-network_1_1_AI_4 + P-network_1_1_AI_5 + P-network_1_1_AI_6 + P-network_1_1_AI_7 + P-network_0_5_AnnP_1 + P-network_0_5_AnnP_2 + P-network_0_5_AnnP_3 + P-network_0_5_AnnP_4 + P-network_0_5_AnnP_5 + P-network_0_5_AnnP_6 + P-network_0_5_AnnP_7 + P-network_0_5_RP_1 + P-network_0_5_RP_2 + P-network_0_5_RP_3 + P-network_0_5_RP_4 + P-network_0_5_RP_5 + P-network_0_5_RP_6 + P-network_0_5_RP_7 + P-network_6_5_AskP_1 + P-network_6_5_AskP_2 + P-network_6_5_AskP_3 + P-network_6_5_AskP_4 + P-network_6_5_AskP_5 + P-network_6_5_AskP_6 + P-network_6_5_AskP_7 + P-network_4_1_AskP_7 + P-network_4_1_AskP_6 + P-network_4_1_AskP_5 + P-network_4_1_AskP_4 + P-network_4_1_AskP_3 + P-network_4_1_AskP_2 + P-network_4_1_AskP_1 + P-network_6_0_RI_1 + P-network_6_0_RI_2 + P-network_6_0_RI_3 + P-network_6_0_RI_4 + P-network_6_0_RI_5 + P-network_6_0_RI_6 + P-network_6_0_RI_7 + P-network_4_1_RI_1 + P-network_4_1_RI_2 + P-network_4_1_RI_3 + P-network_4_1_RI_4 + P-network_4_1_RI_5 + P-network_4_1_RI_6 + P-network_4_1_RI_7 + P-network_7_2_AnnP_1 + P-network_7_2_AnnP_2 + P-network_7_2_AnnP_3 + P-network_7_2_AnnP_4 + P-network_7_2_AnnP_5 + P-network_7_2_AnnP_6 + P-network_7_2_AnnP_7 + P-network_1_2_AskP_1 + P-network_1_2_AskP_2 + P-network_1_2_AskP_3 + P-network_1_2_AskP_4 + P-network_1_2_AskP_5 + P-network_1_2_AskP_6 + P-network_1_2_AskP_7 + P-network_2_2_RI_1 + P-network_2_2_RI_2 + P-network_2_2_RI_3 + P-network_2_2_RI_4 + P-network_2_2_RI_5 + P-network_2_2_RI_6 + P-network_2_2_RI_7 + P-network_0_3_RI_1 + P-network_0_3_RI_2 + P-network_0_3_RI_3 + P-network_0_3_RI_4 + P-network_0_3_RI_5 + P-network_0_3_RI_6 + P-network_0_3_RI_7 + P-network_4_6_AskP_1 + P-network_4_6_AskP_2 + P-network_4_6_AskP_3 + P-network_4_6_AskP_4 + P-network_4_6_AskP_5 + P-network_4_6_AskP_6 + P-network_4_6_AskP_7 + P-network_5_0_RP_1 + P-network_5_0_RP_2 + P-network_5_0_RP_3 + P-network_5_0_RP_4 + P-network_5_0_RP_5 + P-network_5_0_RP_6 + P-network_5_0_RP_7 + P-network_3_1_RP_1 + P-network_3_1_RP_2 + P-network_3_1_RP_3 + P-network_3_1_RP_4 + P-network_3_1_RP_5 + P-network_3_1_RP_6 + P-network_3_1_RP_7 + P-network_5_3_AnnP_1 + P-network_5_3_AnnP_2 + P-network_5_3_AnnP_3 + P-network_5_3_AnnP_4 + P-network_5_3_AnnP_5 + P-network_5_3_AnnP_6 + P-network_5_3_AnnP_7 + P-network_1_2_RP_1 + P-network_1_2_RP_2 + P-network_1_2_RP_3 + P-network_1_2_RP_4 + P-network_1_2_RP_5 + P-network_1_2_RP_6 + P-network_1_2_RP_7 + P-network_3_4_AnnP_7 + P-network_3_4_AnnP_6 + P-network_3_4_AnnP_5 + P-network_3_4_AnnP_4 + P-network_3_4_AnnP_3 + P-network_0_0_AnnP_1 + P-network_0_0_AnnP_2 + P-network_0_0_AnnP_3 + P-network_0_0_AnnP_4 + P-network_0_0_AnnP_5 + P-network_0_0_AnnP_6 + P-network_0_0_AnnP_7 + P-network_3_4_AnnP_2 + P-network_3_4_AnnP_1 + P-network_6_0_AskP_1 + P-network_6_0_AskP_2 + P-network_6_0_AskP_3 + P-network_6_0_AskP_4 + P-network_6_0_AskP_5 + P-network_6_0_AskP_6 + P-network_6_0_AskP_7 + P-network_1_0_RI_1 + P-network_1_0_RI_2 + P-network_1_0_RI_3 + P-network_1_0_RI_4 + P-network_1_0_RI_5 + P-network_1_0_RI_6 + P-network_1_0_RI_7 + P-network_2_7_AskP_1 + P-network_2_7_AskP_2 + P-network_2_7_AskP_3 + P-network_2_7_AskP_4 + P-network_2_7_AskP_5 + P-network_2_7_AskP_6 + P-network_2_7_AskP_7 <= P-electionFailed_0 + P-electionFailed_1 + P-electionFailed_2 + P-electionFailed_3 + P-electionFailed_4 + P-electionFailed_5 + P-electionFailed_6 + P-electionFailed_7)
lola: after: (P-network_2_7_AskP_0 + P-network_1_0_RI_0 + P-network_1_2_AnsP_7 + P-network_1_2_AnsP_6 + P-network_1_2_AnsP_5 + P-network_1_2_AnsP_4 + P-network_1_2_AnsP_3 + P-network_1_2_AnsP_2 + P-network_1_2_AnsP_1 + P-network_1_2_AnsP_0 + P-network_6_0_AskP_0 + P-network_6_5_AnsP_7 + P-network_6_5_AnsP_6 + P-network_6_5_AnsP_5 + P-network_6_5_AnsP_4 + P-network_6_5_AnsP_3 + P-network_6_5_AnsP_2 + P-network_3_4_AnnP_0 + P-network_6_5_AnsP_1 + P-network_6_5_AnsP_0 + P-network_0_0_AnnP_0 + P-network_1_2_RP_0 + P-network_5_3_AnnP_0 + P-network_4_6_AnsP_0 + P-network_4_6_AnsP_1 + P-network_4_6_AnsP_2 + P-network_4_6_AnsP_3 + P-network_4_6_AnsP_4 + P-network_4_6_AnsP_5 + P-network_4_6_AnsP_6 + P-network_4_6_AnsP_7 + P-network_3_1_RP_0 + P-network_5_0_RP_0 + P-network_4_6_AskP_0 + P-network_3_1_AnsP_7 + P-network_3_1_AnsP_6 + P-network_3_1_AnsP_5 + P-network_3_1_AnsP_4 + P-network_3_1_AnsP_3 + P-network_3_1_AnsP_2 + P-network_3_1_AnsP_1 + P-network_3_1_AnsP_0 + P-network_0_3_RI_0 + P-network_2_2_RI_0 + P-network_1_2_AskP_0 + P-network_7_2_AnnP_0 + P-network_4_1_RI_0 + P-network_4_1_AskP_0 + P-network_6_0_RI_0 + P-network_1_7_AnsP_7 + P-network_1_7_AnsP_6 + P-network_1_7_AnsP_5 + P-network_1_7_AnsP_4 + P-network_1_7_AnsP_3 + P-network_1_7_AnsP_2 + P-network_1_7_AnsP_1 + P-network_1_7_AnsP_0 + P-network_6_5_AskP_0 + P-network_0_5_RP_0 + P-network_0_5_AnnP_0 + P-network_1_1_AI_0 + P-network_5_0_AnsP_7 + P-network_5_0_AnsP_6 + P-network_0_0_RP_0 + 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_2_4_RP_0 + P-network_3_0_AI_0 + P-network_4_3_RP_0 + P-network_6_2_RP_0 + P-network_3_1_AskP_0 + P-network_3_6_AnsP_7 + P-network_3_6_AnsP_6 + P-network_3_6_AnsP_5 + P-network_3_6_AnsP_4 + P-network_3_6_AnsP_3 + P-network_3_6_AnsP_2 + P-network_3_6_AnsP_1 + P-network_3_6_AnsP_0 + P-network_1_5_RI_0 + P-network_2_4_AnnP_0 + P-network_3_4_RI_0 + P-network_5_3_RI_0 + P-network_7_6_AI_0 + P-network_7_2_RI_0 + P-network_1_7_AskP_0 + P-network_7_7_AnnP_0 + P-network_5_7_AI_0 + P-network_6_0_AnsP_0 + P-network_6_0_AnsP_1 + P-network_6_0_AnsP_2 + P-network_6_0_AnsP_3 + P-network_6_0_AnsP_4 + P-network_6_0_AnsP_5 + P-network_6_0_AnsP_6 + P-network_6_0_AnsP_7 + P-network_0_4_AI_0 + P-network_1_7_RP_0 + P-network_0_2_AnsP_7 + P-network_0_2_AnsP_6 + P-network_0_2_AnsP_5 + P-network_0_2_AnsP_4 + P-network_0_2_AnsP_3 + P-network_0_2_AnsP_2 + P-network_1_5_AnnP_0 + P-network_0_2_AnsP_1 + P-network_0_2_AnsP_0 + P-network_2_3_AI_0 + P-network_3_6_RP_0 + P-network_5_0_AskP_0 + P-network_4_2_AI_0 + P-network_5_5_RP_0 + P-network_6_1_AI_0 + P-network_5_5_AnsP_7 + P-network_5_5_AnsP_6 + P-network_5_5_AnsP_5 + P-network_5_5_AnsP_4 + P-network_5_5_AnsP_3 + P-network_5_5_AnsP_2 + P-network_5_5_AnsP_1 + P-network_5_5_AnsP_0 + P-network_7_4_RP_0 + P-network_7_5_AskP_0 + P-network_4_3_AnnP_0 + P-network_3_6_AskP_0 + P-network_2_7_RI_0 + P-network_2_1_AnsP_7 + P-network_2_1_AnsP_6 + P-network_2_1_AnsP_5 + P-network_2_7_AnsP_0 + P-network_2_7_AnsP_1 + P-network_2_7_AnsP_2 + P-network_2_7_AnsP_3 + P-network_2_7_AnsP_4 + P-network_2_7_AnsP_5 + P-network_2_7_AnsP_6 + P-network_2_7_AnsP_7 + P-network_2_1_AnsP_4 + P-network_2_1_AnsP_3 + P-network_2_1_AnsP_2 + P-network_2_1_AnsP_1 + P-network_2_1_AnsP_0 + P-network_4_6_RI_0 + P-network_6_5_RI_0 + P-network_7_4_AnsP_7 + P-network_2_2_AskP_0 + P-network_7_4_AnsP_6 + P-network_7_4_AnsP_5 + P-network_7_4_AnsP_4 + P-network_7_4_AnsP_3 + P-network_7_4_AnsP_2 + P-network_7_4_AnsP_1 + P-network_7_4_AnsP_0 + P-network_1_6_AI_0 + P-network_0_2_AskP_0 + P-network_6_2_AnnP_0 + P-network_3_5_AI_0 + P-network_5_4_AI_0 + P-network_6_7_RP_0 + P-network_0_7_AnsP_7 + P-network_0_7_AnsP_6 + P-network_0_7_AnsP_5 + P-network_0_7_AnsP_4 + P-network_0_7_AnsP_3 + P-network_0_7_AnsP_2 + P-network_0_7_AnsP_1 + P-network_0_7_AnsP_0 + P-network_7_3_AI_0 + P-network_5_5_AskP_0 + P-network_4_0_AnsP_7 + P-network_4_0_AnsP_6 + P-network_4_0_AnsP_5 + P-network_4_0_AnsP_4 + P-network_4_0_AnsP_3 + P-network_4_0_AnsP_2 + P-network_4_0_AnsP_1 + P-network_4_0_AnsP_0 + P-network_4_1_AnsP_0 + P-network_4_1_AnsP_1 + P-network_4_1_AnsP_2 + P-network_4_1_AnsP_3 + P-network_4_1_AnsP_4 + P-network_4_1_AnsP_5 + P-network_4_1_AnsP_6 + P-network_4_1_AnsP_7 + P-network_2_1_AskP_0 + P-network_7_7_RI_0 + P-network_2_6_AnsP_7 + P-network_5_6_AskP_0 + P-network_2_6_AnsP_6 + P-network_2_6_AnsP_5 + 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_7_4_AskP_0 + P-network_7_7_RP_0 + P-network_1_4_AnnP_0 + P-network_4_7_AI_0 + P-network_6_4_AI_0 + P-network_6_6_AI_0 + P-network_0_7_AskP_0 + P-network_6_7_AnnP_0 + P-network_4_0_AskP_0 + P-network_4_5_AnsP_7 + P-network_4_5_AnsP_6 + P-network_4_5_AI_0 + 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_6_3_AnnP_0 + P-network_3_3_AnnP_0 + P-network_0_3_AskP_0 + P-network_2_6_AskP_0 + P-network_0_0_RI_0 + P-network_1_1_AnsP_7 + P-network_1_1_AnsP_6 + P-network_2_6_AI_0 + 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_6_4_AnsP_7 + P-network_6_4_AnsP_6 + P-network_0_7_AI_0 + 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_1_0_AnnP_0 + P-network_0_2_RP_0 + P-network_7_5_AnsP_0 + P-network_7_5_AnsP_1 + P-network_7_5_AnsP_2 + P-network_7_5_AnsP_3 + P-network_7_5_AnsP_4 + P-network_7_5_AnsP_5 + P-network_7_5_AnsP_6 + P-network_7_5_AnsP_7 + P-network_5_2_AnnP_0 + P-network_2_1_RP_0 + P-network_7_5_RI_0 + P-network_4_0_RP_0 + P-network_4_5_AskP_0 + P-network_3_0_AnsP_7 + P-network_3_0_AnsP_6 + P-network_3_0_AnsP_5 + P-network_3_0_AnsP_4 + P-network_3_0_AnsP_3 + P-network_3_0_AnsP_2 + P-network_3_0_AnsP_1 + P-network_3_0_AnsP_0 + P-network_7_0_AskP_0 + P-network_5_6_RI_0 + P-network_1_2_RI_0 + P-network_1_1_AskP_0 + P-network_7_1_AnnP_0 + P-network_3_1_RI_0 + P-network_5_0_RI_0 + P-network_1_6_AnsP_7 + P-network_1_6_AnsP_6 + P-network_1_6_AnsP_5 + P-network_1_6_AnsP_4 + P-network_1_6_AnsP_3 + P-network_1_6_AnsP_2 + P-network_1_6_AnsP_1 + P-network_1_6_AnsP_0 + P-network_6_4_AskP_0 + P-network_2_2_AnsP_0 + P-network_2_2_AnsP_1 + P-network_2_2_AnsP_2 + P-network_2_2_AnsP_3 + P-network_2_2_AnsP_4 + P-network_2_2_AnsP_5 + P-network_2_2_AnsP_6 + P-network_2_2_AnsP_7 + P-network_0_4_AnnP_0 + P-network_0_1_AI_0 + P-network_1_4_RP_0 + P-network_2_0_AI_0 + P-network_3_3_RP_0 + P-network_3_7_RI_0 + P-network_5_2_RP_0 + P-network_5_7_AnnP_0 + P-network_7_1_RP_0 + P-network_3_0_AskP_0 + P-network_3_5_AnsP_7 + 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_3_5_AnsP_1 + P-network_3_7_AskP_0 + P-network_3_5_AnsP_0 + P-network_0_5_RI_0 + P-network_2_3_AnnP_0 + P-network_2_4_RI_0 + P-network_4_3_RI_0 + P-network_6_2_RI_0 + P-network_1_6_AskP_0 + P-network_7_6_AnnP_0 + P-network_0_7_RP_0 + P-network_0_1_AnsP_7 + P-network_0_1_AnsP_6 + P-network_0_1_AnsP_5 + P-network_0_1_AnsP_4 + P-network_0_1_AnsP_3 + P-network_0_1_AnsP_2 + P-network_4_4_AnnP_0 + P-network_0_1_AnsP_1 + P-network_0_1_AnsP_0 + P-network_1_3_AI_0 + P-network_2_6_RP_0 + P-network_3_2_AI_0 + P-network_4_5_RP_0 + P-network_5_1_AI_0 + P-network_5_4_AnsP_7 + P-network_5_4_AnsP_6 + P-network_5_4_AnsP_5 + P-network_5_4_AnsP_4 + P-network_5_4_AnsP_3 + P-network_5_4_AnsP_2 + P-network_5_4_AnsP_1 + P-network_5_6_AnsP_0 + P-network_5_6_AnsP_1 + P-network_5_6_AnsP_2 + P-network_5_6_AnsP_3 + P-network_5_6_AnsP_4 + P-network_5_6_AnsP_5 + P-network_5_6_AnsP_6 + P-network_5_6_AnsP_7 + P-network_7_1_AI_0 + P-network_5_4_AnsP_0 + P-network_6_4_RP_0 + P-network_7_0_AI_0 + P-network_4_2_AnnP_0 + P-network_3_5_AskP_0 + P-network_1_7_RI_0 + P-network_6_5_RP_0 + P-network_2_0_AnsP_7 + P-network_2_0_AnsP_6 + P-network_2_0_AnsP_5 + P-network_2_0_AnsP_4 + P-network_2_0_AnsP_3 + P-network_2_0_AnsP_2 + P-network_2_0_AnsP_1 + P-network_5_2_AI_0 + P-network_2_0_AnsP_0 + P-network_3_6_RI_0 + P-network_5_5_RI_0 + P-network_7_4_RI_0 + P-network_7_3_AnsP_7 + P-network_7_3_AnsP_6 + P-network_5_1_AskP_0 + P-network_7_3_AnsP_5 + P-network_7_3_AnsP_4 + P-network_7_3_AnsP_3 + P-network_7_3_AnsP_2 + P-network_7_3_AnsP_1 + P-network_7_3_AnsP_0 + P-network_0_6_AI_0 + P-network_4_6_RP_0 + P-network_0_1_AskP_0 + P-network_6_1_AnnP_0 + P-network_2_5_AI_0 + P-network_4_4_AI_0 + P-network_5_7_RP_0 + P-network_0_6_AnsP_7 + P-network_0_6_AnsP_6 + P-network_3_3_AI_0 + 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_0_3_AnsP_0 + P-network_0_3_AnsP_1 + P-network_0_3_AnsP_2 + P-network_0_3_AnsP_3 + P-network_0_3_AnsP_4 + P-network_0_3_AnsP_5 + P-network_0_3_AnsP_6 + P-network_0_3_AnsP_7 + P-network_2_7_RP_0 + P-network_6_3_AI_0 + P-network_7_6_RP_0 + P-network_5_4_AskP_0 + P-network_1_4_AI_0 + P-network_6_3_RI_0 + P-network_4_7_AnnP_0 + P-network_2_0_AskP_0 + P-network_6_7_RI_0 + P-network_7_0_AnsP_0 + P-network_7_0_AnsP_1 + P-network_7_0_AnsP_2 + P-network_7_0_AnsP_3 + P-network_7_0_AnsP_4 + P-network_7_0_AnsP_5 + P-network_7_0_AnsP_6 + P-network_7_0_AnsP_7 + P-network_4_4_RI_0 + P-network_2_5_AnsP_7 + P-network_2_5_AnsP_6 + P-network_2_5_AnsP_5 + P-network_2_5_AnsP_4 + P-network_2_5_AnsP_3 + P-network_2_5_AnsP_2 + P-network_2_5_AnsP_1 + P-network_2_5_AnsP_0 + P-network_7_3_AskP_0 + P-network_1_3_AnnP_0 + P-network_3_7_AI_0 + P-network_2_5_AnnP_0 + P-network_5_6_AI_0 + P-network_0_6_AskP_0 + P-network_6_6_AnnP_0 + P-network_7_5_AI_0 + P-network_2_5_RI_0 + P-network_0_6_RI_0 + P-network_3_7_AnsP_0 + P-network_3_7_AnsP_1 + P-network_3_7_AnsP_2 + P-network_3_7_AnsP_3 + P-network_3_7_AnsP_4 + P-network_3_7_AnsP_5 + P-network_3_7_AnsP_6 + P-network_3_7_AnsP_7 + P-network_4_4_AnsP_7 + P-network_4_4_AnsP_6 + P-network_4_4_AnsP_5 + P-network_4_4_AnsP_4 + P-network_4_4_AnsP_3 + P-network_4_4_AnsP_2 + P-network_4_4_AnsP_1 + P-network_4_4_AnsP_0 + P-network_3_2_AnnP_0 + P-network_3_2_AskP_0 + P-network_2_5_AskP_0 + P-network_1_0_AnsP_7 + P-network_1_0_AnsP_6 + P-network_1_0_AnsP_5 + P-network_1_0_AnsP_4 + P-network_1_0_AnsP_3 + P-network_1_0_AnsP_2 + P-network_1_0_AnsP_1 + P-network_1_0_AnsP_0 + P-network_6_3_AnsP_7 + P-network_6_3_AnsP_6 + P-network_6_3_AnsP_5 + P-network_6_3_AnsP_4 + P-network_6_3_AnsP_3 + P-network_6_3_AnsP_2 + P-network_6_3_AnsP_1 + P-network_6_3_AnsP_0 + P-network_5_1_AnnP_0 + P-network_1_1_RP_0 + P-network_3_0_RP_0 + P-network_4_4_AskP_0 + P-network_7_2_RP_0 + P-network_3_7_AnnP_0 + P-network_5_3_RP_0 + P-network_0_2_RI_0 + P-network_1_0_AskP_0 + P-network_7_0_AnnP_0 + P-network_2_1_RI_0 + P-network_4_0_RI_0 + P-network_4_0_AI_0 + P-network_1_5_AnsP_7 + P-network_1_5_AnsP_6 + P-network_1_5_AnsP_5 + P-network_1_5_AnsP_4 + P-network_1_5_AnsP_3 + P-network_1_5_AnsP_2 + P-network_1_5_AnsP_1 + P-network_1_5_AnsP_0 + P-network_6_3_AskP_0 + P-network_0_3_AnnP_0 + P-network_0_4_RP_0 + P-network_1_0_AI_0 + P-network_2_3_RP_0 + P-network_3_4_RP_0 + P-network_5_1_AnsP_0 + P-network_5_1_AnsP_1 + P-network_5_1_AnsP_2 + P-network_5_1_AnsP_3 + P-network_5_1_AnsP_4 + P-network_5_1_AnsP_5 + P-network_5_1_AnsP_6 + P-network_5_1_AnsP_7 + P-network_2_1_AI_0 + P-network_4_2_RP_0 + P-network_5_6_AnnP_0 + P-network_6_1_RP_0 + P-network_3_4_AnsP_7 + P-network_3_4_AnsP_6 + P-network_0_6_AnnP_0 + P-network_3_4_AnsP_5 + P-network_3_4_AnsP_4 + P-network_3_4_AnsP_3 + P-network_3_4_AnsP_2 + P-network_3_4_AnsP_1 + P-network_3_4_AnsP_0 + P-network_1_5_RP_0 + P-network_2_2_AnnP_0 + P-network_1_4_RI_0 + P-network_3_3_RI_0 + P-network_0_2_AI_0 + P-network_5_2_RI_0 + P-network_1_5_AskP_0 + P-network_7_5_AnnP_0 + P-network_6_6_AskP_0 + P-network_7_1_RI_0 + P-network_0_0_AnsP_7 + P-network_0_0_AnsP_6 + P-network_0_0_AnsP_5 + P-network_0_0_AnsP_4 + P-network_0_0_AnsP_3 + P-network_0_0_AnsP_2 + P-network_0_0_AnsP_1 + P-network_0_0_AnsP_0 + P-network_0_3_AI_0 + P-network_1_6_RP_0 + P-network_2_2_AI_0 + P-network_3_5_RP_0 + P-network_4_1_AI_0 + P-network_7_0_RI_0 + P-network_5_3_AnsP_7 + P-network_5_3_AnsP_6 + P-network_5_3_AnsP_5 + P-network_5_3_AnsP_4 + P-network_5_3_AnsP_3 + P-network_5_3_AnsP_2 + P-network_5_3_AnsP_1 + P-network_5_1_RI_0 + P-network_5_3_AnsP_0 + P-network_5_4_RP_0 + P-network_6_0_AI_0 + P-network_7_3_RP_0 + P-network_7_3_AnnP_0 + P-network_4_1_AnnP_0 + P-network_1_3_AskP_0 + P-network_3_2_RI_0 + P-network_3_4_AskP_0 + P-network_0_7_RI_0 + P-network_2_6_RI_0 + P-network_4_5_RI_0 + P-network_1_3_RI_0 + P-network_2_7_AnnP_0 + P-network_6_4_RI_0 + P-network_7_2_AnsP_7 + P-network_7_2_AnsP_6 + P-network_7_2_AnsP_5 + P-network_7_2_AnsP_4 + P-network_7_2_AnsP_3 + P-network_2_0_AnnP_0 + P-network_7_2_AnsP_2 + P-network_7_2_AnsP_1 + P-network_7_2_AnsP_0 + P-network_0_0_AskP_0 + P-network_6_0_AnnP_0 + P-network_1_5_AI_0 + P-network_3_4_AI_0 + P-network_4_7_RP_0 + P-network_0_5_AnsP_7 + P-network_0_5_AnsP_6 + P-network_0_5_AnsP_5 + P-network_0_5_AnsP_4 + P-network_0_5_AnsP_3 + P-network_0_5_AnsP_2 + P-network_0_5_AnsP_1 + P-network_0_5_AnsP_0 + P-network_5_3_AI_0 + P-network_6_6_RP_0 + P-network_5_3_AskP_0 + P-network_7_2_AI_0 + P-network_4_6_AnnP_0 + P-network_5_7_RI_0 + P-network_2_4_AnsP_7 + P-network_2_4_AnsP_6 + P-network_2_4_AnsP_5 + P-network_2_4_AnsP_4 + P-network_2_4_AnsP_3 + P-network_2_4_AnsP_2 + P-network_2_4_AnsP_1 + P-network_3_2_AnsP_0 + P-network_3_2_AnsP_1 + P-network_3_2_AnsP_2 + P-network_3_2_AnsP_3 + P-network_3_2_AnsP_4 + P-network_3_2_AnsP_5 + P-network_3_2_AnsP_6 + P-network_3_2_AnsP_7 + P-network_2_4_AnsP_0 + P-network_7_6_RI_0 + P-network_7_2_AskP_0 + P-network_7_7_AnsP_7 + P-network_7_7_AnsP_6 + P-network_7_7_AnsP_5 + P-network_7_7_AnsP_4 + P-network_7_7_AnsP_3 + P-network_7_7_AnsP_2 + P-network_4_7_AskP_0 + P-network_7_7_AnsP_1 + P-network_7_7_AnsP_0 + P-network_1_2_AnnP_0 + P-network_2_7_AI_0 + P-network_4_6_AI_0 + P-network_0_5_AskP_0 + P-network_6_5_AnnP_0 + P-network_6_5_AI_0 + P-network_6_0_RP_0 + P-network_4_3_AnsP_7 + P-network_4_3_AnsP_6 + P-network_4_3_AnsP_5 + P-network_4_3_AnsP_4 + P-network_4_3_AnsP_3 + P-network_4_3_AnsP_2 + P-network_4_3_AnsP_1 + P-network_4_3_AnsP_0 + P-network_4_1_RP_0 + P-network_3_1_AnnP_0 + P-network_2_4_AskP_0 + P-network_5_4_AnnP_0 + P-network_7_7_AskP_0 + P-network_1_7_AnnP_0 + P-network_2_2_RP_0 + P-network_6_2_AnsP_7 + P-network_6_2_AnsP_6 + P-network_6_2_AnsP_5 + P-network_6_2_AnsP_4 + P-network_6_2_AnsP_3 + P-network_6_2_AnsP_2 + P-network_6_2_AnsP_1 + P-network_6_2_AnsP_0 + P-network_7_7_AI_0 + P-network_5_0_AnnP_0 + P-network_0_1_RP_0 + P-network_0_3_RP_0 + P-network_2_0_RP_0 + P-network_4_3_AskP_0 + P-network_3_6_AnnP_0 + P-network_0_1_AnnP_0 + P-network_6_6_AnsP_0 + P-network_6_6_AnsP_1 + P-network_6_6_AnsP_2 + P-network_6_6_AnsP_3 + P-network_6_6_AnsP_4 + P-network_6_6_AnsP_5 + P-network_6_6_AnsP_6 + P-network_6_6_AnsP_7 + P-network_1_1_RI_0 + P-network_3_0_RI_0 + P-network_1_4_AnsP_7 + P-network_1_4_AnsP_6 + P-network_1_4_AnsP_5 + P-network_1_4_AnsP_4 + P-network_6_1_AskP_0 + P-network_1_4_AnsP_3 + P-network_1_4_AnsP_2 + P-network_1_4_AnsP_1 + P-network_1_4_AnsP_0 + P-network_6_2_AskP_0 + P-network_6_7_AnsP_7 + P-network_1_3_AnsP_0 + P-network_1_3_AnsP_1 + P-network_1_3_AnsP_2 + P-network_1_3_AnsP_3 + P-network_1_3_AnsP_4 + P-network_1_3_AnsP_5 + P-network_1_3_AnsP_6 + P-network_1_3_AnsP_7 + P-network_2_0_RI_0 + P-network_6_7_AnsP_6 + P-network_6_7_AnsP_5 + P-network_6_7_AnsP_4 + P-network_6_7_AnsP_3 + P-network_6_7_AnsP_2 + P-network_6_7_AnsP_1 + P-network_6_7_AnsP_0 + P-network_0_2_AnnP_0 + P-network_0_0_AI_0 + P-network_1_3_RP_0 + P-network_3_2_RP_0 + P-network_5_5_AnnP_0 + P-network_0_1_RI_0 + P-network_5_1_RP_0 + P-network_7_0_RP_0 + P-network_3_3_AnsP_7 + 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_2_1_AnnP_0 + P-network_0_4_RI_0 + P-network_2_3_RI_0 + P-network_4_2_RI_0 + P-network_1_4_AskP_0 + P-network_7_4_AnnP_0 + P-network_6_1_RI_0 + P-network_6_7_AskP_0 + P-network_0_6_RP_0 + P-network_1_2_AI_0 + P-network_2_5_RP_0 + P-network_0_7_AnnP_0 + P-network_3_1_AI_0 + P-network_5_2_AnsP_7 + P-network_5_2_AnsP_6 + P-network_5_2_AnsP_5 + P-network_5_2_AnsP_4 + P-network_5_2_AnsP_3 + P-network_3_5_AnnP_0 + P-network_5_2_AnsP_2 + P-network_5_2_AnsP_1 + P-network_5_2_AnsP_0 + P-network_4_4_RP_0 + P-network_5_0_AI_0 + P-network_6_3_RP_0 + P-network_4_0_AnnP_0 + P-network_3_3_AskP_0 + P-network_4_7_AnsP_0 + P-network_4_7_AnsP_1 + P-network_4_7_AnsP_2 + P-network_4_7_AnsP_3 + P-network_4_7_AnsP_4 + P-network_4_7_AnsP_5 + P-network_4_7_AnsP_6 + P-network_4_7_AnsP_7 + P-network_1_6_RI_0 + P-network_3_5_RI_0 + P-network_2_6_AnnP_0 + P-network_5_4_RI_0 + P-network_7_1_AnsP_7 + P-network_7_1_AnsP_6 + P-network_7_1_AnsP_5 + P-network_7_1_AnsP_4 + P-network_7_1_AnsP_3 + P-network_7_1_AnsP_2 + P-network_7_1_AnsP_1 + P-network_7_1_AnsP_0 + P-network_7_3_RI_0 + P-network_0_5_AI_0 + P-network_2_4_AI_0 + P-network_3_7_RP_0 + P-network_4_2_AskP_0 + P-network_0_4_AnsP_7 + P-network_0_4_AnsP_6 + P-network_0_4_AnsP_5 + P-network_0_4_AnsP_4 + P-network_0_4_AnsP_3 + P-network_0_4_AnsP_2 + P-network_0_4_AnsP_1 + P-network_0_4_AnsP_0 + P-network_1_0_RP_0 + P-network_4_3_AI_0 + P-network_5_6_RP_0 + P-network_5_2_AskP_0 + P-network_6_2_AI_0 + P-network_7_5_RP_0 + P-network_5_7_AnsP_7 + P-network_5_7_AnsP_6 + P-network_5_7_AnsP_5 + P-network_5_7_AnsP_4 + P-network_5_7_AnsP_3 + P-network_5_7_AnsP_2 + P-network_5_7_AnsP_1 + P-network_5_7_AnsP_0 + P-network_4_5_AnnP_0 + P-network_4_7_RI_0 + P-network_2_3_AnsP_7 + P-network_2_3_AnsP_6 + P-network_2_3_AnsP_5 + P-network_2_3_AnsP_4 + P-network_2_3_AnsP_3 + P-network_6_7_AI_0 + P-network_2_3_AnsP_2 + P-network_2_3_AnsP_1 + P-network_2_3_AnsP_0 + P-network_6_6_RI_0 + P-network_7_1_AskP_0 + P-network_7_6_AnsP_7 + P-network_7_6_AnsP_6 + P-network_6_1_AnsP_0 + P-network_6_1_AnsP_1 + P-network_6_1_AnsP_2 + P-network_6_1_AnsP_3 + P-network_6_1_AnsP_4 + P-network_6_1_AnsP_5 + P-network_6_1_AnsP_6 + P-network_6_1_AnsP_7 + P-network_7_6_AnsP_5 + P-network_7_6_AnsP_4 + P-network_7_6_AnsP_3 + P-network_7_6_AnsP_2 + P-network_7_6_AnsP_1 + P-network_7_6_AnsP_0 + P-network_1_1_AnnP_0 + P-network_1_7_AI_0 + P-network_1_6_AnnP_0 + P-network_7_6_AskP_0 + P-network_3_6_AI_0 + P-network_0_4_AskP_0 + P-network_6_4_AnnP_0 + P-network_5_5_AI_0 + P-network_7_4_AI_0 + P-network_5_7_AskP_0 + P-network_4_2_AnsP_7 + P-network_4_2_AnsP_6 + P-network_4_2_AnsP_5 + P-network_4_2_AnsP_4 + P-network_4_2_AnsP_3 + P-network_4_2_AnsP_2 + P-network_4_2_AnsP_1 + P-network_4_2_AnsP_0 + P-network_2_3_AskP_0 + P-network_3_0_AnnP_0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (P-masterList_5_1_0 + P-masterList_5_1_1 + P-masterList_5_1_2 + P-masterList_5_1_3 + P-masterList_5_1_4 + P-masterList_5_1_5 + P-masterList_5_1_6 + P-masterList_5_1_7 + P-masterList_1_1_0 + P-masterList_1_1_1 + P-masterList_1_1_2 + P-masterList_1_1_3 + P-masterList_1_1_4 + P-masterList_1_1_5 + P-masterList_1_1_6 + P-masterList_1_1_7 + P-masterList_5_2_0 + P-masterList_5_2_1 + P-masterList_5_2_2 + P-masterList_5_2_3 + P-masterList_5_2_4 + P-masterList_5_2_5 + P-masterList_5_2_6 + P-masterList_5_2_7 + P-masterList_1_2_0 + P-masterList_1_2_1 + P-masterList_1_2_2 + P-masterList_1_2_3 + P-masterList_1_2_4 + P-masterList_1_2_5 + P-masterList_1_2_6 + P-masterList_1_2_7 + P-masterList_0_7_7 + P-masterList_0_7_6 + P-masterList_0_7_5 + P-masterList_0_7_4 + P-masterList_0_7_3 + P-masterList_0_7_2 + P-masterList_0_7_1 + P-masterList_0_7_0 + P-masterList_5_3_0 + P-masterList_5_3_1 + P-masterList_5_3_2 + P-masterList_5_3_3 + P-masterList_5_3_4 + P-masterList_5_3_5 + P-masterList_5_3_6 + P-masterList_5_3_7 + P-masterList_1_3_0 + P-masterList_1_3_1 + P-masterList_1_3_2 + P-masterList_1_3_3 + P-masterList_1_3_4 + P-masterList_1_3_5 + P-masterList_1_3_6 + P-masterList_1_3_7 + P-masterList_5_4_0 + P-masterList_5_4_1 + P-masterList_5_4_2 + P-masterList_5_4_3 + P-masterList_5_4_4 + P-masterList_5_4_5 + P-masterList_5_4_6 + P-masterList_5_4_7 + P-masterList_1_4_0 + P-masterList_1_4_1 + P-masterList_1_4_2 + P-masterList_1_4_3 + P-masterList_1_4_4 + P-masterList_1_4_5 + P-masterList_1_4_6 + P-masterList_1_4_7 + P-masterList_4_7_7 + P-masterList_4_7_6 + P-masterList_4_7_5 + P-masterList_4_7_4 + P-masterList_4_7_3 + P-masterList_4_7_2 + P-masterList_4_7_1 + P-masterList_5_5_0 + P-masterList_5_5_1 + P-masterList_5_5_2 + P-masterList_5_5_3 + P-masterList_5_5_4 + P-masterList_5_5_5 + P-masterList_5_5_6 + P-masterList_5_5_7 + P-masterList_4_7_0 + P-masterList_1_5_0 + P-masterList_1_5_1 + P-masterList_1_5_2 + P-masterList_1_5_3 + P-masterList_1_5_4 + P-masterList_1_5_5 + P-masterList_1_5_6 + P-masterList_1_5_7 + P-masterList_5_6_0 + P-masterList_5_6_1 + P-masterList_5_6_2 + P-masterList_5_6_3 + P-masterList_5_6_4 + P-masterList_5_6_5 + P-masterList_5_6_6 + P-masterList_5_6_7 + P-masterList_0_6_7 + P-masterList_0_6_6 + P-masterList_0_6_5 + P-masterList_0_6_4 + P-masterList_0_6_3 + P-masterList_0_6_2 + P-masterList_0_6_1 + P-masterList_0_6_0 + P-masterList_1_6_0 + P-masterList_1_6_1 + P-masterList_1_6_2 + P-masterList_1_6_3 + P-masterList_1_6_4 + P-masterList_1_6_5 + P-masterList_1_6_6 + P-masterList_1_6_7 + P-masterList_5_7_0 + P-masterList_5_7_1 + P-masterList_5_7_2 + P-masterList_5_7_3 + P-masterList_5_7_4 + P-masterList_5_7_5 + P-masterList_5_7_6 + P-masterList_5_7_7 + P-masterList_1_7_0 + P-masterList_1_7_1 + P-masterList_1_7_2 + P-masterList_1_7_3 + P-masterList_1_7_4 + P-masterList_1_7_5 + P-masterList_1_7_6 + P-masterList_1_7_7 + P-masterList_4_6_7 + P-masterList_4_6_6 + P-masterList_4_6_5 + P-masterList_4_6_4 + P-masterList_4_6_3 + P-masterList_4_6_2 + P-masterList_4_6_1 + P-masterList_4_6_0 + P-masterList_6_1_0 + P-masterList_6_1_1 + P-masterList_6_1_2 + P-masterList_6_1_3 + P-masterList_6_1_4 + P-masterList_6_1_5 + P-masterList_6_1_6 + P-masterList_6_1_7 + P-masterList_2_1_0 + P-masterList_2_1_1 + P-masterList_2_1_2 + P-masterList_2_1_3 + P-masterList_2_1_4 + P-masterList_2_1_5 + P-masterList_2_1_6 + P-masterList_2_1_7 + P-masterList_0_5_7 + P-masterList_0_5_6 + P-masterList_6_2_0 + P-masterList_6_2_1 + P-masterList_6_2_2 + P-masterList_6_2_3 + P-masterList_6_2_4 + P-masterList_6_2_5 + P-masterList_6_2_6 + P-masterList_6_2_7 + P-masterList_0_5_5 + P-masterList_0_5_4 + P-masterList_0_5_3 + P-masterList_0_5_2 + P-masterList_0_5_1 + P-masterList_0_5_0 + P-masterList_2_2_0 + P-masterList_2_2_1 + P-masterList_2_2_2 + P-masterList_2_2_3 + P-masterList_2_2_4 + P-masterList_2_2_5 + P-masterList_2_2_6 + P-masterList_2_2_7 + P-masterList_6_3_0 + P-masterList_6_3_1 + P-masterList_6_3_2 + P-masterList_6_3_3 + P-masterList_6_3_4 + P-masterList_6_3_5 + P-masterList_6_3_6 + P-masterList_6_3_7 + P-masterList_2_3_0 + P-masterList_2_3_1 + P-masterList_2_3_2 + P-masterList_2_3_3 + P-masterList_2_3_4 + P-masterList_2_3_5 + P-masterList_2_3_6 + P-masterList_2_3_7 + P-masterList_6_4_0 + P-masterList_6_4_1 + P-masterList_6_4_2 + P-masterList_6_4_3 + P-masterList_6_4_4 + P-masterList_6_4_5 + P-masterList_6_4_6 + P-masterList_6_4_7 + P-masterList_2_4_0 + P-masterList_2_4_1 + P-masterList_2_4_2 + P-masterList_2_4_3 + P-masterList_2_4_4 + P-masterList_2_4_5 + P-masterList_2_4_6 + P-masterList_2_4_7 + P-masterList_4_5_7 + P-masterList_4_5_6 + P-masterList_4_5_5 + P-masterList_4_5_4 + P-masterList_4_5_3 + P-masterList_4_5_2 + P-masterList_4_5_1 + P-masterList_4_5_0 + P-masterList_6_5_0 + P-masterList_6_5_1 + P-masterList_6_5_2 + P-masterList_6_5_3 + P-masterList_6_5_4 + P-masterList_6_5_5 + P-masterList_6_5_6 + P-masterList_6_5_7 + P-masterList_2_5_0 + P-masterList_2_5_1 + P-masterList_2_5_2 + P-masterList_2_5_3 + P-masterList_2_5_4 + P-masterList_2_5_5 + P-masterList_2_5_6 + P-masterList_2_5_7 + P-masterList_6_6_0 + P-masterList_6_6_1 + P-masterList_6_6_2 + P-masterList_6_6_3 + P-masterList_6_6_4 + P-masterList_6_6_5 + P-masterList_6_6_6 + P-masterList_6_6_7 + P-masterList_0_4_7 + P-masterList_0_4_6 + P-masterList_0_4_5 + P-masterList_0_4_4 + P-masterList_0_4_3 + P-masterList_0_4_2 + P-masterList_0_4_1 + P-masterList_0_4_0 + P-masterList_2_6_0 + P-masterList_2_6_1 + P-masterList_2_6_2 + P-masterList_2_6_3 + P-masterList_2_6_4 + P-masterList_2_6_5 + P-masterList_2_6_6 + P-masterList_2_6_7 + P-masterList_6_7_0 + P-masterList_6_7_1 + P-masterList_6_7_2 + P-masterList_6_7_3 + P-masterList_6_7_4 + P-masterList_6_7_5 + P-masterList_6_7_6 + P-masterList_6_7_7 + P-masterList_2_7_0 + P-masterList_2_7_1 + P-masterList_2_7_2 + P-masterList_2_7_3 + P-masterList_2_7_4 + P-masterList_2_7_5 + P-masterList_2_7_6 + P-masterList_2_7_7 + P-masterList_4_4_7 + P-masterList_4_4_6 + P-masterList_4_4_5 + P-masterList_4_4_4 + P-masterList_4_4_3 + P-masterList_4_4_2 + P-masterList_4_4_1 + P-masterList_4_4_0 + P-masterList_0_3_7 + P-masterList_0_3_6 + P-masterList_0_3_5 + P-masterList_0_3_4 + P-masterList_0_3_3 + P-masterList_0_3_2 + P-masterList_0_3_1 + P-masterList_7_1_0 + P-masterList_7_1_1 + P-masterList_7_1_2 + P-masterList_7_1_3 + P-masterList_7_1_4 + P-masterList_7_1_5 + P-masterList_7_1_6 + P-masterList_7_1_7 + P-masterList_0_3_0 + P-masterList_3_1_0 + P-masterList_3_1_1 + P-masterList_3_1_2 + P-masterList_3_1_3 + P-masterList_3_1_4 + P-masterList_3_1_5 + P-masterList_3_1_6 + P-masterList_3_1_7 + P-masterList_7_2_0 + P-masterList_7_2_1 + P-masterList_7_2_2 + P-masterList_7_2_3 + P-masterList_7_2_4 + P-masterList_7_2_5 + P-masterList_7_2_6 + P-masterList_7_2_7 + P-masterList_3_2_0 + P-masterList_3_2_1 + P-masterList_3_2_2 + P-masterList_3_2_3 + P-masterList_3_2_4 + P-masterList_3_2_5 + P-masterList_3_2_6 + P-masterList_3_2_7 + P-masterList_7_3_0 + P-masterList_7_3_1 + P-masterList_7_3_2 + P-masterList_7_3_3 + P-masterList_7_3_4 + P-masterList_7_3_5 + P-masterList_7_3_6 + P-masterList_7_3_7 + P-masterList_3_3_0 + P-masterList_3_3_1 + P-masterList_3_3_2 + P-masterList_3_3_3 + P-masterList_3_3_4 + P-masterList_3_3_5 + P-masterList_3_3_6 + P-masterList_3_3_7 + P-masterList_4_3_7 + P-masterList_4_3_6 + P-masterList_4_3_5 + P-masterList_7_4_0 + P-masterList_7_4_1 + P-masterList_7_4_2 + P-masterList_7_4_3 + P-masterList_7_4_4 + P-masterList_7_4_5 + P-masterList_7_4_6 + P-masterList_7_4_7 + P-masterList_4_3_4 + P-masterList_4_3_3 + P-masterList_4_3_2 + P-masterList_4_3_1 + P-masterList_4_3_0 + P-masterList_3_4_0 + P-masterList_3_4_1 + P-masterList_3_4_2 + P-masterList_3_4_3 + P-masterList_3_4_4 + P-masterList_3_4_5 + P-masterList_3_4_6 + P-masterList_3_4_7 + P-masterList_7_5_0 + P-masterList_7_5_1 + P-masterList_7_5_2 + P-masterList_7_5_3 + P-masterList_7_5_4 + P-masterList_7_5_5 + P-masterList_7_5_6 + P-masterList_7_5_7 + P-masterList_0_2_7 + P-masterList_0_2_6 + P-masterList_0_2_5 + P-masterList_0_2_4 + P-masterList_0_2_3 + P-masterList_0_2_2 + P-masterList_0_2_1 + P-masterList_0_2_0 + P-masterList_3_5_0 + P-masterList_3_5_1 + P-masterList_3_5_2 + P-masterList_3_5_3 + P-masterList_3_5_4 + P-masterList_3_5_5 + P-masterList_3_5_6 + P-masterList_3_5_7 + P-masterList_7_6_0 + P-masterList_7_6_1 + P-masterList_7_6_2 + P-masterList_7_6_3 + P-masterList_7_6_4 + P-masterList_7_6_5 + P-masterList_7_6_6 + P-masterList_7_6_7 + P-masterList_4_2_7 + P-masterList_4_2_6 + P-masterList_4_2_5 + P-masterList_4_2_4 + P-masterList_4_2_3 + P-masterList_4_2_2 + P-masterList_4_2_1 + P-masterList_4_2_0 + P-masterList_3_6_0 + P-masterList_3_6_1 + P-masterList_3_6_2 + P-masterList_3_6_3 + P-masterList_3_6_4 + P-masterList_3_6_5 + P-masterList_3_6_6 + P-masterList_3_6_7 + P-masterList_7_7_0 + P-masterList_7_7_1 + P-masterList_7_7_2 + P-masterList_7_7_3 + P-masterList_7_7_4 + P-masterList_7_7_5 + P-masterList_7_7_6 + P-masterList_7_7_7 + P-masterList_0_1_7 + P-masterList_0_1_6 + P-masterList_0_1_5 + P-masterList_0_1_4 + P-masterList_0_1_3 + P-masterList_0_1_2 + P-masterList_0_1_1 + P-masterList_0_1_0 + P-masterList_3_7_0 + P-masterList_3_7_1 + P-masterList_3_7_2 + P-masterList_3_7_3 + P-masterList_3_7_4 + P-masterList_3_7_5 + P-masterList_3_7_6 + P-masterList_3_7_7 + P-masterList_4_1_0 + P-masterList_4_1_1 + P-masterList_4_1_2 + P-masterList_4_1_3 + P-masterList_4_1_4 + P-masterList_4_1_5 + P-masterList_4_1_6 + P-masterList_4_1_7 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1)
lola: after: (42 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1)
lola: LP says that atomic proposition is always false: (42 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1)
lola: place invariant simplifies atomic proposition
lola: before: (P-electedPrimary_7 + P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0 <= P-stage_3_PRIM + P-stage_7_SEC + P-stage_3_SEC + P-stage_2_PRIM + P-stage_5_SEC + P-stage_7_PRIM + P-stage_1_NEG + P-stage_5_NEG + P-stage_6_PRIM + P-stage_0_SEC + P-stage_4_SEC + P-stage_4_NEG + P-stage_0_NEG + P-stage_1_PRIM + P-stage_4_PRIM + P-stage_1_SEC + P-stage_6_NEG + P-stage_2_NEG + P-stage_5_PRIM + P-stage_0_PRIM + P-stage_6_SEC + P-stage_2_SEC + P-stage_7_NEG + P-stage_3_NEG)
lola: after: (P-electedPrimary_7 + P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0 <= 7)
lola: LP says that atomic proposition is always true: (P-electedPrimary_7 + P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0 <= 7)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_6_4_AnsP_7 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_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_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_7 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1 + P-poll__networl_2_3_RP_6 + P-poll__networl_2_3_RP_7 + P-poll__networl_1_0_AI_0 + P-poll__networl_1_0_AI_1 + P-poll__networl_1_0_AI_2 + P-poll__networl_1_0_AI_3 + P-poll__networl_1_0_AI_4 + P-poll__networl_1_0_AI_5 + P-poll__networl_1_0_AI_6 + P-poll__networl_1_0_AI_7 + P-poll__networl_4_1_AnsP_0 + P-poll__networl_2_3_RP_5 + P-poll__networl_2_3_RP_4 + P-poll__networl_2_3_RP_3 + P-poll__networl_2_3_RP_2 + P-poll__networl_2_3_RP_1 + P-poll__networl_2_3_RP_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_0_4_RP_7 + P-poll__networl_5_6_AskP_0 + P-poll__networl_5_6_AskP_1 + P-poll__networl_5_6_AskP_2 + P-poll__networl_5_6_AskP_3 + P-poll__networl_5_6_AskP_4 + P-poll__networl_5_6_AskP_5 + P-poll__networl_5_6_AskP_6 + P-poll__networl_5_6_AskP_7 + 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_4_0_RI_7 + P-poll__networl_4_2_RP_7 + P-poll__networl_4_2_RP_6 + P-poll__networl_4_2_RP_5 + P-poll__networl_4_2_RP_4 + P-poll__networl_4_2_RP_3 + P-poll__networl_4_2_RP_2 + P-poll__networl_4_2_RP_1 + P-poll__networl_4_2_RP_0 + P-poll__networl_6_1_RP_7 + P-poll__networl_2_1_RI_0 + P-poll__networl_2_1_RI_1 + P-poll__networl_2_1_RI_2 + P-poll__networl_2_1_RI_3 + P-poll__networl_2_1_RI_4 + P-poll__networl_2_1_RI_5 + P-poll__networl_2_1_RI_6 + P-poll__networl_2_1_RI_7 + P-poll__networl_6_3_AnnP_0 + P-poll__networl_6_3_AnnP_1 + P-poll__networl_6_3_AnnP_2 + P-poll__networl_6_3_AnnP_3 + P-poll__networl_6_3_AnnP_4 + P-poll__networl_6_3_AnnP_5 + P-poll__networl_6_3_AnnP_6 + P-poll__networl_6_3_AnnP_7 + P-poll__networl_0_3_AskP_0 + P-poll__networl_0_3_AskP_1 + P-poll__networl_0_3_AskP_2 + P-poll__networl_0_3_AskP_3 + P-poll__networl_0_3_AskP_4 + P-poll__networl_0_3_AskP_5 + P-poll__networl_0_3_AskP_6 + P-poll__networl_0_3_AskP_7 + P-poll__networl_0_2_RI_0 + P-poll__networl_0_2_RI_1 + P-poll__networl_0_2_RI_2 + P-poll__networl_0_2_RI_3 + P-poll__networl_0_2_RI_4 + P-poll__networl_0_2_RI_5 + P-poll__networl_0_2_RI_6 + P-poll__networl_0_2_RI_7 + P-poll__networl_6_1_RP_6 + P-poll__networl_1_0_AnnP_0 + P-poll__networl_1_0_AnnP_1 + P-poll__networl_1_0_AnnP_2 + P-poll__networl_1_0_AnnP_3 + P-poll__networl_1_0_AnnP_4 + P-poll__networl_1_0_AnnP_5 + P-poll__networl_1_0_AnnP_6 + P-poll__networl_1_0_AnnP_7 + P-poll__networl_7_5_AnsP_0 + P-poll__networl_6_1_RP_5 + P-poll__networl_6_1_RP_4 + P-poll__networl_6_1_RP_3 + P-poll__networl_6_1_RP_2 + P-poll__networl_6_1_RP_1 + P-poll__networl_6_1_RP_0 + P-poll__networl_7_0_AskP_0 + P-poll__networl_7_0_AskP_1 + P-poll__networl_7_0_AskP_2 + P-poll__networl_7_0_AskP_3 + P-poll__networl_7_0_AskP_4 + P-poll__networl_7_0_AskP_5 + P-poll__networl_7_0_AskP_6 + P-poll__networl_7_0_AskP_7 + P-poll__networl_2_2_AnsP_0 + P-poll__networl_2_2_AskP_7 + 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_3_7_AskP_0 + P-poll__networl_3_7_AskP_1 + P-poll__networl_3_7_AskP_2 + P-poll__networl_3_7_AskP_3 + P-poll__networl_3_7_AskP_4 + P-poll__networl_3_7_AskP_5 + P-poll__networl_3_7_AskP_6 + P-poll__networl_3_7_AskP_7 + P-poll__networl_3_0_RP_0 + P-poll__networl_3_0_RP_1 + P-poll__networl_3_0_RP_2 + P-poll__networl_3_0_RP_3 + P-poll__networl_3_0_RP_4 + P-poll__networl_3_0_RP_5 + P-poll__networl_3_0_RP_6 + P-poll__networl_3_0_RP_7 + P-poll__networl_1_1_RP_0 + P-poll__networl_1_1_RP_1 + P-poll__networl_1_1_RP_2 + P-poll__networl_1_1_RP_3 + P-poll__networl_1_1_RP_4 + P-poll__networl_1_1_RP_5 + P-poll__networl_1_1_RP_6 + P-poll__networl_1_1_RP_7 + P-poll__networl_2_7_AnsP_0 + P-poll__networl_7_5_AskP_7 + P-poll__networl_7_5_AskP_6 + P-poll__networl_7_5_AskP_5 + P-poll__networl_7_5_AskP_4 + P-poll__networl_4_4_AnnP_0 + P-poll__networl_4_4_AnnP_1 + P-poll__networl_4_4_AnnP_2 + P-poll__networl_4_4_AnnP_3 + P-poll__networl_4_4_AnnP_4 + P-poll__networl_4_4_AnnP_5 + P-poll__networl_4_4_AnnP_6 + P-poll__networl_4_4_AnnP_7 + P-poll__networl_7_5_AskP_3 + P-poll__networl_7_5_AskP_2 + P-poll__networl_7_5_AskP_1 + P-poll__networl_7_5_AskP_0 + P-poll__networl_5_6_AnsP_0 + P-poll__networl_1_4_RI_7 + P-poll__networl_5_1_AskP_0 + P-poll__networl_5_1_AskP_1 + P-poll__networl_5_1_AskP_2 + P-poll__networl_5_1_AskP_3 + P-poll__networl_5_1_AskP_4 + P-poll__networl_5_1_AskP_5 + P-poll__networl_5_1_AskP_6 + P-poll__networl_5_1_AskP_7 + P-poll__networl_1_4_RI_6 + P-poll__networl_1_4_RI_5 + P-poll__networl_1_4_RI_4 + P-poll__networl_0_3_AnsP_0 + P-poll__networl_1_4_RI_3 + P-poll__networl_1_4_RI_2 + P-poll__networl_1_4_RI_1 + P-poll__networl_1_4_RI_0 + P-poll__networl_1_5_AnnP_7 + 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_1_5_AnnP_2 + P-poll__networl_1_5_AnnP_1 + P-poll__networl_1_5_AnnP_0 + P-poll__networl_6_0_AnsP_0 + P-poll__networl_7_0_AnsP_0 + P-poll__networl_3_3_RI_7 + 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_3_3_RI_2 + P-poll__networl_3_3_RI_1 + P-poll__networl_3_3_RI_0 + P-poll__networl_5_2_RI_7 + P-poll__networl_2_5_AnnP_0 + P-poll__networl_2_5_AnnP_1 + P-poll__networl_2_5_AnnP_2 + P-poll__networl_2_5_AnnP_3 + P-poll__networl_2_5_AnnP_4 + P-poll__networl_2_5_AnnP_5 + P-poll__networl_2_5_AnnP_6 + P-poll__networl_2_5_AnnP_7 + P-poll__networl_5_2_RI_6 + P-poll__networl_5_2_RI_5 + P-poll__networl_3_7_AnsP_0 + P-poll__networl_5_2_RI_4 + P-poll__networl_5_2_RI_3 + P-poll__networl_5_2_RI_2 + P-poll__networl_5_2_RI_1 + P-poll__networl_5_2_RI_0 + P-poll__networl_7_1_RI_7 + P-poll__networl_7_1_RI_6 + P-poll__networl_7_1_RI_5 + P-poll__networl_7_1_RI_4 + P-poll__networl_3_2_AskP_0 + P-poll__networl_3_2_AskP_1 + P-poll__networl_3_2_AskP_2 + P-poll__networl_3_2_AskP_3 + P-poll__networl_3_2_AskP_4 + P-poll__networl_3_2_AskP_5 + P-poll__networl_3_2_AskP_6 + P-poll__networl_3_2_AskP_7 + P-poll__networl_7_1_RI_3 + P-poll__networl_7_1_RI_2 + P-poll__networl_7_1_RI_1 + P-poll__networl_7_1_RI_0 + P-poll__networl_0_3_AI_7 + P-poll__networl_0_3_AI_6 + P-poll__networl_7_5_AI_0 + P-poll__networl_7_5_AI_1 + P-poll__networl_7_5_AI_2 + P-poll__networl_7_5_AI_3 + P-poll__networl_7_5_AI_4 + P-poll__networl_7_5_AI_5 + P-poll__networl_7_5_AI_6 + P-poll__networl_7_5_AI_7 + P-poll__networl_0_3_AI_5 + P-poll__networl_5_6_AI_0 + P-poll__networl_5_6_AI_1 + P-poll__networl_5_6_AI_2 + P-poll__networl_5_6_AI_3 + P-poll__networl_5_6_AI_4 + P-poll__networl_5_6_AI_5 + P-poll__networl_5_6_AI_6 + P-poll__networl_5_6_AI_7 + P-poll__networl_0_3_AI_4 + P-poll__networl_0_3_AI_3 + P-poll__networl_3_7_AI_0 + P-poll__networl_3_7_AI_1 + P-poll__networl_3_7_AI_2 + P-poll__networl_3_7_AI_3 + P-poll__networl_3_7_AI_4 + P-poll__networl_3_7_AI_5 + P-poll__networl_3_7_AI_6 + P-poll__networl_3_7_AI_7 + P-poll__networl_5_1_AnsP_0 + P-poll__networl_0_3_AI_2 + P-poll__networl_0_3_AI_1 + P-poll__networl_0_3_AI_0 + P-poll__networl_1_6_RP_7 + P-poll__networl_1_6_RP_6 + P-poll__networl_1_6_RP_5 + P-poll__networl_1_6_RP_4 + P-poll__networl_1_6_RP_3 + P-poll__networl_0_6_AnnP_0 + P-poll__networl_0_6_AnnP_1 + P-poll__networl_0_6_AnnP_2 + P-poll__networl_0_6_AnnP_3 + P-poll__networl_0_6_AnnP_4 + P-poll__networl_0_6_AnnP_5 + P-poll__networl_0_6_AnnP_6 + P-poll__networl_0_6_AnnP_7 + P-poll__networl_1_6_RP_2 + P-poll__networl_1_6_RP_1 + P-poll__networl_1_6_RP_0 + P-poll__networl_6_6_AskP_0 + P-poll__networl_6_6_AskP_1 + P-poll__networl_6_6_AskP_2 + P-poll__networl_6_6_AskP_3 + P-poll__networl_6_6_AskP_4 + P-poll__networl_6_6_AskP_5 + P-poll__networl_6_6_AskP_6 + P-poll__networl_6_6_AskP_7 + P-poll__networl_6_7_RI_0 + P-poll__networl_6_7_RI_1 + P-poll__networl_6_7_RI_2 + P-poll__networl_6_7_RI_3 + P-poll__networl_6_7_RI_4 + P-poll__networl_6_7_RI_5 + P-poll__networl_6_7_RI_6 + P-poll__networl_6_7_RI_7 + P-poll__networl_4_1_AskP_7 + P-poll__networl_4_1_AskP_6 + P-poll__networl_4_1_AskP_5 + P-poll__networl_4_1_AskP_4 + P-poll__networl_4_1_AskP_3 + P-poll__networl_4_1_AskP_2 + P-poll__networl_7_3_AnnP_0 + P-poll__networl_7_3_AnnP_1 + P-poll__networl_7_3_AnnP_2 + P-poll__networl_7_3_AnnP_3 + P-poll__networl_7_3_AnnP_4 + P-poll__networl_7_3_AnnP_5 + P-poll__networl_7_3_AnnP_6 + P-poll__networl_7_3_AnnP_7 + P-poll__networl_1_3_AskP_0 + P-poll__networl_1_3_AskP_1 + P-poll__networl_1_3_AskP_2 + P-poll__networl_1_3_AskP_3 + P-poll__networl_1_3_AskP_4 + P-poll__networl_1_3_AskP_5 + P-poll__networl_1_3_AskP_6 + P-poll__networl_1_3_AskP_7 + P-poll__networl_4_1_AskP_1 + P-poll__networl_4_1_AskP_0 + P-poll__networl_2_2_AI_7 + P-poll__networl_2_2_AI_6 + P-poll__networl_2_2_AI_5 + P-poll__networl_2_2_AI_4 + 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_2_0_AnnP_7 + P-poll__networl_2_2_AI_3 + P-poll__networl_2_2_AI_2 + P-poll__networl_2_2_AI_1 + P-poll__networl_2_2_AI_0 + P-poll__networl_3_2_AnsP_0 + P-poll__networl_3_5_RP_7 + P-poll__networl_3_5_RP_6 + P-poll__networl_3_5_RP_5 + P-poll__networl_3_5_RP_4 + P-poll__networl_3_5_RP_3 + P-poll__networl_3_5_RP_2 + P-poll__networl_3_5_RP_1 + P-poll__networl_3_5_RP_0 + P-poll__networl_4_1_AI_7 + P-poll__networl_4_1_AI_6 + P-poll__networl_4_1_AI_5 + P-poll__networl_4_1_AI_4 + P-poll__networl_4_1_AI_3 + P-poll__networl_4_1_AI_2 + P-poll__networl_4_1_AI_1 + P-poll__networl_4_1_AI_0 + P-poll__networl_5_4_RP_7 + P-poll__networl_5_4_RP_6 + P-poll__networl_4_7_AskP_0 + P-poll__networl_4_7_AskP_1 + P-poll__networl_4_7_AskP_2 + P-poll__networl_4_7_AskP_3 + P-poll__networl_4_7_AskP_4 + P-poll__networl_4_7_AskP_5 + P-poll__networl_4_7_AskP_6 + P-poll__networl_4_7_AskP_7 + P-poll__networl_7_6_RP_0 + P-poll__networl_7_6_RP_1 + P-poll__networl_7_6_RP_2 + P-poll__networl_7_6_RP_3 + P-poll__networl_7_6_RP_4 + P-poll__networl_7_6_RP_5 + P-poll__networl_7_6_RP_6 + P-poll__networl_7_6_RP_7 + P-poll__networl_6_3_AI_0 + P-poll__networl_6_3_AI_1 + P-poll__networl_6_3_AI_2 + P-poll__networl_6_3_AI_3 + P-poll__networl_6_3_AI_4 + P-poll__networl_6_3_AI_5 + P-poll__networl_6_3_AI_6 + P-poll__networl_6_3_AI_7 + P-poll__networl_5_7_RP_0 + P-poll__networl_5_7_RP_1 + P-poll__networl_5_7_RP_2 + P-poll__networl_5_7_RP_3 + P-poll__networl_5_7_RP_4 + P-poll__networl_5_7_RP_5 + P-poll__networl_5_7_RP_6 + P-poll__networl_5_7_RP_7 + P-poll__networl_4_4_AI_0 + P-poll__networl_4_4_AI_1 + P-poll__networl_4_4_AI_2 + P-poll__networl_4_4_AI_3 + P-poll__networl_4_4_AI_4 + P-poll__networl_4_4_AI_5 + P-poll__networl_4_4_AI_6 + P-poll__networl_4_4_AI_7 + P-poll__networl_5_4_RP_5 + P-poll__networl_5_4_RP_4 + P-poll__networl_5_4_RP_3 + P-poll__networl_5_4_RP_2 + P-poll__networl_5_4_RP_1 + P-poll__networl_5_4_RP_0 + P-poll__networl_4_6_AnsP_0 + P-poll__networl_6_0_AI_7 + P-poll__networl_5_4_AnnP_0 + P-poll__networl_5_4_AnnP_1 + P-poll__networl_5_4_AnnP_2 + P-poll__networl_5_4_AnnP_3 + P-poll__networl_5_4_AnnP_4 + P-poll__networl_5_4_AnnP_5 + P-poll__networl_5_4_AnnP_6 + P-poll__networl_5_4_AnnP_7 + P-poll__networl_2_5_AI_0 + P-poll__networl_2_5_AI_1 + P-poll__networl_2_5_AI_2 + P-poll__networl_2_5_AI_3 + P-poll__networl_2_5_AI_4 + P-poll__networl_2_5_AI_5 + P-poll__networl_2_5_AI_6 + P-poll__networl_2_5_AI_7 + P-poll__networl_0_6_AI_0 + P-poll__networl_0_6_AI_1 + P-poll__networl_0_6_AI_2 + P-poll__networl_0_6_AI_3 + P-poll__networl_0_6_AI_4 + P-poll__networl_0_6_AI_5 + P-poll__networl_0_6_AI_6 + P-poll__networl_0_6_AI_7 + P-poll__networl_6_0_AI_6 + P-poll__networl_0_1_AnnP_0 + P-poll__networl_0_1_AnnP_1 + P-poll__networl_0_1_AnnP_2 + P-poll__networl_0_1_AnnP_3 + P-poll__networl_0_1_AnnP_4 + P-poll__networl_0_1_AnnP_5 + P-poll__networl_0_1_AnnP_6 + P-poll__networl_0_1_AnnP_7 + P-poll__networl_6_0_AI_5 + P-poll__networl_6_6_AnsP_0 + P-poll__networl_6_0_AI_4 + P-poll__networl_6_0_AI_3 + P-poll__networl_6_0_AI_2 + P-poll__networl_6_0_AI_1 + P-poll__networl_6_0_AI_0 + P-poll__networl_7_3_RP_7 + P-poll__networl_7_3_RP_6 + P-poll__networl_7_4_RI_0 + P-poll__networl_7_4_RI_1 + P-poll__networl_7_4_RI_2 + P-poll__networl_7_4_RI_3 + P-poll__networl_7_4_RI_4 + P-poll__networl_7_4_RI_5 + P-poll__networl_7_4_RI_6 + P-poll__networl_7_4_RI_7 + P-poll__networl_7_3_RP_5 + P-poll__networl_7_3_RP_4 + P-poll__networl_7_3_RP_3 + P-poll__networl_7_3_RP_2 + P-poll__networl_7_3_RP_1 + P-poll__networl_7_3_RP_0 + P-poll__networl_3_4_AnnP_7 + P-poll__networl_3_4_AnnP_6 + P-poll__networl_3_4_AnnP_5 + P-poll__networl_5_5_RI_0 + P-poll__networl_5_5_RI_1 + P-poll__networl_5_5_RI_2 + P-poll__networl_5_5_RI_3 + P-poll__networl_5_5_RI_4 + P-poll__networl_5_5_RI_5 + P-poll__networl_5_5_RI_6 + P-poll__networl_5_5_RI_7 + P-poll__networl_6_1_AskP_0 + P-poll__networl_6_1_AskP_1 + P-poll__networl_6_1_AskP_2 + P-poll__networl_6_1_AskP_3 + P-poll__networl_6_1_AskP_4 + P-poll__networl_6_1_AskP_5 + P-poll__networl_6_1_AskP_6 + P-poll__networl_6_1_AskP_7 + P-poll__networl_3_4_AnnP_4 + P-poll__networl_3_4_AnnP_3 + P-poll__networl_3_4_AnnP_2 + P-poll__networl_3_6_RI_0 + P-poll__networl_3_6_RI_1 + P-poll__networl_3_6_RI_2 + P-poll__networl_3_6_RI_3 + P-poll__networl_3_6_RI_4 + P-poll__networl_3_6_RI_5 + P-poll__networl_3_6_RI_6 + P-poll__networl_3_6_RI_7 + P-poll__networl_1_3_AnsP_0 + P-poll__networl_3_4_AnnP_1 + P-poll__networl_3_4_AnnP_0 + P-poll__networl_1_7_RI_0 + P-poll__networl_1_7_RI_1 + P-poll__networl_1_7_RI_2 + P-poll__networl_1_7_RI_3 + P-poll__networl_1_7_RI_4 + P-poll__networl_1_7_RI_5 + P-poll__networl_1_7_RI_6 + P-poll__networl_1_7_RI_7 + P-poll__networl_2_7_AskP_7 + P-poll__networl_2_7_AskP_6 + P-poll__networl_2_7_AskP_5 + P-poll__networl_2_7_AskP_4 + P-poll__networl_2_7_AskP_3 + P-poll__networl_3_5_AnnP_0 + P-poll__networl_3_5_AnnP_1 + P-poll__networl_3_5_AnnP_2 + P-poll__networl_3_5_AnnP_3 + P-poll__networl_3_5_AnnP_4 + P-poll__networl_3_5_AnnP_5 + P-poll__networl_3_5_AnnP_6 + P-poll__networl_3_5_AnnP_7 + P-poll__networl_2_7_AskP_2 + P-poll__networl_7_0_AI_0 + P-poll__networl_7_0_AI_1 + P-poll__networl_7_0_AI_2 + P-poll__networl_7_0_AI_3 + P-poll__networl_7_0_AI_4 + P-poll__networl_7_0_AI_5 + P-poll__networl_7_0_AI_6 + P-poll__networl_7_0_AI_7 + P-poll__networl_2_7_AskP_1 + P-poll__networl_4_7_AnsP_0 + P-poll__networl_2_7_AskP_0 + P-poll__networl_6_4_RP_0 + P-poll__networl_6_4_RP_1 + P-poll__networl_6_4_RP_2 + P-poll__networl_6_4_RP_3 + P-poll__networl_6_4_RP_4 + P-poll__networl_6_4_RP_5 + P-poll__networl_6_4_RP_6 + P-poll__networl_6_4_RP_7 + P-poll__networl_5_1_AI_0 + P-poll__networl_5_1_AI_1 + P-poll__networl_5_1_AI_2 + P-poll__networl_5_1_AI_3 + P-poll__networl_5_1_AI_4 + P-poll__networl_5_1_AI_5 + P-poll__networl_5_1_AI_6 + P-poll__networl_5_1_AI_7 + P-poll__networl_4_5_RP_0 + P-poll__networl_4_5_RP_1 + P-poll__networl_4_5_RP_2 + P-poll__networl_4_5_RP_3 + P-poll__networl_4_5_RP_4 + P-poll__networl_4_5_RP_5 + P-poll__networl_4_5_RP_6 + P-poll__networl_4_5_RP_7 + P-poll__networl_3_2_AI_0 + P-poll__networl_3_2_AI_1 + P-poll__networl_3_2_AI_2 + P-poll__networl_3_2_AI_3 + P-poll__networl_3_2_AI_4 + P-poll__networl_3_2_AI_5 + P-poll__networl_3_2_AI_6 + P-poll__networl_3_2_AI_7 + P-poll__networl_4_2_AskP_0 + P-poll__networl_4_2_AskP_1 + P-poll__networl_4_2_AskP_2 + P-poll__networl_4_2_AskP_3 + P-poll__networl_4_2_AskP_4 + P-poll__networl_4_2_AskP_5 + P-poll__networl_4_2_AskP_6 + P-poll__networl_4_2_AskP_7 + P-poll__networl_0_7_RI_7 + P-poll__networl_2_6_RP_0 + P-poll__networl_2_6_RP_1 + P-poll__networl_2_6_RP_2 + P-poll__networl_2_6_RP_3 + P-poll__networl_2_6_RP_4 + P-poll__networl_2_6_RP_5 + P-poll__networl_2_6_RP_6 + P-poll__networl_2_6_RP_7 + P-poll__networl_1_3_AI_0 + P-poll__networl_1_3_AI_1 + P-poll__networl_1_3_AI_2 + 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_3_AI_7 + P-poll__networl_0_7_RI_6 + P-poll__networl_0_7_RP_0 + P-poll__networl_0_7_RP_1 + P-poll__networl_0_7_RP_2 + P-poll__networl_0_7_RP_3 + P-poll__networl_0_7_RP_4 + P-poll__networl_0_7_RP_5 + P-poll__networl_0_7_RP_6 + P-poll__networl_0_7_RP_7 + P-poll__networl_0_7_RI_5 + P-poll__networl_0_7_RI_4 + P-poll__networl_0_7_RI_3 + P-poll__networl_0_7_RI_2 + P-poll__networl_0_7_RI_1 + P-poll__networl_0_7_RI_0 + P-poll__networl_6_2_RI_0 + P-poll__networl_6_2_RI_1 + P-poll__networl_6_2_RI_2 + P-poll__networl_6_2_RI_3 + P-poll__networl_6_2_RI_4 + P-poll__networl_6_2_RI_5 + P-poll__networl_6_2_RI_6 + P-poll__networl_6_2_RI_7 + P-poll__networl_4_3_RI_0 + P-poll__networl_4_3_RI_1 + P-poll__networl_4_3_RI_2 + P-poll__networl_4_3_RI_3 + P-poll__networl_4_3_RI_4 + P-poll__networl_4_3_RI_5 + P-poll__networl_4_3_RI_6 + P-poll__networl_4_3_RI_7 + P-poll__networl_6_1_AnsP_0 + P-poll__networl_1_2_AnsP_0 + P-poll__networl_1_6_AnnP_0 + P-poll__networl_1_6_AnnP_1 + P-poll__networl_1_6_AnnP_2 + P-poll__networl_1_6_AnnP_3 + P-poll__networl_1_6_AnnP_4 + P-poll__networl_1_6_AnnP_5 + P-poll__networl_1_6_AnnP_6 + P-poll__networl_1_6_AnnP_7 + P-poll__networl_2_4_RI_0 + P-poll__networl_2_4_RI_1 + P-poll__networl_2_4_RI_2 + P-poll__networl_2_4_RI_3 + P-poll__networl_2_4_RI_4 + P-poll__networl_2_4_RI_5 + P-poll__networl_2_4_RI_6 + P-poll__networl_2_4_RI_7 + P-poll__networl_2_6_RI_7 + P-poll__networl_2_6_RI_6 + P-poll__networl_2_6_RI_5 + P-poll__networl_2_6_RI_4 + P-poll__networl_2_6_RI_3 + P-poll__networl_0_5_RI_0 + P-poll__networl_0_5_RI_1 + P-poll__networl_0_5_RI_2 + P-poll__networl_0_5_RI_3 + P-poll__networl_0_5_RI_4 + P-poll__networl_0_5_RI_5 + P-poll__networl_0_5_RI_6 + P-poll__networl_0_5_RI_7 + P-poll__networl_2_6_RI_2 + P-poll__networl_7_6_AskP_0 + P-poll__networl_7_6_AskP_1 + P-poll__networl_7_6_AskP_2 + P-poll__networl_7_6_AskP_3 + P-poll__networl_7_6_AskP_4 + P-poll__networl_7_6_AskP_5 + P-poll__networl_7_6_AskP_6 + P-poll__networl_7_6_AskP_7 + P-poll__networl_2_6_RI_1 + P-poll__networl_2_6_RI_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_2_3_AskP_7 + P-poll__networl_3_0_AnnP_0 + P-poll__networl_3_0_AnnP_1 + P-poll__networl_3_0_AnnP_2 + P-poll__networl_3_0_AnnP_3 + P-poll__networl_3_0_AnnP_4 + P-poll__networl_3_0_AnnP_5 + P-poll__networl_3_0_AnnP_6 + P-poll__networl_3_0_AnnP_7 + P-poll__networl_7_1_RP_0 + P-poll__networl_7_1_RP_1 + P-poll__networl_7_1_RP_2 + P-poll__networl_7_1_RP_3 + P-poll__networl_7_1_RP_4 + P-poll__networl_7_1_RP_5 + P-poll__networl_7_1_RP_6 + P-poll__networl_7_1_RP_7 + P-poll__networl_5_2_RP_0 + P-poll__networl_5_2_RP_1 + P-poll__networl_5_2_RP_2 + P-poll__networl_5_2_RP_3 + P-poll__networl_5_2_RP_4 + P-poll__networl_5_2_RP_5 + P-poll__networl_5_2_RP_6 + P-poll__networl_5_2_RP_7 + P-poll__networl_6_0_AskP_7 + P-poll__networl_6_0_AskP_6 + P-poll__networl_6_0_AskP_5 + P-poll__networl_6_0_AskP_4 + P-poll__networl_3_3_RP_0 + P-poll__networl_3_3_RP_1 + P-poll__networl_3_3_RP_2 + P-poll__networl_3_3_RP_3 + P-poll__networl_3_3_RP_4 + P-poll__networl_3_3_RP_5 + P-poll__networl_3_3_RP_6 + P-poll__networl_3_3_RP_7 + P-poll__networl_6_0_AskP_3 + P-poll__networl_6_0_AskP_2 + P-poll__networl_6_0_AskP_1 + P-poll__networl_6_0_AskP_0 + P-poll__networl_4_5_RI_7 + P-poll__networl_4_5_RI_6 + P-poll__networl_4_5_RI_5 + P-poll__networl_2_0_AI_0 + P-poll__networl_2_0_AI_1 + P-poll__networl_2_0_AI_2 + P-poll__networl_2_0_AI_3 + P-poll__networl_2_0_AI_4 + P-poll__networl_2_0_AI_5 + P-poll__networl_2_0_AI_6 + P-poll__networl_2_0_AI_7 + P-poll__networl_4_2_AnsP_0 + P-poll__networl_4_5_RI_4 + P-poll__networl_4_5_RI_3 + P-poll__networl_4_5_RI_2 + P-poll__networl_4_5_RI_1 + P-poll__networl_4_5_RI_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_1_4_RP_7 + P-poll__networl_0_1_AI_0 + P-poll__networl_0_1_AI_1 + P-poll__networl_0_1_AI_2 + P-poll__networl_0_1_AI_3 + P-poll__networl_0_1_AI_4 + P-poll__networl_0_1_AI_5 + P-poll__networl_0_1_AI_6 + P-poll__networl_0_1_AI_7 + P-poll__networl_5_7_AskP_0 + P-poll__networl_5_7_AskP_1 + P-poll__networl_5_7_AskP_2 + P-poll__networl_5_7_AskP_3 + P-poll__networl_5_7_AskP_4 + P-poll__networl_5_7_AskP_5 + P-poll__networl_5_7_AskP_6 + P-poll__networl_5_7_AskP_7 + P-poll__networl_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_5_0_RI_7 + P-poll__networl_6_4_RI_7 + P-poll__networl_6_4_RI_6 + P-poll__networl_6_4_RI_5 + P-poll__networl_6_4_RI_4 + P-poll__networl_6_4_RI_3 + P-poll__networl_6_4_RI_2 + P-poll__networl_6_4_RI_1 + P-poll__networl_6_4_RI_0 + P-poll__networl_3_1_RI_0 + P-poll__networl_3_1_RI_1 + P-poll__networl_3_1_RI_2 + P-poll__networl_3_1_RI_3 + P-poll__networl_3_1_RI_4 + P-poll__networl_3_1_RI_5 + P-poll__networl_3_1_RI_6 + P-poll__networl_3_1_RI_7 + P-poll__networl_6_4_AnnP_0 + P-poll__networl_6_4_AnnP_1 + P-poll__networl_6_4_AnnP_2 + P-poll__networl_6_4_AnnP_3 + P-poll__networl_6_4_AnnP_4 + P-poll__networl_6_4_AnnP_5 + P-poll__networl_6_4_AnnP_6 + P-poll__networl_6_4_AnnP_7 + P-poll__networl_0_4_AskP_0 + P-poll__networl_0_4_AskP_1 + P-poll__networl_0_4_AskP_2 + P-poll__networl_0_4_AskP_3 + P-poll__networl_0_4_AskP_4 + P-poll__networl_0_4_AskP_5 + P-poll__networl_0_4_AskP_6 + P-poll__networl_0_4_AskP_7 + P-poll__networl_1_2_RI_0 + P-poll__networl_1_2_RI_1 + P-poll__networl_1_2_RI_2 + P-poll__networl_1_2_RI_3 + P-poll__networl_1_2_RI_4 + P-poll__networl_1_2_RI_5 + P-poll__networl_1_2_RI_6 + P-poll__networl_1_2_RI_7 + P-poll__networl_6_5_AnsP_0 + P-poll__networl_1_1_AnnP_0 + P-poll__networl_1_1_AnnP_1 + P-poll__networl_1_1_AnnP_2 + P-poll__networl_1_1_AnnP_3 + P-poll__networl_1_1_AnnP_4 + P-poll__networl_1_1_AnnP_5 + P-poll__networl_1_1_AnnP_6 + P-poll__networl_1_1_AnnP_7 + P-poll__networl_7_6_AnsP_0 + P-poll__networl_0_0_AnnP_7 + P-poll__networl_7_1_AskP_0 + P-poll__networl_7_1_AskP_1 + P-poll__networl_7_1_AskP_2 + P-poll__networl_7_1_AskP_3 + P-poll__networl_7_1_AskP_4 + P-poll__networl_7_1_AskP_5 + P-poll__networl_7_1_AskP_6 + P-poll__networl_7_1_AskP_7 + P-poll__networl_0_0_AnnP_6 + P-poll__networl_0_0_AnnP_5 + P-poll__networl_0_0_AnnP_4 + P-poll__networl_2_3_AnsP_0 + P-poll__networl_0_0_AnnP_3 + P-poll__networl_0_0_AnnP_2 + P-poll__networl_0_0_AnnP_1 + P-poll__networl_0_0_AnnP_0 + P-poll__networl_1_5_AI_7 + P-poll__networl_1_5_AI_6 + P-poll__networl_1_5_AI_5 + P-poll__networl_1_5_AI_4 + P-poll__networl_1_5_AI_3 + P-poll__networl_1_5_AI_2 + P-poll__networl_1_5_AI_1 + P-poll__networl_1_5_AI_0 + P-poll__networl_5_3_AnnP_7 + P-poll__networl_5_3_AnnP_6 + P-poll__networl_5_3_AnnP_5 + P-poll__networl_5_3_AnnP_4 + P-poll__networl_5_3_AnnP_3 + P-poll__networl_4_0_RP_0 + P-poll__networl_4_0_RP_1 + P-poll__networl_4_0_RP_2 + P-poll__networl_4_0_RP_3 + P-poll__networl_4_0_RP_4 + P-poll__networl_4_0_RP_5 + P-poll__networl_4_0_RP_6 + P-poll__networl_4_0_RP_7 + P-poll__networl_5_3_AnnP_2 + P-poll__networl_5_3_AnnP_1 + P-poll__networl_2_1_RP_0 + P-poll__networl_2_1_RP_1 + P-poll__networl_2_1_RP_2 + P-poll__networl_2_1_RP_3 + P-poll__networl_2_1_RP_4 + P-poll__networl_2_1_RP_5 + P-poll__networl_2_1_RP_6 + P-poll__networl_2_1_RP_7 + P-poll__networl_5_3_AnnP_0 + P-poll__networl_3_4_AI_7 + P-poll__networl_3_4_AI_6 + P-poll__networl_3_4_AI_5 + P-poll__networl_3_4_AI_4 + P-poll__networl_3_4_AI_3 + P-poll__networl_3_4_AI_2 + P-poll__networl_3_4_AI_1 + P-poll__networl_4_5_AnnP_0 + P-poll__networl_4_5_AnnP_1 + P-poll__networl_4_5_AnnP_2 + P-poll__networl_4_5_AnnP_3 + P-poll__networl_4_5_AnnP_4 + P-poll__networl_4_5_AnnP_5 + P-poll__networl_4_5_AnnP_6 + P-poll__networl_4_5_AnnP_7 + P-poll__networl_3_4_AI_0 + P-poll__networl_0_2_RP_0 + P-poll__networl_0_2_RP_1 + P-poll__networl_0_2_RP_2 + P-poll__networl_0_2_RP_3 + P-poll__networl_0_2_RP_4 + P-poll__networl_0_2_RP_5 + P-poll__networl_0_2_RP_6 + P-poll__networl_0_2_RP_7 + P-poll__networl_4_7_RP_7 + P-poll__networl_4_7_RP_6 + P-poll__networl_4_7_RP_5 + P-poll__networl_5_7_AnsP_0 + P-poll__networl_4_7_RP_4 + P-poll__networl_4_7_RP_3 + P-poll__networl_4_7_RP_2 + P-poll__networl_4_7_RP_1 + P-poll__networl_4_7_RP_0 + P-poll__networl_5_3_AI_7 + P-poll__networl_5_3_AI_6 + P-poll__networl_5_3_AI_5 + P-poll__networl_5_3_AI_4 + P-poll__networl_5_2_AskP_0 + P-poll__networl_5_2_AskP_1 + P-poll__networl_5_2_AskP_2 + P-poll__networl_5_2_AskP_3 + P-poll__networl_5_2_AskP_4 + P-poll__networl_5_2_AskP_5 + P-poll__networl_5_2_AskP_6 + P-poll__networl_5_2_AskP_7 + P-poll__networl_5_3_AI_3 + P-poll__networl_0_4_AnsP_0 + P-poll__networl_5_3_AI_2 + P-poll__networl_5_3_AI_1 + P-poll__networl_5_3_AI_0 + P-poll__networl_6_6_RP_7 + P-poll__networl_6_6_RP_6 + P-poll__networl_6_6_RP_5 + P-poll__networl_6_6_RP_4 + P-poll__networl_6_6_RP_3 + P-poll__networl_0_0_RI_0 + P-poll__networl_0_0_RI_1 + P-poll__networl_0_0_RI_2 + P-poll__networl_0_0_RI_3 + P-poll__networl_0_0_RI_4 + P-poll__networl_0_0_RI_5 + P-poll__networl_0_0_RI_6 + P-poll__networl_0_0_RI_7 + P-poll__networl_6_6_RP_2 + P-poll__networl_6_6_RP_1 + P-poll__networl_6_6_RP_0 + P-poll__networl_4_6_AskP_7 + P-poll__networl_7_1_AnsP_0 + P-poll__networl_4_6_AskP_6 + P-poll__networl_4_6_AskP_5 + P-poll__networl_4_6_AskP_4 + P-poll__networl_4_6_AskP_3 + P-poll__networl_4_6_AskP_2 + P-poll__networl_4_6_AskP_1 + P-poll__networl_4_6_AskP_0 + P-poll__networl_7_2_AI_7 + P-poll__networl_7_2_AI_6 + P-poll__networl_7_2_AI_5 + P-poll__networl_7_2_AI_4 + P-poll__networl_7_2_AI_3 + P-poll__networl_7_2_AI_2 + P-poll__networl_7_2_AI_1 + P-poll__networl_7_2_AI_0 + P-poll__networl_2_6_AnnP_0 + P-poll__networl_2_6_AnnP_1 + P-poll__networl_2_6_AnnP_2 + P-poll__networl_2_6_AnnP_3 + P-poll__networl_2_6_AnnP_4 + P-poll__networl_2_6_AnnP_5 + P-poll__networl_2_6_AnnP_6 + P-poll__networl_2_6_AnnP_7 + P-poll__networl_3_3_AskP_0 + P-poll__networl_3_3_AskP_1 + P-poll__networl_3_3_AskP_2 + P-poll__networl_3_3_AskP_3 + P-poll__networl_3_3_AskP_4 + P-poll__networl_3_3_AskP_5 + P-poll__networl_3_3_AskP_6 + P-poll__networl_3_3_AskP_7 + P-poll__networl_3_1_AnsP_0 + P-poll__networl_4_0_AnnP_0 + P-poll__networl_4_0_AnnP_1 + P-poll__networl_4_0_AnnP_2 + P-poll__networl_4_0_AnnP_3 + P-poll__networl_4_0_AnnP_4 + P-poll__networl_4_0_AnnP_5 + P-poll__networl_4_0_AnnP_6 + P-poll__networl_4_0_AnnP_7 + P-poll__networl_6_6_AI_0 + P-poll__networl_6_6_AI_1 + P-poll__networl_6_6_AI_2 + P-poll__networl_6_6_AI_3 + P-poll__networl_6_6_AI_4 + P-poll__networl_6_6_AI_5 + P-poll__networl_6_6_AI_6 + P-poll__networl_6_6_AI_7 + P-poll__networl_4_7_AI_0 + P-poll__networl_4_7_AI_1 + P-poll__networl_4_7_AI_2 + P-poll__networl_4_7_AI_3 + P-poll__networl_4_7_AI_4 + P-poll__networl_4_7_AI_5 + P-poll__networl_4_7_AI_6 + P-poll__networl_4_7_AI_7 + P-poll__networl_5_2_AnsP_0 + P-poll__networl_0_7_AnnP_0 + P-poll__networl_0_7_AnnP_1 + P-poll__networl_0_7_AnnP_2 + P-poll__networl_0_7_AnnP_3 + P-poll__networl_0_7_AnnP_4 + P-poll__networl_0_7_AnnP_5 + P-poll__networl_0_7_AnnP_6 + P-poll__networl_0_7_AnnP_7 + P-poll__networl_6_7_AskP_0 + P-poll__networl_6_7_AskP_1 + P-poll__networl_6_7_AskP_2 + P-poll__networl_6_7_AskP_3 + P-poll__networl_6_7_AskP_4 + P-poll__networl_6_7_AskP_5 + P-poll__networl_6_7_AskP_6 + P-poll__networl_6_7_AskP_7 + P-poll__networl_7_7_RI_0 + P-poll__networl_7_7_RI_1 + P-poll__networl_7_7_RI_2 + P-poll__networl_7_7_RI_3 + P-poll__networl_7_7_RI_4 + P-poll__networl_7_7_RI_5 + P-poll__networl_7_7_RI_6 + P-poll__networl_7_7_RI_7 + P-poll__networl_7_4_AnnP_0 + P-poll__networl_7_4_AnnP_1 + P-poll__networl_7_4_AnnP_2 + P-poll__networl_7_4_AnnP_3 + P-poll__networl_7_4_AnnP_4 + P-poll__networl_7_4_AnnP_5 + P-poll__networl_7_4_AnnP_6 + P-poll__networl_7_4_AnnP_7 + P-poll__networl_1_4_AskP_0 + P-poll__networl_1_4_AskP_1 + P-poll__networl_1_4_AskP_2 + P-poll__networl_1_4_AskP_3 + P-poll__networl_1_4_AskP_4 + P-poll__networl_1_4_AskP_5 + P-poll__networl_1_4_AskP_6 + P-poll__networl_1_4_AskP_7 + P-poll__networl_2_1_AnnP_0 + P-poll__networl_2_1_AnnP_1 + P-poll__networl_2_1_AnnP_2 + P-poll__networl_2_1_AnnP_3 + P-poll__networl_2_1_AnnP_4 + P-poll__networl_2_1_AnnP_5 + P-poll__networl_2_1_AnnP_6 + P-poll__networl_2_1_AnnP_7 + P-poll__networl_3_3_AnsP_0 + P-poll__networl_7_3_AI_0 + P-poll__networl_7_3_AI_1 + P-poll__networl_7_3_AI_2 + P-poll__networl_7_3_AI_3 + P-poll__networl_7_3_AI_4 + P-poll__networl_7_3_AI_5 + P-poll__networl_7_3_AI_6 + P-poll__networl_7_3_AI_7 + P-poll__networl_6_7_RP_0 + P-poll__networl_6_7_RP_1 + P-poll__networl_6_7_RP_2 + P-poll__networl_6_7_RP_3 + P-poll__networl_6_7_RP_4 + P-poll__networl_6_7_RP_5 + P-poll__networl_6_7_RP_6 + P-poll__networl_6_7_RP_7 + P-poll__networl_5_4_AI_0 + P-poll__networl_5_4_AI_1 + P-poll__networl_5_4_AI_2 + P-poll__networl_5_4_AI_3 + P-poll__networl_5_4_AI_4 + P-poll__networl_5_4_AI_5 + P-poll__networl_5_4_AI_6 + P-poll__networl_5_4_AI_7 + P-poll__networl_1_2_AskP_7 + P-poll__networl_1_2_AskP_6 + P-poll__networl_5_5_AnnP_0 + P-poll__networl_5_5_AnnP_1 + P-poll__networl_5_5_AnnP_2 + P-poll__networl_5_5_AnnP_3 + P-poll__networl_5_5_AnnP_4 + P-poll__networl_5_5_AnnP_5 + P-poll__networl_5_5_AnnP_6 + P-poll__networl_5_5_AnnP_7 + P-poll__networl_3_5_AI_0 + P-poll__networl_3_5_AI_1 + P-poll__networl_3_5_AI_2 + P-poll__networl_3_5_AI_3 + P-poll__networl_3_5_AI_4 + P-poll__networl_3_5_AI_5 + P-poll__networl_3_5_AI_6 + P-poll__networl_3_5_AI_7 + P-poll__networl_1_2_AskP_5 + P-poll__networl_1_2_AskP_4 + P-poll__networl_1_2_AskP_3 + P-poll__networl_1_2_AskP_2 + P-poll__networl_1_2_AskP_1 + P-poll__networl_1_2_AskP_0 + P-poll__networl_7_2_AnnP_7 + P-poll__networl_7_2_AnnP_6 + P-poll__networl_1_6_AI_0 + P-poll__networl_1_6_AI_1 + P-poll__networl_1_6_AI_2 + P-poll__networl_1_6_AI_3 + P-poll__networl_1_6_AI_4 + P-poll__networl_1_6_AI_5 + P-poll__networl_1_6_AI_6 + P-poll__networl_1_6_AI_7 + P-poll__networl_7_2_AnnP_5 + P-poll__networl_7_2_AnnP_4 + P-poll__networl_7_2_AnnP_3 + P-poll__networl_0_2_AnnP_0 + P-poll__networl_0_2_AnnP_1 + P-poll__networl_0_2_AnnP_2 + P-poll__networl_0_2_AnnP_3 + P-poll__networl_0_2_AnnP_4 + P-poll__networl_0_2_AnnP_5 + P-poll__networl_0_2_AnnP_6 + P-poll__networl_0_2_AnnP_7 + P-poll__networl_6_7_AnsP_0 + P-poll__networl_7_2_AnnP_2 + P-poll__networl_7_2_AnnP_1 + P-poll__networl_7_2_AnnP_0 + P-poll__networl_6_5_RI_0 + P-poll__networl_6_5_RI_1 + P-poll__networl_6_5_RI_2 + P-poll__networl_6_5_RI_3 + P-poll__networl_6_5_RI_4 + P-poll__networl_6_5_RI_5 + P-poll__networl_6_5_RI_6 + P-poll__networl_6_5_RI_7 + P-poll__networl_6_2_AskP_0 + P-poll__networl_6_2_AskP_1 + P-poll__networl_6_2_AskP_2 + P-poll__networl_6_2_AskP_3 + P-poll__networl_6_2_AskP_4 + P-poll__networl_6_2_AskP_5 + P-poll__networl_6_2_AskP_6 + P-poll__networl_6_2_AskP_7 + P-poll__networl_4_6_RI_0 + P-poll__networl_4_6_RI_1 + P-poll__networl_4_6_RI_2 + P-poll__networl_4_6_RI_3 + P-poll__networl_4_6_RI_4 + P-poll__networl_4_6_RI_5 + P-poll__networl_4_6_RI_6 + P-poll__networl_4_6_RI_7 + P-poll__networl_1_4_AnsP_0 + P-poll__networl_5_7_RI_7 + P-poll__networl_5_7_RI_6 + P-poll__networl_5_7_RI_5 + P-poll__networl_5_7_RI_4 + P-poll__networl_2_7_RI_0 + P-poll__networl_2_7_RI_1 + P-poll__networl_2_7_RI_2 + P-poll__networl_2_7_RI_3 + P-poll__networl_2_7_RI_4 + P-poll__networl_2_7_RI_5 + P-poll__networl_2_7_RI_6 + P-poll__networl_2_7_RI_7 + P-poll__networl_5_7_RI_3 + P-poll__networl_5_7_RI_2 + P-poll__networl_5_7_RI_1 + P-poll__networl_5_7_RI_0 + P-poll__networl_3_6_AnnP_0 + P-poll__networl_3_6_AnnP_1 + P-poll__networl_3_6_AnnP_2 + P-poll__networl_3_6_AnnP_3 + P-poll__networl_3_6_AnnP_4 + P-poll__networl_3_6_AnnP_5 + P-poll__networl_3_6_AnnP_6 + P-poll__networl_3_6_AnnP_7 + P-poll__networl_7_4_RP_0 + P-poll__networl_7_4_RP_1 + P-poll__networl_7_4_RP_2 + P-poll__networl_7_4_RP_3 + P-poll__networl_7_4_RP_4 + P-poll__networl_7_4_RP_5 + P-poll__networl_7_4_RP_6 + P-poll__networl_7_4_RP_7 + P-poll__networl_6_1_AI_0 + P-poll__networl_6_1_AI_1 + P-poll__networl_6_1_AI_2 + P-poll__networl_6_1_AI_3 + P-poll__networl_6_1_AI_4 + P-poll__networl_6_1_AI_5 + P-poll__networl_6_1_AI_6 + P-poll__networl_6_1_AI_7 + P-poll__networl_1_7_AnsP_0 + P-poll__networl_7_6_RI_7 + P-poll__networl_7_6_RI_6 + P-poll__networl_7_6_RI_5 + P-poll__networl_7_6_RI_4 + P-poll__networl_7_6_RI_3 + P-poll__networl_5_5_RP_0 + P-poll__networl_5_5_RP_1 + P-poll__networl_5_5_RP_2 + P-poll__networl_5_5_RP_3 + P-poll__networl_5_5_RP_4 + P-poll__networl_5_5_RP_5 + P-poll__networl_5_5_RP_6 + P-poll__networl_5_5_RP_7 + P-poll__networl_4_2_AI_0 + P-poll__networl_4_2_AI_1 + P-poll__networl_4_2_AI_2 + P-poll__networl_4_2_AI_3 + P-poll__networl_4_2_AI_4 + P-poll__networl_4_2_AI_5 + P-poll__networl_4_2_AI_6 + P-poll__networl_4_2_AI_7 + P-poll__networl_4_3_AskP_0 + P-poll__networl_4_3_AskP_1 + P-poll__networl_4_3_AskP_2 + P-poll__networl_4_3_AskP_3 + P-poll__networl_4_3_AskP_4 + P-poll__networl_4_3_AskP_5 + P-poll__networl_4_3_AskP_6 + P-poll__networl_4_3_AskP_7 + P-poll__networl_7_6_RI_2 + P-poll__networl_3_6_RP_0 + P-poll__networl_3_6_RP_1 + P-poll__networl_3_6_RP_2 + P-poll__networl_3_6_RP_3 + P-poll__networl_3_6_RP_4 + P-poll__networl_3_6_RP_5 + P-poll__networl_3_6_RP_6 + P-poll__networl_3_6_RP_7 + P-poll__networl_2_3_AI_0 + P-poll__networl_2_3_AI_1 + P-poll__networl_2_3_AI_2 + P-poll__networl_2_3_AI_3 + P-poll__networl_2_3_AI_4 + P-poll__networl_2_3_AI_5 + P-poll__networl_2_3_AI_6 + P-poll__networl_2_3_AI_7 + P-poll__networl_1_7_RP_0 + P-poll__networl_1_7_RP_1 + P-poll__networl_1_7_RP_2 + P-poll__networl_1_7_RP_3 + P-poll__networl_1_7_RP_4 + P-poll__networl_1_7_RP_5 + P-poll__networl_1_7_RP_6 + P-poll__networl_1_7_RP_7 + P-poll__networl_0_4_AI_0 + P-poll__networl_0_4_AI_1 + P-poll__networl_0_4_AI_2 + P-poll__networl_0_4_AI_3 + P-poll__networl_0_4_AI_4 + P-poll__networl_0_4_AI_5 + P-poll__networl_0_4_AI_6 + P-poll__networl_0_4_AI_7 + P-poll__networl_7_6_RI_1 + P-poll__networl_7_6_RI_0 + P-poll__networl_5_0_AnnP_0 + P-poll__networl_5_0_AnnP_1 + P-poll__networl_5_0_AnnP_2 + P-poll__networl_5_0_AnnP_3 + P-poll__networl_5_0_AnnP_4 + P-poll__networl_5_0_AnnP_5 + P-poll__networl_5_0_AnnP_6 + P-poll__networl_5_0_AnnP_7 + P-poll__networl_7_2_RI_0 + P-poll__networl_7_2_RI_1 + P-poll__networl_7_2_RI_2 + P-poll__networl_7_2_RI_3 + P-poll__networl_7_2_RI_4 + P-poll__networl_7_2_RI_5 + P-poll__networl_7_2_RI_6 + P-poll__networl_7_2_RI_7 + P-poll__networl_6_5_AskP_7 + P-poll__networl_5_3_RI_0 + P-poll__networl_5_3_RI_1 + P-poll__networl_5_3_RI_2 + P-poll__networl_5_3_RI_3 + P-poll__networl_5_3_RI_4 + P-poll__networl_5_3_RI_5 + P-poll__networl_5_3_RI_6 + P-poll__networl_5_3_RI_7 + P-poll__networl_6_5_AskP_6 + P-poll__networl_6_2_AnsP_0 + P-poll__networl_6_5_AskP_5 + P-poll__networl_6_5_AskP_4 + P-poll__networl_6_5_AskP_3 + P-poll__networl_6_5_AskP_2 + P-poll__networl_6_5_AskP_1 + P-poll__networl_6_5_AskP_0 + P-poll__networl_0_5_AnnP_7 + P-poll__networl_1_7_AnnP_0 + P-poll__networl_1_7_AnnP_1 + P-poll__networl_1_7_AnnP_2 + P-poll__networl_1_7_AnnP_3 + P-poll__networl_1_7_AnnP_4 + P-poll__networl_1_7_AnnP_5 + P-poll__networl_1_7_AnnP_6 + P-poll__networl_1_7_AnnP_7 + P-poll__networl_3_4_RI_0 + P-poll__networl_3_4_RI_1 + P-poll__networl_3_4_RI_2 + P-poll__networl_3_4_RI_3 + P-poll__networl_3_4_RI_4 + P-poll__networl_3_4_RI_5 + P-poll__networl_3_4_RI_6 + P-poll__networl_3_4_RI_7 + P-poll__networl_0_5_AnnP_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_5_RI_7 + P-poll__networl_0_5_AnnP_5 + P-poll__networl_7_7_AskP_0 + P-poll__networl_7_7_AskP_1 + P-poll__networl_7_7_AskP_2 + P-poll__networl_7_7_AskP_3 + P-poll__networl_7_7_AskP_4 + P-poll__networl_7_7_AskP_5 + P-poll__networl_7_7_AskP_6 + P-poll__networl_7_7_AskP_7 + P-poll__networl_0_5_AnnP_4 + P-poll__networl_0_5_AnnP_3 + P-poll__networl_0_5_AnnP_2 + P-poll__networl_0_5_AnnP_1 + P-poll__networl_0_5_AnnP_0 + P-poll__networl_5_0_AnsP_0 + P-poll__networl_2_7_AI_7 + P-poll__networl_2_4_AskP_0 + P-poll__networl_2_4_AskP_1 + P-poll__networl_2_4_AskP_2 + P-poll__networl_2_4_AskP_3 + P-poll__networl_2_4_AskP_4 + P-poll__networl_2_4_AskP_5 + P-poll__networl_2_4_AskP_6 + P-poll__networl_2_4_AskP_7 + P-poll__networl_2_7_AI_6 + P-poll__networl_2_7_AI_5 + P-poll__networl_2_7_AI_4 + P-poll__networl_2_7_AI_3 + P-poll__networl_2_7_AI_2 + P-poll__networl_2_7_AI_1 + P-poll__networl_2_7_AI_0 + P-poll__networl_3_1_AnnP_0 + P-poll__networl_3_1_AnnP_1 + P-poll__networl_3_1_AnnP_2 + P-poll__networl_3_1_AnnP_3 + P-poll__networl_3_1_AnnP_4 + P-poll__networl_3_1_AnnP_5 + P-poll__networl_3_1_AnnP_6 + P-poll__networl_3_1_AnnP_7 + P-poll__networl_6_2_RP_0 + P-poll__networl_6_2_RP_1 + P-poll__networl_6_2_RP_2 + P-poll__networl_6_2_RP_3 + P-poll__networl_6_2_RP_4 + P-poll__networl_6_2_RP_5 + P-poll__networl_6_2_RP_6 + P-poll__networl_6_2_RP_7 + P-poll__networl_4_3_RP_0 + P-poll__networl_4_3_RP_1 + P-poll__networl_4_3_RP_2 + P-poll__networl_4_3_RP_3 + P-poll__networl_4_3_RP_4 + P-poll__networl_4_3_RP_5 + P-poll__networl_4_3_RP_6 + P-poll__networl_4_3_RP_7 + P-poll__networl_3_0_AI_0 + P-poll__networl_3_0_AI_1 + P-poll__networl_3_0_AI_2 + P-poll__networl_3_0_AI_3 + P-poll__networl_3_0_AI_4 + P-poll__networl_3_0_AI_5 + P-poll__networl_3_0_AI_6 + P-poll__networl_3_0_AI_7 + P-poll__networl_4_3_AnsP_0 + P-poll__networl_4_6_AI_7 + P-poll__networl_4_6_AI_6 + P-poll__networl_2_4_RP_0 + P-poll__networl_2_4_RP_1 + P-poll__networl_2_4_RP_2 + P-poll__networl_2_4_RP_3 + P-poll__networl_2_4_RP_4 + P-poll__networl_2_4_RP_5 + P-poll__networl_2_4_RP_6 + P-poll__networl_2_4_RP_7 + P-poll__networl_1_1_AI_0 + P-poll__networl_1_1_AI_1 + P-poll__networl_1_1_AI_2 + P-poll__networl_1_1_AI_3 + P-poll__networl_1_1_AI_4 + P-poll__networl_1_1_AI_5 + P-poll__networl_1_1_AI_6 + P-poll__networl_1_1_AI_7 + P-poll__networl_0_5_RP_0 + P-poll__networl_0_5_RP_1 + P-poll__networl_0_5_RP_2 + P-poll__networl_0_5_RP_3 + P-poll__networl_0_5_RP_4 + P-poll__networl_0_5_RP_5 + P-poll__networl_0_5_RP_6 + P-poll__networl_0_5_RP_7 + P-poll__networl_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_6_0_RI_0 + P-poll__networl_6_0_RI_1 + P-poll__networl_6_0_RI_2 + P-poll__networl_6_0_RI_3 + P-poll__networl_6_0_RI_4 + P-poll__networl_6_0_RI_5 + P-poll__networl_6_0_RI_6 + P-poll__networl_6_0_RI_7 + P-poll__networl_4_6_AI_1 + P-poll__networl_4_6_AI_0 + P-poll__networl_6_5_AI_7 + P-poll__networl_6_5_AI_6 + P-poll__networl_6_5_AI_5 + P-poll__networl_6_5_AI_4 + P-poll__networl_6_5_AI_3 + P-poll__networl_6_5_AI_2 + P-poll__networl_6_5_AI_1 + P-poll__networl_4_1_RI_0 + P-poll__networl_4_1_RI_1 + P-poll__networl_4_1_RI_2 + P-poll__networl_4_1_RI_3 + P-poll__networl_4_1_RI_4 + P-poll__networl_4_1_RI_5 + P-poll__networl_4_1_RI_6 + P-poll__networl_4_1_RI_7 + P-poll__networl_6_5_AnnP_0 + P-poll__networl_6_5_AnnP_1 + P-poll__networl_6_5_AnnP_2 + P-poll__networl_6_5_AnnP_3 + P-poll__networl_6_5_AnnP_4 + P-poll__networl_6_5_AnnP_5 + P-poll__networl_6_5_AnnP_6 + P-poll__networl_6_5_AnnP_7 + P-poll__networl_0_5_AskP_0 + P-poll__networl_0_5_AskP_1 + P-poll__networl_0_5_AskP_2 + P-poll__networl_0_5_AskP_3 + P-poll__networl_0_5_AskP_4 + P-poll__networl_0_5_AskP_5 + P-poll__networl_0_5_AskP_6 + P-poll__networl_0_5_AskP_7 + P-poll__networl_2_2_RI_0 + P-poll__networl_2_2_RI_1 + P-poll__networl_2_2_RI_2 + P-poll__networl_2_2_RI_3 + P-poll__networl_2_2_RI_4 + P-poll__networl_2_2_RI_5 + P-poll__networl_2_2_RI_6 + P-poll__networl_2_2_RI_7 + P-poll__networl_0_3_RI_0 + P-poll__networl_0_3_RI_1 + P-poll__networl_0_3_RI_2 + P-poll__networl_0_3_RI_3 + P-poll__networl_0_3_RI_4 + P-poll__networl_0_3_RI_5 + P-poll__networl_0_3_RI_6 + P-poll__networl_0_3_RI_7 + P-poll__networl_1_2_AnnP_0 + P-poll__networl_1_2_AnnP_1 + P-poll__networl_1_2_AnnP_2 + P-poll__networl_1_2_AnnP_3 + P-poll__networl_1_2_AnnP_4 + P-poll__networl_1_2_AnnP_5 + P-poll__networl_1_2_AnnP_6 + P-poll__networl_1_2_AnnP_7 + P-poll__networl_7_7_AnsP_0 + P-poll__networl_6_5_AI_0 + P-poll__networl_7_2_AskP_0 + P-poll__networl_7_2_AskP_1 + P-poll__networl_7_2_AskP_2 + P-poll__networl_7_2_AskP_3 + P-poll__networl_7_2_AskP_4 + P-poll__networl_7_2_AskP_5 + P-poll__networl_7_2_AskP_6 + P-poll__networl_7_2_AskP_7 + P-poll__networl_2_4_AnsP_0 + P-poll__networl_3_1_AskP_7 + P-poll__networl_3_1_AskP_6 + P-poll__networl_3_1_AskP_5 + P-poll__networl_3_1_AskP_4 + P-poll__networl_3_1_AskP_3 + P-poll__networl_3_1_AskP_2 + P-poll__networl_3_1_AskP_1 + P-poll__networl_3_1_AskP_0 + P-poll__networl_5_0_RP_0 + P-poll__networl_5_0_RP_1 + P-poll__networl_5_0_RP_2 + P-poll__networl_5_0_RP_3 + P-poll__networl_5_0_RP_4 + P-poll__networl_5_0_RP_5 + P-poll__networl_5_0_RP_6 + P-poll__networl_5_0_RP_7 + P-poll__networl_3_1_RP_0 + P-poll__networl_3_1_RP_1 + P-poll__networl_3_1_RP_2 + P-poll__networl_3_1_RP_3 + P-poll__networl_3_1_RP_4 + P-poll__networl_3_1_RP_5 + P-poll__networl_3_1_RP_6 + P-poll__networl_3_1_RP_7 + P-poll__networl_4_6_AnnP_0 + P-poll__networl_4_6_AnnP_1 + P-poll__networl_4_6_AnnP_2 + P-poll__networl_4_6_AnnP_3 + P-poll__networl_4_6_AnnP_4 + P-poll__networl_4_6_AnnP_5 + P-poll__networl_4_6_AnnP_6 + P-poll__networl_4_6_AnnP_7 + P-poll__networl_1_2_RP_0 + P-poll__networl_1_2_RP_1 + P-poll__networl_1_2_RP_2 + P-poll__networl_1_2_RP_3 + P-poll__networl_1_2_RP_4 + P-poll__networl_1_2_RP_5 + P-poll__networl_1_2_RP_6 + P-poll__networl_1_2_RP_7 + P-poll__networl_5_3_AskP_0 + P-poll__networl_5_3_AskP_1 + P-poll__networl_5_3_AskP_2 + P-poll__networl_5_3_AskP_3 + P-poll__networl_5_3_AskP_4 + P-poll__networl_5_3_AskP_5 + P-poll__networl_5_3_AskP_6 + P-poll__networl_5_3_AskP_7 + P-poll__networl_0_5_AnsP_0 + P-poll__networl_3_6_AnsP_0 + P-poll__networl_1_0_RI_0 + P-poll__networl_1_0_RI_1 + P-poll__networl_1_0_RI_2 + P-poll__networl_1_0_RI_3 + P-poll__networl_1_0_RI_4 + P-poll__networl_1_0_RI_5 + P-poll__networl_1_0_RI_6 + P-poll__networl_1_0_RI_7 + P-poll__networl_2_4_AnnP_7 + P-poll__networl_2_4_AnnP_6 + P-poll__networl_2_4_AnnP_5 + P-poll__networl_2_4_AnnP_4 + P-poll__networl_2_4_AnnP_3 + P-poll__networl_2_4_AnnP_2 + P-poll__networl_6_0_AnnP_0 + P-poll__networl_6_0_AnnP_1 + P-poll__networl_6_0_AnnP_2 + P-poll__networl_6_0_AnnP_3 + P-poll__networl_6_0_AnnP_4 + P-poll__networl_6_0_AnnP_5 + P-poll__networl_6_0_AnnP_6 + P-poll__networl_6_0_AnnP_7 + P-poll__networl_0_0_AskP_0 + P-poll__networl_0_0_AskP_1 + P-poll__networl_0_0_AskP_2 + P-poll__networl_0_0_AskP_3 + P-poll__networl_0_0_AskP_4 + P-poll__networl_0_0_AskP_5 + P-poll__networl_0_0_AskP_6 + P-poll__networl_0_0_AskP_7 + P-poll__networl_2_4_AnnP_1 + P-poll__networl_2_4_AnnP_0 + P-poll__networl_7_2_AnsP_0 + P-poll__networl_2_7_AnnP_0 + P-poll__networl_2_7_AnnP_1 + P-poll__networl_2_7_AnnP_2 + P-poll__networl_2_7_AnnP_3 + P-poll__networl_2_7_AnnP_4 + P-poll__networl_2_7_AnnP_5 + P-poll__networl_2_7_AnnP_6 + P-poll__networl_2_7_AnnP_7 + P-poll__networl_3_4_AskP_0 + P-poll__networl_3_4_AskP_1 + P-poll__networl_3_4_AskP_2 + P-poll__networl_3_4_AskP_3 + P-poll__networl_3_4_AskP_4 + P-poll__networl_3_4_AskP_5 + P-poll__networl_3_4_AskP_6 + P-poll__networl_3_4_AskP_7 + P-poll__networl_0_0_RP_0 + P-poll__networl_0_0_RP_1 + P-poll__networl_0_0_RP_2 + P-poll__networl_0_0_RP_3 + P-poll__networl_0_0_RP_4 + P-poll__networl_0_0_RP_5 + P-poll__networl_0_0_RP_6 + P-poll__networl_0_0_RP_7 + P-poll__networl_4_1_AnnP_0 + P-poll__networl_4_1_AnnP_1 + P-poll__networl_4_1_AnnP_2 + P-poll__networl_4_1_AnnP_3 + P-poll__networl_4_1_AnnP_4 + P-poll__networl_4_1_AnnP_5 + P-poll__networl_4_1_AnnP_6 + P-poll__networl_4_1_AnnP_7 + P-poll__networl_1_7_AskP_7 + P-poll__networl_1_7_AskP_6 + P-poll__networl_1_7_AskP_5 + P-poll__networl_7_6_AI_0 + P-poll__networl_7_6_AI_1 + P-poll__networl_7_6_AI_2 + P-poll__networl_7_6_AI_3 + P-poll__networl_7_6_AI_4 + P-poll__networl_7_6_AI_5 + P-poll__networl_7_6_AI_6 + P-poll__networl_7_6_AI_7 + P-poll__networl_1_7_AskP_4 + P-poll__networl_1_7_AskP_3 + P-poll__networl_5_7_AI_0 + P-poll__networl_5_7_AI_1 + P-poll__networl_5_7_AI_2 + P-poll__networl_5_7_AI_3 + P-poll__networl_5_7_AI_4 + P-poll__networl_5_7_AI_5 + P-poll__networl_5_7_AI_6 + P-poll__networl_5_7_AI_7 + P-poll__networl_5_3_AnsP_0 + P-poll__networl_1_7_AskP_2 + P-poll__networl_1_7_AskP_1 + P-poll__networl_1_7_AskP_0 + P-poll__networl_7_7_AnnP_7 + P-poll__networl_7_7_AnnP_6 + P-poll__networl_7_7_AnnP_5 + P-poll__networl_7_7_AnnP_4 + P-poll__networl_7_7_AnnP_3 + P-poll__networl_0_0_AnsP_0 + P-poll__networl_7_7_AnnP_2 + P-poll__networl_7_7_AnnP_1 + P-poll__networl_7_7_AnnP_0 + P-poll__networl_0_2_AnsP_0 + P-poll__networl_7_5_AnnP_0 + P-poll__networl_7_5_AnnP_1 + P-poll__networl_7_5_AnnP_2 + P-poll__networl_7_5_AnnP_3 + P-poll__networl_7_5_AnnP_4 + P-poll__networl_7_5_AnnP_5 + P-poll__networl_7_5_AnnP_6 + P-poll__networl_7_5_AnnP_7 + P-poll__networl_1_5_AskP_0 + P-poll__networl_1_5_AskP_1 + P-poll__networl_1_5_AskP_2 + P-poll__networl_1_5_AskP_3 + P-poll__networl_1_5_AskP_4 + P-poll__networl_1_5_AskP_5 + P-poll__networl_1_5_AskP_6 + P-poll__networl_1_5_AskP_7 + P-poll__networl_5_0_AskP_7 + P-poll__networl_5_0_AskP_6 + P-poll__networl_5_0_AskP_5 + P-poll__networl_5_0_AskP_4 + P-poll__networl_5_0_AskP_3 + P-poll__networl_5_0_AskP_2 + P-poll__networl_5_0_AskP_1 + P-poll__networl_2_2_AnnP_0 + P-poll__networl_2_2_AnnP_1 + P-poll__networl_2_2_AnnP_2 + P-poll__networl_2_2_AnnP_3 + P-poll__networl_2_2_AnnP_4 + P-poll__networl_2_2_AnnP_5 + P-poll__networl_2_2_AnnP_6 + P-poll__networl_2_2_AnnP_7 + P-poll__networl_5_0_AskP_0 + P-poll__networl_5_5_AnsP_0 + P-poll__networl_7_7_AI_7 + P-poll__networl_3_4_AnsP_0 + P-poll__networl_7_7_AI_6 + P-poll__networl_7_7_AI_5 + P-poll__networl_7_7_AI_4 + P-poll__networl_7_7_AI_3 + P-poll__networl_7_7_AI_2 + P-poll__networl_7_7_AI_1 + P-poll__networl_7_7_AI_0 + P-poll__networl_7_7_RP_0 + P-poll__networl_7_7_RP_1 + P-poll__networl_7_7_RP_2 + P-poll__networl_7_7_RP_3 + P-poll__networl_7_7_RP_4 + P-poll__networl_7_7_RP_5 + P-poll__networl_7_7_RP_6 + P-poll__networl_7_7_RP_7 + P-poll__networl_6_4_AI_0 + P-poll__networl_6_4_AI_1 + P-poll__networl_6_4_AI_2 + P-poll__networl_6_4_AI_3 + P-poll__networl_6_4_AI_4 + P-poll__networl_6_4_AI_5 + P-poll__networl_6_4_AI_6 + P-poll__networl_6_4_AI_7 + P-poll__networl_5_6_AnnP_0 + P-poll__networl_5_6_AnnP_1 + P-poll__networl_5_6_AnnP_2 + P-poll__networl_5_6_AnnP_3 + P-poll__networl_5_6_AnnP_4 + P-poll__networl_5_6_AnnP_5 + P-poll__networl_5_6_AnnP_6 + P-poll__networl_5_6_AnnP_7 + P-poll__networl_4_5_AI_0 + P-poll__networl_4_5_AI_1 + P-poll__networl_4_5_AI_2 + P-poll__networl_4_5_AI_3 + P-poll__networl_4_5_AI_4 + P-poll__networl_4_5_AI_5 + P-poll__networl_4_5_AI_6 + P-poll__networl_4_5_AI_7 + P-poll__networl_2_6_AI_0 + P-poll__networl_2_6_AI_1 + P-poll__networl_2_6_AI_2 + P-poll__networl_2_6_AI_3 + P-poll__networl_2_6_AI_4 + P-poll__networl_2_6_AI_5 + P-poll__networl_2_6_AI_6 + P-poll__networl_2_6_AI_7 + P-poll__networl_0_7_AI_0 + P-poll__networl_0_7_AI_1 + P-poll__networl_0_7_AI_2 + P-poll__networl_0_7_AI_3 + P-poll__networl_0_7_AI_4 + P-poll__networl_0_7_AI_5 + P-poll__networl_0_7_AI_6 + P-poll__networl_0_7_AI_7 + P-poll__networl_0_3_AnnP_0 + P-poll__networl_0_3_AnnP_1 + P-poll__networl_0_3_AnnP_2 + P-poll__networl_0_3_AnnP_3 + P-poll__networl_0_3_AnnP_4 + P-poll__networl_0_3_AnnP_5 + P-poll__networl_0_3_AnnP_6 + P-poll__networl_0_3_AnnP_7 + P-poll__networl_7_5_RI_0 + P-poll__networl_7_5_RI_1 + P-poll__networl_7_5_RI_2 + P-poll__networl_7_5_RI_3 + P-poll__networl_7_5_RI_4 + P-poll__networl_7_5_RI_5 + P-poll__networl_7_5_RI_6 + P-poll__networl_7_5_RI_7 + P-poll__networl_6_3_AskP_0 + P-poll__networl_6_3_AskP_1 + P-poll__networl_6_3_AskP_2 + P-poll__networl_6_3_AskP_3 + P-poll__networl_6_3_AskP_4 + P-poll__networl_6_3_AskP_5 + P-poll__networl_6_3_AskP_6 + P-poll__networl_6_3_AskP_7 + P-poll__networl_5_6_RI_0 + P-poll__networl_5_6_RI_1 + P-poll__networl_5_6_RI_2 + P-poll__networl_5_6_RI_3 + P-poll__networl_5_6_RI_4 + P-poll__networl_5_6_RI_5 + P-poll__networl_5_6_RI_6 + P-poll__networl_5_6_RI_7 + P-poll__networl_1_5_AnsP_0 + P-poll__networl_4_3_AnnP_7 + P-poll__networl_4_3_AnnP_6 + P-poll__networl_4_3_AnnP_5 + P-poll__networl_4_3_AnnP_4 + P-poll__networl_4_3_AnnP_3 + P-poll__networl_3_7_RI_0 + P-poll__networl_3_7_RI_1 + P-poll__networl_3_7_RI_2 + P-poll__networl_3_7_RI_3 + P-poll__networl_3_7_RI_4 + P-poll__networl_3_7_RI_5 + P-poll__networl_3_7_RI_6 + P-poll__networl_3_7_RI_7 + P-poll__networl_4_3_AnnP_2 + P-poll__networl_4_3_AnnP_1 + P-poll__networl_7_0_AnnP_0 + P-poll__networl_7_0_AnnP_1 + P-poll__networl_7_0_AnnP_2 + P-poll__networl_7_0_AnnP_3 + P-poll__networl_7_0_AnnP_4 + P-poll__networl_7_0_AnnP_5 + P-poll__networl_7_0_AnnP_6 + P-poll__networl_7_0_AnnP_7 + P-poll__networl_1_0_AskP_0 + P-poll__networl_1_0_AskP_1 + P-poll__networl_1_0_AskP_2 + P-poll__networl_1_0_AskP_3 + P-poll__networl_1_0_AskP_4 + P-poll__networl_1_0_AskP_5 + P-poll__networl_1_0_AskP_6 + P-poll__networl_1_0_AskP_7 + P-poll__networl_4_3_AnnP_0 + P-poll__networl_0_1_RP_7 + P-poll__networl_0_1_RP_6 + P-poll__networl_0_1_RP_5 + P-poll__networl_0_1_RP_4 + P-poll__networl_0_1_RP_3 + P-poll__networl_0_1_RP_2 + P-poll__networl_0_1_RP_1 + P-poll__networl_0_1_RP_0 + P-poll__networl_3_7_AnnP_0 + P-poll__networl_3_7_AnnP_1 + P-poll__networl_3_7_AnnP_2 + P-poll__networl_3_7_AnnP_3 + P-poll__networl_3_7_AnnP_4 + P-poll__networl_3_7_AnnP_5 + P-poll__networl_3_7_AnnP_6 + P-poll__networl_3_7_AnnP_7 + P-poll__networl_7_1_AI_0 + P-poll__networl_7_1_AI_1 + P-poll__networl_7_1_AI_2 + P-poll__networl_7_1_AI_3 + P-poll__networl_7_1_AI_4 + P-poll__networl_7_1_AI_5 + P-poll__networl_7_1_AI_6 + P-poll__networl_7_1_AI_7 + P-poll__networl_6_5_RP_0 + P-poll__networl_6_5_RP_1 + P-poll__networl_6_5_RP_2 + P-poll__networl_6_5_RP_3 + P-poll__networl_6_5_RP_4 + P-poll__networl_6_5_RP_5 + P-poll__networl_6_5_RP_6 + P-poll__networl_6_5_RP_7 + P-poll__networl_5_2_AI_0 + P-poll__networl_5_2_AI_1 + P-poll__networl_5_2_AI_2 + P-poll__networl_5_2_AI_3 + P-poll__networl_5_2_AI_4 + P-poll__networl_5_2_AI_5 + P-poll__networl_5_2_AI_6 + P-poll__networl_5_2_AI_7 + P-poll__networl_4_4_AskP_0 + P-poll__networl_4_4_AskP_1 + P-poll__networl_4_4_AskP_2 + P-poll__networl_4_4_AskP_3 + P-poll__networl_4_4_AskP_4 + P-poll__networl_4_4_AskP_5 + P-poll__networl_4_4_AskP_6 + P-poll__networl_4_4_AskP_7 + P-poll__networl_4_6_RP_0 + P-poll__networl_4_6_RP_1 + P-poll__networl_4_6_RP_2 + P-poll__networl_4_6_RP_3 + P-poll__networl_4_6_RP_4 + P-poll__networl_4_6_RP_5 + P-poll__networl_4_6_RP_6 + P-poll__networl_4_6_RP_7 + P-poll__networl_3_3_AI_0 + P-poll__networl_3_3_AI_1 + P-poll__networl_3_3_AI_2 + 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_3_AI_7 + P-poll__networl_2_7_RP_0 + P-poll__networl_2_7_RP_1 + P-poll__networl_2_7_RP_2 + P-poll__networl_2_7_RP_3 + P-poll__networl_2_7_RP_4 + P-poll__networl_2_7_RP_5 + P-poll__networl_2_7_RP_6 + P-poll__networl_2_7_RP_7 + P-poll__networl_2_0_RP_7 + P-poll__networl_1_4_AI_0 + P-poll__networl_1_4_AI_1 + P-poll__networl_1_4_AI_2 + P-poll__networl_1_4_AI_3 + P-poll__networl_1_4_AI_4 + P-poll__networl_1_4_AI_5 + P-poll__networl_1_4_AI_6 + P-poll__networl_1_4_AI_7 + P-poll__networl_2_0_RP_6 + P-poll__networl_2_0_RP_5 + P-poll__networl_2_0_RP_4 + P-poll__networl_2_0_RP_3 + P-poll__networl_2_0_RP_2 + P-poll__networl_2_0_RP_1 + P-poll__networl_2_0_RP_0 + P-poll__networl_5_1_AnnP_0 + P-poll__networl_5_1_AnnP_1 + P-poll__networl_5_1_AnnP_2 + P-poll__networl_5_1_AnnP_3 + P-poll__networl_5_1_AnnP_4 + P-poll__networl_5_1_AnnP_5 + P-poll__networl_5_1_AnnP_6 + P-poll__networl_5_1_AnnP_7 + P-poll__networl_6_3_RI_0 + P-poll__networl_6_3_RI_1 + P-poll__networl_6_3_RI_2 + P-poll__networl_6_3_RI_3 + P-poll__networl_6_3_RI_4 + P-poll__networl_6_3_RI_5 + P-poll__networl_6_3_RI_6 + P-poll__networl_6_3_RI_7 + P-poll__networl_6_3_AnsP_0 + P-poll__networl_3_6_AskP_7 + P-poll__networl_3_6_AskP_6 + P-poll__networl_3_6_AskP_5 + P-poll__networl_3_6_AskP_4 + P-poll__networl_3_6_AskP_3 + P-poll__networl_4_4_RI_0 + P-poll__networl_4_4_RI_1 + P-poll__networl_4_4_RI_2 + P-poll__networl_4_4_RI_3 + P-poll__networl_4_4_RI_4 + P-poll__networl_4_4_RI_5 + P-poll__networl_4_4_RI_6 + P-poll__networl_4_4_RI_7 + P-poll__networl_3_6_AskP_2 + P-poll__networl_3_6_AskP_1 + P-poll__networl_2_5_RI_0 + P-poll__networl_2_5_RI_1 + P-poll__networl_2_5_RI_2 + P-poll__networl_2_5_RI_3 + P-poll__networl_2_5_RI_4 + P-poll__networl_2_5_RI_5 + P-poll__networl_2_5_RI_6 + P-poll__networl_2_5_RI_7 + P-poll__networl_3_6_AskP_0 + P-poll__networl_0_6_RI_0 + P-poll__networl_0_6_RI_1 + P-poll__networl_0_6_RI_2 + P-poll__networl_0_6_RI_3 + P-poll__networl_0_6_RI_4 + P-poll__networl_0_6_RI_5 + P-poll__networl_0_6_RI_6 + P-poll__networl_0_6_RI_7 + P-poll__networl_1_0_AnsP_0 + P-poll__networl_2_1_AnsP_0 + P-poll__networl_2_5_AskP_0 + P-poll__networl_2_5_AskP_1 + P-poll__networl_2_5_AskP_2 + P-poll__networl_2_5_AskP_3 + P-poll__networl_2_5_AskP_4 + P-poll__networl_2_5_AskP_5 + P-poll__networl_2_5_AskP_6 + P-poll__networl_2_5_AskP_7 + P-poll__networl_3_2_AnnP_0 + P-poll__networl_3_2_AnnP_1 + P-poll__networl_3_2_AnnP_2 + P-poll__networl_3_2_AnnP_3 + P-poll__networl_3_2_AnnP_4 + P-poll__networl_3_2_AnnP_5 + P-poll__networl_3_2_AnnP_6 + P-poll__networl_3_2_AnnP_7 + P-poll__networl_7_2_RP_0 + P-poll__networl_7_2_RP_1 + P-poll__networl_7_2_RP_2 + P-poll__networl_7_2_RP_3 + P-poll__networl_7_2_RP_4 + P-poll__networl_7_2_RP_5 + P-poll__networl_7_2_RP_6 + P-poll__networl_7_2_RP_7 + P-poll__networl_5_3_RP_0 + P-poll__networl_5_3_RP_1 + P-poll__networl_5_3_RP_2 + P-poll__networl_5_3_RP_3 + P-poll__networl_5_3_RP_4 + P-poll__networl_5_3_RP_5 + P-poll__networl_5_3_RP_6 + P-poll__networl_5_3_RP_7 + P-poll__networl_4_0_AI_0 + P-poll__networl_4_0_AI_1 + P-poll__networl_4_0_AI_2 + P-poll__networl_4_0_AI_3 + P-poll__networl_4_0_AI_4 + P-poll__networl_4_0_AI_5 + P-poll__networl_4_0_AI_6 + P-poll__networl_4_0_AI_7 + P-poll__networl_4_4_AnsP_0 + P-poll__networl_3_4_RP_0 + P-poll__networl_3_4_RP_1 + P-poll__networl_3_4_RP_2 + P-poll__networl_3_4_RP_3 + P-poll__networl_3_4_RP_4 + P-poll__networl_3_4_RP_5 + P-poll__networl_3_4_RP_6 + P-poll__networl_3_4_RP_7 + P-poll__networl_2_1_AI_0 + P-poll__networl_2_1_AI_1 + P-poll__networl_2_1_AI_2 + P-poll__networl_2_1_AI_3 + P-poll__networl_2_1_AI_4 + P-poll__networl_2_1_AI_5 + P-poll__networl_2_1_AI_6 + P-poll__networl_2_1_AI_7 + P-poll__networl_1_5_RP_0 + P-poll__networl_1_5_RP_1 + P-poll__networl_1_5_RP_2 + P-poll__networl_1_5_RP_3 + P-poll__networl_1_5_RP_4 + P-poll__networl_1_5_RP_5 + P-poll__networl_1_5_RP_6 + P-poll__networl_1_5_RP_7 + P-poll__networl_0_2_AI_0 + P-poll__networl_0_2_AI_1 + P-poll__networl_0_2_AI_2 + P-poll__networl_0_2_AI_3 + P-poll__networl_0_2_AI_4 + P-poll__networl_0_2_AI_5 + P-poll__networl_0_2_AI_6 + P-poll__networl_0_2_AI_7 + P-poll__networl_7_0_RI_0 + P-poll__networl_7_0_RI_1 + P-poll__networl_7_0_RI_2 + P-poll__networl_7_0_RI_3 + P-poll__networl_7_0_RI_4 + P-poll__networl_7_0_RI_5 + P-poll__networl_7_0_RI_6 + P-poll__networl_7_0_RI_7 + P-poll__networl_5_1_RI_0 + P-poll__networl_5_1_RI_1 + P-poll__networl_5_1_RI_2 + P-poll__networl_5_1_RI_3 + P-poll__networl_5_1_RI_4 + P-poll__networl_5_1_RI_5 + P-poll__networl_5_1_RI_6 + P-poll__networl_5_1_RI_7 + P-poll__networl_6_6_AnnP_0 + P-poll__networl_6_6_AnnP_1 + P-poll__networl_6_6_AnnP_2 + P-poll__networl_6_6_AnnP_3 + P-poll__networl_6_6_AnnP_4 + P-poll__networl_6_6_AnnP_5 + P-poll__networl_6_6_AnnP_6 + P-poll__networl_6_6_AnnP_7 + P-poll__networl_0_6_AskP_0 + P-poll__networl_0_6_AskP_1 + P-poll__networl_0_6_AskP_2 + P-poll__networl_0_6_AskP_3 + P-poll__networl_0_6_AskP_4 + P-poll__networl_0_6_AskP_5 + P-poll__networl_0_6_AskP_6 + P-poll__networl_0_6_AskP_7 + P-poll__networl_3_2_RI_0 + P-poll__networl_3_2_RI_1 + P-poll__networl_3_2_RI_2 + P-poll__networl_3_2_RI_3 + P-poll__networl_3_2_RI_4 + P-poll__networl_3_2_RI_5 + P-poll__networl_3_2_RI_6 + P-poll__networl_3_2_RI_7 + P-poll__networl_1_3_RI_0 + P-poll__networl_1_3_RI_1 + P-poll__networl_1_3_RI_2 + P-poll__networl_1_3_RI_3 + P-poll__networl_1_3_RI_4 + P-poll__networl_1_3_RI_5 + P-poll__networl_1_3_RI_6 + P-poll__networl_1_3_RI_7 + P-poll__networl_1_3_AnnP_0 + P-poll__networl_1_3_AnnP_1 + P-poll__networl_1_3_AnnP_2 + P-poll__networl_1_3_AnnP_3 + P-poll__networl_1_3_AnnP_4 + P-poll__networl_1_3_AnnP_5 + P-poll__networl_1_3_AnnP_6 + P-poll__networl_1_3_AnnP_7 + P-poll__networl_7_3_AskP_0 + P-poll__networl_7_3_AskP_1 + P-poll__networl_7_3_AskP_2 + P-poll__networl_7_3_AskP_3 + P-poll__networl_7_3_AskP_4 + P-poll__networl_7_3_AskP_5 + P-poll__networl_7_3_AskP_6 + P-poll__networl_7_3_AskP_7 + P-poll__networl_2_5_AnsP_0 + P-poll__networl_2_0_AskP_0 + P-poll__networl_2_0_AskP_1 + P-poll__networl_2_0_AskP_2 + P-poll__networl_2_0_AskP_3 + P-poll__networl_2_0_AskP_4 + P-poll__networl_2_0_AskP_5 + P-poll__networl_2_0_AskP_6 + P-poll__networl_2_0_AskP_7 + P-poll__networl_6_0_RP_0 + P-poll__networl_6_0_RP_1 + P-poll__networl_6_0_RP_2 + P-poll__networl_6_0_RP_3 + P-poll__networl_6_0_RP_4 + P-poll__networl_6_0_RP_5 + P-poll__networl_6_0_RP_6 + P-poll__networl_6_0_RP_7 + P-poll__networl_7_4_AnsP_0 + P-poll__networl_4_1_RP_0 + P-poll__networl_4_1_RP_1 + P-poll__networl_4_1_RP_2 + P-poll__networl_4_1_RP_3 + P-poll__networl_4_1_RP_4 + P-poll__networl_4_1_RP_5 + P-poll__networl_4_1_RP_6 + P-poll__networl_4_1_RP_7 + P-poll__networl_0_2_AskP_7 + P-poll__networl_4_7_AnnP_0 + P-poll__networl_4_7_AnnP_1 + P-poll__networl_4_7_AnnP_2 + P-poll__networl_4_7_AnnP_3 + P-poll__networl_4_7_AnnP_4 + P-poll__networl_4_7_AnnP_5 + P-poll__networl_4_7_AnnP_6 + P-poll__networl_4_7_AnnP_7 + P-poll__networl_0_2_AskP_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_2_RP_7 + P-poll__networl_0_2_AskP_5 + P-poll__networl_0_2_AskP_4 + P-poll__networl_0_3_RP_0 + P-poll__networl_0_3_RP_1 + P-poll__networl_0_3_RP_2 + P-poll__networl_0_3_RP_3 + P-poll__networl_0_3_RP_4 + P-poll__networl_0_3_RP_5 + P-poll__networl_0_3_RP_6 + P-poll__networl_0_3_RP_7 + P-poll__networl_0_2_AskP_3 + P-poll__networl_0_2_AskP_2 + P-poll__networl_0_2_AskP_1 + P-poll__networl_0_2_AskP_0 + P-poll__networl_6_2_AnnP_7 + P-poll__networl_6_2_AnnP_6 + P-poll__networl_6_2_AnnP_5 + P-poll__networl_5_4_AskP_0 + P-poll__networl_5_4_AskP_1 + P-poll__networl_5_4_AskP_2 + P-poll__networl_5_4_AskP_3 + P-poll__networl_5_4_AskP_4 + P-poll__networl_5_4_AskP_5 + P-poll__networl_5_4_AskP_6 + P-poll__networl_5_4_AskP_7 + P-poll__networl_6_2_AnnP_4 + P-poll__networl_0_6_AnsP_0 + P-poll__networl_6_2_AnnP_3 + P-poll__networl_6_2_AnnP_2 + P-poll__networl_6_2_AnnP_1 + P-poll__networl_6_2_AnnP_0 + P-poll__networl_1_1_RI_7 + P-poll__networl_1_1_RI_6 + P-poll__networl_1_1_RI_5 + P-poll__networl_2_0_RI_0 + P-poll__networl_2_0_RI_1 + P-poll__networl_2_0_RI_2 + P-poll__networl_2_0_RI_3 + P-poll__networl_2_0_RI_4 + P-poll__networl_2_0_RI_5 + P-poll__networl_2_0_RI_6 + P-poll__networl_2_0_RI_7 + P-poll__networl_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_3_0_RI_7 + P-poll__networl_3_0_RI_6 + P-poll__networl_3_0_RI_5 + P-poll__networl_3_0_RI_4 + P-poll__networl_0_1_RI_0 + P-poll__networl_0_1_RI_1 + P-poll__networl_0_1_RI_2 + P-poll__networl_0_1_RI_3 + P-poll__networl_0_1_RI_4 + P-poll__networl_0_1_RI_5 + P-poll__networl_0_1_RI_6 + P-poll__networl_0_1_RI_7 + P-poll__networl_6_1_AnnP_0 + P-poll__networl_6_1_AnnP_1 + P-poll__networl_6_1_AnnP_2 + P-poll__networl_6_1_AnnP_3 + P-poll__networl_6_1_AnnP_4 + P-poll__networl_6_1_AnnP_5 + P-poll__networl_6_1_AnnP_6 + P-poll__networl_6_1_AnnP_7 + P-poll__networl_0_1_AskP_0 + P-poll__networl_0_1_AskP_1 + P-poll__networl_0_1_AskP_2 + P-poll__networl_0_1_AskP_3 + P-poll__networl_0_1_AskP_4 + P-poll__networl_0_1_AskP_5 + P-poll__networl_0_1_AskP_6 + P-poll__networl_0_1_AskP_7 + P-poll__networl_3_0_RI_3 + P-poll__networl_3_0_RI_2 + P-poll__networl_7_3_AnsP_0 + P-poll__networl_3_0_RI_1 + P-poll__networl_3_0_RI_0 + P-poll__networl_0_7_AnsP_0 + P-poll__networl_5_5_AskP_7 + P-poll__networl_5_5_AskP_6 + P-poll__networl_5_5_AskP_5 + P-poll__networl_5_5_AskP_4 + P-poll__networl_5_5_AskP_3 + P-poll__networl_5_5_AskP_2 + P-poll__networl_5_5_AskP_1 + P-poll__networl_5_5_AskP_0 + P-poll__networl_4_0_AnsP_0 + P-poll__networl_0_0_AI_7 + 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_1_3_RP_7 + P-poll__networl_2_0_AnsP_0 + P-poll__networl_1_3_RP_6 + P-poll__networl_1_3_RP_5 + P-poll__networl_1_3_RP_4 + P-poll__networl_1_3_RP_3 + P-poll__networl_1_3_RP_2 + P-poll__networl_1_3_RP_1 + P-poll__networl_1_3_RP_0 + P-poll__networl_3_2_RP_7 + P-poll__networl_3_5_AskP_0 + P-poll__networl_3_5_AskP_1 + P-poll__networl_3_5_AskP_2 + P-poll__networl_3_5_AskP_3 + P-poll__networl_3_5_AskP_4 + P-poll__networl_3_5_AskP_5 + P-poll__networl_3_5_AskP_6 + P-poll__networl_3_5_AskP_7 + P-poll__networl_3_2_RP_6 + P-poll__networl_1_0_RP_0 + P-poll__networl_1_0_RP_1 + P-poll__networl_1_0_RP_2 + P-poll__networl_1_0_RP_3 + P-poll__networl_1_0_RP_4 + P-poll__networl_1_0_RP_5 + P-poll__networl_1_0_RP_6 + P-poll__networl_1_0_RP_7 + P-poll__networl_3_2_RP_5 + P-poll__networl_3_2_RP_4 + P-poll__networl_3_2_RP_3 + P-poll__networl_3_2_RP_2 + P-poll__networl_3_2_RP_1 + P-poll__networl_3_2_RP_0 + P-poll__networl_5_1_RP_7 + P-poll__networl_5_1_RP_6 + P-poll__networl_5_1_RP_5 + P-poll__networl_4_2_AnnP_0 + P-poll__networl_4_2_AnnP_1 + P-poll__networl_4_2_AnnP_2 + P-poll__networl_4_2_AnnP_3 + P-poll__networl_4_2_AnnP_4 + P-poll__networl_4_2_AnnP_5 + P-poll__networl_4_2_AnnP_6 + P-poll__networl_4_2_AnnP_7 + P-poll__networl_5_1_RP_4 + P-poll__networl_5_1_RP_3 + P-poll__networl_5_1_RP_2 + P-poll__networl_6_7_AI_0 + P-poll__networl_6_7_AI_1 + P-poll__networl_6_7_AI_2 + P-poll__networl_6_7_AI_3 + P-poll__networl_6_7_AI_4 + P-poll__networl_6_7_AI_5 + P-poll__networl_6_7_AI_6 + P-poll__networl_6_7_AI_7 + P-poll__networl_5_4_AnsP_0 + P-poll__networl_5_1_RP_1 + P-poll__networl_5_1_RP_0 + P-poll__networl_0_1_AnsP_0 + P-poll__networl_7_0_RP_7 + P-poll__networl_7_0_RP_6 + P-poll__networl_7_0_RP_5 + P-poll__networl_7_0_RP_4 + P-poll__networl_7_0_RP_3 + P-poll__networl_7_0_RP_2 + P-poll__networl_7_0_RP_1 + P-poll__networl_7_0_RP_0 + P-poll__networl_7_6_AnnP_0 + P-poll__networl_7_6_AnnP_1 + P-poll__networl_7_6_AnnP_2 + P-poll__networl_7_6_AnnP_3 + P-poll__networl_7_6_AnnP_4 + P-poll__networl_7_6_AnnP_5 + P-poll__networl_7_6_AnnP_6 + P-poll__networl_7_6_AnnP_7 + P-poll__networl_1_6_AskP_0 + P-poll__networl_1_6_AskP_1 + P-poll__networl_1_6_AskP_2 + P-poll__networl_1_6_AskP_3 + P-poll__networl_1_6_AskP_4 + P-poll__networl_1_6_AskP_5 + P-poll__networl_1_6_AskP_6 + P-poll__networl_1_6_AskP_7 + P-poll__networl_2_1_AskP_7 + P-poll__networl_2_1_AskP_6 + P-poll__networl_2_1_AskP_5 + P-poll__networl_2_1_AskP_4 + P-poll__networl_2_1_AskP_3 + P-poll__networl_2_1_AskP_2 + P-poll__networl_2_1_AskP_1 + P-poll__networl_2_3_AnnP_0 + P-poll__networl_2_3_AnnP_1 + P-poll__networl_2_3_AnnP_2 + P-poll__networl_2_3_AnnP_3 + P-poll__networl_2_3_AnnP_4 + P-poll__networl_2_3_AnnP_5 + P-poll__networl_2_3_AnnP_6 + P-poll__networl_2_3_AnnP_7 + P-poll__networl_2_1_AskP_0 + P-poll__networl_2_6_AnsP_0 + P-poll__networl_3_5_AnsP_0 + P-poll__networl_7_4_AskP_7 + P-poll__networl_7_4_AskP_6 + P-poll__networl_7_4_AskP_5 + P-poll__networl_7_4_AskP_4 + P-poll__networl_3_0_AskP_0 + P-poll__networl_3_0_AskP_1 + P-poll__networl_3_0_AskP_2 + P-poll__networl_3_0_AskP_3 + P-poll__networl_3_0_AskP_4 + P-poll__networl_3_0_AskP_5 + P-poll__networl_3_0_AskP_6 + P-poll__networl_3_0_AskP_7 + P-poll__networl_7_4_AskP_3 + P-poll__networl_7_4_AskP_2 + P-poll__networl_7_4_AI_0 + P-poll__networl_7_4_AI_1 + P-poll__networl_7_4_AI_2 + P-poll__networl_7_4_AI_3 + P-poll__networl_7_4_AI_4 + P-poll__networl_7_4_AI_5 + P-poll__networl_7_4_AI_6 + P-poll__networl_7_4_AI_7 + P-poll__networl_7_4_AskP_1 + P-poll__networl_7_4_AskP_0 + P-poll__networl_5_7_AnnP_0 + P-poll__networl_5_7_AnnP_1 + P-poll__networl_5_7_AnnP_2 + P-poll__networl_5_7_AnnP_3 + P-poll__networl_5_7_AnnP_4 + P-poll__networl_5_7_AnnP_5 + P-poll__networl_5_7_AnnP_6 + P-poll__networl_5_7_AnnP_7 + P-poll__networl_5_5_AI_0 + P-poll__networl_5_5_AI_1 + P-poll__networl_5_5_AI_2 + P-poll__networl_5_5_AI_3 + P-poll__networl_5_5_AI_4 + P-poll__networl_5_5_AI_5 + P-poll__networl_5_5_AI_6 + P-poll__networl_5_5_AI_7 + P-poll__networl_3_6_AI_0 + P-poll__networl_3_6_AI_1 + P-poll__networl_3_6_AI_2 + P-poll__networl_3_6_AI_3 + P-poll__networl_3_6_AI_4 + P-poll__networl_3_6_AI_5 + P-poll__networl_3_6_AI_6 + P-poll__networl_3_6_AI_7 + P-poll__networl_0_4_RI_7 + P-poll__networl_0_4_RI_6 + P-poll__networl_0_4_RI_5 + P-poll__networl_0_4_RI_4 + P-poll__networl_0_4_RI_3 + P-poll__networl_0_4_RI_2 + P-poll__networl_1_7_AI_0 + P-poll__networl_1_7_AI_1 + P-poll__networl_1_7_AI_2 + P-poll__networl_1_7_AI_3 + P-poll__networl_1_7_AI_4 + P-poll__networl_1_7_AI_5 + P-poll__networl_1_7_AI_6 + P-poll__networl_1_7_AI_7 + P-poll__networl_0_4_AnnP_0 + P-poll__networl_0_4_AnnP_1 + P-poll__networl_0_4_AnnP_2 + P-poll__networl_0_4_AnnP_3 + P-poll__networl_0_4_AnnP_4 + P-poll__networl_0_4_AnnP_5 + P-poll__networl_0_4_AnnP_6 + P-poll__networl_0_4_AnnP_7 + P-poll__networl_6_4_AskP_0 + P-poll__networl_6_4_AskP_1 + P-poll__networl_6_4_AskP_2 + P-poll__networl_6_4_AskP_3 + P-poll__networl_6_4_AskP_4 + P-poll__networl_6_4_AskP_5 + P-poll__networl_6_4_AskP_6 + P-poll__networl_6_4_AskP_7 + P-poll__networl_0_4_RI_1 + P-poll__networl_6_6_RI_0 + P-poll__networl_6_6_RI_1 + P-poll__networl_6_6_RI_2 + P-poll__networl_6_6_RI_3 + P-poll__networl_6_6_RI_4 + P-poll__networl_6_6_RI_5 + P-poll__networl_6_6_RI_6 + P-poll__networl_6_6_RI_7 + P-poll__networl_1_6_AnsP_0 + P-poll__networl_0_4_RI_0 + P-poll__networl_1_4_AnnP_7 + P-poll__networl_1_4_AnnP_6 + P-poll__networl_1_4_AnnP_5 + P-poll__networl_1_4_AnnP_4 + P-poll__networl_1_4_AnnP_3 + P-poll__networl_1_4_AnnP_2 + P-poll__networl_1_4_AnnP_1 + P-poll__networl_1_4_AnnP_0 + P-poll__networl_4_7_RI_0 + P-poll__networl_4_7_RI_1 + P-poll__networl_4_7_RI_2 + P-poll__networl_4_7_RI_3 + P-poll__networl_4_7_RI_4 + P-poll__networl_4_7_RI_5 + P-poll__networl_4_7_RI_6 + P-poll__networl_4_7_RI_7 + P-poll__networl_2_3_RI_7 + P-poll__networl_2_3_RI_6 + P-poll__networl_2_3_RI_5 + P-poll__networl_7_1_AnnP_0 + P-poll__networl_7_1_AnnP_1 + P-poll__networl_7_1_AnnP_2 + P-poll__networl_7_1_AnnP_3 + P-poll__networl_7_1_AnnP_4 + P-poll__networl_7_1_AnnP_5 + P-poll__networl_7_1_AnnP_6 + P-poll__networl_7_1_AnnP_7 + P-poll__networl_1_1_AskP_0 + P-poll__networl_1_1_AskP_1 + P-poll__networl_1_1_AskP_2 + P-poll__networl_1_1_AskP_3 + P-poll__networl_1_1_AskP_4 + P-poll__networl_1_1_AskP_5 + P-poll__networl_1_1_AskP_6 + P-poll__networl_1_1_AskP_7 + P-poll__networl_2_3_RI_4 + P-poll__networl_2_3_RI_3 + P-poll__networl_2_3_RI_2 + P-poll__networl_2_3_RI_1 + P-poll__networl_2_3_RI_0 + P-poll__networl_4_2_RI_7 + P-poll__networl_4_2_RI_6 + P-poll__networl_4_2_RI_5 + P-poll__networl_4_2_RI_4 + P-poll__networl_3_0_AnsP_0 + P-poll__networl_4_2_RI_3 + P-poll__networl_4_2_RI_2 + P-poll__networl_4_2_RI_1 + P-poll__networl_4_2_RI_0 + P-poll__networl_0_7_AskP_7 + P-poll__networl_0_7_AskP_6 + P-poll__networl_0_7_AskP_5 + P-poll__networl_0_7_AskP_4 + P-poll__networl_7_5_RP_0 + P-poll__networl_7_5_RP_1 + P-poll__networl_7_5_RP_2 + P-poll__networl_7_5_RP_3 + P-poll__networl_7_5_RP_4 + P-poll__networl_7_5_RP_5 + P-poll__networl_7_5_RP_6 + P-poll__networl_7_5_RP_7 + P-poll__networl_6_2_AI_0 + P-poll__networl_6_2_AI_1 + P-poll__networl_6_2_AI_2 + P-poll__networl_6_2_AI_3 + P-poll__networl_6_2_AI_4 + P-poll__networl_6_2_AI_5 + P-poll__networl_6_2_AI_6 + P-poll__networl_6_2_AI_7 + P-poll__networl_4_5_AskP_0 + P-poll__networl_4_5_AskP_1 + P-poll__networl_4_5_AskP_2 + P-poll__networl_4_5_AskP_3 + P-poll__networl_4_5_AskP_4 + P-poll__networl_4_5_AskP_5 + P-poll__networl_4_5_AskP_6 + P-poll__networl_4_5_AskP_7 + P-poll__networl_5_6_RP_0 + P-poll__networl_5_6_RP_1 + P-poll__networl_5_6_RP_2 + P-poll__networl_5_6_RP_3 + P-poll__networl_5_6_RP_4 + P-poll__networl_5_6_RP_5 + P-poll__networl_5_6_RP_6 + P-poll__networl_5_6_RP_7 + P-poll__networl_4_3_AI_0 + P-poll__networl_4_3_AI_1 + P-poll__networl_4_3_AI_2 + P-poll__networl_4_3_AI_3 + P-poll__networl_4_3_AI_4 + P-poll__networl_4_3_AI_5 + P-poll__networl_4_3_AI_6 + P-poll__networl_4_3_AI_7 + P-poll__networl_3_7_RP_0 + P-poll__networl_3_7_RP_1 + P-poll__networl_3_7_RP_2 + P-poll__networl_3_7_RP_3 + P-poll__networl_3_7_RP_4 + P-poll__networl_3_7_RP_5 + P-poll__networl_3_7_RP_6 + P-poll__networl_3_7_RP_7 + P-poll__networl_2_4_AI_0 + P-poll__networl_2_4_AI_1 + P-poll__networl_2_4_AI_2 + P-poll__networl_2_4_AI_3 + P-poll__networl_2_4_AI_4 + P-poll__networl_2_4_AI_5 + P-poll__networl_2_4_AI_6 + P-poll__networl_2_4_AI_7 + P-poll__networl_0_7_AskP_3 + P-poll__networl_0_7_AskP_2 + P-poll__networl_0_7_AskP_1 + P-poll__networl_0_7_AskP_0 + P-poll__networl_6_7_AnnP_7 + P-poll__networl_6_7_AnnP_6 + P-poll__networl_6_7_AnnP_5 + P-poll__networl_6_7_AnnP_4 + P-poll__networl_5_2_AnnP_0 + P-poll__networl_5_2_AnnP_1 + P-poll__networl_5_2_AnnP_2 + P-poll__networl_5_2_AnnP_3 + P-poll__networl_5_2_AnnP_4 + P-poll__networl_5_2_AnnP_5 + P-poll__networl_5_2_AnnP_6 + P-poll__networl_5_2_AnnP_7 + P-poll__networl_0_5_AI_0 + P-poll__networl_0_5_AI_1 + P-poll__networl_0_5_AI_2 + P-poll__networl_0_5_AI_3 + P-poll__networl_0_5_AI_4 + P-poll__networl_0_5_AI_5 + P-poll__networl_0_5_AI_6 + P-poll__networl_0_5_AI_7 + P-poll__networl_6_7_AnnP_3 + P-poll__networl_7_3_RI_0 + P-poll__networl_7_3_RI_1 + P-poll__networl_7_3_RI_2 + P-poll__networl_7_3_RI_3 + P-poll__networl_7_3_RI_4 + P-poll__networl_7_3_RI_5 + P-poll__networl_7_3_RI_6 + P-poll__networl_7_3_RI_7 + P-poll__networl_6_7_AnnP_2 + P-poll__networl_6_4_AnsP_0 + P-poll__networl_6_7_AnnP_1 + P-poll__networl_6_7_AnnP_0 + P-poll__networl_6_1_RI_7 + P-poll__networl_6_1_RI_6 + P-poll__networl_6_1_RI_5 + P-poll__networl_6_1_RI_4 + P-poll__networl_6_1_RI_3 + P-poll__networl_5_4_RI_0 + P-poll__networl_5_4_RI_1 + P-poll__networl_5_4_RI_2 + P-poll__networl_5_4_RI_3 + P-poll__networl_5_4_RI_4 + P-poll__networl_5_4_RI_5 + P-poll__networl_5_4_RI_6 + P-poll__networl_5_4_RI_7 + P-poll__networl_6_1_RI_2 + P-poll__networl_6_1_RI_1 + P-poll__networl_6_1_RI_0 + P-poll__networl_0_6_RP_7 + P-poll__networl_0_6_RP_6 + P-poll__networl_0_6_RP_5 + P-poll__networl_3_5_RI_0 + P-poll__networl_3_5_RI_1 + P-poll__networl_3_5_RI_2 + P-poll__networl_3_5_RI_3 + P-poll__networl_3_5_RI_4 + P-poll__networl_3_5_RI_5 + P-poll__networl_3_5_RI_6 + P-poll__networl_3_5_RI_7 + P-poll__networl_0_6_RP_4 + P-poll__networl_0_6_RP_3 + P-poll__networl_1_6_RI_0 + P-poll__networl_1_6_RI_1 + P-poll__networl_1_6_RI_2 + P-poll__networl_1_6_RI_3 + P-poll__networl_1_6_RI_4 + P-poll__networl_1_6_RI_5 + P-poll__networl_1_6_RI_6 + P-poll__networl_1_6_RI_7 + P-poll__networl_1_1_AnsP_0 + P-poll__networl_0_6_RP_2 + P-poll__networl_0_6_RP_1 + P-poll__networl_0_6_RP_0 + P-poll__networl_4_0_AskP_7 + P-poll__networl_4_0_AskP_6 + P-poll__networl_4_0_AskP_5 + P-poll__networl_4_0_AskP_4 + P-poll__networl_4_0_AskP_3 + P-poll__networl_4_0_AskP_2 + P-poll__networl_2_6_AskP_0 + P-poll__networl_2_6_AskP_1 + P-poll__networl_2_6_AskP_2 + P-poll__networl_2_6_AskP_3 + P-poll__networl_2_6_AskP_4 + P-poll__networl_2_6_AskP_5 + P-poll__networl_2_6_AskP_6 + P-poll__networl_2_6_AskP_7 + P-poll__networl_4_0_AskP_1 + P-poll__networl_4_0_AskP_0 + P-poll__networl_1_2_AI_7 + P-poll__networl_1_2_AI_6 + P-poll__networl_1_2_AI_5 + P-poll__networl_1_2_AI_4 + P-poll__networl_1_2_AI_3 + P-poll__networl_1_2_AI_2 + P-poll__networl_1_2_AI_1 + P-poll__networl_1_2_AI_0 + P-poll__networl_3_3_AnnP_0 + P-poll__networl_3_3_AnnP_1 + P-poll__networl_3_3_AnnP_2 + P-poll__networl_3_3_AnnP_3 + P-poll__networl_3_3_AnnP_4 + P-poll__networl_3_3_AnnP_5 + P-poll__networl_3_3_AnnP_6 + P-poll__networl_3_3_AnnP_7 + P-poll__networl_2_5_RP_7 + P-poll__networl_6_3_RP_0 + P-poll__networl_6_3_RP_1 + P-poll__networl_6_3_RP_2 + P-poll__networl_6_3_RP_3 + P-poll__networl_6_3_RP_4 + P-poll__networl_6_3_RP_5 + P-poll__networl_6_3_RP_6 + P-poll__networl_6_3_RP_7 + P-poll__networl_5_0_AI_0 + P-poll__networl_5_0_AI_1 + P-poll__networl_5_0_AI_2 + P-poll__networl_5_0_AI_3 + P-poll__networl_5_0_AI_4 + P-poll__networl_5_0_AI_5 + P-poll__networl_5_0_AI_6 + P-poll__networl_5_0_AI_7 + P-poll__networl_4_5_AnsP_0 + P-poll__networl_2_5_RP_6 + P-poll__networl_2_5_RP_5 + P-poll__networl_2_5_RP_4 + P-poll__networl_2_5_RP_3 + P-poll__networl_2_5_RP_2 + P-poll__networl_2_5_RP_1 + P-poll__networl_2_5_RP_0 + P-poll__networl_4_4_RP_0 + P-poll__networl_4_4_RP_1 + P-poll__networl_4_4_RP_2 + P-poll__networl_4_4_RP_3 + P-poll__networl_4_4_RP_4 + P-poll__networl_4_4_RP_5 + P-poll__networl_4_4_RP_6 + P-poll__networl_4_4_RP_7 + P-poll__networl_3_1_AI_0 + P-poll__networl_3_1_AI_1 + P-poll__networl_3_1_AI_2 + P-poll__networl_3_1_AI_3 + P-poll__networl_3_1_AI_4 + P-poll__networl_3_1_AI_5 + P-poll__networl_3_1_AI_6 + P-poll__networl_3_1_AI_7)
lola: after: (3 <= P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_6_4_AnsP_7 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_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_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_7 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1)
lola: LP says that atomic proposition is always false: (3 <= P-poll__networl_4_5_AnsP_7 + P-poll__networl_4_5_AnsP_6 + P-poll__networl_4_5_AnsP_5 + P-poll__networl_4_5_AnsP_4 + P-poll__networl_4_5_AnsP_3 + P-poll__networl_4_5_AnsP_2 + P-poll__networl_4_5_AnsP_1 + P-poll__networl_1_1_AnsP_7 + P-poll__networl_1_1_AnsP_6 + P-poll__networl_1_1_AnsP_5 + P-poll__networl_1_1_AnsP_4 + P-poll__networl_1_1_AnsP_3 + P-poll__networl_1_1_AnsP_2 + P-poll__networl_1_1_AnsP_1 + P-poll__networl_6_4_AnsP_7 + P-poll__networl_6_4_AnsP_6 + P-poll__networl_6_4_AnsP_5 + P-poll__networl_6_4_AnsP_4 + P-poll__networl_6_4_AnsP_3 + P-poll__networl_6_4_AnsP_2 + P-poll__networl_6_4_AnsP_1 + P-poll__networl_3_0_AnsP_7 + P-poll__networl_3_0_AnsP_6 + P-poll__networl_3_0_AnsP_5 + P-poll__networl_3_0_AnsP_4 + P-poll__networl_3_0_AnsP_3 + P-poll__networl_3_0_AnsP_2 + P-poll__networl_3_0_AnsP_1 + P-poll__networl_1_6_AnsP_7 + P-poll__networl_1_6_AnsP_6 + P-poll__networl_1_6_AnsP_5 + P-poll__networl_1_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_3_5_AnsP_7 + P-poll__networl_3_5_AnsP_6 + P-poll__networl_3_5_AnsP_5 + P-poll__networl_3_5_AnsP_4 + P-poll__networl_3_5_AnsP_3 + P-poll__networl_3_5_AnsP_2 + P-poll__networl_3_5_AnsP_1 + P-poll__networl_2_6_AnsP_1 + P-poll__networl_2_6_AnsP_2 + P-poll__networl_2_6_AnsP_3 + P-poll__networl_2_6_AnsP_4 + P-poll__networl_2_6_AnsP_5 + P-poll__networl_2_6_AnsP_6 + P-poll__networl_2_6_AnsP_7 + P-poll__networl_0_1_AnsP_7 + P-poll__networl_0_1_AnsP_6 + P-poll__networl_0_1_AnsP_5 + P-poll__networl_0_1_AnsP_4 + P-poll__networl_0_1_AnsP_3 + P-poll__networl_0_1_AnsP_2 + P-poll__networl_0_1_AnsP_1 + P-poll__networl_5_4_AnsP_7 + P-poll__networl_5_4_AnsP_6 + P-poll__networl_5_4_AnsP_5 + P-poll__networl_5_4_AnsP_4 + P-poll__networl_5_4_AnsP_3 + P-poll__networl_5_4_AnsP_2 + P-poll__networl_5_4_AnsP_1 + P-poll__networl_2_0_AnsP_7 + P-poll__networl_2_0_AnsP_6 + P-poll__networl_2_0_AnsP_5 + P-poll__networl_2_0_AnsP_4 + P-poll__networl_2_0_AnsP_3 + P-poll__networl_2_0_AnsP_2 + P-poll__networl_2_0_AnsP_1 + P-poll__networl_4_0_AnsP_1 + P-poll__networl_4_0_AnsP_2 + P-poll__networl_4_0_AnsP_3 + P-poll__networl_4_0_AnsP_4 + P-poll__networl_4_0_AnsP_5 + P-poll__networl_4_0_AnsP_6 + P-poll__networl_4_0_AnsP_7 + P-poll__networl_7_3_AnsP_7 + P-poll__networl_7_3_AnsP_6 + P-poll__networl_7_3_AnsP_5 + P-poll__networl_7_3_AnsP_4 + P-poll__networl_7_3_AnsP_3 + P-poll__networl_0_7_AnsP_1 + P-poll__networl_0_7_AnsP_2 + P-poll__networl_0_7_AnsP_3 + P-poll__networl_0_7_AnsP_4 + P-poll__networl_0_7_AnsP_5 + P-poll__networl_0_7_AnsP_6 + P-poll__networl_0_7_AnsP_7 + P-poll__networl_7_3_AnsP_2 + P-poll__networl_7_3_AnsP_1 + P-poll__networl_0_6_AnsP_7 + P-poll__networl_0_6_AnsP_6 + P-poll__networl_0_6_AnsP_5 + P-poll__networl_0_6_AnsP_4 + P-poll__networl_0_6_AnsP_3 + P-poll__networl_0_6_AnsP_2 + P-poll__networl_0_6_AnsP_1 + P-poll__networl_7_4_AnsP_1 + P-poll__networl_7_4_AnsP_2 + P-poll__networl_7_4_AnsP_3 + P-poll__networl_7_4_AnsP_4 + P-poll__networl_7_4_AnsP_5 + P-poll__networl_7_4_AnsP_6 + P-poll__networl_7_4_AnsP_7 + P-poll__networl_2_5_AnsP_7 + P-poll__networl_2_5_AnsP_6 + P-poll__networl_2_5_AnsP_5 + P-poll__networl_2_5_AnsP_4 + P-poll__networl_2_5_AnsP_3 + P-poll__networl_2_5_AnsP_2 + P-poll__networl_2_5_AnsP_1 + P-poll__networl_4_4_AnsP_7 + P-poll__networl_4_4_AnsP_6 + P-poll__networl_4_4_AnsP_5 + P-poll__networl_4_4_AnsP_4 + P-poll__networl_4_4_AnsP_3 + P-poll__networl_4_4_AnsP_2 + P-poll__networl_4_4_AnsP_1 + P-poll__networl_2_1_AnsP_1 + P-poll__networl_2_1_AnsP_2 + P-poll__networl_2_1_AnsP_3 + P-poll__networl_2_1_AnsP_4 + P-poll__networl_2_1_AnsP_5 + P-poll__networl_2_1_AnsP_6 + P-poll__networl_2_1_AnsP_7 + P-poll__networl_1_0_AnsP_7 + P-poll__networl_1_0_AnsP_6 + P-poll__networl_1_0_AnsP_5 + P-poll__networl_1_0_AnsP_4 + P-poll__networl_1_0_AnsP_3 + P-poll__networl_1_0_AnsP_2 + P-poll__networl_1_0_AnsP_1 + P-poll__networl_6_3_AnsP_7 + P-poll__networl_6_3_AnsP_6 + P-poll__networl_6_3_AnsP_5 + P-poll__networl_6_3_AnsP_4 + P-poll__networl_6_3_AnsP_3 + P-poll__networl_6_3_AnsP_2 + P-poll__networl_6_3_AnsP_1 + P-poll__networl_1_5_AnsP_7 + P-poll__networl_1_5_AnsP_6 + P-poll__networl_1_5_AnsP_5 + P-poll__networl_1_5_AnsP_4 + P-poll__networl_1_5_AnsP_3 + P-poll__networl_1_5_AnsP_2 + P-poll__networl_1_5_AnsP_1 + P-poll__networl_3_4_AnsP_7 + P-poll__networl_3_4_AnsP_6 + P-poll__networl_3_4_AnsP_5 + P-poll__networl_3_4_AnsP_4 + P-poll__networl_3_4_AnsP_3 + P-poll__networl_3_4_AnsP_2 + P-poll__networl_3_4_AnsP_1 + P-poll__networl_5_5_AnsP_1 + P-poll__networl_5_5_AnsP_2 + P-poll__networl_5_5_AnsP_3 + P-poll__networl_5_5_AnsP_4 + P-poll__networl_5_5_AnsP_5 + P-poll__networl_5_5_AnsP_6 + P-poll__networl_5_5_AnsP_7 + P-poll__networl_0_2_AnsP_1 + P-poll__networl_0_2_AnsP_2 + P-poll__networl_0_2_AnsP_3 + P-poll__networl_0_2_AnsP_4 + P-poll__networl_0_2_AnsP_5 + P-poll__networl_0_2_AnsP_6 + P-poll__networl_0_2_AnsP_7 + P-poll__networl_0_0_AnsP_7 + P-poll__networl_0_0_AnsP_6 + P-poll__networl_0_0_AnsP_5 + P-poll__networl_0_0_AnsP_4 + P-poll__networl_0_0_AnsP_3 + P-poll__networl_0_0_AnsP_2 + P-poll__networl_0_0_AnsP_1 + P-poll__networl_5_3_AnsP_7 + P-poll__networl_5_3_AnsP_6 + P-poll__networl_5_3_AnsP_5 + P-poll__networl_5_3_AnsP_4 + P-poll__networl_5_3_AnsP_3 + P-poll__networl_5_3_AnsP_2 + P-poll__networl_5_3_AnsP_1 + P-poll__networl_7_2_AnsP_7 + P-poll__networl_7_2_AnsP_6 + P-poll__networl_7_2_AnsP_5 + P-poll__networl_7_2_AnsP_4 + P-poll__networl_7_2_AnsP_3 + P-poll__networl_7_2_AnsP_2 + P-poll__networl_7_2_AnsP_1 + P-poll__networl_0_5_AnsP_7 + P-poll__networl_0_5_AnsP_6 + P-poll__networl_0_5_AnsP_5 + P-poll__networl_0_5_AnsP_4 + P-poll__networl_0_5_AnsP_3 + P-poll__networl_0_5_AnsP_2 + P-poll__networl_0_5_AnsP_1 + P-poll__networl_3_6_AnsP_1 + P-poll__networl_3_6_AnsP_2 + P-poll__networl_3_6_AnsP_3 + P-poll__networl_3_6_AnsP_4 + P-poll__networl_3_6_AnsP_5 + P-poll__networl_3_6_AnsP_6 + P-poll__networl_3_6_AnsP_7 + P-poll__networl_2_4_AnsP_7 + P-poll__networl_2_4_AnsP_6 + P-poll__networl_2_4_AnsP_5 + P-poll__networl_2_4_AnsP_4 + P-poll__networl_2_4_AnsP_3 + P-poll__networl_2_4_AnsP_2 + P-poll__networl_2_4_AnsP_1 + P-poll__networl_7_7_AnsP_7 + P-poll__networl_7_7_AnsP_6 + P-poll__networl_7_7_AnsP_5 + P-poll__networl_7_7_AnsP_4 + P-poll__networl_7_7_AnsP_3 + P-poll__networl_7_7_AnsP_2 + P-poll__networl_7_7_AnsP_1 + P-poll__networl_4_3_AnsP_7 + P-poll__networl_4_3_AnsP_6 + P-poll__networl_4_3_AnsP_5 + P-poll__networl_4_3_AnsP_4 + P-poll__networl_4_3_AnsP_3 + P-poll__networl_4_3_AnsP_2 + P-poll__networl_4_3_AnsP_1 + P-poll__networl_5_0_AnsP_1 + P-poll__networl_5_0_AnsP_2 + P-poll__networl_5_0_AnsP_3 + P-poll__networl_5_0_AnsP_4 + P-poll__networl_5_0_AnsP_5 + P-poll__networl_5_0_AnsP_6 + P-poll__networl_5_0_AnsP_7 + P-poll__networl_6_2_AnsP_7 + P-poll__networl_6_2_AnsP_6 + P-poll__networl_6_2_AnsP_5 + P-poll__networl_6_2_AnsP_4 + P-poll__networl_6_2_AnsP_3 + P-poll__networl_6_2_AnsP_2 + P-poll__networl_6_2_AnsP_1 + P-poll__networl_1_7_AnsP_1 + P-poll__networl_1_7_AnsP_2 + P-poll__networl_1_7_AnsP_3 + P-poll__networl_1_7_AnsP_4 + P-poll__networl_1_7_AnsP_5 + P-poll__networl_1_7_AnsP_6 + P-poll__networl_1_7_AnsP_7 + P-poll__networl_1_4_AnsP_7 + P-poll__networl_1_4_AnsP_6 + P-poll__networl_1_4_AnsP_5 + P-poll__networl_1_4_AnsP_4 + P-poll__networl_1_4_AnsP_3 + P-poll__networl_1_4_AnsP_2 + P-poll__networl_1_4_AnsP_1 + P-poll__networl_6_7_AnsP_7 + P-poll__networl_6_7_AnsP_6 + P-poll__networl_6_7_AnsP_5 + P-poll__networl_6_7_AnsP_4 + P-poll__networl_6_7_AnsP_3 + P-poll__networl_6_7_AnsP_2 + P-poll__networl_6_7_AnsP_1 + P-poll__networl_3_3_AnsP_7 + P-poll__networl_3_3_AnsP_6 + P-poll__networl_3_3_AnsP_5 + P-poll__networl_3_3_AnsP_4 + P-poll__networl_3_3_AnsP_3 + P-poll__networl_3_3_AnsP_2 + P-poll__networl_3_3_AnsP_1 + P-poll__networl_5_2_AnsP_7 + P-poll__networl_5_2_AnsP_6 + P-poll__networl_5_2_AnsP_5 + P-poll__networl_5_2_AnsP_4 + P-poll__networl_5_2_AnsP_3 + P-poll__networl_5_2_AnsP_2 + P-poll__networl_5_2_AnsP_1 + P-poll__networl_3_1_AnsP_1 + P-poll__networl_3_1_AnsP_2 + P-poll__networl_3_1_AnsP_3 + P-poll__networl_3_1_AnsP_4 + P-poll__networl_3_1_AnsP_5 + P-poll__networl_3_1_AnsP_6 + P-poll__networl_3_1_AnsP_7 + P-poll__networl_7_1_AnsP_7 + P-poll__networl_7_1_AnsP_6 + P-poll__networl_7_1_AnsP_5 + P-poll__networl_7_1_AnsP_4 + P-poll__networl_7_1_AnsP_3 + P-poll__networl_7_1_AnsP_2 + P-poll__networl_7_1_AnsP_1 + P-poll__networl_0_4_AnsP_7 + P-poll__networl_0_4_AnsP_6 + P-poll__networl_0_4_AnsP_5 + P-poll__networl_0_4_AnsP_4 + P-poll__networl_0_4_AnsP_3 + P-poll__networl_0_4_AnsP_2 + P-poll__networl_0_4_AnsP_1 + P-poll__networl_5_7_AnsP_7 + P-poll__networl_5_7_AnsP_6 + P-poll__networl_5_7_AnsP_5 + P-poll__networl_5_7_AnsP_4 + P-poll__networl_5_7_AnsP_3 + P-poll__networl_5_7_AnsP_2 + P-poll__networl_5_7_AnsP_1 + P-poll__networl_2_3_AnsP_7 + P-poll__networl_2_3_AnsP_6 + P-poll__networl_2_3_AnsP_5 + P-poll__networl_2_3_AnsP_4 + P-poll__networl_2_3_AnsP_3 + P-poll__networl_2_3_AnsP_2 + P-poll__networl_2_3_AnsP_1 + P-poll__networl_7_6_AnsP_7 + P-poll__networl_7_6_AnsP_6 + P-poll__networl_7_6_AnsP_5 + P-poll__networl_7_6_AnsP_4 + P-poll__networl_7_6_AnsP_3 + P-poll__networl_7_6_AnsP_2 + P-poll__networl_7_6_AnsP_1 + P-poll__networl_6_5_AnsP_1 + P-poll__networl_6_5_AnsP_2 + P-poll__networl_6_5_AnsP_3 + P-poll__networl_6_5_AnsP_4 + P-poll__networl_6_5_AnsP_5 + P-poll__networl_6_5_AnsP_6 + P-poll__networl_6_5_AnsP_7 + P-poll__networl_4_2_AnsP_7 + P-poll__networl_4_2_AnsP_6 + P-poll__networl_4_2_AnsP_5 + P-poll__networl_4_2_AnsP_4 + P-poll__networl_4_2_AnsP_3 + P-poll__networl_4_2_AnsP_2 + P-poll__networl_4_2_AnsP_1 + P-poll__networl_6_1_AnsP_7 + P-poll__networl_6_1_AnsP_6 + P-poll__networl_6_1_AnsP_5 + P-poll__networl_6_1_AnsP_4 + P-poll__networl_6_1_AnsP_3 + P-poll__networl_1_2_AnsP_1 + P-poll__networl_1_2_AnsP_2 + P-poll__networl_1_2_AnsP_3 + P-poll__networl_1_2_AnsP_4 + P-poll__networl_1_2_AnsP_5 + P-poll__networl_1_2_AnsP_6 + P-poll__networl_1_2_AnsP_7 + P-poll__networl_6_1_AnsP_2 + P-poll__networl_6_1_AnsP_1 + P-poll__networl_4_7_AnsP_7 + P-poll__networl_4_7_AnsP_6 + P-poll__networl_4_7_AnsP_5 + P-poll__networl_4_7_AnsP_4 + P-poll__networl_4_7_AnsP_3 + P-poll__networl_4_7_AnsP_2 + P-poll__networl_4_7_AnsP_1 + P-poll__networl_1_3_AnsP_7 + P-poll__networl_1_3_AnsP_6 + P-poll__networl_1_3_AnsP_5 + P-poll__networl_1_3_AnsP_4 + P-poll__networl_1_3_AnsP_3 + P-poll__networl_1_3_AnsP_2 + P-poll__networl_1_3_AnsP_1 + P-poll__networl_6_6_AnsP_7 + P-poll__networl_6_6_AnsP_6 + P-poll__networl_6_6_AnsP_5 + P-poll__networl_6_6_AnsP_4 + P-poll__networl_6_6_AnsP_3 + P-poll__networl_6_6_AnsP_2 + P-poll__networl_6_6_AnsP_1 + P-poll__networl_4_6_AnsP_1 + P-poll__networl_4_6_AnsP_2 + P-poll__networl_4_6_AnsP_3 + P-poll__networl_4_6_AnsP_4 + P-poll__networl_4_6_AnsP_5 + P-poll__networl_4_6_AnsP_6 + P-poll__networl_4_6_AnsP_7 + P-poll__networl_3_2_AnsP_7 + P-poll__networl_3_2_AnsP_6 + P-poll__networl_3_2_AnsP_5 + P-poll__networl_3_2_AnsP_4 + P-poll__networl_3_2_AnsP_3 + P-poll__networl_3_2_AnsP_2 + P-poll__networl_3_2_AnsP_1 + P-poll__networl_5_1_AnsP_7 + P-poll__networl_5_1_AnsP_6 + P-poll__networl_5_1_AnsP_5 + P-poll__networl_5_1_AnsP_4 + P-poll__networl_5_1_AnsP_3 + P-poll__networl_5_1_AnsP_2 + P-poll__networl_5_1_AnsP_1 + P-poll__networl_3_7_AnsP_7 + P-poll__networl_3_7_AnsP_6 + P-poll__networl_3_7_AnsP_5 + P-poll__networl_3_7_AnsP_4 + P-poll__networl_3_7_AnsP_3 + P-poll__networl_3_7_AnsP_2 + P-poll__networl_3_7_AnsP_1 + P-poll__networl_7_0_AnsP_7 + P-poll__networl_7_0_AnsP_6 + P-poll__networl_7_0_AnsP_5 + P-poll__networl_7_0_AnsP_4 + P-poll__networl_7_0_AnsP_3 + P-poll__networl_7_0_AnsP_2 + P-poll__networl_7_0_AnsP_1 + P-poll__networl_6_0_AnsP_1 + P-poll__networl_6_0_AnsP_2 + P-poll__networl_6_0_AnsP_3 + P-poll__networl_6_0_AnsP_4 + P-poll__networl_6_0_AnsP_5 + P-poll__networl_6_0_AnsP_6 + P-poll__networl_6_0_AnsP_7 + P-poll__networl_0_3_AnsP_7 + P-poll__networl_0_3_AnsP_6 + P-poll__networl_0_3_AnsP_5 + P-poll__networl_0_3_AnsP_4 + P-poll__networl_0_3_AnsP_3 + P-poll__networl_0_3_AnsP_2 + P-poll__networl_0_3_AnsP_1 + P-poll__networl_5_6_AnsP_7 + P-poll__networl_5_6_AnsP_6 + P-poll__networl_5_6_AnsP_5 + P-poll__networl_5_6_AnsP_4 + P-poll__networl_5_6_AnsP_3 + P-poll__networl_5_6_AnsP_2 + P-poll__networl_5_6_AnsP_1 + P-poll__networl_2_7_AnsP_1 + P-poll__networl_2_7_AnsP_2 + P-poll__networl_2_7_AnsP_3 + P-poll__networl_2_7_AnsP_4 + P-poll__networl_2_7_AnsP_5 + P-poll__networl_2_7_AnsP_6 + P-poll__networl_2_7_AnsP_7 + P-poll__networl_2_2_AnsP_7 + P-poll__networl_2_2_AnsP_6 + P-poll__networl_2_2_AnsP_5 + P-poll__networl_2_2_AnsP_4 + P-poll__networl_2_2_AnsP_3 + P-poll__networl_2_2_AnsP_2 + P-poll__networl_2_2_AnsP_1 + P-poll__networl_7_5_AnsP_7 + P-poll__networl_7_5_AnsP_6 + P-poll__networl_7_5_AnsP_5 + P-poll__networl_7_5_AnsP_4 + P-poll__networl_7_5_AnsP_3 + P-poll__networl_7_5_AnsP_2 + P-poll__networl_7_5_AnsP_1 + P-poll__networl_4_1_AnsP_7 + P-poll__networl_4_1_AnsP_6 + P-poll__networl_4_1_AnsP_5 + P-poll__networl_4_1_AnsP_4 + P-poll__networl_4_1_AnsP_3 + P-poll__networl_4_1_AnsP_2 + P-poll__networl_4_1_AnsP_1)
lola: place invariant simplifies atomic proposition
lola: before: (P-startNeg__broadcasting_0_5 + P-startNeg__broadcasting_0_4 + P-startNeg__broadcasting_0_3 + P-startNeg__broadcasting_1_1 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_5 + P-startNeg__broadcasting_1_6 + P-startNeg__broadcasting_1_7 + P-startNeg__broadcasting_0_2 + P-startNeg__broadcasting_0_1 + P-startNeg__broadcasting_2_1 + P-startNeg__broadcasting_2_2 + P-startNeg__broadcasting_2_3 + P-startNeg__broadcasting_2_4 + P-startNeg__broadcasting_2_5 + P-startNeg__broadcasting_2_6 + P-startNeg__broadcasting_2_7 + P-startNeg__broadcasting_3_1 + P-startNeg__broadcasting_3_2 + P-startNeg__broadcasting_3_3 + P-startNeg__broadcasting_3_4 + P-startNeg__broadcasting_3_5 + P-startNeg__broadcasting_3_6 + P-startNeg__broadcasting_3_7 + P-startNeg__broadcasting_4_1 + P-startNeg__broadcasting_4_2 + P-startNeg__broadcasting_4_3 + P-startNeg__broadcasting_4_4 + P-startNeg__broadcasting_4_5 + P-startNeg__broadcasting_4_6 + P-startNeg__broadcasting_4_7 + P-startNeg__broadcasting_5_1 + P-startNeg__broadcasting_5_2 + P-startNeg__broadcasting_5_3 + P-startNeg__broadcasting_5_4 + P-startNeg__broadcasting_5_5 + P-startNeg__broadcasting_5_6 + P-startNeg__broadcasting_5_7 + P-startNeg__broadcasting_6_1 + P-startNeg__broadcasting_6_2 + P-startNeg__broadcasting_6_3 + P-startNeg__broadcasting_6_4 + P-startNeg__broadcasting_6_5 + P-startNeg__broadcasting_6_6 + P-startNeg__broadcasting_6_7 + P-startNeg__broadcasting_7_1 + P-startNeg__broadcasting_7_2 + P-startNeg__broadcasting_7_3 + P-startNeg__broadcasting_7_4 + P-startNeg__broadcasting_7_5 + P-startNeg__broadcasting_7_6 + P-startNeg__broadcasting_7_7 + P-startNeg__broadcasting_0_6 + P-startNeg__broadcasting_0_7 <= P-masterState_0_F_6 + P-masterState_0_F_5 + P-masterState_0_F_4 + P-masterState_0_F_3 + P-masterState_0_F_2 + P-masterState_0_F_1 + P-masterState_0_F_0 + P-masterState_4_F_6 + P-masterState_4_F_5 + P-masterState_4_F_4 + P-masterState_4_F_3 + P-masterState_4_F_2 + P-masterState_4_F_1 + P-masterState_4_F_0 + 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_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_7_T_0 + P-masterState_7_T_1 + P-masterState_7_T_2 + P-masterState_7_T_3 + P-masterState_7_T_4 + P-masterState_7_T_5 + P-masterState_7_T_6 + P-masterState_7_T_7 + P-masterState_3_T_0 + P-masterState_3_T_1 + P-masterState_3_T_2 + P-masterState_3_T_3 + P-masterState_3_T_4 + P-masterState_3_T_5 + P-masterState_3_T_6 + P-masterState_3_T_7 + P-masterState_3_F_6 + P-masterState_3_F_5 + P-masterState_3_F_4 + P-masterState_3_F_3 + P-masterState_3_F_2 + P-masterState_3_F_1 + P-masterState_3_F_0 + P-masterState_7_F_6 + P-masterState_7_F_5 + P-masterState_7_F_4 + P-masterState_7_F_3 + P-masterState_7_F_2 + P-masterState_7_F_1 + P-masterState_7_F_0 + P-masterState_1_T_6 + P-masterState_1_T_5 + P-masterState_1_T_4 + P-masterState_1_T_3 + P-masterState_1_T_2 + P-masterState_1_T_1 + P-masterState_1_T_0 + P-masterState_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_5_F_0 + P-masterState_5_F_1 + P-masterState_5_F_2 + P-masterState_5_F_3 + P-masterState_5_F_4 + P-masterState_5_F_5 + P-masterState_5_F_6 + P-masterState_5_F_7 + P-masterState_2_F_7 + P-masterState_2_F_6 + P-masterState_2_F_5 + P-masterState_2_F_4 + P-masterState_2_F_3 + P-masterState_2_F_2 + P-masterState_2_F_1 + P-masterState_2_F_0 + P-masterState_6_F_7 + P-masterState_6_F_6 + P-masterState_6_F_5 + P-masterState_6_F_4 + P-masterState_6_F_3 + P-masterState_6_F_2 + P-masterState_6_F_1 + P-masterState_6_F_0 + P-masterState_1_F_0 + P-masterState_1_F_1 + P-masterState_1_F_2 + P-masterState_1_F_3 + P-masterState_1_F_4 + P-masterState_1_F_5 + P-masterState_1_F_6 + P-masterState_1_F_7 + P-masterState_0_T_7 + P-masterState_0_T_6 + P-masterState_0_T_5 + P-masterState_0_T_4 + P-masterState_0_T_3 + P-masterState_0_T_2 + P-masterState_0_T_1 + P-masterState_0_T_0 + P-masterState_4_T_7 + P-masterState_4_T_6 + P-masterState_4_T_5 + P-masterState_4_T_4 + P-masterState_4_T_3 + P-masterState_4_T_2 + P-masterState_4_T_1 + P-masterState_4_T_0 + P-masterState_5_T_7 + P-masterState_1_T_7 + P-masterState_7_F_7 + P-masterState_3_F_7 + P-masterState_6_T_7 + P-masterState_2_T_7 + P-masterState_4_F_7 + P-masterState_0_F_7)
lola: after: (P-startNeg__broadcasting_0_5 + P-startNeg__broadcasting_0_4 + P-startNeg__broadcasting_0_3 + P-startNeg__broadcasting_1_1 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_5 + P-startNeg__broadcasting_1_6 + P-startNeg__broadcasting_1_7 + P-startNeg__broadcasting_0_2 + P-startNeg__broadcasting_0_1 + P-startNeg__broadcasting_2_1 + P-startNeg__broadcasting_2_2 + P-startNeg__broadcasting_2_3 + P-startNeg__broadcasting_2_4 + P-startNeg__broadcasting_2_5 + P-startNeg__broadcasting_2_6 + P-startNeg__broadcasting_2_7 + P-startNeg__broadcasting_3_1 + P-startNeg__broadcasting_3_2 + P-startNeg__broadcasting_3_3 + P-startNeg__broadcasting_3_4 + P-startNeg__broadcasting_3_5 + P-startNeg__broadcasting_3_6 + P-startNeg__broadcasting_3_7 + P-startNeg__broadcasting_4_1 + P-startNeg__broadcasting_4_2 + P-startNeg__broadcasting_4_3 + P-startNeg__broadcasting_4_4 + P-startNeg__broadcasting_4_5 + P-startNeg__broadcasting_4_6 + P-startNeg__broadcasting_4_7 + P-startNeg__broadcasting_5_1 + P-startNeg__broadcasting_5_2 + P-startNeg__broadcasting_5_3 + P-startNeg__broadcasting_5_4 + P-startNeg__broadcasting_5_5 + P-startNeg__broadcasting_5_6 + P-startNeg__broadcasting_5_7 + P-startNeg__broadcasting_6_1 + P-startNeg__broadcasting_6_2 + P-startNeg__broadcasting_6_3 + P-startNeg__broadcasting_6_4 + P-startNeg__broadcasting_6_5 + P-startNeg__broadcasting_6_6 + P-startNeg__broadcasting_6_7 + P-startNeg__broadcasting_7_1 + P-startNeg__broadcasting_7_2 + P-startNeg__broadcasting_7_3 + P-startNeg__broadcasting_7_4 + P-startNeg__broadcasting_7_5 + P-startNeg__broadcasting_7_6 + P-startNeg__broadcasting_7_7 + P-startNeg__broadcasting_0_6 + P-startNeg__broadcasting_0_7 <= 7)
lola: LP says that atomic proposition is always true: (P-startNeg__broadcasting_0_5 + P-startNeg__broadcasting_0_4 + P-startNeg__broadcasting_0_3 + P-startNeg__broadcasting_1_1 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_5 + P-startNeg__broadcasting_1_6 + P-startNeg__broadcasting_1_7 + P-startNeg__broadcasting_0_2 + P-startNeg__broadcasting_0_1 + P-startNeg__broadcasting_2_1 + P-startNeg__broadcasting_2_2 + P-startNeg__broadcasting_2_3 + P-startNeg__broadcasting_2_4 + P-startNeg__broadcasting_2_5 + P-startNeg__broadcasting_2_6 + P-startNeg__broadcasting_2_7 + P-startNeg__broadcasting_3_1 + P-startNeg__broadcasting_3_2 + P-startNeg__broadcasting_3_3 + P-startNeg__broadcasting_3_4 + P-startNeg__broadcasting_3_5 + P-startNeg__broadcasting_3_6 + P-startNeg__broadcasting_3_7 + P-startNeg__broadcasting_4_1 + P-startNeg__broadcasting_4_2 + P-startNeg__broadcasting_4_3 + P-startNeg__broadcasting_4_4 + P-startNeg__broadcasting_4_5 + P-startNeg__broadcasting_4_6 + P-startNeg__broadcasting_4_7 + P-startNeg__broadcasting_5_1 + P-startNeg__broadcasting_5_2 + P-startNeg__broadcasting_5_3 + P-startNeg__broadcasting_5_4 + P-startNeg__broadcasting_5_5 + P-startNeg__broadcasting_5_6 + P-startNeg__broadcasting_5_7 + P-startNeg__broadcasting_6_1 + P-startNeg__broadcasting_6_2 + P-startNeg__broadcasting_6_3 + P-startNeg__broadcasting_6_4 + P-startNeg__broadcasting_6_5 + P-startNeg__broadcasting_6_6 + P-startNeg__broadcasting_6_7 + P-startNeg__broadcasting_7_1 + P-startNeg__broadcasting_7_2 + P-startNeg__broadcasting_7_3 + P-startNeg__broadcasting_7_4 + P-startNeg__broadcasting_7_5 + P-startNeg__broadcasting_7_6 + P-startNeg__broadcasting_7_7 + P-startNeg__broadcasting_0_6 + P-startNeg__broadcasting_0_7 <= 7)
lola: LP says that atomic proposition is always true: (P-electedSecondary_0 + P-electedSecondary_1 + P-electedSecondary_2 + P-electedSecondary_3 + P-electedSecondary_4 + P-electedSecondary_5 + P-electedSecondary_6 + P-electedSecondary_7 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1)
lola: LP says that atomic proposition is always true: (P-electedSecondary_0 + P-electedSecondary_1 + P-electedSecondary_2 + P-electedSecondary_3 + P-electedSecondary_4 + P-electedSecondary_5 + P-electedSecondary_6 + P-electedSecondary_7 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1)
lola: place invariant simplifies atomic proposition
lola: before: (P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= P-dead_7 + P-dead_6 + P-dead_5 + P-dead_4 + P-dead_3 + P-dead_2 + P-dead_1 + P-dead_0)
lola: after: (P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (P-stage_3_PRIM + P-stage_7_SEC + P-stage_3_SEC + P-stage_2_PRIM + P-stage_5_SEC + P-stage_7_PRIM + P-stage_1_NEG + P-stage_5_NEG + P-stage_6_PRIM + P-stage_0_SEC + P-stage_4_SEC + P-stage_4_NEG + P-stage_0_NEG + P-stage_1_PRIM + P-stage_4_PRIM + P-stage_1_SEC + P-stage_6_NEG + P-stage_2_NEG + P-stage_5_PRIM + P-stage_0_PRIM + P-stage_6_SEC + P-stage_2_SEC + P-stage_7_NEG + P-stage_3_NEG <= P-poll__waitingMessage_6 + P-poll__waitingMessage_2 + P-poll__waitingMessage_0 + P-poll__waitingMessage_1 + P-poll__waitingMessage_3 + P-poll__waitingMessage_4 + P-poll__waitingMessage_5 + P-poll__waitingMessage_7)
lola: after: (7 <= P-poll__waitingMessage_6 + P-poll__waitingMessage_2 + P-poll__waitingMessage_0 + P-poll__waitingMessage_1 + P-poll__waitingMessage_3 + P-poll__waitingMessage_4 + P-poll__waitingMessage_5 + P-poll__waitingMessage_7)
lola: LP says that atomic proposition is always false: (7 <= P-poll__waitingMessage_6 + P-poll__waitingMessage_2 + P-poll__waitingMessage_0 + P-poll__waitingMessage_1 + P-poll__waitingMessage_3 + P-poll__waitingMessage_4 + P-poll__waitingMessage_5 + P-poll__waitingMessage_7)
lola: LP says that atomic proposition is always true: (P-sendAnnPs__broadcasting_2_1 <= P-masterState_3_T_0)
lola: LP says that atomic proposition is always true: (P-sendAnnPs__broadcasting_2_1 <= P-masterState_3_T_0)
lola: LP says that atomic proposition is always false: (2 <= P-sendAnnPs__broadcasting_7_3)
lola: LP says that atomic proposition is always true: (P-sendAnnPs__broadcasting_2_1 <= P-masterState_3_T_0)
lola: LP says that atomic proposition is always true: (1 <= P-stage_3_NEG)
lola: LP says that atomic proposition is always true: (P-poll__pollEnd_0 <= P-sendAnnPs__broadcasting_0_6)
lola: LP says that atomic proposition is always true: (P-startNeg__broadcasting_0_3 <= P-polling_0)
lola: LP says that atomic proposition is always true: (P-poll__pollEnd_0 <= P-sendAnnPs__broadcasting_0_6)
lola: place invariant simplifies atomic proposition
lola: before: (0 <= P-dead_2)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (P-electionFailed_4 <= P-masterList_6_7_2)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (P-dead_1 <= P-sendAnnPs__broadcasting_2_4)
lola: after: (0 <= P-sendAnnPs__broadcasting_2_4)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= P-network_5_5_AnnP_5)
lola: after: (1 <= 0)
lola: LP says that atomic proposition is always true: (P-electedPrimary_2 <= P-startNeg__broadcasting_4_6)
lola: LP says that atomic proposition is always false: (3 <= P-electedSecondary_2)
lola: LP says that atomic proposition is always false: (1 <= P-masterState_4_T_7)
lola: place invariant simplifies atomic proposition
lola: before: (P-poll__pollEnd_1 <= P-dead_1)
lola: after: (P-poll__pollEnd_1 <= 0)
lola: LP says that atomic proposition is always false: (3 <= P-masterState_2_F_4)
lola: place invariant simplifies atomic proposition
lola: before: (2 <= P-crashed_4)
lola: after: (2 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (P-electionFailed_3 <= P-crashed_0)
lola: after: (0 <= 0)
lola: A ((NOT(F ((0 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0))) AND F (()))) : A ((F ((3 <= 0)) U (3 <= 0))) : A (X (((P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0 <= 6) OR F (NOT(G (F (X (((43 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7) U F ((42 <= P-polling_0 + P-polling_1 + P-polling_2 + P-polling_3 + P-polling_4 + P-polling_5 + P-polling_6 + P-polling_7))))))))))) : A (X (((7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0) U (P-network_2_7_AskP_0 + P-network_1_0_RI_0 + P-network_1_2_AnsP_7 + P-network_1_2_AnsP_6 + P-network_1_2_AnsP_5 + P-network_1_2_AnsP_4 + P-network_1_2_AnsP_3 + P-network_1_2_AnsP_2 + P-network_1_2_AnsP_1 + P-network_1_2_AnsP_0 + P-network_6_0_AskP_0 + P-network_6_5_AnsP_7 + P-network_6_5_AnsP_6 + P-network_6_5_AnsP_5 + P-network_6_5_AnsP_4 + P-network_6_5_AnsP_3 + P-network_6_5_AnsP_2 + P-network_3_4_AnnP_0 + P-network_6_5_AnsP_1 + P-network_6_5_AnsP_0 + P-network_0_0_AnnP_0 + P-network_1_2_RP_0 + P-network_5_3_AnnP_0 + P-network_4_6_AnsP_0 + P-network_4_6_AnsP_1 + P-network_4_6_AnsP_2 + P-network_4_6_AnsP_3 + P-network_4_6_AnsP_4 + P-network_4_6_AnsP_5 + P-network_4_6_AnsP_6 + P-network_4_6_AnsP_7 + P-network_3_1_RP_0 + P-network_5_0_RP_0 + P-network_4_6_AskP_0 + P-network_3_1_AnsP_7 + P-network_3_1_AnsP_6 + P-network_3_1_AnsP_5 + P-network_3_1_AnsP_4 + P-network_3_1_AnsP_3 + P-network_3_1_AnsP_2 + P-network_3_1_AnsP_1 + P-network_3_1_AnsP_0 + P-network_0_3_RI_0 + P-network_2_2_RI_0 + P-network_1_2_AskP_0 + P-network_7_2_AnnP_0 + P-network_4_1_RI_0 + P-network_4_1_AskP_0 + P-network_6_0_RI_0 + P-network_1_7_AnsP_7 + P-network_1_7_AnsP_6 + P-network_1_7_AnsP_5 + P-network_1_7_AnsP_4 + P-network_1_7_AnsP_3 + P-network_1_7_AnsP_2 + P-network_1_7_AnsP_1 + P-network_1_7_AnsP_0 + P-network_6_5_AskP_0 + P-network_0_5_RP_0 + P-network_0_5_AnnP_0 + P-network_1_1_AI_0 + P-network_5_0_AnsP_7 + P-network_5_0_AnsP_6 + P-network_0_0_RP_0 + 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_2_4_RP_0 + P-network_3_0_AI_0 + P-network_4_3_RP_0 + P-network_6_2_RP_0 + P-network_3_1_AskP_0 + P-network_3_6_AnsP_7 + P-network_3_6_AnsP_6 + P-network_3_6_AnsP_5 + P-network_3_6_AnsP_4 + P-network_3_6_AnsP_3 + P-network_3_6_AnsP_2 + P-network_3_6_AnsP_1 + P-network_3_6_AnsP_0 + P-network_1_5_RI_0 + P-network_2_4_AnnP_0 + P-network_3_4_RI_0 + P-network_5_3_RI_0 + P-network_7_6_AI_0 + P-network_7_2_RI_0 + P-network_1_7_AskP_0 + P-network_7_7_AnnP_0 + P-network_5_7_AI_0 + P-network_6_0_AnsP_0 + P-network_6_0_AnsP_1 + P-network_6_0_AnsP_2 + P-network_6_0_AnsP_3 + P-network_6_0_AnsP_4 + P-network_6_0_AnsP_5 + P-network_6_0_AnsP_6 + P-network_6_0_AnsP_7 + P-network_0_4_AI_0 + P-network_1_7_RP_0 + P-network_0_2_AnsP_7 + P-network_0_2_AnsP_6 + P-network_0_2_AnsP_5 + P-network_0_2_AnsP_4 + P-network_0_2_AnsP_3 + P-network_0_2_AnsP_2 + P-network_1_5_AnnP_0 + P-network_0_2_AnsP_1 + P-network_0_2_AnsP_0 + P-network_2_3_AI_0 + P-network_3_6_RP_0 + P-network_5_0_AskP_0 + P-network_4_2_AI_0 + P-network_5_5_RP_0 + P-network_6_1_AI_0 + P-network_5_5_AnsP_7 + P-network_5_5_AnsP_6 + P-network_5_5_AnsP_5 + P-network_5_5_AnsP_4 + P-network_5_5_AnsP_3 + P-network_5_5_AnsP_2 + P-network_5_5_AnsP_1 + P-network_5_5_AnsP_0 + P-network_7_4_RP_0 + P-network_7_5_AskP_0 + P-network_4_3_AnnP_0 + P-network_3_6_AskP_0 + P-network_2_7_RI_0 + P-network_2_1_AnsP_7 + P-network_2_1_AnsP_6 + P-network_2_1_AnsP_5 + P-network_2_7_AnsP_0 + P-network_2_7_AnsP_1 + P-network_2_7_AnsP_2 + P-network_2_7_AnsP_3 + P-network_2_7_AnsP_4 + P-network_2_7_AnsP_5 + P-network_2_7_AnsP_6 + P-network_2_7_AnsP_7 + P-network_2_1_AnsP_4 + P-network_2_1_AnsP_3 + P-network_2_1_AnsP_2 + P-network_2_1_AnsP_1 + P-network_2_1_AnsP_0 + P-network_4_6_RI_0 + P-network_6_5_RI_0 + P-network_7_4_AnsP_7 + P-network_2_2_AskP_0 + P-network_7_4_AnsP_6 + P-network_7_4_AnsP_5 + P-network_7_4_AnsP_4 + P-network_7_4_AnsP_3 + P-network_7_4_AnsP_2 + P-network_7_4_AnsP_1 + P-network_7_4_AnsP_0 + P-network_1_6_AI_0 + P-network_0_2_AskP_0 + P-network_6_2_AnnP_0 + P-network_3_5_AI_0 + P-network_5_4_AI_0 + P-network_6_7_RP_0 + P-network_0_7_AnsP_7 + P-network_0_7_AnsP_6 + P-network_0_7_AnsP_5 + P-network_0_7_AnsP_4 + P-network_0_7_AnsP_3 + P-network_0_7_AnsP_2 + P-network_0_7_AnsP_1 + P-network_0_7_AnsP_0 + P-network_7_3_AI_0 + P-network_5_5_AskP_0 + P-network_4_0_AnsP_7 + P-network_4_0_AnsP_6 + P-network_4_0_AnsP_5 + P-network_4_0_AnsP_4 + P-network_4_0_AnsP_3 + P-network_4_0_AnsP_2 + P-network_4_0_AnsP_1 + P-network_4_0_AnsP_0 + P-network_4_1_AnsP_0 + P-network_4_1_AnsP_1 + P-network_4_1_AnsP_2 + P-network_4_1_AnsP_3 + P-network_4_1_AnsP_4 + P-network_4_1_AnsP_5 + P-network_4_1_AnsP_6 + P-network_4_1_AnsP_7 + P-network_2_1_AskP_0 + P-network_7_7_RI_0 + P-network_2_6_AnsP_7 + P-network_5_6_AskP_0 + P-network_2_6_AnsP_6 + P-network_2_6_AnsP_5 + 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_7_4_AskP_0 + P-network_7_7_RP_0 + P-network_1_4_AnnP_0 + P-network_4_7_AI_0 + P-network_6_4_AI_0 + P-network_6_6_AI_0 + P-network_0_7_AskP_0 + P-network_6_7_AnnP_0 + P-network_4_0_AskP_0 + P-network_4_5_AnsP_7 + P-network_4_5_AnsP_6 + P-network_4_5_AI_0 + 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_6_3_AnnP_0 + P-network_3_3_AnnP_0 + P-network_0_3_AskP_0 + P-network_2_6_AskP_0 + P-network_0_0_RI_0 + P-network_1_1_AnsP_7 + P-network_1_1_AnsP_6 + P-network_2_6_AI_0 + 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_6_4_AnsP_7 + P-network_6_4_AnsP_6 + P-network_0_7_AI_0 + 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_1_0_AnnP_0 + P-network_0_2_RP_0 + P-network_7_5_AnsP_0 + P-network_7_5_AnsP_1 + P-network_7_5_AnsP_2 + P-network_7_5_AnsP_3 + P-network_7_5_AnsP_4 + P-network_7_5_AnsP_5 + P-network_7_5_AnsP_6 + P-network_7_5_AnsP_7 + P-network_5_2_AnnP_0 + P-network_2_1_RP_0 + P-network_7_5_RI_0 + P-network_4_0_RP_0 + P-network_4_5_AskP_0 + P-network_3_0_AnsP_7 + P-network_3_0_AnsP_6 + P-network_3_0_AnsP_5 + P-network_3_0_AnsP_4 + P-network_3_0_AnsP_3 + P-network_3_0_AnsP_2 + P-network_3_0_AnsP_1 + P-network_3_0_AnsP_0 + P-network_7_0_AskP_0 + P-network_5_6_RI_0 + P-network_1_2_RI_0 + P-network_1_1_AskP_0 + P-network_7_1_AnnP_0 + P-network_3_1_RI_0 + P-network_5_0_RI_0 + P-network_1_6_AnsP_7 + P-network_1_6_AnsP_6 + P-network_1_6_AnsP_5 + P-network_1_6_AnsP_4 + P-network_1_6_AnsP_3 + P-network_1_6_AnsP_2 + P-network_1_6_AnsP_1 + P-network_1_6_AnsP_0 + P-network_6_4_AskP_0 + P-network_2_2_AnsP_0 + P-network_2_2_AnsP_1 + P-network_2_2_AnsP_2 + P-network_2_2_AnsP_3 + P-network_2_2_AnsP_4 + P-network_2_2_AnsP_5 + P-network_2_2_AnsP_6 + P-network_2_2_AnsP_7 + P-network_0_4_AnnP_0 + P-network_0_1_AI_0 + P-network_1_4_RP_0 + P-network_2_0_AI_0 + P-network_3_3_RP_0 + P-network_3_7_RI_0 + P-network_5_2_RP_0 + P-network_5_7_AnnP_0 + P-network_7_1_RP_0 + P-network_3_0_AskP_0 + P-network_3_5_AnsP_7 + 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_3_5_AnsP_1 + P-network_3_7_AskP_0 + P-network_3_5_AnsP_0 + P-network_0_5_RI_0 + P-network_2_3_AnnP_0 + P-network_2_4_RI_0 + P-network_4_3_RI_0 + P-network_6_2_RI_0 + P-network_1_6_AskP_0 + P-network_7_6_AnnP_0 + P-network_0_7_RP_0 + P-network_0_1_AnsP_7 + P-network_0_1_AnsP_6 + P-network_0_1_AnsP_5 + P-network_0_1_AnsP_4 + P-network_0_1_AnsP_3 + P-network_0_1_AnsP_2 + P-network_4_4_AnnP_0 + P-network_0_1_AnsP_1 + P-network_0_1_AnsP_0 + P-network_1_3_AI_0 + P-network_2_6_RP_0 + P-network_3_2_AI_0 + P-network_4_5_RP_0 + P-network_5_1_AI_0 + P-network_5_4_AnsP_7 + P-network_5_4_AnsP_6 + P-network_5_4_AnsP_5 + P-network_5_4_AnsP_4 + P-network_5_4_AnsP_3 + P-network_5_4_AnsP_2 + P-network_5_4_AnsP_1 + P-network_5_6_AnsP_0 + P-network_5_6_AnsP_1 + P-network_5_6_AnsP_2 + P-network_5_6_AnsP_3 + P-network_5_6_AnsP_4 + P-network_5_6_AnsP_5 + P-network_5_6_AnsP_6 + P-network_5_6_AnsP_7 + P-network_7_1_AI_0 + P-network_5_4_AnsP_0 + P-network_6_4_RP_0 + P-network_7_0_AI_0 + P-network_4_2_AnnP_0 + P-network_3_5_AskP_0 + P-network_1_7_RI_0 + P-network_6_5_RP_0 + P-network_2_0_AnsP_7 + P-network_2_0_AnsP_6 + P-network_2_0_AnsP_5 + P-network_2_0_AnsP_4 + P-network_2_0_AnsP_3 + P-network_2_0_AnsP_2 + P-network_2_0_AnsP_1 + P-network_5_2_AI_0 + P-network_2_0_AnsP_0 + P-network_3_6_RI_0 + P-network_5_5_RI_0 + P-network_7_4_RI_0 + P-network_7_3_AnsP_7 + P-network_7_3_AnsP_6 + P-network_5_1_AskP_0 + P-network_7_3_AnsP_5 + P-network_7_3_AnsP_4 + P-network_7_3_AnsP_3 + P-network_7_3_AnsP_2 + P-network_7_3_AnsP_1 + P-network_7_3_AnsP_0 + P-network_0_6_AI_0 + P-network_4_6_RP_0 + P-network_0_1_AskP_0 + P-network_6_1_AnnP_0 + P-network_2_5_AI_0 + P-network_4_4_AI_0 + P-network_5_7_RP_0 + P-network_0_6_AnsP_7 + P-network_0_6_AnsP_6 + P-network_3_3_AI_0 + 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_0_3_AnsP_0 + P-network_0_3_AnsP_1 + P-network_0_3_AnsP_2 + P-network_0_3_AnsP_3 + P-network_0_3_AnsP_4 + P-network_0_3_AnsP_5 + P-network_0_3_AnsP_6 + P-network_0_3_AnsP_7 + P-network_2_7_RP_0 + P-network_6_3_AI_0 + P-network_7_6_RP_0 + P-network_5_4_AskP_0 + P-network_1_4_AI_0 + P-network_6_3_RI_0 + P-network_4_7_AnnP_0 + P-network_2_0_AskP_0 + P-network_6_7_RI_0 + P-network_7_0_AnsP_0 + P-network_7_0_AnsP_1 + P-network_7_0_AnsP_2 + P-network_7_0_AnsP_3 + P-network_7_0_AnsP_4 + P-network_7_0_AnsP_5 + P-network_7_0_AnsP_6 + P-network_7_0_AnsP_7 + P-network_4_4_RI_0 + P-network_2_5_AnsP_7 + P-network_2_5_AnsP_6 + P-network_2_5_AnsP_5 + P-network_2_5_AnsP_4 + P-network_2_5_AnsP_3 + P-network_2_5_AnsP_2 + P-network_2_5_AnsP_1 + P-network_2_5_AnsP_0 + P-network_7_3_AskP_0 + P-network_1_3_AnnP_0 + P-network_3_7_AI_0 + P-network_2_5_AnnP_0 + P-network_5_6_AI_0 + P-network_0_6_AskP_0 + P-network_6_6_AnnP_0 + P-network_7_5_AI_0 + P-network_2_5_RI_0 + P-network_0_6_RI_0 + P-network_3_7_AnsP_0 + P-network_3_7_AnsP_1 + P-network_3_7_AnsP_2 + P-network_3_7_AnsP_3 + P-network_3_7_AnsP_4 + P-network_3_7_AnsP_5 + P-network_3_7_AnsP_6 + P-network_3_7_AnsP_7 + P-network_4_4_AnsP_7 + P-network_4_4_AnsP_6 + P-network_4_4_AnsP_5 + P-network_4_4_AnsP_4 + P-network_4_4_AnsP_3 + P-network_4_4_AnsP_2 + P-network_4_4_AnsP_1 + P-network_4_4_AnsP_0 + P-network_3_2_AnnP_0 + P-network_3_2_AskP_0 + P-network_2_5_AskP_0 + P-network_1_0_AnsP_7 + P-network_1_0_AnsP_6 + P-network_1_0_AnsP_5 + P-network_1_0_AnsP_4 + P-network_1_0_AnsP_3 + P-network_1_0_AnsP_2 + P-network_1_0_AnsP_1 + P-network_1_0_AnsP_0 + P-network_6_3_AnsP_7 + P-network_6_3_AnsP_6 + P-network_6_3_AnsP_5 + P-network_6_3_AnsP_4 + P-network_6_3_AnsP_3 + P-network_6_3_AnsP_2 + P-network_6_3_AnsP_1 + P-network_6_3_AnsP_0 + P-network_5_1_AnnP_0 + P-network_1_1_RP_0 + P-network_3_0_RP_0 + P-network_4_4_AskP_0 + P-network_7_2_RP_0 + P-network_3_7_AnnP_0 + P-network_5_3_RP_0 + P-network_0_2_RI_0 + P-network_1_0_AskP_0 + P-network_7_0_AnnP_0 + P-network_2_1_RI_0 + P-network_4_0_RI_0 + P-network_4_0_AI_0 + P-network_1_5_AnsP_7 + P-network_1_5_AnsP_6 + P-network_1_5_AnsP_5 + P-network_1_5_AnsP_4 + P-network_1_5_AnsP_3 + P-network_1_5_AnsP_2 + P-network_1_5_AnsP_1 + P-network_1_5_AnsP_0 + P-network_6_3_AskP_0 + P-network_0_3_AnnP_0 + P-network_0_4_RP_0 + P-network_1_0_AI_0 + P-network_2_3_RP_0 + P-network_3_4_RP_0 + P-network_5_1_AnsP_0 + P-network_5_1_AnsP_1 + P-network_5_1_AnsP_2 + P-network_5_1_AnsP_3 + P-network_5_1_AnsP_4 + P-network_5_1_AnsP_5 + P-network_5_1_AnsP_6 + P-network_5_1_AnsP_7 + P-network_2_1_AI_0 + P-network_4_2_RP_0 + P-network_5_6_AnnP_0 + P-network_6_1_RP_0 + P-network_3_4_AnsP_7 + P-network_3_4_AnsP_6 + P-network_0_6_AnnP_0 + P-network_3_4_AnsP_5 + P-network_3_4_AnsP_4 + P-network_3_4_AnsP_3 + P-network_3_4_AnsP_2 + P-network_3_4_AnsP_1 + P-network_3_4_AnsP_0 + P-network_1_5_RP_0 + P-network_2_2_AnnP_0 + P-network_1_4_RI_0 + P-network_3_3_RI_0 + P-network_0_2_AI_0 + P-network_5_2_RI_0 + P-network_1_5_AskP_0 + P-network_7_5_AnnP_0 + P-network_6_6_AskP_0 + P-network_7_1_RI_0 + P-network_0_0_AnsP_7 + P-network_0_0_AnsP_6 + P-network_0_0_AnsP_5 + P-network_0_0_AnsP_4 + P-network_0_0_AnsP_3 + P-network_0_0_AnsP_2 + P-network_0_0_AnsP_1 + P-network_0_0_AnsP_0 + P-network_0_3_AI_0 + P-network_1_6_RP_0 + P-network_2_2_AI_0 + P-network_3_5_RP_0 + P-network_4_1_AI_0 + P-network_7_0_RI_0 + P-network_5_3_AnsP_7 + P-network_5_3_AnsP_6 + P-network_5_3_AnsP_5 + P-network_5_3_AnsP_4 + P-network_5_3_AnsP_3 + P-network_5_3_AnsP_2 + P-network_5_3_AnsP_1 + P-network_5_1_RI_0 + P-network_5_3_AnsP_0 + P-network_5_4_RP_0 + P-network_6_0_AI_0 + P-network_7_3_RP_0 + P-network_7_3_AnnP_0 + P-network_4_1_AnnP_0 + P-network_1_3_AskP_0 + P-network_3_2_RI_0 + P-network_3_4_AskP_0 + P-network_0_7_RI_0 + P-network_2_6_RI_0 + P-network_4_5_RI_0 + P-network_1_3_RI_0 + P-network_2_7_AnnP_0 + P-network_6_4_RI_0 + P-network_7_2_AnsP_7 + P-network_7_2_AnsP_6 + P-network_7_2_AnsP_5 + P-network_7_2_AnsP_4 + P-network_7_2_AnsP_3 + P-network_2_0_AnnP_0 + P-network_7_2_AnsP_2 + P-network_7_2_AnsP_1 + P-network_7_2_AnsP_0 + P-network_0_0_AskP_0 + P-network_6_0_AnnP_0 + P-network_1_5_AI_0 + P-network_3_4_AI_0 + P-network_4_7_RP_0 + P-network_0_5_AnsP_7 + P-network_0_5_AnsP_6 + P-network_0_5_AnsP_5 + P-network_0_5_AnsP_4 + P-network_0_5_AnsP_3 + P-network_0_5_AnsP_2 + P-network_0_5_AnsP_1 + P-network_0_5_AnsP_0 + P-network_5_3_AI_0 + P-network_6_6_RP_0 + P-network_5_3_AskP_0 + P-network_7_2_AI_0 + P-network_4_6_AnnP_0 + P-network_5_7_RI_0 + P-network_2_4_AnsP_7 + P-network_2_4_AnsP_6 + P-network_2_4_AnsP_5 + P-network_2_4_AnsP_4 + P-network_2_4_AnsP_3 + P-network_2_4_AnsP_2 + P-network_2_4_AnsP_1 + P-network_3_2_AnsP_0 + P-network_3_2_AnsP_1 + P-network_3_2_AnsP_2 + P-network_3_2_AnsP_3 + P-network_3_2_AnsP_4 + P-network_3_2_AnsP_5 + P-network_3_2_AnsP_6 + P-network_3_2_AnsP_7 + P-network_2_4_AnsP_0 + P-network_7_6_RI_0 + P-network_7_2_AskP_0 + P-network_7_7_AnsP_7 + P-network_7_7_AnsP_6 + P-network_7_7_AnsP_5 + P-network_7_7_AnsP_4 + P-network_7_7_AnsP_3 + P-network_7_7_AnsP_2 + P-network_4_7_AskP_0 + P-network_7_7_AnsP_1 + P-network_7_7_AnsP_0 + P-network_1_2_AnnP_0 + P-network_2_7_AI_0 + P-network_4_6_AI_0 + P-network_0_5_AskP_0 + P-network_6_5_AnnP_0 + P-network_6_5_AI_0 + P-network_6_0_RP_0 + P-network_4_3_AnsP_7 + P-network_4_3_AnsP_6 + P-network_4_3_AnsP_5 + P-network_4_3_AnsP_4 + P-network_4_3_AnsP_3 + P-network_4_3_AnsP_2 + P-network_4_3_AnsP_1 + P-network_4_3_AnsP_0 + P-network_4_1_RP_0 + P-network_3_1_AnnP_0 + P-network_2_4_AskP_0 + P-network_5_4_AnnP_0 + P-network_7_7_AskP_0 + P-network_1_7_AnnP_0 + P-network_2_2_RP_0 + P-network_6_2_AnsP_7 + P-network_6_2_AnsP_6 + P-network_6_2_AnsP_5 + P-network_6_2_AnsP_4 + P-network_6_2_AnsP_3 + P-network_6_2_AnsP_2 + P-network_6_2_AnsP_1 + P-network_6_2_AnsP_0 + P-network_7_7_AI_0 + P-network_5_0_AnnP_0 + P-network_0_1_RP_0 + P-network_0_3_RP_0 + P-network_2_0_RP_0 + P-network_4_3_AskP_0 + P-network_3_6_AnnP_0 + P-network_0_1_AnnP_0 + P-network_6_6_AnsP_0 + P-network_6_6_AnsP_1 + P-network_6_6_AnsP_2 + P-network_6_6_AnsP_3 + P-network_6_6_AnsP_4 + P-network_6_6_AnsP_5 + P-network_6_6_AnsP_6 + P-network_6_6_AnsP_7 + P-network_1_1_RI_0 + P-network_3_0_RI_0 + P-network_1_4_AnsP_7 + P-network_1_4_AnsP_6 + P-network_1_4_AnsP_5 + P-network_1_4_AnsP_4 + P-network_6_1_AskP_0 + P-network_1_4_AnsP_3 + P-network_1_4_AnsP_2 + P-network_1_4_AnsP_1 + P-network_1_4_AnsP_0 + P-network_6_2_AskP_0 + P-network_6_7_AnsP_7 + P-network_1_3_AnsP_0 + P-network_1_3_AnsP_1 + P-network_1_3_AnsP_2 + P-network_1_3_AnsP_3 + P-network_1_3_AnsP_4 + P-network_1_3_AnsP_5 + P-network_1_3_AnsP_6 + P-network_1_3_AnsP_7 + P-network_2_0_RI_0 + P-network_6_7_AnsP_6 + P-network_6_7_AnsP_5 + P-network_6_7_AnsP_4 + P-network_6_7_AnsP_3 + P-network_6_7_AnsP_2 + P-network_6_7_AnsP_1 + P-network_6_7_AnsP_0 + P-network_0_2_AnnP_0 + P-network_0_0_AI_0 + P-network_1_3_RP_0 + P-network_3_2_RP_0 + P-network_5_5_AnnP_0 + P-network_0_1_RI_0 + P-network_5_1_RP_0 + P-network_7_0_RP_0 + P-network_3_3_AnsP_7 + 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_2_1_AnnP_0 + P-network_0_4_RI_0 + P-network_2_3_RI_0 + P-network_4_2_RI_0 + P-network_1_4_AskP_0 + P-network_7_4_AnnP_0 + P-network_6_1_RI_0 + P-network_6_7_AskP_0 + P-network_0_6_RP_0 + P-network_1_2_AI_0 + P-network_2_5_RP_0 + P-network_0_7_AnnP_0 + P-network_3_1_AI_0 + P-network_5_2_AnsP_7 + P-network_5_2_AnsP_6 + P-network_5_2_AnsP_5 + P-network_5_2_AnsP_4 + P-network_5_2_AnsP_3 + P-network_3_5_AnnP_0 + P-network_5_2_AnsP_2 + P-network_5_2_AnsP_1 + P-network_5_2_AnsP_0 + P-network_4_4_RP_0 + P-network_5_0_AI_0 + P-network_6_3_RP_0 + P-network_4_0_AnnP_0 + P-network_3_3_AskP_0 + P-network_4_7_AnsP_0 + P-network_4_7_AnsP_1 + P-network_4_7_AnsP_2 + P-network_4_7_AnsP_3 + P-network_4_7_AnsP_4 + P-network_4_7_AnsP_5 + P-network_4_7_AnsP_6 + P-network_4_7_AnsP_7 + P-network_1_6_RI_0 + P-network_3_5_RI_0 + P-network_2_6_AnnP_0 + P-network_5_4_RI_0 + P-network_7_1_AnsP_7 + P-network_7_1_AnsP_6 + P-network_7_1_AnsP_5 + P-network_7_1_AnsP_4 + P-network_7_1_AnsP_3 + P-network_7_1_AnsP_2 + P-network_7_1_AnsP_1 + P-network_7_1_AnsP_0 + P-network_7_3_RI_0 + P-network_0_5_AI_0 + P-network_2_4_AI_0 + P-network_3_7_RP_0 + P-network_4_2_AskP_0 + P-network_0_4_AnsP_7 + P-network_0_4_AnsP_6 + P-network_0_4_AnsP_5 + P-network_0_4_AnsP_4 + P-network_0_4_AnsP_3 + P-network_0_4_AnsP_2 + P-network_0_4_AnsP_1 + P-network_0_4_AnsP_0 + P-network_1_0_RP_0 + P-network_4_3_AI_0 + P-network_5_6_RP_0 + P-network_5_2_AskP_0 + P-network_6_2_AI_0 + P-network_7_5_RP_0 + P-network_5_7_AnsP_7 + P-network_5_7_AnsP_6 + P-network_5_7_AnsP_5 + P-network_5_7_AnsP_4 + P-network_5_7_AnsP_3 + P-network_5_7_AnsP_2 + P-network_5_7_AnsP_1 + P-network_5_7_AnsP_0 + P-network_4_5_AnnP_0 + P-network_4_7_RI_0 + P-network_2_3_AnsP_7 + P-network_2_3_AnsP_6 + P-network_2_3_AnsP_5 + P-network_2_3_AnsP_4 + P-network_2_3_AnsP_3 + P-network_6_7_AI_0 + P-network_2_3_AnsP_2 + P-network_2_3_AnsP_1 + P-network_2_3_AnsP_0 + P-network_6_6_RI_0 + P-network_7_1_AskP_0 + P-network_7_6_AnsP_7 + P-network_7_6_AnsP_6 + P-network_6_1_AnsP_0 + P-network_6_1_AnsP_1 + P-network_6_1_AnsP_2 + P-network_6_1_AnsP_3 + P-network_6_1_AnsP_4 + P-network_6_1_AnsP_5 + P-network_6_1_AnsP_6 + P-network_6_1_AnsP_7 + P-network_7_6_AnsP_5 + P-network_7_6_AnsP_4 + P-network_7_6_AnsP_3 + P-network_7_6_AnsP_2 + P-network_7_6_AnsP_1 + P-network_7_6_AnsP_0 + P-network_1_1_AnnP_0 + P-network_1_7_AI_0 + P-network_1_6_AnnP_0 + P-network_7_6_AskP_0 + P-network_3_6_AI_0 + P-network_0_4_AskP_0 + P-network_6_4_AnnP_0 + P-network_5_5_AI_0 + P-network_7_4_AI_0 + P-network_5_7_AskP_0 + P-network_4_2_AnsP_7 + P-network_4_2_AnsP_6 + P-network_4_2_AnsP_5 + P-network_4_2_AnsP_4 + P-network_4_2_AnsP_3 + P-network_4_2_AnsP_2 + P-network_4_2_AnsP_1 + P-network_4_2_AnsP_0 + P-network_2_3_AskP_0 + P-network_3_0_AnnP_0 <= 0)))) : A (F ((NOT(X ((42 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1))) AND G (X ((P-electedPrimary_7 + P-electedPrimary_6 + P-electedPrimary_5 + P-electedPrimary_4 + P-electedPrimary_3 + P-electedPrimary_2 + P-electedPrimary_1 + P-electedPrimary_0 <= 7)))))) : A (((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0) U X (((() U NOT(G (X ((P-startNeg__broadcasting_0_5 + P-startNeg__broadcasting_0_4 + P-startNeg__broadcasting_0_3 + P-startNeg__broadcasting_1_1 + P-startNeg__broadcasting_1_2 + P-startNeg__broadcasting_1_3 + P-startNeg__broadcasting_1_4 + P-startNeg__broadcasting_1_5 + P-startNeg__broadcasting_1_6 + P-startNeg__broadcasting_1_7 + P-startNeg__broadcasting_0_2 + P-startNeg__broadcasting_0_1 + P-startNeg__broadcasting_2_1 + P-startNeg__broadcasting_2_2 + P-startNeg__broadcasting_2_3 + P-startNeg__broadcasting_2_4 + P-startNeg__broadcasting_2_5 + P-startNeg__broadcasting_2_6 + P-startNeg__broadcasting_2_7 + P-startNeg__broadcasting_3_1 + P-startNeg__broadcasting_3_2 + P-startNeg__broadcasting_3_3 + P-startNeg__broadcasting_3_4 + P-startNeg__broadcasting_3_5 + P-startNeg__broadcasting_3_6 + P-startNeg__broadcasting_3_7 + P-startNeg__broadcasting_4_1 + P-startNeg__broadcasting_4_2 + P-startNeg__broadcasting_4_3 + P-startNeg__broadcasting_4_4 + P-startNeg__broadcasting_4_5 + P-startNeg__broadcasting_4_6 + P-startNeg__broadcasting_4_7 + P-startNeg__broadcasting_5_1 + P-startNeg__broadcasting_5_2 + P-startNeg__broadcasting_5_3 + P-startNeg__broadcasting_5_4 + P-startNeg__broadcasting_5_5 + P-startNeg__broadcasting_5_6 + P-startNeg__broadcasting_5_7 + P-startNeg__broadcasting_6_1 + P-startNeg__broadcasting_6_2 + P-startNeg__broadcasting_6_3 + P-startNeg__broadcasting_6_4 + P-startNeg__broadcasting_6_5 + P-startNeg__broadcasting_6_6 + P-startNeg__broadcasting_6_7 + P-startNeg__broadcasting_7_1 + P-startNeg__broadcasting_7_2 + P-startNeg__broadcasting_7_3 + P-startNeg__broadcasting_7_4 + P-startNeg__broadcasting_7_5 + P-startNeg__broadcasting_7_6 + P-startNeg__broadcasting_7_7 + P-startNeg__broadcasting_0_6 + P-startNeg__broadcasting_0_7 <= 7))))) OR G ((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0)))))) : A (NOT(X (X (F (((F ((P-electedSecondary_0 + P-electedSecondary_1 + P-electedSecondary_2 + P-electedSecondary_3 + P-electedSecondary_4 + P-electedSecondary_5 + P-electedSecondary_6 + P-electedSecondary_7 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1)) OR X ((P-electedSecondary_0 + P-electedSecondary_1 + P-electedSecondary_2 + P-electedSecondary_3 + P-electedSecondary_4 + P-electedSecondary_5 + P-electedSecondary_6 + P-electedSecondary_7 <= P-sendAnnPs__broadcasting_7_7 + P-sendAnnPs__broadcasting_7_6 + P-sendAnnPs__broadcasting_7_5 + P-sendAnnPs__broadcasting_7_4 + P-sendAnnPs__broadcasting_7_3 + P-sendAnnPs__broadcasting_7_2 + P-sendAnnPs__broadcasting_7_1 + P-sendAnnPs__broadcasting_6_7 + P-sendAnnPs__broadcasting_6_6 + P-sendAnnPs__broadcasting_6_5 + P-sendAnnPs__broadcasting_6_4 + P-sendAnnPs__broadcasting_6_3 + P-sendAnnPs__broadcasting_6_2 + P-sendAnnPs__broadcasting_6_1 + P-sendAnnPs__broadcasting_5_7 + P-sendAnnPs__broadcasting_5_6 + P-sendAnnPs__broadcasting_5_5 + P-sendAnnPs__broadcasting_5_4 + P-sendAnnPs__broadcasting_5_3 + P-sendAnnPs__broadcasting_5_2 + P-sendAnnPs__broadcasting_5_1 + P-sendAnnPs__broadcasting_4_7 + P-sendAnnPs__broadcasting_4_6 + P-sendAnnPs__broadcasting_4_5 + P-sendAnnPs__broadcasting_4_4 + P-sendAnnPs__broadcasting_4_3 + P-sendAnnPs__broadcasting_4_2 + P-sendAnnPs__broadcasting_4_1 + P-sendAnnPs__broadcasting_3_7 + P-sendAnnPs__broadcasting_3_6 + P-sendAnnPs__broadcasting_3_5 + P-sendAnnPs__broadcasting_3_4 + P-sendAnnPs__broadcasting_3_3 + P-sendAnnPs__broadcasting_3_2 + P-sendAnnPs__broadcasting_3_1 + P-sendAnnPs__broadcasting_2_7 + P-sendAnnPs__broadcasting_2_6 + P-sendAnnPs__broadcasting_2_5 + P-sendAnnPs__broadcasting_2_4 + P-sendAnnPs__broadcasting_2_3 + P-sendAnnPs__broadcasting_2_2 + P-sendAnnPs__broadcasting_2_1 + P-sendAnnPs__broadcasting_1_7 + P-sendAnnPs__broadcasting_1_6 + P-sendAnnPs__broadcasting_1_5 + P-sendAnnPs__broadcasting_1_4 + P-sendAnnPs__broadcasting_1_3 + P-sendAnnPs__broadcasting_1_2 + P-sendAnnPs__broadcasting_1_1 + P-sendAnnPs__broadcasting_0_7 + P-sendAnnPs__broadcasting_0_6 + P-sendAnnPs__broadcasting_0_5 + P-sendAnnPs__broadcasting_0_4 + P-sendAnnPs__broadcasting_0_3 + P-sendAnnPs__broadcasting_0_2 + P-sendAnnPs__broadcasting_0_1))) AND X (X ((3 <= P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7))))))))) : A (F (((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= 0) AND X (X ((7 <= P-poll__waitingMessage_6 + P-poll__waitingMessage_2 + P-poll__waitingMessage_0 + P-poll__waitingMessage_1 + P-poll__waitingMessage_3 + P-poll__waitingMessage_4 + P-poll__waitingMessage_5 + P-poll__waitingMessage_7)))))) : A (F (G (X (((P-sendAnnPs__broadcasting_2_1 <= P-masterState_3_T_0) OR NOT((() OR F (((P-sendAnnPs__broadcasting_2_1 <= P-masterState_3_T_0) U G ((1 <= P-stage_3_NEG))))))))))) : A (X (G ((X ((G ((P-poll__pollEnd_0 <= P-sendAnnPs__broadcasting_0_6)) AND F ((P-startNeg__broadcasting_0_3 <= P-polling_0)))) AND X ((P-poll__pollEnd_0 <= P-sendAnnPs__broadcasting_0_6)))))) : A (NOT((G ((G ((0 <= 0)) U (0 <= 0))) U X ((P-sendAnnPs__broadcasting_2_4 + 1 <= 0))))) : A (X (X (F ((() OR X (G (F (NOT(((P-electedPrimary_2 <= P-startNeg__broadcasting_4_6) AND F ((P-stage_6_NEG <= P-poll__pollEnd_3)))))))))))) : A ((G ((3 <= P-electedSecondary_2)) OR ((1 <= P-masterState_4_T_7) AND X (NOT(G ((P-poll__pollEnd_1 <= 0))))))) : A ((((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3) AND (P-poll__networl_6_6_AnsP_3 + 1 <= P-poll__handlingMessage_5)) U G (F (NOT((G ((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3)) U (P-poll__networl_6_6_AnsP_3 + 1 <= P-poll__handlingMessage_5))))))) : A (G (NOT(X ((F (NOT(((P-negotiation_4_3_DONE <= 0) OR X ((1 <= P-masterState_5_T_0))))) U ((P-masterState_5_T_0 <= 0) U (3 <= P-masterState_2_F_4))))))) : A (X (X (G (((0 <= 1) OR X (((P-polling_6 <= P-electedPrimary_6) OR G ((0 <= 0)))))))))
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:118
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:282
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:123
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:282
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:353
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:116
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:353
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:122
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:124
lola: rewrite Frontend/Parser/formula_rewrite.k:116
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:332
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:117
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:124
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:124
lola: rewrite Frontend/Parser/formula_rewrite.k:353
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:116
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:525
lola: rewrite Frontend/Parser/formula_rewrite.k:116
lola: rewrite Frontend/Parser/formula_rewrite.k:353
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:142
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:282
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:116
lola: rewrite Frontend/Parser/formula_rewrite.k:332
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:374
lola: rewrite Frontend/Parser/formula_rewrite.k:380
lola: rewrite Frontend/Parser/formula_rewrite.k:124
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:142
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:329
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:118
lola: rewrite Frontend/Parser/formula_rewrite.k:122
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:431
lola: rewrite Frontend/Parser/formula_rewrite.k:318
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:315
lola: rewrite Frontend/Parser/formula_rewrite.k:329
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:332
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:425
lola: rewrite Frontend/Parser/formula_rewrite.k:318
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:180
lola: rewrite Frontend/Parser/formula_rewrite.k:180
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:282
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:123
lola: rewrite Frontend/Parser/formula_rewrite.k:124
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:142
lola: computing a collection of formulas
lola: RUNNING
lola: subprocess 0 will run for 208 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 1 will run for 222 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 2 will run for 238 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 3 will run for 256 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 4 will run for 277 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 5 will run for 303 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 6 will run for 333 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (X (X (X (G ((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= 2)))))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (X (X (X (G ((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= 2)))))))
lola: processed formula length: 180
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 6 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 568 markings, 568 edges
lola: ========================================
lola: subprocess 7 will run for 370 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 8 markings, 7 edges
lola: ========================================
lola: subprocess 8 will run for 416 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 8 markings, 7 edges
lola: ========================================
lola: subprocess 9 will run for 476 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 8 markings, 7 edges
lola: ========================================
lola: subprocess 10 will run for 555 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (((7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0) U (P-network_2_7_AskP_0 + P-network_1_0_RI_0 + P-network_1_2_AnsP_7 + P-network_1_2_AnsP_6 + P-network_1_2_AnsP_5 + P-network_1_2_AnsP_4 + P-network_1_2_AnsP_3 + P-network_1_2_AnsP_2 + P-network_1_2_AnsP_1 + P-network_1_2_AnsP_0... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (((7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0) U (P-network_2_7_AskP_0 + P-network_1_0_RI_0 + P-network_1_2_AnsP_7 + P-network_1_2_AnsP_6 + P-network_1_2_AnsP_5 + P-network_1_2_AnsP_4 + P-network_1_2_AnsP_3 + P-network_1_2_AnsP_2 + P-network_1_2_AnsP_1 + P-network_1_2_AnsP_0... (shortened)
lola: processed formula length: 18933
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 8 markings, 7 edges
lola: ========================================
lola: subprocess 11 will run for 667 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 8 markings, 7 edges
lola: ========================================
lola: subprocess 12 will run for 833 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 8 markings, 7 edges
lola: ========================================
lola: subprocess 13 will run for 1111 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0) U X (G ((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 ... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 + P-electionInit_4 + P-electionInit_5 + P-electionInit_6 + P-electionInit_7 <= P-poll__pollEnd_7 + P-poll__pollEnd_6 + P-poll__pollEnd_5 + P-poll__pollEnd_4 + P-poll__pollEnd_3 + P-poll__pollEnd_2 + P-poll__pollEnd_1 + P-poll__pollEnd_0) U X (G ((P-electionInit_0 + P-electionInit_1 + P-electionInit_2 + P-electionInit_3 ... (shortened)
lola: processed formula length: 641
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 5 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 568 markings, 568 edges
lola: ========================================
lola: subprocess 14 will run for 1667 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 8 markings, 7 edges
lola: ========================================
lola: subprocess 15 will run for 3335 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (G (F (((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3) AND (F ((P-poll__networl_6_6_AnsP_3 + 1 <= P-poll__handlingMessage_5)) OR G ((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3)))))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (G (F (((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3) AND (F ((P-poll__networl_6_6_AnsP_3 + 1 <= P-poll__handlingMessage_5)) OR G ((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3)))))))
lola: processed formula length: 208
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 4 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method with deletion algorithm (--stubborn=deletion)
lola: using ltl preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: SEARCH
lola: RUNNING
lola: 68629 markings, 185275 edges, 13726 markings/sec, 0 secs
lola: 140493 markings, 398008 edges, 14373 markings/sec, 5 secs
lola: 212922 markings, 599272 edges, 14486 markings/sec, 10 secs
lola: 285540 markings, 818545 edges, 14524 markings/sec, 15 secs
lola: 358313 markings, 1042543 edges, 14555 markings/sec, 20 secs
lola: 427781 markings, 1232473 edges, 13894 markings/sec, 25 secs
lola: 503800 markings, 1456684 edges, 15204 markings/sec, 30 secs
lola: 574324 markings, 1663056 edges, 14105 markings/sec, 35 secs
lola: 640541 markings, 1836809 edges, 13243 markings/sec, 40 secs
lola: 708489 markings, 2052361 edges, 13590 markings/sec, 45 secs
lola: 781747 markings, 2280176 edges, 14652 markings/sec, 50 secs
lola: 857723 markings, 2512193 edges, 15195 markings/sec, 55 secs
lola: 932393 markings, 2775669 edges, 14934 markings/sec, 60 secs
lola: 1006091 markings, 3038127 edges, 14740 markings/sec, 65 secs
lola: 1084524 markings, 3290293 edges, 15687 markings/sec, 70 secs
lola: 1159552 markings, 3554439 edges, 15006 markings/sec, 75 secs
lola: 1233103 markings, 3814499 edges, 14710 markings/sec, 80 secs
lola: 1315158 markings, 4057592 edges, 16411 markings/sec, 85 secs
lola: 1391064 markings, 4313629 edges, 15181 markings/sec, 90 secs
lola: 1466858 markings, 4573343 edges, 15159 markings/sec, 95 secs
lola: 1536709 markings, 4842146 edges, 13970 markings/sec, 100 secs
lola: 1612602 markings, 5095352 edges, 15179 markings/sec, 105 secs
lola: 1687792 markings, 5353601 edges, 15038 markings/sec, 110 secs
lola: 1761042 markings, 5614608 edges, 14650 markings/sec, 115 secs
lola: 1833140 markings, 5875719 edges, 14420 markings/sec, 120 secs
lola: 1912524 markings, 6126490 edges, 15877 markings/sec, 125 secs
lola: 1992218 markings, 6376261 edges, 15939 markings/sec, 130 secs
lola: 2064956 markings, 6641878 edges, 14548 markings/sec, 135 secs
lola: 2136459 markings, 6909706 edges, 14301 markings/sec, 140 secs
lola: 2209083 markings, 7172661 edges, 14525 markings/sec, 145 secs
lola: 2279445 markings, 7442459 edges, 14072 markings/sec, 150 secs
lola: 2350437 markings, 7709673 edges, 14198 markings/sec, 155 secs
lola: 2424150 markings, 7968436 edges, 14743 markings/sec, 160 secs
lola: 2497852 markings, 8229570 edges, 14740 markings/sec, 165 secs
lola: 2569091 markings, 8494585 edges, 14248 markings/sec, 170 secs
lola: 2640345 markings, 8760606 edges, 14251 markings/sec, 175 secs
lola: 2708725 markings, 9029299 edges, 13676 markings/sec, 180 secs
lola: 2781522 markings, 9289701 edges, 14559 markings/sec, 185 secs
lola: 2854581 markings, 9548076 edges, 14612 markings/sec, 190 secs
lola: 2932119 markings, 9794285 edges, 15508 markings/sec, 195 secs
lola: 3011066 markings, 10037472 edges, 15789 markings/sec, 200 secs
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lola: 3170590 markings, 10515785 edges, 16142 markings/sec, 210 secs
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lola: 3323597 markings, 11007163 edges, 15437 markings/sec, 220 secs
lola: 3400579 markings, 11263298 edges, 15396 markings/sec, 225 secs
lola: 3474059 markings, 11524970 edges, 14696 markings/sec, 230 secs
lola: 3549250 markings, 11782718 edges, 15038 markings/sec, 235 secs
lola: 3623124 markings, 12042461 edges, 14775 markings/sec, 240 secs
lola: 3694237 markings, 12307678 edges, 14223 markings/sec, 245 secs
lola: 3763926 markings, 12558727 edges, 13938 markings/sec, 250 secs
lola: 3842434 markings, 12812394 edges, 15702 markings/sec, 255 secs
lola: 3921032 markings, 13063541 edges, 15720 markings/sec, 260 secs
lola: 3993725 markings, 13324764 edges, 14539 markings/sec, 265 secs
lola: 4068877 markings, 13582432 edges, 15030 markings/sec, 270 secs
lola: 4141226 markings, 13842968 edges, 14470 markings/sec, 275 secs
lola: 4217465 markings, 14085200 edges, 15248 markings/sec, 280 secs
lola: 4289287 markings, 14330327 edges, 14364 markings/sec, 285 secs
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lola: 4514479 markings, 15097389 edges, 14456 markings/sec, 300 secs
lola: 4585114 markings, 15363515 edges, 14127 markings/sec, 305 secs
lola: 4650202 markings, 15608832 edges, 13018 markings/sec, 310 secs
lola: 4714555 markings, 15849940 edges, 12871 markings/sec, 315 secs
lola: 4778685 markings, 16102173 edges, 12826 markings/sec, 320 secs
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lola: 4926386 markings, 16601775 edges, 14358 markings/sec, 330 secs
lola: 4990275 markings, 16841438 edges, 12778 markings/sec, 335 secs
lola: 5059403 markings, 17065694 edges, 13826 markings/sec, 340 secs
lola: 5123664 markings, 17297040 edges, 12852 markings/sec, 345 secs
lola: 5191386 markings, 17550786 edges, 13544 markings/sec, 350 secs
lola: 5261686 markings, 17802466 edges, 14060 markings/sec, 355 secs
lola: 5330259 markings, 18051721 edges, 13715 markings/sec, 360 secs
lola: 5401682 markings, 18292858 edges, 14285 markings/sec, 365 secs
lola: 5481036 markings, 18524603 edges, 15871 markings/sec, 370 secs
lola: 5557697 markings, 18761347 edges, 15332 markings/sec, 375 secs
lola: 5634136 markings, 18995328 edges, 15288 markings/sec, 380 secs
lola: 5711148 markings, 19232411 edges, 15402 markings/sec, 385 secs
lola: 5784486 markings, 19472369 edges, 14668 markings/sec, 390 secs
lola: 5856463 markings, 19681702 edges, 14395 markings/sec, 395 secs
lola: 5925986 markings, 19884215 edges, 13905 markings/sec, 400 secs
lola: 5996805 markings, 20089841 edges, 14164 markings/sec, 405 secs
lola: 6064851 markings, 20295116 edges, 13609 markings/sec, 410 secs
lola: 6132928 markings, 20505752 edges, 13615 markings/sec, 415 secs
lola: 6199820 markings, 20689703 edges, 13378 markings/sec, 420 secs
lola: 6270881 markings, 20900073 edges, 14212 markings/sec, 425 secs
lola: 6336340 markings, 21077456 edges, 13092 markings/sec, 430 secs
lola: 6404302 markings, 21290702 edges, 13592 markings/sec, 435 secs
lola: 6473682 markings, 21502978 edges, 13876 markings/sec, 440 secs
lola: 6546059 markings, 21753802 edges, 14475 markings/sec, 445 secs
lola: 6617436 markings, 22005398 edges, 14275 markings/sec, 450 secs
lola: 6692031 markings, 22250457 edges, 14919 markings/sec, 455 secs
lola: 6762733 markings, 22503793 edges, 14140 markings/sec, 460 secs
lola: 6837640 markings, 22748381 edges, 14981 markings/sec, 465 secs
lola: 6913437 markings, 22991167 edges, 15159 markings/sec, 470 secs
lola: 6986083 markings, 23242187 edges, 14529 markings/sec, 475 secs
lola: 7053681 markings, 23499793 edges, 13520 markings/sec, 480 secs
lola: 7129011 markings, 23753320 edges, 15066 markings/sec, 485 secs
lola: 7203471 markings, 24009527 edges, 14892 markings/sec, 490 secs
lola: 7272088 markings, 24263469 edges, 13723 markings/sec, 495 secs
lola: 7347999 markings, 24503807 edges, 15182 markings/sec, 500 secs
lola: 7422598 markings, 24747352 edges, 14920 markings/sec, 505 secs
lola: 7490725 markings, 25005105 edges, 13625 markings/sec, 510 secs
lola: 7560024 markings, 25259738 edges, 13860 markings/sec, 515 secs
lola: 7627529 markings, 25518412 edges, 13501 markings/sec, 520 secs
lola: 7694733 markings, 25776747 edges, 13441 markings/sec, 525 secs
lola: 7767540 markings, 26022078 edges, 14561 markings/sec, 530 secs
lola: 7836146 markings, 26279090 edges, 13721 markings/sec, 535 secs
lola: 7904375 markings, 26535669 edges, 13646 markings/sec, 540 secs
lola: 7970729 markings, 26793778 edges, 13271 markings/sec, 545 secs
lola: 8040452 markings, 27046262 edges, 13945 markings/sec, 550 secs
lola: 8112721 markings, 27293122 edges, 14454 markings/sec, 555 secs
lola: 8189912 markings, 27525278 edges, 15438 markings/sec, 560 secs
lola: 8266086 markings, 27759497 edges, 15235 markings/sec, 565 secs
lola: 8341927 markings, 27993322 edges, 15168 markings/sec, 570 secs
lola: 8415305 markings, 28232725 edges, 14676 markings/sec, 575 secs
lola: 8490779 markings, 28474866 edges, 15095 markings/sec, 580 secs
lola: 8561848 markings, 28728386 edges, 14214 markings/sec, 585 secs
lola: 8633737 markings, 28978688 edges, 14378 markings/sec, 590 secs
lola: 8703133 markings, 29232595 edges, 13879 markings/sec, 595 secs
lola: 8771964 markings, 29487484 edges, 13766 markings/sec, 600 secs
lola: 8846942 markings, 29732401 edges, 14996 markings/sec, 605 secs
lola: 8921041 markings, 29978285 edges, 14820 markings/sec, 610 secs
lola: 8991874 markings, 30228935 edges, 14167 markings/sec, 615 secs
lola: 9063074 markings, 30478954 edges, 14240 markings/sec, 620 secs
lola: 9136589 markings, 30719211 edges, 14703 markings/sec, 625 secs
lola: 9208081 markings, 30962793 edges, 14298 markings/sec, 630 secs
lola: 9282739 markings, 31204126 edges, 14932 markings/sec, 635 secs
lola: 9352354 markings, 31459354 edges, 13923 markings/sec, 640 secs
lola: 9421531 markings, 31713522 edges, 13835 markings/sec, 645 secs
lola: 9489068 markings, 31970534 edges, 13507 markings/sec, 650 secs
lola: 9556034 markings, 32228632 edges, 13393 markings/sec, 655 secs
lola: 9625567 markings, 32473691 edges, 13907 markings/sec, 660 secs
lola: 9695131 markings, 32713775 edges, 13913 markings/sec, 665 secs
lola: 9761587 markings, 32960571 edges, 13291 markings/sec, 670 secs
lola: 9834556 markings, 33210744 edges, 14594 markings/sec, 675 secs
lola: 9905138 markings, 33469809 edges, 14116 markings/sec, 680 secs
lola: 9976858 markings, 33730001 edges, 14344 markings/sec, 685 secs
lola: 10049507 markings, 33984496 edges, 14530 markings/sec, 690 secs
lola: 10129194 markings, 34226046 edges, 15937 markings/sec, 695 secs
lola: 10206570 markings, 34470050 edges, 15475 markings/sec, 700 secs
lola: 10286391 markings, 34706329 edges, 15964 markings/sec, 705 secs
lola: 10360764 markings, 34953509 edges, 14875 markings/sec, 710 secs
lola: 10433341 markings, 35167350 edges, 14515 markings/sec, 715 secs
lola: 10504123 markings, 35380130 edges, 14156 markings/sec, 720 secs
lola: 10570630 markings, 35576865 edges, 13301 markings/sec, 725 secs
lola: 10636433 markings, 35775685 edges, 13161 markings/sec, 730 secs
lola: 10705516 markings, 35975703 edges, 13817 markings/sec, 735 secs
lola: 10772472 markings, 36168743 edges, 13391 markings/sec, 740 secs
lola: 10841068 markings, 36385726 edges, 13719 markings/sec, 745 secs
lola: 10912964 markings, 36623650 edges, 14379 markings/sec, 750 secs
lola: 10986752 markings, 36883246 edges, 14758 markings/sec, 755 secs
lola: 11061010 markings, 37141420 edges, 14852 markings/sec, 760 secs
lola: 11136925 markings, 37395613 edges, 15183 markings/sec, 765 secs
lola: 11212977 markings, 37651137 edges, 15210 markings/sec, 770 secs
lola: 11284163 markings, 37914388 edges, 14237 markings/sec, 775 secs
lola: 11357974 markings, 38165849 edges, 14762 markings/sec, 780 secs
lola: 11426649 markings, 38421363 edges, 13735 markings/sec, 785 secs
lola: 11502076 markings, 38663100 edges, 15085 markings/sec, 790 secs
lola: 11573182 markings, 38912908 edges, 14221 markings/sec, 795 secs
lola: 11642083 markings, 39168014 edges, 13780 markings/sec, 800 secs
lola: 11708766 markings, 39426628 edges, 13337 markings/sec, 805 secs
lola: 11778241 markings, 39679251 edges, 13895 markings/sec, 810 secs
lola: 11847302 markings, 39932892 edges, 13812 markings/sec, 815 secs
lola: 11914239 markings, 40191157 edges, 13387 markings/sec, 820 secs
lola: 11982266 markings, 40444923 edges, 13605 markings/sec, 825 secs
lola: 12053368 markings, 40694533 edges, 14220 markings/sec, 830 secs
lola: 12129945 markings, 40927122 edges, 15315 markings/sec, 835 secs
lola: 12205683 markings, 41160435 edges, 15148 markings/sec, 840 secs
lola: 12278521 markings, 41399555 edges, 14568 markings/sec, 845 secs
lola: 12350866 markings, 41648134 edges, 14469 markings/sec, 850 secs
lola: 12421905 markings, 41898074 edges, 14208 markings/sec, 855 secs
lola: 12490809 markings, 42152854 edges, 13781 markings/sec, 860 secs
lola: 12562629 markings, 42402397 edges, 14364 markings/sec, 865 secs
lola: 12635754 markings, 42651050 edges, 14625 markings/sec, 870 secs
lola: 12707058 markings, 42902000 edges, 14261 markings/sec, 875 secs
lola: 12779010 markings, 43147547 edges, 14390 markings/sec, 880 secs
lola: 12849876 markings, 43391803 edges, 14173 markings/sec, 885 secs
lola: 12922923 markings, 43637380 edges, 14609 markings/sec, 890 secs
lola: 12991129 markings, 43892734 edges, 13641 markings/sec, 895 secs
lola: 13057901 markings, 44150632 edges, 13354 markings/sec, 900 secs
lola: 13125131 markings, 44406486 edges, 13446 markings/sec, 905 secs
lola: 13197446 markings, 44655415 edges, 14463 markings/sec, 910 secs
lola: 13267233 markings, 44902372 edges, 13957 markings/sec, 915 secs
lola: 13334964 markings, 45152727 edges, 13546 markings/sec, 920 secs
lola: 13403666 markings, 45406966 edges, 13740 markings/sec, 925 secs
lola: 13474995 markings, 45652998 edges, 14266 markings/sec, 930 secs
lola: 13551672 markings, 45884573 edges, 15335 markings/sec, 935 secs
lola: 13627153 markings, 46118292 edges, 15096 markings/sec, 940 secs
lola: 13695144 markings, 46343485 edges, 13598 markings/sec, 945 secs
lola: 13766903 markings, 46568598 edges, 14352 markings/sec, 950 secs
lola: 13839749 markings, 46802107 edges, 14569 markings/sec, 955 secs
lola: 13912881 markings, 47063139 edges, 14626 markings/sec, 960 secs
lola: 13982830 markings, 47328045 edges, 13990 markings/sec, 965 secs
lola: 14050953 markings, 47578578 edges, 13625 markings/sec, 970 secs
lola: 14113583 markings, 47826620 edges, 12526 markings/sec, 975 secs
lola: 14179949 markings, 48062289 edges, 13273 markings/sec, 980 secs
lola: 14249866 markings, 48289609 edges, 13983 markings/sec, 985 secs
lola: 14325016 markings, 48531300 edges, 15030 markings/sec, 990 secs
lola: 14391039 markings, 48765127 edges, 13205 markings/sec, 995 secs
lola: 14457543 markings, 49009291 edges, 13301 markings/sec, 1000 secs
lola: 14525457 markings, 49263300 edges, 13583 markings/sec, 1005 secs
lola: 14592259 markings, 49521642 edges, 13360 markings/sec, 1010 secs
lola: 14660145 markings, 49775919 edges, 13577 markings/sec, 1015 secs
lola: 14734060 markings, 50019213 edges, 14783 markings/sec, 1020 secs
lola: 14808573 markings, 50254803 edges, 14903 markings/sec, 1025 secs
lola: 14876006 markings, 50488851 edges, 13487 markings/sec, 1030 secs
lola: 14940620 markings, 50726881 edges, 12923 markings/sec, 1035 secs
lola: 15004927 markings, 50964383 edges, 12861 markings/sec, 1040 secs
lola: 15070470 markings, 51217607 edges, 13109 markings/sec, 1045 secs
lola: 15137635 markings, 51479574 edges, 13433 markings/sec, 1050 secs
lola: 15211958 markings, 51726273 edges, 14865 markings/sec, 1055 secs
lola: 15283940 markings, 51954392 edges, 14396 markings/sec, 1060 secs
lola: 15351287 markings, 52191125 edges, 13469 markings/sec, 1065 secs
lola: 15424088 markings, 52419750 edges, 14560 markings/sec, 1070 secs
lola: 15496936 markings, 52666001 edges, 14570 markings/sec, 1075 secs
lola: 15567432 markings, 52921582 edges, 14099 markings/sec, 1080 secs
lola: 15640480 markings, 53172417 edges, 14610 markings/sec, 1085 secs
lola: 15714637 markings, 53418883 edges, 14831 markings/sec, 1090 secs
lola: 15785945 markings, 53670160 edges, 14262 markings/sec, 1095 secs
lola: 15862849 markings, 53912544 edges, 15381 markings/sec, 1100 secs
lola: 15934235 markings, 54163328 edges, 14277 markings/sec, 1105 secs
lola: 15999874 markings, 54403843 edges, 13128 markings/sec, 1110 secs
lola: 16070272 markings, 54625548 edges, 14080 markings/sec, 1115 secs
lola: 16136725 markings, 54855298 edges, 13291 markings/sec, 1120 secs
lola: 16205623 markings, 55090323 edges, 13780 markings/sec, 1125 secs
lola: 16275284 markings, 55316370 edges, 13932 markings/sec, 1130 secs
lola: 16341860 markings, 55550186 edges, 13315 markings/sec, 1135 secs
lola: 16407250 markings, 55791439 edges, 13078 markings/sec, 1140 secs
lola: 16449138 markings, 55919993 edges, 8378 markings/sec, 1145 secs
lola: 16505529 markings, 56111843 edges, 11278 markings/sec, 1150 secs
lola: 16555386 markings, 56277353 edges, 9971 markings/sec, 1155 secs
lola: 16617839 markings, 56494434 edges, 12491 markings/sec, 1160 secs
lola: 16664807 markings, 56642752 edges, 9394 markings/sec, 1165 secs
lola: 16709761 markings, 56779596 edges, 8991 markings/sec, 1170 secs
lola: 16772234 markings, 57012359 edges, 12495 markings/sec, 1175 secs
lola: 16822171 markings, 57185046 edges, 9987 markings/sec, 1180 secs
lola: 16881309 markings, 57397719 edges, 11828 markings/sec, 1185 secs
lola: 16924285 markings, 57529246 edges, 8595 markings/sec, 1190 secs
lola: 16975931 markings, 57692783 edges, 10329 markings/sec, 1195 secs
lola: 17032990 markings, 57889298 edges, 11412 markings/sec, 1200 secs
lola: 17093430 markings, 58096689 edges, 12088 markings/sec, 1205 secs
lola: 17144785 markings, 58263813 edges, 10271 markings/sec, 1210 secs
lola: 17185022 markings, 58382832 edges, 8047 markings/sec, 1215 secs
lola: 17241734 markings, 58584433 edges, 11342 markings/sec, 1220 secs
lola: 17292356 markings, 58760679 edges, 10124 markings/sec, 1225 secs
lola: 17353565 markings, 58983644 edges, 12242 markings/sec, 1230 secs
lola: 17402699 markings, 59147855 edges, 9827 markings/sec, 1235 secs
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lola: 38572486 markings, 137021006 edges, 13921 markings/sec, 2805 secs
lola: 38639052 markings, 137270379 edges, 13313 markings/sec, 2810 secs
lola: 38706931 markings, 137517671 edges, 13576 markings/sec, 2815 secs
lola: 38773171 markings, 137778461 edges, 13248 markings/sec, 2820 secs
lola: 38839954 markings, 138034626 edges, 13357 markings/sec, 2825 secs
lola: 38904022 markings, 138296106 edges, 12814 markings/sec, 2830 secs
lola: 38971257 markings, 138549875 edges, 13447 markings/sec, 2835 secs
lola: 39036309 markings, 138806297 edges, 13010 markings/sec, 2840 secs
lola: 39103534 markings, 139055395 edges, 13445 markings/sec, 2845 secs
lola: 39173255 markings, 139306296 edges, 13944 markings/sec, 2850 secs
lola: 39243991 markings, 139552397 edges, 14147 markings/sec, 2855 secs
lola: 39319843 markings, 139790161 edges, 15170 markings/sec, 2860 secs
lola: 39392647 markings, 140035823 edges, 14561 markings/sec, 2865 secs
lola: 39469958 markings, 140275430 edges, 15462 markings/sec, 2870 secs
lola: 39542236 markings, 140515357 edges, 14456 markings/sec, 2875 secs
lola: 39615960 markings, 140752526 edges, 14745 markings/sec, 2880 secs
lola: 39687521 markings, 140996888 edges, 14312 markings/sec, 2885 secs
lola: 39759079 markings, 141222151 edges, 14312 markings/sec, 2890 secs
lola: 39826479 markings, 141451674 edges, 13480 markings/sec, 2895 secs
lola: 39896490 markings, 141672089 edges, 14002 markings/sec, 2900 secs
lola: 39961092 markings, 141902763 edges, 12920 markings/sec, 2905 secs
lola: 40031857 markings, 142143626 edges, 14153 markings/sec, 2910 secs
lola: 40101738 markings, 142388602 edges, 13976 markings/sec, 2915 secs
lola: 40170803 markings, 142636758 edges, 13813 markings/sec, 2920 secs
lola: 40242005 markings, 142877855 edges, 14240 markings/sec, 2925 secs
lola: 40317334 markings, 143093709 edges, 15066 markings/sec, 2930 secs
lola: 40392922 markings, 143317645 edges, 15118 markings/sec, 2935 secs
lola: 40463973 markings, 143516902 edges, 14210 markings/sec, 2940 secs
lola: 40535526 markings, 143741662 edges, 14311 markings/sec, 2945 secs
lola: 40606356 markings, 143938088 edges, 14166 markings/sec, 2950 secs
lola: 40679688 markings, 144155528 edges, 14666 markings/sec, 2955 secs
lola: 40750951 markings, 144354250 edges, 14253 markings/sec, 2960 secs
lola: 40821780 markings, 144571114 edges, 14166 markings/sec, 2965 secs
lola: 40893596 markings, 144791504 edges, 14363 markings/sec, 2970 secs
lola: 40965653 markings, 145039128 edges, 14411 markings/sec, 2975 secs
lola: 41036207 markings, 145289389 edges, 14111 markings/sec, 2980 secs
lola: 41110053 markings, 145532032 edges, 14769 markings/sec, 2985 secs
lola: 41180280 markings, 145782627 edges, 14045 markings/sec, 2990 secs
lola: 41253818 markings, 146027332 edges, 14708 markings/sec, 2995 secs
lola: 41329112 markings, 146265724 edges, 15059 markings/sec, 3000 secs
lola: 41401311 markings, 146514386 edges, 14440 markings/sec, 3005 secs
lola: 41468342 markings, 146770232 edges, 13406 markings/sec, 3010 secs
lola: 41540907 markings, 147014026 edges, 14513 markings/sec, 3015 secs
lola: 41613082 markings, 147262013 edges, 14435 markings/sec, 3020 secs
lola: 41680432 markings, 147517376 edges, 13470 markings/sec, 3025 secs
lola: 41758197 markings, 147762174 edges, 15553 markings/sec, 3030 secs
lola: 41833404 markings, 148000452 edges, 15041 markings/sec, 3035 secs
lola: 41900982 markings, 148256190 edges, 13516 markings/sec, 3040 secs
lola: 41969183 markings, 148508882 edges, 13640 markings/sec, 3045 secs
lola: 42036372 markings, 148765050 edges, 13438 markings/sec, 3050 secs
lola: 42103068 markings, 149022869 edges, 13339 markings/sec, 3055 secs
lola: 42174542 markings, 149266496 edges, 14295 markings/sec, 3060 secs
lola: 42242807 markings, 149519505 edges, 13653 markings/sec, 3065 secs
lola: 42311256 markings, 149772954 edges, 13690 markings/sec, 3070 secs
lola: 42376557 markings, 150031831 edges, 13060 markings/sec, 3075 secs
lola: 42446681 markings, 150282944 edges, 14025 markings/sec, 3080 secs
lola: 42517156 markings, 150530865 edges, 14095 markings/sec, 3085 secs
lola: 42593409 markings, 150763380 edges, 15251 markings/sec, 3090 secs
lola: 42668752 markings, 150998979 edges, 15069 markings/sec, 3095 secs
lola: 42745476 markings, 151227822 edges, 15345 markings/sec, 3100 secs
lola: 42818159 markings, 151467589 edges, 14537 markings/sec, 3105 secs
lola: 42893083 markings, 151704121 edges, 14985 markings/sec, 3110 secs
lola: 42964365 markings, 151954949 edges, 14256 markings/sec, 3115 secs
lola: 43035088 markings, 152205150 edges, 14145 markings/sec, 3120 secs
lola: 43105187 markings, 152454469 edges, 14020 markings/sec, 3125 secs
lola: 43173222 markings, 152707853 edges, 13607 markings/sec, 3130 secs
lola: 43246494 markings, 152952284 edges, 14654 markings/sec, 3135 secs
lola: 43320864 markings, 153195242 edges, 14874 markings/sec, 3140 secs
lola: 43390870 markings, 153443383 edges, 14001 markings/sec, 3145 secs
lola: 43461410 markings, 153690778 edges, 14108 markings/sec, 3150 secs
lola: 43533998 markings, 153931135 edges, 14518 markings/sec, 3155 secs
lola: 43604605 markings, 154171815 edges, 14121 markings/sec, 3160 secs
lola: 43677164 markings, 154411710 edges, 14512 markings/sec, 3165 secs
lola: 43748592 markings, 154658696 edges, 14286 markings/sec, 3170 secs
lola: 43818433 markings, 154908947 edges, 13968 markings/sec, 3175 secs
lola: 43884073 markings, 155166172 edges, 13128 markings/sec, 3180 secs
lola: 43951598 markings, 155420316 edges, 13505 markings/sec, 3185 secs
lola: 44018025 markings, 155674564 edges, 13285 markings/sec, 3190 secs
lola: 44088974 markings, 155922850 edges, 14190 markings/sec, 3195 secs
lola: 44159746 markings, 156170018 edges, 14154 markings/sec, 3200 secs
lola: 44230199 markings, 156411234 edges, 14091 markings/sec, 3205 secs
lola: 44298808 markings, 156655880 edges, 13722 markings/sec, 3210 secs
lola: 44366920 markings, 156908880 edges, 13622 markings/sec, 3215 secs
lola: 44434804 markings, 157157334 edges, 13577 markings/sec, 3220 secs
lola: 44507396 markings, 157400766 edges, 14518 markings/sec, 3225 secs
lola: 44584315 markings, 157631164 edges, 15384 markings/sec, 3230 secs
lola: 44659804 markings, 157863913 edges, 15098 markings/sec, 3235 secs
lola: 44735315 markings, 158095512 edges, 15102 markings/sec, 3240 secs
lola: 44808128 markings, 158332474 edges, 14563 markings/sec, 3245 secs
lola: 44880969 markings, 158542762 edges, 14568 markings/sec, 3250 secs
lola: 44952640 markings, 158749766 edges, 14334 markings/sec, 3255 secs
lola: 45020942 markings, 158953462 edges, 13660 markings/sec, 3260 secs
lola: 45090210 markings, 159157131 edges, 13854 markings/sec, 3265 secs
lola: 45162760 markings, 159373663 edges, 14510 markings/sec, 3270 secs
lola: 45231972 markings, 159570745 edges, 13842 markings/sec, 3275 secs
lola: 45301978 markings, 159790842 edges, 14001 markings/sec, 3280 secs
lola: 45373111 markings, 160022114 edges, 14227 markings/sec, 3285 secs
lola: 45442911 markings, 160272472 edges, 13960 markings/sec, 3290 secs
lola: 45515243 markings, 160518117 edges, 14466 markings/sec, 3295 secs
lola: 45585521 markings, 160767040 edges, 14056 markings/sec, 3300 secs
lola: 45661118 markings, 161004084 edges, 15119 markings/sec, 3305 secs
lola: 45733068 markings, 161251072 edges, 14390 markings/sec, 3310 secs
lola: 45801301 markings, 161499934 edges, 13647 markings/sec, 3315 secs
lola: 45872038 markings, 161746752 edges, 14147 markings/sec, 3320 secs
lola: 45939748 markings, 161998135 edges, 13542 markings/sec, 3325 secs
lola: local time limit reached - aborting
lola:
preliminary result: no no yes yes yes no no no yes yes yes yes no unknown yes yes
lola: time limit reached - aborting
lola:
preliminary result: no no yes yes yes no no no yes yes yes yes no unknown yes yes
lola:
preliminary result: no no yes yes yes no no no yes yes yes yes no unknown yes yes
lola: Child process aborted or communication problem between parent and child process
lola: ========================================
lola: ...considering subproblem: A (G (F (((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3) AND (F ((P-poll__networl_6_6_AnsP_3 + 1 <= P-poll__handlingMessage_5)) OR G ((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3)))))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (G (F (((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3) AND (F ((P-poll__networl_6_6_AnsP_3 + 1 <= P-poll__handlingMessage_5)) OR G ((P-poll__handlingMessage_5 <= P-poll__networl_6_6_AnsP_3)))))))
lola: processed formula length: 208
lola: 143 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 4 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method with deletion algorithm (--stubborn=deletion)
lola: using ltl preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: SEARCH
lola: RUNNING
lola: memory consumption: 558044 KB
lola: time consumption: 3570 seconds
lola: print data as JSON (--json)
lola: writing JSON to LTLCardinality.json
lola: closed JSON file LTLCardinality.json
lola: caught signal User defined signal 1 - aborting LoLA
lola:
preliminary result: no no yes yes yes no no no yes yes yes yes no unknown yes yes
lola: memory consumption: 556220 KB
lola: time consumption: 3571 seconds
lola: print data as JSON (--json)
lola: writing JSON to LTLCardinality.json
lola: closed JSON file LTLCardinality.json
rslt: finished

BK_STOP 1590342234051

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

Sequence of Actions to be Executed by the VM

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

set -x
# this is for BenchKit: configuration of major elements for the test
export BK_INPUT="NeoElection-PT-7"
export BK_EXAMINATION="LTLCardinality"
export BK_TOOL="win2019"
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

# this is for BenchKit: explicit launching of the test
echo "====================================================================="
echo " Generated by BenchKit 2-4028"
echo " Executing tool win2019"
echo " Input is NeoElection-PT-7, examination is LTLCardinality"
echo " Time confinement is $BK_TIME_CONFINEMENT seconds"
echo " Memory confinement is 16384 MBytes"
echo " Number of cores is 4"
echo " Run identifier is r120-csrt-158961292500079"
echo "====================================================================="
echo
echo "--------------------"
echo "preparation of the directory to be used:"

tar xzf /home/mcc/BenchKit/INPUTS/NeoElection-PT-7.tgz
mv NeoElection-PT-7 execution
cd execution
if [ "LTLCardinality" = "ReachabilityDeadlock" ] || [ "LTLCardinality" = "UpperBounds" ] || [ "LTLCardinality" = "QuasiLiveness" ] || [ "LTLCardinality" = "StableMarking" ] || [ "LTLCardinality" = "Liveness" ] || [ "LTLCardinality" = "OneSafe" ] || [ "LTLCardinality" = "StateSpace" ]; then
rm -f GenericPropertiesVerdict.xml
fi
pwd
ls -lh

echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "LTLCardinality" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "LTLCardinality" != "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 "LTLCardinality.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property LTLCardinality.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "LTLCardinality.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 '' LTLCardinality.xml | cut -d '>' -f 2 | cut -d '<' -f 1 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ "LTLCardinality" = "ReachabilityDeadlock" ] || [ "LTLCardinality" = "QuasiLiveness" ] || [ "LTLCardinality" = "StableMarking" ] || [ "LTLCardinality" = "Liveness" ] || [ "LTLCardinality" = "OneSafe" ] ; then
echo "FORMULA_NAME LTLCardinality"
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 ;