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Model Checking Contest 2023
13th edition, Paris, France, April 26, 2023 (at TOOLympics II)
Execution of r266-smll-167863541000506
Last Updated
May 14, 2023

About the Execution of Marcie+red for PermAdmissibility-PT-01

Execution Summary
Max Memory
Used (MB)		 Time wait (ms) CPU Usage (ms) I/O Wait (ms) Computed Result Execution
Status
7564.384 107967.00 129019.00 767.40 FTFFTTFTFFFTFTFF normal

Execution Chart

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

Trace from the execution

Formatting '/data/fkordon/mcc2023-input.r266-smll-167863541000506.qcow2', fmt=qcow2 size=4294967296 backing_file=/data/fkordon/mcc2023-input.qcow2 cluster_size=65536 lazy_refcounts=off refcount_bits=16
Waiting for the VM to be ready (probing ssh)
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=====================================================================
Generated by BenchKit 2-5348
Executing tool marciexred
Input is PermAdmissibility-PT-01, examination is CTLFireability
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r266-smll-167863541000506
=====================================================================

--------------------
preparation of the directory to be used:
/home/mcc/execution
total 1.8M
-rw-r--r-- 1 mcc users 8.7K Feb 26 01:21 CTLCardinality.txt
-rw-r--r-- 1 mcc users 81K Feb 26 01:21 CTLCardinality.xml
-rw-r--r-- 1 mcc users 30K Feb 26 01:19 CTLFireability.txt
-rw-r--r-- 1 mcc users 150K Feb 26 01:19 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.2K Jan 29 11:40 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 6.3K Jan 29 11:40 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 5.0K Feb 25 16:30 LTLCardinality.txt
-rw-r--r-- 1 mcc users 31K Feb 25 16:30 LTLCardinality.xml
-rw-r--r-- 1 mcc users 19K Feb 25 16:30 LTLFireability.txt
-rw-r--r-- 1 mcc users 79K Feb 25 16:30 LTLFireability.xml
-rw-r--r-- 1 mcc users 16K Feb 26 01:29 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 130K Feb 26 01:29 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 110K Feb 26 01:28 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 550K Feb 26 01:28 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 1.9K Feb 25 16:30 UpperBounds.txt
-rw-r--r-- 1 mcc users 4.4K Feb 25 16:30 UpperBounds.xml
-rw-r--r-- 1 mcc users 5 Mar 5 18:23 equiv_col
-rw-r--r-- 1 mcc users 3 Mar 5 18:23 instance
-rw-r--r-- 1 mcc users 6 Mar 5 18:23 iscolored
-rw-r--r-- 1 mcc users 484K Mar 5 18:23 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 PermAdmissibility-PT-01-CTLFireability-00
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-01
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-02
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-03
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-04
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-05
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-06
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-07
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-08
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-09
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-10
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-11
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-12
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-13
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-14
FORMULA_NAME PermAdmissibility-PT-01-CTLFireability-15

=== Now, execution of the tool begins

BK_START 1679103709483

bash -c /home/mcc/BenchKit/BenchKit_head.sh 2> STDERR ; echo ; echo -n "BK_STOP " ; date -u +%s%3N
Invoking MCC driver with
BK_TOOL=marciexred
BK_EXAMINATION=CTLFireability
BK_BIN_PATH=/home/mcc/BenchKit/bin/
BK_TIME_CONFINEMENT=3600
BK_INPUT=PermAdmissibility-PT-01
Applying reductions before tool marcie
Invoking reducer
Running Version 202303021504
[2023-03-18 01:41:52] [INFO ] Running its-tools with arguments : [-pnfolder, /home/mcc/execution, -examination, CTLFireability, -timeout, 360, -rebuildPNML]
[2023-03-18 01:41:52] [INFO ] Parsing pnml file : /home/mcc/execution/model.pnml
[2023-03-18 01:41:52] [INFO ] Load time of PNML (sax parser for PT used): 155 ms
[2023-03-18 01:41:52] [INFO ] Transformed 168 places.
[2023-03-18 01:41:52] [INFO ] Transformed 592 transitions.
[2023-03-18 01:41:52] [INFO ] Parsed PT model containing 168 places and 592 transitions and 3456 arcs in 274 ms.
Parsed 16 properties from file /home/mcc/execution/CTLFireability.xml in 21 ms.
Support contains 104 out of 168 places. Attempting structural reductions.
Starting structural reductions in LTL mode, iteration 0 : 168/168 places, 592/592 transitions.
Reduce places removed 64 places and 0 transitions.
Iterating post reduction 0 with 64 rules applied. Total rules applied 64 place count 104 transition count 592
Applied a total of 64 rules in 31 ms. Remains 104 /168 variables (removed 64) and now considering 592/592 (removed 0) transitions.
// Phase 1: matrix 592 rows 104 cols
[2023-03-18 01:41:52] [INFO ] Computed 16 place invariants in 56 ms
[2023-03-18 01:41:53] [INFO ] Implicit Places using invariants in 398 ms returned []
[2023-03-18 01:41:53] [INFO ] Invariant cache hit.
[2023-03-18 01:41:53] [INFO ] Implicit Places using invariants and state equation in 360 ms returned []
Implicit Place search using SMT with State Equation took 802 ms to find 0 implicit places.
[2023-03-18 01:41:53] [INFO ] Invariant cache hit.
[2023-03-18 01:41:54] [INFO ] Dead Transitions using invariants and state equation in 503 ms found 0 transitions.
Starting structural reductions in LTL mode, iteration 1 : 104/168 places, 592/592 transitions.
Finished structural reductions in LTL mode , in 1 iterations and 1346 ms. Remains : 104/168 places, 592/592 transitions.
Support contains 104 out of 104 places after structural reductions.
[2023-03-18 01:41:54] [INFO ] Flatten gal took : 247 ms
[2023-03-18 01:41:55] [INFO ] Flatten gal took : 102 ms
[2023-03-18 01:41:55] [INFO ] Input system was already deterministic with 592 transitions.
Incomplete random walk after 10000 steps, including 588 resets, run finished after 986 ms. (steps per millisecond=10 ) properties (out of 56) seen :45
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 284 ms. (steps per millisecond=35 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 229 ms. (steps per millisecond=43 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 328 ms. (steps per millisecond=30 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 170 ms. (steps per millisecond=58 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 165 ms. (steps per millisecond=60 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 161 ms. (steps per millisecond=62 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 151 ms. (steps per millisecond=66 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 168 ms. (steps per millisecond=59 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 184 ms. (steps per millisecond=54 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 188 ms. (steps per millisecond=53 ) properties (out of 11) seen :0
Incomplete Best-First random walk after 10001 steps, including 204 resets, run finished after 158 ms. (steps per millisecond=63 ) properties (out of 11) seen :0
Running SMT prover for 11 properties.
[2023-03-18 01:41:58] [INFO ] Invariant cache hit.
[2023-03-18 01:41:59] [INFO ] [Real]Absence check using 0 positive and 16 generalized place invariants in 15 ms returned sat
[2023-03-18 01:41:59] [INFO ] After 380ms SMT Verify possible using all constraints in real domain returned unsat :0 sat :0 real:11
[2023-03-18 01:42:00] [INFO ] [Nat]Absence check using 0 positive and 16 generalized place invariants in 10 ms returned sat
[2023-03-18 01:42:02] [INFO ] After 2922ms SMT Verify possible using all constraints in natural domain returned unsat :11 sat :0
Fused 11 Parikh solutions to 0 different solutions.
Parikh walk visited 0 properties in 0 ms.
Successfully simplified 11 atomic propositions for a total of 16 simplifications.
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 88 ms
[2023-03-18 01:42:03] [INFO ] Initial state reduction rules for CTL removed 2 formulas.
FORMULA PermAdmissibility-PT-01-CTLFireability-10 FALSE TECHNIQUES TOPOLOGICAL INITIAL_STATE
FORMULA PermAdmissibility-PT-01-CTLFireability-03 FALSE TECHNIQUES TOPOLOGICAL INITIAL_STATE
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 55 ms
[2023-03-18 01:42:03] [INFO ] Input system was already deterministic with 592 transitions.
FORMULA PermAdmissibility-PT-01-CTLFireability-07 TRUE TECHNIQUES TOPOLOGICAL INITIAL_STATE
Computed a total of 104 stabilizing places and 592 stable transitions
Complete graph has no SCC; deadlocks are unavoidable. place count 104 transition count 592
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge (and all enablings converge to false).
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 13 places :
Symmetric choice reduction at 0 with 13 rule applications. Total rules 13 place count 91 transition count 468
Iterating global reduction 0 with 13 rules applied. Total rules applied 26 place count 91 transition count 468
Applied a total of 26 rules in 15 ms. Remains 91 /104 variables (removed 13) and now considering 468/592 (removed 124) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 15 ms. Remains : 91/104 places, 468/592 transitions.
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 32 ms
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 36 ms
[2023-03-18 01:42:03] [INFO ] Input system was already deterministic with 468 transitions.
Starting structural reductions in SI_CTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Graph (complete) has 975 edges and 104 vertex of which 86 are kept as prefixes of interest. Removing 18 places using SCC suffix rule.6 ms
Discarding 18 places :
Also discarding 128 output transitions
Drop transitions removed 128 transitions
Applied a total of 1 rules in 48 ms. Remains 86 /104 variables (removed 18) and now considering 464/592 (removed 128) transitions.
Finished structural reductions in SI_CTL mode , in 1 iterations and 49 ms. Remains : 86/104 places, 464/592 transitions.
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 25 ms
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 25 ms
[2023-03-18 01:42:03] [INFO ] Input system was already deterministic with 464 transitions.
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 26 places :
Symmetric choice reduction at 0 with 26 rule applications. Total rules 26 place count 78 transition count 344
Iterating global reduction 0 with 26 rules applied. Total rules applied 52 place count 78 transition count 344
Discarding 24 places :
Symmetric choice reduction at 0 with 24 rule applications. Total rules 76 place count 54 transition count 108
Iterating global reduction 0 with 24 rules applied. Total rules applied 100 place count 54 transition count 108
Discarding 3 places :
Symmetric choice reduction at 0 with 3 rule applications. Total rules 103 place count 51 transition count 84
Iterating global reduction 0 with 3 rules applied. Total rules applied 106 place count 51 transition count 84
Applied a total of 106 rules in 24 ms. Remains 51 /104 variables (removed 53) and now considering 84/592 (removed 508) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 24 ms. Remains : 51/104 places, 84/592 transitions.
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 5 ms
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 5 ms
[2023-03-18 01:42:03] [INFO ] Input system was already deterministic with 84 transitions.
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 13 places :
Symmetric choice reduction at 0 with 13 rule applications. Total rules 13 place count 91 transition count 468
Iterating global reduction 0 with 13 rules applied. Total rules applied 26 place count 91 transition count 468
Applied a total of 26 rules in 16 ms. Remains 91 /104 variables (removed 13) and now considering 468/592 (removed 124) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 17 ms. Remains : 91/104 places, 468/592 transitions.
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 20 ms
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 22 ms
[2023-03-18 01:42:03] [INFO ] Input system was already deterministic with 468 transitions.
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 13 places :
Symmetric choice reduction at 0 with 13 rule applications. Total rules 13 place count 91 transition count 468
Iterating global reduction 0 with 13 rules applied. Total rules applied 26 place count 91 transition count 468
Applied a total of 26 rules in 7 ms. Remains 91 /104 variables (removed 13) and now considering 468/592 (removed 124) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 8 ms. Remains : 91/104 places, 468/592 transitions.
[2023-03-18 01:42:03] [INFO ] Flatten gal took : 21 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 26 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 468 transitions.
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 13 places :
Symmetric choice reduction at 0 with 13 rule applications. Total rules 13 place count 91 transition count 468
Iterating global reduction 0 with 13 rules applied. Total rules applied 26 place count 91 transition count 468
Applied a total of 26 rules in 18 ms. Remains 91 /104 variables (removed 13) and now considering 468/592 (removed 124) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 19 ms. Remains : 91/104 places, 468/592 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 20 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 23 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 468 transitions.
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 18 places :
Symmetric choice reduction at 0 with 18 rule applications. Total rules 18 place count 86 transition count 384
Iterating global reduction 0 with 18 rules applied. Total rules applied 36 place count 86 transition count 384
Discarding 12 places :
Symmetric choice reduction at 0 with 12 rule applications. Total rules 48 place count 74 transition count 232
Iterating global reduction 0 with 12 rules applied. Total rules applied 60 place count 74 transition count 232
Applied a total of 60 rules in 8 ms. Remains 74 /104 variables (removed 30) and now considering 232/592 (removed 360) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 9 ms. Remains : 74/104 places, 232/592 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 10 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 12 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 232 transitions.
Starting structural reductions in SI_CTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 24 places :
Symmetric choice reduction at 0 with 24 rule applications. Total rules 24 place count 80 transition count 352
Iterating global reduction 0 with 24 rules applied. Total rules applied 48 place count 80 transition count 352
Discarding 18 places :
Symmetric choice reduction at 0 with 18 rule applications. Total rules 66 place count 62 transition count 146
Iterating global reduction 0 with 18 rules applied. Total rules applied 84 place count 62 transition count 146
Discarding 1 places :
Symmetric choice reduction at 0 with 1 rule applications. Total rules 85 place count 61 transition count 138
Iterating global reduction 0 with 1 rules applied. Total rules applied 86 place count 61 transition count 138
Applied a total of 86 rules in 26 ms. Remains 61 /104 variables (removed 43) and now considering 138/592 (removed 454) transitions.
Finished structural reductions in SI_CTL mode , in 1 iterations and 26 ms. Remains : 61/104 places, 138/592 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 7 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 7 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 138 transitions.
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 24 places :
Symmetric choice reduction at 0 with 24 rule applications. Total rules 24 place count 80 transition count 352
Iterating global reduction 0 with 24 rules applied. Total rules applied 48 place count 80 transition count 352
Discarding 20 places :
Symmetric choice reduction at 0 with 20 rule applications. Total rules 68 place count 60 transition count 136
Iterating global reduction 0 with 20 rules applied. Total rules applied 88 place count 60 transition count 136
Applied a total of 88 rules in 16 ms. Remains 60 /104 variables (removed 44) and now considering 136/592 (removed 456) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 17 ms. Remains : 60/104 places, 136/592 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 7 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 8 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 136 transitions.
Starting structural reductions in SI_CTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 24 places :
Symmetric choice reduction at 0 with 24 rule applications. Total rules 24 place count 80 transition count 352
Iterating global reduction 0 with 24 rules applied. Total rules applied 48 place count 80 transition count 352
Discarding 19 places :
Symmetric choice reduction at 0 with 19 rule applications. Total rules 67 place count 61 transition count 144
Iterating global reduction 0 with 19 rules applied. Total rules applied 86 place count 61 transition count 144
Discarding 1 places :
Symmetric choice reduction at 0 with 1 rule applications. Total rules 87 place count 60 transition count 136
Iterating global reduction 0 with 1 rules applied. Total rules applied 88 place count 60 transition count 136
Applied a total of 88 rules in 25 ms. Remains 60 /104 variables (removed 44) and now considering 136/592 (removed 456) transitions.
Finished structural reductions in SI_CTL mode , in 1 iterations and 26 ms. Remains : 60/104 places, 136/592 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 8 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 8 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 136 transitions.
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 23 places :
Symmetric choice reduction at 0 with 23 rule applications. Total rules 23 place count 81 transition count 356
Iterating global reduction 0 with 23 rules applied. Total rules applied 46 place count 81 transition count 356
Discarding 15 places :
Symmetric choice reduction at 0 with 15 rule applications. Total rules 61 place count 66 transition count 178
Iterating global reduction 0 with 15 rules applied. Total rules applied 76 place count 66 transition count 178
Applied a total of 76 rules in 9 ms. Remains 66 /104 variables (removed 38) and now considering 178/592 (removed 414) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 9 ms. Remains : 66/104 places, 178/592 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 9 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 9 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 178 transitions.
Starting structural reductions in SI_CTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 20 places :
Symmetric choice reduction at 0 with 20 rule applications. Total rules 20 place count 84 transition count 372
Iterating global reduction 0 with 20 rules applied. Total rules applied 40 place count 84 transition count 372
Discarding 10 places :
Symmetric choice reduction at 0 with 10 rule applications. Total rules 50 place count 74 transition count 246
Iterating global reduction 0 with 10 rules applied. Total rules applied 60 place count 74 transition count 246
Applied a total of 60 rules in 24 ms. Remains 74 /104 variables (removed 30) and now considering 246/592 (removed 346) transitions.
Finished structural reductions in SI_CTL mode , in 1 iterations and 25 ms. Remains : 74/104 places, 246/592 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 11 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 12 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 246 transitions.
Starting structural reductions in LTL mode, iteration 0 : 104/104 places, 592/592 transitions.
Discarding 26 places :
Symmetric choice reduction at 0 with 26 rule applications. Total rules 26 place count 78 transition count 344
Iterating global reduction 0 with 26 rules applied. Total rules applied 52 place count 78 transition count 344
Discarding 24 places :
Symmetric choice reduction at 0 with 24 rule applications. Total rules 76 place count 54 transition count 108
Iterating global reduction 0 with 24 rules applied. Total rules applied 100 place count 54 transition count 108
Discarding 3 places :
Symmetric choice reduction at 0 with 3 rule applications. Total rules 103 place count 51 transition count 84
Iterating global reduction 0 with 3 rules applied. Total rules applied 106 place count 51 transition count 84
Applied a total of 106 rules in 9 ms. Remains 51 /104 variables (removed 53) and now considering 84/592 (removed 508) transitions.
Finished structural reductions in LTL mode , in 1 iterations and 9 ms. Remains : 51/104 places, 84/592 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 5 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 5 ms
[2023-03-18 01:42:04] [INFO ] Input system was already deterministic with 84 transitions.
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 36 ms
[2023-03-18 01:42:04] [INFO ] Flatten gal took : 34 ms
[2023-03-18 01:42:04] [INFO ] Export to MCC of 13 properties in file /home/mcc/execution/CTLFireability.sr.xml took 13 ms.
[2023-03-18 01:42:04] [INFO ] Export to PNML in file /home/mcc/execution/model.sr.pnml of net with 104 places, 592 transitions and 2944 arcs took 4 ms.
Total runtime 12561 ms.
There are residual formulas that ITS could not solve within timeout
timeout --kill-after=10s --signal=SIGINT 1m for testing only

Marcie built on Linux at 2019-11-18.
A model checker for Generalized Stochastic Petri nets

authors: Alex Tovchigrechko (IDD package and CTL model checking)

Martin Schwarick (Symbolic numerical analysis and CSL model checking)

Christian Rohr (Simulative and approximative numerical model checking)

marcie@informatik.tu-cottbus.de

called as: /home/mcc/BenchKit/bin//../reducer/bin//../../marcie/bin/marcie --net-file=model.pnml --mcc-file=CTLFireability.xml --memory=6 --mcc-mode

parse successfull
net created successfully

Net: Petri
(NrP: 104 NrTr: 592 NrArc: 2944)

parse formulas
formulas created successfully
place and transition orderings generation:0m 0.012sec

net check time: 0m 0.000sec

init dd package: 0m 3.593sec


RS generation: 0m 6.315sec


-> reachability set: #nodes 17746 (1.8e+04) #states 9,862 (3)



starting MCC model checker
--------------------------

checking: AG [EF [EX [EF [[1<=p36 & [1<=p38 & 1<=p42]]]]]]
normalized: ~ [E [true U ~ [E [true U EX [E [true U [[1<=p38 & 1<=p42] & 1<=p36]]]]]]]

abstracting: (1<=p36)
states: 146
abstracting: (1<=p42)
states: 136
abstracting: (1<=p38)
states: 256
.-> the formula is FALSE

FORMULA PermAdmissibility-PT-01-CTLFireability-15 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 2.091sec

checking: AF [AG [[[EF [[p1<=0 | [p12<=0 | p15<=0]]] & 1<=p47] & [1<=p63 & 1<=p94]]]]
normalized: ~ [EG [E [true U ~ [[[E [true U [[p12<=0 | p15<=0] | p1<=0]] & 1<=p47] & [1<=p63 & 1<=p94]]]]]]

abstracting: (1<=p94)
states: 736
abstracting: (1<=p63)
states: 844
abstracting: (1<=p47)
states: 764
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p15<=0)
states: 9,806 (3)
abstracting: (p12<=0)
states: 7,798 (3)

EG iterations: 0
-> the formula is FALSE

FORMULA PermAdmissibility-PT-01-CTLFireability-09 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 0.090sec

checking: AX [~ [E [[1<=p23 & [1<=p27 & 1<=p30]] U AF [[[1<=p69 & [1<=p80 & 1<=p95]] | [1<=p39 & [1<=p44 & 1<=p59]]]]]]]
normalized: ~ [EX [E [[[1<=p27 & 1<=p30] & 1<=p23] U ~ [EG [~ [[[[1<=p80 & 1<=p95] & 1<=p69] | [[1<=p44 & 1<=p59] & 1<=p39]]]]]]]]

abstracting: (1<=p39)
states: 136
abstracting: (1<=p59)
states: 64
abstracting: (1<=p44)
states: 146
abstracting: (1<=p69)
states: 240
abstracting: (1<=p95)
states: 896
abstracting: (1<=p80)
states: 272
....
EG iterations: 4
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
.-> the formula is TRUE

FORMULA PermAdmissibility-PT-01-CTLFireability-11 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 2.193sec

checking: [E [~ [[[1<=p82 & [1<=p84 & 1<=p99]] | EG [EF [[1<=p38 & [1<=p39 & 1<=p41]]]]]] U EF [[1<=p55 & [1<=p78 & 1<=p95]]]] & AF [[1<=p4 & [1<=p14 & 1<=p17]]]]
normalized: [E [~ [[EG [E [true U [[1<=p39 & 1<=p41] & 1<=p38]]] | [[1<=p84 & 1<=p99] & 1<=p82]]] U E [true U [[1<=p78 & 1<=p95] & 1<=p55]]] & ~ [EG [~ [[[1<=p14 & 1<=p17] & 1<=p4]]]]]

abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p17)
states: 420
abstracting: (1<=p14)
states: 2,064 (3)
....
EG iterations: 4
abstracting: (1<=p55)
states: 240
abstracting: (1<=p95)
states: 896
abstracting: (1<=p78)
states: 272
abstracting: (1<=p82)
states: 17
abstracting: (1<=p99)
states: 16
abstracting: (1<=p84)
states: 17
abstracting: (1<=p38)
states: 256
abstracting: (1<=p41)
states: 146
abstracting: (1<=p39)
states: 136
.........
EG iterations: 9
-> the formula is FALSE

FORMULA PermAdmissibility-PT-01-CTLFireability-12 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 0.658sec

checking: A [AX [EX [AF [E [[1<=p52 & [1<=p58 & 1<=p77]] U [1<=p51 & [1<=p85 & 1<=p94]]]]]] U AX [[~ [AF [[1<=p24 & [1<=p30 & 1<=p34]]]] | [1<=p24 & [1<=p27 & 1<=p30]]]]]
normalized: [~ [EG [EX [~ [[[[1<=p27 & 1<=p30] & 1<=p24] | EG [~ [[[1<=p30 & 1<=p34] & 1<=p24]]]]]]]] & ~ [E [EX [~ [[[[1<=p27 & 1<=p30] & 1<=p24] | EG [~ [[[1<=p30 & 1<=p34] & 1<=p24]]]]]] U [EX [~ [EX [~ [EG [~ [E [[[1<=p58 & 1<=p77] & 1<=p52] U [[1<=p85 & 1<=p94] & 1<=p51]]]]]]]] & EX [~ [[[[1<=p27 & 1<=p30] & 1<=p24] | EG [~ [[[1<=p30 & 1<=p34] & 1<=p24]]]]]]]]]]

abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
.
EG iterations: 1
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
.abstracting: (1<=p51)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p85)
states: 844
abstracting: (1<=p52)
states: 256
abstracting: (1<=p77)
states: 272
abstracting: (1<=p58)
states: 240
....
EG iterations: 4
..abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
.
EG iterations: 1
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
.abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
.
EG iterations: 1
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
...
EG iterations: 2
-> the formula is TRUE

FORMULA PermAdmissibility-PT-01-CTLFireability-13 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 0.551sec

checking: A [[~ [[1<=p22 & [1<=p30 & 1<=p31]]] | [1<=p62 & [1<=p64 & 1<=p74]]] U [[1<=p7 & 1<=p13] & [1<=p17 & [~ [AF [[1<=p52 & [1<=p56 & 1<=p89]]]] | [1<=p4 & [1<=p9 & 1<=p15]]]]]]
normalized: [~ [EG [~ [[[[[[1<=p9 & 1<=p15] & 1<=p4] | EG [~ [[[1<=p56 & 1<=p89] & 1<=p52]]]] & 1<=p17] & [1<=p7 & 1<=p13]]]]] & ~ [E [~ [[[[[[1<=p9 & 1<=p15] & 1<=p4] | EG [~ [[[1<=p56 & 1<=p89] & 1<=p52]]]] & 1<=p17] & [1<=p7 & 1<=p13]]] U [~ [[[[1<=p64 & 1<=p74] & 1<=p62] | ~ [[[1<=p30 & 1<=p31] & 1<=p22]]]] & ~ [[[[[[1<=p9 & 1<=p15] & 1<=p4] | EG [~ [[[1<=p56 & 1<=p89] & 1<=p52]]]] & 1<=p17] & [1<=p7 & 1<=p13]]]]]]]

abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p17)
states: 420
abstracting: (1<=p52)
states: 256
abstracting: (1<=p89)
states: 272
abstracting: (1<=p56)
states: 240
..
EG iterations: 2
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p62)
states: 32
abstracting: (1<=p74)
states: 36
abstracting: (1<=p64)
states: 64
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p17)
states: 420
abstracting: (1<=p52)
states: 256
abstracting: (1<=p89)
states: 272
abstracting: (1<=p56)
states: 240
..
EG iterations: 2
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p17)
states: 420
abstracting: (1<=p52)
states: 256
abstracting: (1<=p89)
states: 272
abstracting: (1<=p56)
states: 240
..
EG iterations: 2
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
....
EG iterations: 4
-> the formula is FALSE

FORMULA PermAdmissibility-PT-01-CTLFireability-14 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 1.980sec

checking: [EX [0<=0] & [AF [[EX [[1<=p36 & [1<=p39 & 1<=p59]]] | AG [[p52<=0 | [p57<=0 | p91<=0]]]]] & AF [[[A [AF [[1<=p4 & [1<=p9 & 1<=p17]]] U [[[1<=p2 & [1<=p8 & 1<=p15]] | [1<=p19 & [1<=p27 & 1<=p35]]] & EF [[1<=p23 & [1<=p31 & 1<=p35]]]]] & 1<=p52] & [1<=p56 & 1<=p80]]]]]
normalized: [[~ [EG [~ [[[1<=p56 & 1<=p80] & [1<=p52 & [~ [EG [~ [[E [true U [1<=p23 & [1<=p31 & 1<=p35]]] & [[1<=p19 & [1<=p27 & 1<=p35]] | [1<=p2 & [1<=p8 & 1<=p15]]]]]]] & ~ [E [~ [[E [true U [1<=p23 & [1<=p31 & 1<=p35]]] & [[1<=p19 & [1<=p27 & 1<=p35]] | [1<=p2 & [1<=p8 & 1<=p15]]]]] U [EG [~ [[1<=p4 & [1<=p9 & 1<=p17]]]] & ~ [[E [true U [1<=p23 & [1<=p31 & 1<=p35]]] & [[1<=p19 & [1<=p27 & 1<=p35]] | [1<=p2 & [1<=p8 & 1<=p15]]]]]]]]]]]]]] & ~ [EG [~ [[~ [E [true U ~ [[p52<=0 | [p57<=0 | p91<=0]]]]] | EX [[1<=p36 & [1<=p39 & 1<=p59]]]]]]]] & EX [0<=0]]

abstracting: (0<=0)
states: 9,862 (3)
.abstracting: (1<=p59)
states: 64
abstracting: (1<=p39)
states: 136
abstracting: (1<=p36)
states: 146
.abstracting: (p91<=0)
states: 9,590 (3)
abstracting: (p57<=0)
states: 9,622 (3)
abstracting: (p52<=0)
states: 9,606 (3)
..........
EG iterations: 10
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p35)
states: 1,168 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p35)
states: 1,168 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p17)
states: 420
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
....
EG iterations: 4
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p35)
states: 1,168 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p35)
states: 1,168 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p35)
states: 1,168 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p35)
states: 1,168 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p23)
states: 1,322 (3)
..
EG iterations: 2
abstracting: (1<=p52)
states: 256
abstracting: (1<=p80)
states: 272
abstracting: (1<=p56)
states: 240

EG iterations: 0
-> the formula is FALSE

FORMULA PermAdmissibility-PT-01-CTLFireability-08 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 4.109sec

checking: AG [[[EX [[EX [[[[1<=p97 & [1<=p101 & 1<=p103]] | [1<=p97 & [1<=p101 & 1<=p102]]] | [[1<=p96 & [1<=p101 & 1<=p102]] | [1<=p96 & [1<=p101 & 1<=p103]]]]] | EF [[[[1<=p81 & [1<=p83 & 1<=p99]] | [1<=p82 & [1<=p84 & 1<=p99]]] | [[1<=p82 & [1<=p83 & 1<=p99]] | [1<=p81 & [1<=p84 & 1<=p99]]]]]]] | [1<=p81 & [1<=p84 & 1<=p98]]] | [[1<=p81 & [1<=p83 & 1<=p98]] | [[1<=p82 & [1<=p84 & 1<=p98]] | [1<=p82 & [1<=p83 & 1<=p98]]]]]]
normalized: ~ [E [true U ~ [[[[[1<=p82 & [1<=p83 & 1<=p98]] | [1<=p82 & [1<=p84 & 1<=p98]]] | [1<=p81 & [1<=p83 & 1<=p98]]] | [[1<=p81 & [1<=p84 & 1<=p98]] | EX [[E [true U [[[1<=p81 & [1<=p84 & 1<=p99]] | [1<=p82 & [1<=p83 & 1<=p99]]] | [[1<=p82 & [1<=p84 & 1<=p99]] | [1<=p81 & [1<=p83 & 1<=p99]]]]] | EX [[[[1<=p96 & [1<=p101 & 1<=p103]] | [1<=p96 & [1<=p101 & 1<=p102]]] | [[1<=p97 & [1<=p101 & 1<=p102]] | [1<=p97 & [1<=p101 & 1<=p103]]]]]]]]]]]]

abstracting: (1<=p103)
states: 3
abstracting: (1<=p101)
states: 4
abstracting: (1<=p97)
states: 3
abstracting: (1<=p102)
states: 3
abstracting: (1<=p101)
states: 4
abstracting: (1<=p97)
states: 3
abstracting: (1<=p102)
states: 3
abstracting: (1<=p101)
states: 4
abstracting: (1<=p96)
states: 3
abstracting: (1<=p103)
states: 3
abstracting: (1<=p101)
states: 4
abstracting: (1<=p96)
states: 3
.abstracting: (1<=p99)
states: 16
abstracting: (1<=p83)
states: 17
abstracting: (1<=p81)
states: 17
abstracting: (1<=p99)
states: 16
abstracting: (1<=p84)
states: 17
abstracting: (1<=p82)
states: 17
abstracting: (1<=p99)
states: 16
abstracting: (1<=p83)
states: 17
abstracting: (1<=p82)
states: 17
abstracting: (1<=p99)
states: 16
abstracting: (1<=p84)
states: 17
abstracting: (1<=p81)
states: 17
.abstracting: (1<=p98)
states: 4
abstracting: (1<=p84)
states: 17
abstracting: (1<=p81)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p83)
states: 17
abstracting: (1<=p81)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p84)
states: 17
abstracting: (1<=p82)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p83)
states: 17
abstracting: (1<=p82)
states: 17
-> the formula is FALSE

FORMULA PermAdmissibility-PT-01-CTLFireability-02 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 0.097sec

checking: AX [EF [[[[[[[[1<=p2 & [1<=p13 & 1<=p15]] | [1<=p6 & [1<=p12 & 1<=p15]]] | [[1<=p3 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p8 & 1<=p15]]]] | [[[1<=p0 & [1<=p9 & 1<=p15]] | [1<=p7 & [1<=p10 & 1<=p15]]] | [[1<=p0 & [1<=p8 & 1<=p15]] | [1<=p2 & [1<=p12 & 1<=p15]]]]] | [[[[1<=p6 & [1<=p13 & 1<=p15]] | [1<=p3 & [1<=p9 & 1<=p15]]] | [[1<=p7 & [1<=p15 & 1<=p16]] | [1<=p6 & [1<=p10 & 1<=p15]]]] | [[[1<=p7 & [1<=p11 & 1<=p15]] | [1<=p1 & [1<=p14 & 1<=p15]]] | [[1<=p4 & [1<=p10 & 1<=p15]] | [1<=p1 & [1<=p9 & 1<=p15]]]]]] | [[[[[1<=p0 & [1<=p12 & 1<=p15]] | [1<=p6 & [1<=p15 & 1<=p16]]] | [[1<=p0 & [1<=p11 & 1<=p15]] | [1<=p3 & [1<=p12 & 1<=p15]]]] | [[[1<=p5 & [1<=p13 & 1<=p15]] | [1<=p4 & [1<=p9 & 1<=p15]]] | [[1<=p1 & [1<=p8 & 1<=p15]] | [1<=p0 & [1<=p15 & 1<=p16]]]]] | [[[[1<=p6 & [1<=p11 & 1<=p15]] | [1<=p2 & [1<=p14 & 1<=p15]]] | [[1<=p3 & [1<=p11 & 1<=p15]] | [1<=p5 & [1<=p14 & 1<=p15]]]] | [[[1<=p0 & [1<=p10 & 1<=p15]] | [1<=p4 & [1<=p8 & 1<=p15]]] | [[1<=p7 & [1<=p9 & 1<=p15]] | [1<=p3 & [1<=p15 & 1<=p16]]]]]]] | [[[[[[1<=p7 & [1<=p14 & 1<=p15]] | [1<=p4 & [1<=p13 & 1<=p15]]] | [[1<=p0 & [1<=p14 & 1<=p15]] | [1<=p4 & [1<=p12 & 1<=p15]]]] | [[[1<=p5 & [1<=p9 & 1<=p15]] | [1<=p2 & [1<=p8 & 1<=p15]]] | [[1<=p1 & [1<=p11 & 1<=p15]] | [1<=p5 & [1<=p15 & 1<=p16]]]]] | [[[[1<=p0 & [1<=p13 & 1<=p15]] | [1<=p1 & [1<=p10 & 1<=p15]]] | [[1<=p4 & [1<=p11 & 1<=p15]] | [1<=p4 & [1<=p14 & 1<=p15]]]] | [[[1<=p2 & [1<=p15 & 1<=p16]] | [1<=p5 & [1<=p8 & 1<=p15]]] | [[1<=p5 & [1<=p12 & 1<=p15]] | [1<=p3 & [1<=p13 & 1<=p15]]]]]] | [[[[[1<=p3 & [1<=p8 & 1<=p15]] | [1<=p4 & [1<=p15 & 1<=p16]]] | [[1<=p2 & [1<=p11 & 1<=p15]] | [1<=p6 & [1<=p14 & 1<=p15]]]] | [[[1<=p6 & [1<=p9 & 1<=p15]] | [1<=p1 & [1<=p13 & 1<=p15]]] | [[1<=p7 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p10 & 1<=p15]]]]] | [[[[1<=p3 & [1<=p14 & 1<=p15]] | [1<=p5 & [1<=p11 & 1<=p15]]] | [[1<=p1 & [1<=p15 & 1<=p16]] | [1<=p6 & [1<=p8 & 1<=p15]]]] | [[[1<=p2 & [1<=p9 & 1<=p15]] | [1<=p1 & [1<=p12 & 1<=p15]]] | [[1<=p7 & [1<=p13 & 1<=p15]] | [1<=p5 & [1<=p10 & 1<=p15]]]]]]]]]]
normalized: ~ [EX [~ [E [true U [[[[[[[1<=p5 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p13 & 1<=p15]]] | [[1<=p1 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p9 & 1<=p15]]]] | [[[1<=p6 & [1<=p8 & 1<=p15]] | [1<=p1 & [1<=p15 & 1<=p16]]] | [[1<=p5 & [1<=p11 & 1<=p15]] | [1<=p3 & [1<=p14 & 1<=p15]]]]] | [[[[1<=p2 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p12 & 1<=p15]]] | [[1<=p1 & [1<=p13 & 1<=p15]] | [1<=p6 & [1<=p9 & 1<=p15]]]] | [[[1<=p6 & [1<=p14 & 1<=p15]] | [1<=p2 & [1<=p11 & 1<=p15]]] | [[1<=p4 & [1<=p15 & 1<=p16]] | [1<=p3 & [1<=p8 & 1<=p15]]]]]] | [[[[[1<=p3 & [1<=p13 & 1<=p15]] | [1<=p5 & [1<=p12 & 1<=p15]]] | [[1<=p5 & [1<=p8 & 1<=p15]] | [1<=p2 & [1<=p15 & 1<=p16]]]] | [[[1<=p4 & [1<=p14 & 1<=p15]] | [1<=p4 & [1<=p11 & 1<=p15]]] | [[1<=p1 & [1<=p10 & 1<=p15]] | [1<=p0 & [1<=p13 & 1<=p15]]]]] | [[[[1<=p5 & [1<=p15 & 1<=p16]] | [1<=p1 & [1<=p11 & 1<=p15]]] | [[1<=p2 & [1<=p8 & 1<=p15]] | [1<=p5 & [1<=p9 & 1<=p15]]]] | [[[1<=p4 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p14 & 1<=p15]]] | [[1<=p4 & [1<=p13 & 1<=p15]] | [1<=p7 & [1<=p14 & 1<=p15]]]]]]] | [[[[[[1<=p3 & [1<=p15 & 1<=p16]] | [1<=p7 & [1<=p9 & 1<=p15]]] | [[1<=p4 & [1<=p8 & 1<=p15]] | [1<=p0 & [1<=p10 & 1<=p15]]]] | [[[1<=p5 & [1<=p14 & 1<=p15]] | [1<=p3 & [1<=p11 & 1<=p15]]] | [[1<=p2 & [1<=p14 & 1<=p15]] | [1<=p6 & [1<=p11 & 1<=p15]]]]] | [[[[1<=p0 & [1<=p15 & 1<=p16]] | [1<=p1 & [1<=p8 & 1<=p15]]] | [[1<=p4 & [1<=p9 & 1<=p15]] | [1<=p5 & [1<=p13 & 1<=p15]]]] | [[[1<=p3 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p11 & 1<=p15]]] | [[1<=p6 & [1<=p15 & 1<=p16]] | [1<=p0 & [1<=p12 & 1<=p15]]]]]] | [[[[[1<=p1 & [1<=p9 & 1<=p15]] | [1<=p4 & [1<=p10 & 1<=p15]]] | [[1<=p1 & [1<=p14 & 1<=p15]] | [1<=p7 & [1<=p11 & 1<=p15]]]] | [[[1<=p6 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p15 & 1<=p16]]] | [[1<=p3 & [1<=p9 & 1<=p15]] | [1<=p6 & [1<=p13 & 1<=p15]]]]] | [[[[1<=p2 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p8 & 1<=p15]]] | [[1<=p7 & [1<=p10 & 1<=p15]] | [1<=p0 & [1<=p9 & 1<=p15]]]] | [[[1<=p7 & [1<=p8 & 1<=p15]] | [1<=p3 & [1<=p10 & 1<=p15]]] | [[1<=p6 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p13 & 1<=p15]]]]]]]]]]]]

abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
.-> the formula is TRUE

FORMULA PermAdmissibility-PT-01-CTLFireability-04 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m29.547sec

checking: EF [[AF [[[[[[[[1<=p23 & [1<=p30 & 1<=p31]] | [1<=p19 & [1<=p29 & 1<=p30]]] | [[1<=p22 & [1<=p27 & 1<=p30]] | [1<=p28 & [1<=p30 & 1<=p34]]]] | [[[1<=p19 & [1<=p30 & 1<=p32]] | [1<=p28 & [1<=p30 & 1<=p32]]] | [[1<=p19 & [1<=p30 & 1<=p34]] | [1<=p20 & [1<=p26 & 1<=p30]]]]] | [[[[1<=p23 & [1<=p30 & 1<=p33]] | [1<=p23 & [1<=p26 & 1<=p30]]] | [[1<=p20 & [1<=p27 & 1<=p30]] | [1<=p25 & [1<=p28 & 1<=p30]]]] | [[[1<=p21 & [1<=p30 & 1<=p34]] | [1<=p21 & [1<=p30 & 1<=p32]]] | [[1<=p23 & [1<=p25 & 1<=p30]] | [1<=p28 & [1<=p29 & 1<=p30]]]]]] | [[[[[1<=p18 & [1<=p30 & 1<=p34]] | [1<=p18 & [1<=p30 & 1<=p32]]] | [[1<=p24 & [1<=p30 & 1<=p34]] | [1<=p22 & [1<=p30 & 1<=p31]]]] | [[[1<=p19 & [1<=p27 & 1<=p30]] | [1<=p22 & [1<=p30 & 1<=p33]]] | [[1<=p22 & [1<=p25 & 1<=p30]] | [1<=p24 & [1<=p30 & 1<=p32]]]]] | [[[[1<=p18 & [1<=p29 & 1<=p30]] | [1<=p19 & [1<=p26 & 1<=p30]]] | [[1<=p20 & [1<=p30 & 1<=p33]] | [1<=p20 & [1<=p30 & 1<=p31]]]] | [[[1<=p21 & [1<=p29 & 1<=p30]] | [1<=p21 & [1<=p27 & 1<=p30]]] | [[1<=p20 & [1<=p25 & 1<=p30]] | [1<=p22 & [1<=p26 & 1<=p30]]]]]]] | [[[[[[1<=p24 & [1<=p29 & 1<=p30]] | [1<=p23 & [1<=p30 & 1<=p32]]] | [[1<=p27 & [1<=p28 & 1<=p30]] | [1<=p18 & [1<=p27 & 1<=p30]]]] | [[[1<=p24 & [1<=p27 & 1<=p30]] | [1<=p21 & [1<=p25 & 1<=p30]]] | [[1<=p19 & [1<=p30 & 1<=p31]] | [1<=p28 & [1<=p30 & 1<=p33]]]]] | [[[[1<=p19 & [1<=p30 & 1<=p33]] | [1<=p28 & [1<=p30 & 1<=p31]]] | [[1<=p23 & [1<=p30 & 1<=p34]] | [1<=p24 & [1<=p26 & 1<=p30]]]] | [[[1<=p19 & [1<=p25 & 1<=p30]] | [1<=p23 & [1<=p29 & 1<=p30]]] | [[1<=p21 & [1<=p30 & 1<=p33]] | [1<=p21 & [1<=p26 & 1<=p30]]]]]] | [[[[[1<=p21 & [1<=p30 & 1<=p31]] | [1<=p18 & [1<=p30 & 1<=p33]]] | [[1<=p18 & [1<=p30 & 1<=p31]] | [1<=p18 & [1<=p25 & 1<=p30]]]] | [[[1<=p24 & [1<=p30 & 1<=p33]] | [1<=p22 & [1<=p30 & 1<=p32]]] | [[1<=p24 & [1<=p30 & 1<=p31]] | [1<=p22 & [1<=p30 & 1<=p34]]]]] | [[[[1<=p20 & [1<=p30 & 1<=p34]] | [1<=p20 & [1<=p30 & 1<=p32]]] | [[1<=p22 & [1<=p29 & 1<=p30]] | [1<=p18 & [1<=p26 & 1<=p30]]]] | [[[1<=p24 & [1<=p25 & 1<=p30]] | [1<=p26 & [1<=p28 & 1<=p30]]] | [[1<=p23 & [1<=p27 & 1<=p30]] | [1<=p20 & [1<=p29 & 1<=p30]]]]]]]]] & EF [AG [[[[[[[[p23<=0 | [p30<=0 | p31<=0]] & [p19<=0 | [p29<=0 | p30<=0]]] & [[p22<=0 | [p27<=0 | p30<=0]] & [p28<=0 | [p30<=0 | p34<=0]]]] & [[[p19<=0 | [p30<=0 | p32<=0]] & [p28<=0 | [p30<=0 | p32<=0]]] & [[p19<=0 | [p30<=0 | p34<=0]] & [p20<=0 | [p26<=0 | p30<=0]]]]] & [[[[p23<=0 | [p30<=0 | p33<=0]] & [p23<=0 | [p26<=0 | p30<=0]]] & [[p20<=0 | [p27<=0 | p30<=0]] & [p25<=0 | [p28<=0 | p30<=0]]]] & [[[p21<=0 | [p30<=0 | p34<=0]] & [p21<=0 | [p30<=0 | p32<=0]]] & [[p23<=0 | [p25<=0 | p30<=0]] & [p28<=0 | [p29<=0 | p30<=0]]]]]] & [[[[[p18<=0 | [p30<=0 | p34<=0]] & [p18<=0 | [p30<=0 | p32<=0]]] & [[p24<=0 | [p30<=0 | p34<=0]] & [p22<=0 | [p30<=0 | p31<=0]]]] & [[[p19<=0 | [p27<=0 | p30<=0]] & [p22<=0 | [p30<=0 | p33<=0]]] & [[p22<=0 | [p25<=0 | p30<=0]] & [p24<=0 | [p30<=0 | p32<=0]]]]] & [[[[p18<=0 | [p29<=0 | p30<=0]] & [p19<=0 | [p26<=0 | p30<=0]]] & [[p20<=0 | [p30<=0 | p33<=0]] & [p20<=0 | [p30<=0 | p31<=0]]]] & [[[p21<=0 | [p29<=0 | p30<=0]] & [p21<=0 | [p27<=0 | p30<=0]]] & [[p20<=0 | [p25<=0 | p30<=0]] & [p22<=0 | [p26<=0 | p30<=0]]]]]]] & [[[[[[p24<=0 | [p29<=0 | p30<=0]] & [p23<=0 | [p30<=0 | p32<=0]]] & [[p27<=0 | [p28<=0 | p30<=0]] & [p18<=0 | [p27<=0 | p30<=0]]]] & [[[p24<=0 | [p27<=0 | p30<=0]] & [p21<=0 | [p25<=0 | p30<=0]]] & [[p19<=0 | [p30<=0 | p31<=0]] & [p28<=0 | [p30<=0 | p33<=0]]]]] & [[[[p19<=0 | [p30<=0 | p33<=0]] & [p28<=0 | [p30<=0 | p31<=0]]] & [[p23<=0 | [p30<=0 | p34<=0]] & [p24<=0 | [p26<=0 | p30<=0]]]] & [[[p19<=0 | [p25<=0 | p30<=0]] & [p23<=0 | [p29<=0 | p30<=0]]] & [[p21<=0 | [p30<=0 | p33<=0]] & [p21<=0 | [p26<=0 | p30<=0]]]]]] & [[[[[p21<=0 | [p30<=0 | p31<=0]] & [p18<=0 | [p30<=0 | p33<=0]]] & [[p18<=0 | [p30<=0 | p31<=0]] & [p18<=0 | [p25<=0 | p30<=0]]]] & [[[p24<=0 | [p30<=0 | p33<=0]] & [p22<=0 | [p30<=0 | p32<=0]]] & [[p24<=0 | [p30<=0 | p31<=0]] & [p22<=0 | [p30<=0 | p34<=0]]]]] & [[[[p20<=0 | [p30<=0 | p34<=0]] & [p20<=0 | [p30<=0 | p32<=0]]] & [[p22<=0 | [p29<=0 | p30<=0]] & [p18<=0 | [p26<=0 | p30<=0]]]] & [[[p24<=0 | [p25<=0 | p30<=0]] & [p26<=0 | [p28<=0 | p30<=0]]] & [[p23<=0 | [p27<=0 | p30<=0]] & [p20<=0 | [p29<=0 | p30<=0]]]]]]]]]]]]
normalized: E [true U [E [true U ~ [E [true U ~ [[[[[[[[p21<=0 | [p26<=0 | p30<=0]] & [p21<=0 | [p30<=0 | p33<=0]]] & [[p23<=0 | [p29<=0 | p30<=0]] & [p19<=0 | [p25<=0 | p30<=0]]]] & [[[p24<=0 | [p26<=0 | p30<=0]] & [p23<=0 | [p30<=0 | p34<=0]]] & [[p28<=0 | [p30<=0 | p31<=0]] & [p19<=0 | [p30<=0 | p33<=0]]]]] & [[[[p28<=0 | [p30<=0 | p33<=0]] & [p19<=0 | [p30<=0 | p31<=0]]] & [[p21<=0 | [p25<=0 | p30<=0]] & [p24<=0 | [p27<=0 | p30<=0]]]] & [[[p18<=0 | [p27<=0 | p30<=0]] & [p27<=0 | [p28<=0 | p30<=0]]] & [[p23<=0 | [p30<=0 | p32<=0]] & [p24<=0 | [p29<=0 | p30<=0]]]]]] & [[[[[p20<=0 | [p29<=0 | p30<=0]] & [p23<=0 | [p27<=0 | p30<=0]]] & [[p26<=0 | [p28<=0 | p30<=0]] & [p24<=0 | [p25<=0 | p30<=0]]]] & [[[p18<=0 | [p26<=0 | p30<=0]] & [p22<=0 | [p29<=0 | p30<=0]]] & [[p20<=0 | [p30<=0 | p32<=0]] & [p20<=0 | [p30<=0 | p34<=0]]]]] & [[[[p22<=0 | [p30<=0 | p34<=0]] & [p24<=0 | [p30<=0 | p31<=0]]] & [[p22<=0 | [p30<=0 | p32<=0]] & [p24<=0 | [p30<=0 | p33<=0]]]] & [[[p18<=0 | [p25<=0 | p30<=0]] & [p18<=0 | [p30<=0 | p31<=0]]] & [[p18<=0 | [p30<=0 | p33<=0]] & [p21<=0 | [p30<=0 | p31<=0]]]]]]] & [[[[[[p22<=0 | [p26<=0 | p30<=0]] & [p20<=0 | [p25<=0 | p30<=0]]] & [[p21<=0 | [p27<=0 | p30<=0]] & [p21<=0 | [p29<=0 | p30<=0]]]] & [[[p20<=0 | [p30<=0 | p31<=0]] & [p20<=0 | [p30<=0 | p33<=0]]] & [[p19<=0 | [p26<=0 | p30<=0]] & [p18<=0 | [p29<=0 | p30<=0]]]]] & [[[[p24<=0 | [p30<=0 | p32<=0]] & [p22<=0 | [p25<=0 | p30<=0]]] & [[p22<=0 | [p30<=0 | p33<=0]] & [p19<=0 | [p27<=0 | p30<=0]]]] & [[[p22<=0 | [p30<=0 | p31<=0]] & [p24<=0 | [p30<=0 | p34<=0]]] & [[p18<=0 | [p30<=0 | p32<=0]] & [p18<=0 | [p30<=0 | p34<=0]]]]]] & [[[[[p28<=0 | [p29<=0 | p30<=0]] & [p23<=0 | [p25<=0 | p30<=0]]] & [[p21<=0 | [p30<=0 | p32<=0]] & [p21<=0 | [p30<=0 | p34<=0]]]] & [[[p25<=0 | [p28<=0 | p30<=0]] & [p20<=0 | [p27<=0 | p30<=0]]] & [[p23<=0 | [p26<=0 | p30<=0]] & [p23<=0 | [p30<=0 | p33<=0]]]]] & [[[[p20<=0 | [p26<=0 | p30<=0]] & [p19<=0 | [p30<=0 | p34<=0]]] & [[p28<=0 | [p30<=0 | p32<=0]] & [p19<=0 | [p30<=0 | p32<=0]]]] & [[[p28<=0 | [p30<=0 | p34<=0]] & [p22<=0 | [p27<=0 | p30<=0]]] & [[p19<=0 | [p29<=0 | p30<=0]] & [p23<=0 | [p30<=0 | p31<=0]]]]]]]]]]]] & ~ [EG [~ [[[[[[[[1<=p20 & [1<=p29 & 1<=p30]] | [1<=p23 & [1<=p27 & 1<=p30]]] | [[1<=p26 & [1<=p28 & 1<=p30]] | [1<=p24 & [1<=p25 & 1<=p30]]]] | [[[1<=p18 & [1<=p26 & 1<=p30]] | [1<=p22 & [1<=p29 & 1<=p30]]] | [[1<=p20 & [1<=p30 & 1<=p32]] | [1<=p20 & [1<=p30 & 1<=p34]]]]] | [[[[1<=p22 & [1<=p30 & 1<=p34]] | [1<=p24 & [1<=p30 & 1<=p31]]] | [[1<=p22 & [1<=p30 & 1<=p32]] | [1<=p24 & [1<=p30 & 1<=p33]]]] | [[[1<=p18 & [1<=p25 & 1<=p30]] | [1<=p18 & [1<=p30 & 1<=p31]]] | [[1<=p18 & [1<=p30 & 1<=p33]] | [1<=p21 & [1<=p30 & 1<=p31]]]]]] | [[[[[1<=p21 & [1<=p26 & 1<=p30]] | [1<=p21 & [1<=p30 & 1<=p33]]] | [[1<=p23 & [1<=p29 & 1<=p30]] | [1<=p19 & [1<=p25 & 1<=p30]]]] | [[[1<=p24 & [1<=p26 & 1<=p30]] | [1<=p23 & [1<=p30 & 1<=p34]]] | [[1<=p28 & [1<=p30 & 1<=p31]] | [1<=p19 & [1<=p30 & 1<=p33]]]]] | [[[[1<=p28 & [1<=p30 & 1<=p33]] | [1<=p19 & [1<=p30 & 1<=p31]]] | [[1<=p21 & [1<=p25 & 1<=p30]] | [1<=p24 & [1<=p27 & 1<=p30]]]] | [[[1<=p18 & [1<=p27 & 1<=p30]] | [1<=p27 & [1<=p28 & 1<=p30]]] | [[1<=p23 & [1<=p30 & 1<=p32]] | [1<=p24 & [1<=p29 & 1<=p30]]]]]]] | [[[[[[1<=p22 & [1<=p26 & 1<=p30]] | [1<=p20 & [1<=p25 & 1<=p30]]] | [[1<=p21 & [1<=p27 & 1<=p30]] | [1<=p21 & [1<=p29 & 1<=p30]]]] | [[[1<=p20 & [1<=p30 & 1<=p31]] | [1<=p20 & [1<=p30 & 1<=p33]]] | [[1<=p19 & [1<=p26 & 1<=p30]] | [1<=p18 & [1<=p29 & 1<=p30]]]]] | [[[[1<=p24 & [1<=p30 & 1<=p32]] | [1<=p22 & [1<=p25 & 1<=p30]]] | [[1<=p22 & [1<=p30 & 1<=p33]] | [1<=p19 & [1<=p27 & 1<=p30]]]] | [[[1<=p22 & [1<=p30 & 1<=p31]] | [1<=p24 & [1<=p30 & 1<=p34]]] | [[1<=p18 & [1<=p30 & 1<=p32]] | [1<=p18 & [1<=p30 & 1<=p34]]]]]] | [[[[[1<=p28 & [1<=p29 & 1<=p30]] | [1<=p23 & [1<=p25 & 1<=p30]]] | [[1<=p21 & [1<=p30 & 1<=p32]] | [1<=p21 & [1<=p30 & 1<=p34]]]] | [[[1<=p25 & [1<=p28 & 1<=p30]] | [1<=p20 & [1<=p27 & 1<=p30]]] | [[1<=p23 & [1<=p26 & 1<=p30]] | [1<=p23 & [1<=p30 & 1<=p33]]]]] | [[[[1<=p20 & [1<=p26 & 1<=p30]] | [1<=p19 & [1<=p30 & 1<=p34]]] | [[1<=p28 & [1<=p30 & 1<=p32]] | [1<=p19 & [1<=p30 & 1<=p32]]]] | [[[1<=p28 & [1<=p30 & 1<=p34]] | [1<=p22 & [1<=p27 & 1<=p30]]] | [[1<=p19 & [1<=p29 & 1<=p30]] | [1<=p23 & [1<=p30 & 1<=p31]]]]]]]]]]]]]

abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p29)
states: 1,730 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p28)
states: 1,322 (3)
abstracting: (1<=p32)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p32)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p28)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p26)
states: 1,730 (3)
abstracting: (1<=p20)
states: 1,322 (3)
abstracting: (1<=p33)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p26)
states: 1,730 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p20)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p28)
states: 1,322 (3)
abstracting: (1<=p25)
states: 1,730 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p21)
states: 1,322 (3)
abstracting: (1<=p32)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p21)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p25)
states: 1,730 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p29)
states: 1,730 (3)
abstracting: (1<=p28)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p18)
states: 1,322 (3)
abstracting: (1<=p32)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p18)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p33)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p25)
states: 1,730 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p32)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p29)
states: 1,730 (3)
abstracting: (1<=p18)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p26)
states: 1,730 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p33)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p20)
states: 1,322 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p20)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p29)
states: 1,730 (3)
abstracting: (1<=p21)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p21)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p25)
states: 1,730 (3)
abstracting: (1<=p20)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p26)
states: 1,730 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p29)
states: 1,730 (3)
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p32)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p28)
states: 1,322 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p18)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p25)
states: 1,730 (3)
abstracting: (1<=p21)
states: 1,322 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p33)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p28)
states: 1,322 (3)
abstracting: (1<=p33)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p28)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p26)
states: 1,730 (3)
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p25)
states: 1,730 (3)
abstracting: (1<=p19)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p29)
states: 1,730 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p33)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p21)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p26)
states: 1,730 (3)
abstracting: (1<=p21)
states: 1,322 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p21)
states: 1,322 (3)
abstracting: (1<=p33)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p18)
states: 1,322 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p18)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p25)
states: 1,730 (3)
abstracting: (1<=p18)
states: 1,322 (3)
abstracting: (1<=p33)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p32)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p31)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p34)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p20)
states: 1,322 (3)
abstracting: (1<=p32)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p20)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p29)
states: 1,730 (3)
abstracting: (1<=p22)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p26)
states: 1,730 (3)
abstracting: (1<=p18)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p25)
states: 1,730 (3)
abstracting: (1<=p24)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p28)
states: 1,322 (3)
abstracting: (1<=p26)
states: 1,730 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p27)
states: 1,730 (3)
abstracting: (1<=p23)
states: 1,322 (3)
abstracting: (1<=p30)
states: 3,568 (3)
abstracting: (1<=p29)
states: 1,730 (3)
abstracting: (1<=p20)
states: 1,322 (3)
..............
EG iterations: 14
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p21<=0)
states: 8,540 (3)
-> the formula is TRUE

FORMULA PermAdmissibility-PT-01-CTLFireability-01 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m26.074sec

checking: A [EX [[[[[[[[p3<=0 | [p12<=0 | p17<=0]] & [p1<=0 | [p8<=0 | p17<=0]]] & [[p6<=0 | [p13<=0 | p17<=0]] & [p7<=0 | [p11<=0 | p17<=0]]]] & [[[p4<=0 | [p10<=0 | p17<=0]] & [p0<=0 | [p10<=0 | p17<=0]]] & [[p4<=0 | [p8<=0 | p17<=0]] & [p5<=0 | [p16<=0 | p17<=0]]]]] & [[[[p6<=0 | [p12<=0 | p17<=0]] & [p1<=0 | [p9<=0 | p17<=0]]] & [[p7<=0 | [p9<=0 | p17<=0]] & [p3<=0 | [p11<=0 | p17<=0]]]] & [[[p2<=0 | [p14<=0 | p17<=0]] & [p7<=0 | [p10<=0 | p17<=0]]] & [[p0<=0 | [p11<=0 | p17<=0]] & [p4<=0 | [p9<=0 | p17<=0]]]]]] & [[[[[p7<=0 | [p8<=0 | p17<=0]] & [p6<=0 | [p11<=0 | p17<=0]]] & [[p3<=0 | [p10<=0 | p17<=0]] & [p4<=0 | [p16<=0 | p17<=0]]]] & [[[p3<=0 | [p9<=0 | p17<=0]] & [p2<=0 | [p13<=0 | p17<=0]]] & [[p1<=0 | [p16<=0 | p17<=0]] & [p0<=0 | [p8<=0 | p17<=0]]]]] & [[[[p5<=0 | [p14<=0 | p17<=0]] & [p1<=0 | [p14<=0 | p17<=0]]] & [[p5<=0 | [p13<=0 | p17<=0]] & [p0<=0 | [p9<=0 | p17<=0]]]] & [[[p6<=0 | [p10<=0 | p17<=0]] & [p2<=0 | [p12<=0 | p17<=0]]] & [[p7<=0 | [p16<=0 | p17<=0]] & [p4<=0 | [p14<=0 | p17<=0]]]]]]] & [[[[[[p5<=0 | [p11<=0 | p17<=0]] & [p1<=0 | [p13<=0 | p17<=0]]] & [[p6<=0 | [p9<=0 | p17<=0]] & [p5<=0 | [p12<=0 | p17<=0]]]] & [[[p0<=0 | [p16<=0 | p17<=0]] & [p2<=0 | [p9<=0 | p17<=0]]] & [[p2<=0 | [p11<=0 | p17<=0]] & [p5<=0 | [p10<=0 | p17<=0]]]]] & [[[[p4<=0 | [p13<=0 | p17<=0]] & [p3<=0 | [p8<=0 | p17<=0]]] & [[p1<=0 | [p12<=0 | p17<=0]] & [p6<=0 | [p8<=0 | p17<=0]]]] & [[[p3<=0 | [p16<=0 | p17<=0]] & [p2<=0 | [p10<=0 | p17<=0]]] & [[p7<=0 | [p14<=0 | p17<=0]] & [p1<=0 | [p10<=0 | p17<=0]]]]]] & [[[[[p6<=0 | [p16<=0 | p17<=0]] & [p5<=0 | [p9<=0 | p17<=0]]] & [[p4<=0 | [p12<=0 | p17<=0]] & [p0<=0 | [p14<=0 | p17<=0]]]] & [[[p7<=0 | [p13<=0 | p17<=0]] & [p0<=0 | [p12<=0 | p17<=0]]] & [[p2<=0 | [p16<=0 | p17<=0]] & [p3<=0 | [p13<=0 | p17<=0]]]]] & [[[[p5<=0 | [p8<=0 | p17<=0]] & [p6<=0 | [p14<=0 | p17<=0]]] & [[p1<=0 | [p11<=0 | p17<=0]] & [p4<=0 | [p11<=0 | p17<=0]]]] & [[[p2<=0 | [p8<=0 | p17<=0]] & [p3<=0 | [p14<=0 | p17<=0]]] & [[p7<=0 | [p12<=0 | p17<=0]] & [p0<=0 | [p13<=0 | p17<=0]]]]]]]]] U [AX [[[[[[[[1<=p2 & [1<=p13 & 1<=p15]] | [1<=p6 & [1<=p12 & 1<=p15]]] | [[1<=p3 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p8 & 1<=p15]]]] | [[[1<=p0 & [1<=p9 & 1<=p15]] | [1<=p7 & [1<=p10 & 1<=p15]]] | [[1<=p0 & [1<=p8 & 1<=p15]] | [1<=p2 & [1<=p12 & 1<=p15]]]]] | [[[[1<=p6 & [1<=p13 & 1<=p15]] | [1<=p3 & [1<=p9 & 1<=p15]]] | [[1<=p7 & [1<=p15 & 1<=p16]] | [1<=p6 & [1<=p10 & 1<=p15]]]] | [[[1<=p7 & [1<=p11 & 1<=p15]] | [1<=p1 & [1<=p14 & 1<=p15]]] | [[1<=p4 & [1<=p10 & 1<=p15]] | [1<=p1 & [1<=p9 & 1<=p15]]]]]] | [[[[[1<=p0 & [1<=p12 & 1<=p15]] | [1<=p6 & [1<=p15 & 1<=p16]]] | [[1<=p0 & [1<=p11 & 1<=p15]] | [1<=p3 & [1<=p12 & 1<=p15]]]] | [[[1<=p5 & [1<=p13 & 1<=p15]] | [1<=p4 & [1<=p9 & 1<=p15]]] | [[1<=p1 & [1<=p8 & 1<=p15]] | [1<=p0 & [1<=p15 & 1<=p16]]]]] | [[[[1<=p6 & [1<=p11 & 1<=p15]] | [1<=p2 & [1<=p14 & 1<=p15]]] | [[1<=p3 & [1<=p11 & 1<=p15]] | [1<=p5 & [1<=p14 & 1<=p15]]]] | [[[1<=p0 & [1<=p10 & 1<=p15]] | [1<=p4 & [1<=p8 & 1<=p15]]] | [[1<=p7 & [1<=p9 & 1<=p15]] | [1<=p3 & [1<=p15 & 1<=p16]]]]]]] | [[[[[[1<=p7 & [1<=p14 & 1<=p15]] | [1<=p4 & [1<=p13 & 1<=p15]]] | [[1<=p0 & [1<=p14 & 1<=p15]] | [1<=p4 & [1<=p12 & 1<=p15]]]] | [[[1<=p5 & [1<=p9 & 1<=p15]] | [1<=p2 & [1<=p8 & 1<=p15]]] | [[1<=p1 & [1<=p11 & 1<=p15]] | [1<=p5 & [1<=p15 & 1<=p16]]]]] | [[[[1<=p0 & [1<=p13 & 1<=p15]] | [1<=p1 & [1<=p10 & 1<=p15]]] | [[1<=p4 & [1<=p11 & 1<=p15]] | [1<=p4 & [1<=p14 & 1<=p15]]]] | [[[1<=p2 & [1<=p15 & 1<=p16]] | [1<=p5 & [1<=p8 & 1<=p15]]] | [[1<=p5 & [1<=p12 & 1<=p15]] | [1<=p3 & [1<=p13 & 1<=p15]]]]]] | [[[[[1<=p3 & [1<=p8 & 1<=p15]] | [1<=p4 & [1<=p15 & 1<=p16]]] | [[1<=p2 & [1<=p11 & 1<=p15]] | [1<=p6 & [1<=p14 & 1<=p15]]]] | [[[1<=p6 & [1<=p9 & 1<=p15]] | [1<=p1 & [1<=p13 & 1<=p15]]] | [[1<=p7 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p10 & 1<=p15]]]]] | [[[[1<=p3 & [1<=p14 & 1<=p15]] | [1<=p5 & [1<=p11 & 1<=p15]]] | [[1<=p1 & [1<=p15 & 1<=p16]] | [1<=p6 & [1<=p8 & 1<=p15]]]] | [[[1<=p2 & [1<=p9 & 1<=p15]] | [1<=p1 & [1<=p12 & 1<=p15]]] | [[1<=p7 & [1<=p13 & 1<=p15]] | [1<=p5 & [1<=p10 & 1<=p15]]]]]]]]] & [[[1<=p81 & [1<=p84 & 1<=p98]] | [1<=p81 & [1<=p83 & 1<=p98]]] | [[1<=p82 & [1<=p84 & 1<=p98]] | [1<=p82 & [1<=p83 & 1<=p98]]]]]]
normalized: [~ [EG [~ [[[[[1<=p82 & [1<=p83 & 1<=p98]] | [1<=p82 & [1<=p84 & 1<=p98]]] | [[1<=p81 & [1<=p83 & 1<=p98]] | [1<=p81 & [1<=p84 & 1<=p98]]]] & ~ [EX [~ [[[[[[[[1<=p5 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p13 & 1<=p15]]] | [[1<=p1 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p9 & 1<=p15]]]] | [[[1<=p6 & [1<=p8 & 1<=p15]] | [1<=p1 & [1<=p15 & 1<=p16]]] | [[1<=p5 & [1<=p11 & 1<=p15]] | [1<=p3 & [1<=p14 & 1<=p15]]]]] | [[[[1<=p2 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p12 & 1<=p15]]] | [[1<=p1 & [1<=p13 & 1<=p15]] | [1<=p6 & [1<=p9 & 1<=p15]]]] | [[[1<=p6 & [1<=p14 & 1<=p15]] | [1<=p2 & [1<=p11 & 1<=p15]]] | [[1<=p4 & [1<=p15 & 1<=p16]] | [1<=p3 & [1<=p8 & 1<=p15]]]]]] | [[[[[1<=p3 & [1<=p13 & 1<=p15]] | [1<=p5 & [1<=p12 & 1<=p15]]] | [[1<=p5 & [1<=p8 & 1<=p15]] | [1<=p2 & [1<=p15 & 1<=p16]]]] | [[[1<=p4 & [1<=p14 & 1<=p15]] | [1<=p4 & [1<=p11 & 1<=p15]]] | [[1<=p1 & [1<=p10 & 1<=p15]] | [1<=p0 & [1<=p13 & 1<=p15]]]]] | [[[[1<=p5 & [1<=p15 & 1<=p16]] | [1<=p1 & [1<=p11 & 1<=p15]]] | [[1<=p2 & [1<=p8 & 1<=p15]] | [1<=p5 & [1<=p9 & 1<=p15]]]] | [[[1<=p4 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p14 & 1<=p15]]] | [[1<=p4 & [1<=p13 & 1<=p15]] | [1<=p7 & [1<=p14 & 1<=p15]]]]]]] | [[[[[[1<=p3 & [1<=p15 & 1<=p16]] | [1<=p7 & [1<=p9 & 1<=p15]]] | [[1<=p4 & [1<=p8 & 1<=p15]] | [1<=p0 & [1<=p10 & 1<=p15]]]] | [[[1<=p5 & [1<=p14 & 1<=p15]] | [1<=p3 & [1<=p11 & 1<=p15]]] | [[1<=p2 & [1<=p14 & 1<=p15]] | [1<=p6 & [1<=p11 & 1<=p15]]]]] | [[[[1<=p0 & [1<=p15 & 1<=p16]] | [1<=p1 & [1<=p8 & 1<=p15]]] | [[1<=p4 & [1<=p9 & 1<=p15]] | [1<=p5 & [1<=p13 & 1<=p15]]]] | [[[1<=p3 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p11 & 1<=p15]]] | [[1<=p6 & [1<=p15 & 1<=p16]] | [1<=p0 & [1<=p12 & 1<=p15]]]]]] | [[[[[1<=p1 & [1<=p9 & 1<=p15]] | [1<=p4 & [1<=p10 & 1<=p15]]] | [[1<=p1 & [1<=p14 & 1<=p15]] | [1<=p7 & [1<=p11 & 1<=p15]]]] | [[[1<=p6 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p15 & 1<=p16]]] | [[1<=p3 & [1<=p9 & 1<=p15]] | [1<=p6 & [1<=p13 & 1<=p15]]]]] | [[[[1<=p2 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p8 & 1<=p15]]] | [[1<=p7 & [1<=p10 & 1<=p15]] | [1<=p0 & [1<=p9 & 1<=p15]]]] | [[[1<=p7 & [1<=p8 & 1<=p15]] | [1<=p3 & [1<=p10 & 1<=p15]]] | [[1<=p6 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p13 & 1<=p15]]]]]]]]]]]]]]] & ~ [E [~ [[[[[1<=p82 & [1<=p83 & 1<=p98]] | [1<=p82 & [1<=p84 & 1<=p98]]] | [[1<=p81 & [1<=p83 & 1<=p98]] | [1<=p81 & [1<=p84 & 1<=p98]]]] & ~ [EX [~ [[[[[[[[1<=p5 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p13 & 1<=p15]]] | [[1<=p1 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p9 & 1<=p15]]]] | [[[1<=p6 & [1<=p8 & 1<=p15]] | [1<=p1 & [1<=p15 & 1<=p16]]] | [[1<=p5 & [1<=p11 & 1<=p15]] | [1<=p3 & [1<=p14 & 1<=p15]]]]] | [[[[1<=p2 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p12 & 1<=p15]]] | [[1<=p1 & [1<=p13 & 1<=p15]] | [1<=p6 & [1<=p9 & 1<=p15]]]] | [[[1<=p6 & [1<=p14 & 1<=p15]] | [1<=p2 & [1<=p11 & 1<=p15]]] | [[1<=p4 & [1<=p15 & 1<=p16]] | [1<=p3 & [1<=p8 & 1<=p15]]]]]] | [[[[[1<=p3 & [1<=p13 & 1<=p15]] | [1<=p5 & [1<=p12 & 1<=p15]]] | [[1<=p5 & [1<=p8 & 1<=p15]] | [1<=p2 & [1<=p15 & 1<=p16]]]] | [[[1<=p4 & [1<=p14 & 1<=p15]] | [1<=p4 & [1<=p11 & 1<=p15]]] | [[1<=p1 & [1<=p10 & 1<=p15]] | [1<=p0 & [1<=p13 & 1<=p15]]]]] | [[[[1<=p5 & [1<=p15 & 1<=p16]] | [1<=p1 & [1<=p11 & 1<=p15]]] | [[1<=p2 & [1<=p8 & 1<=p15]] | [1<=p5 & [1<=p9 & 1<=p15]]]] | [[[1<=p4 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p14 & 1<=p15]]] | [[1<=p4 & [1<=p13 & 1<=p15]] | [1<=p7 & [1<=p14 & 1<=p15]]]]]]] | [[[[[[1<=p3 & [1<=p15 & 1<=p16]] | [1<=p7 & [1<=p9 & 1<=p15]]] | [[1<=p4 & [1<=p8 & 1<=p15]] | [1<=p0 & [1<=p10 & 1<=p15]]]] | [[[1<=p5 & [1<=p14 & 1<=p15]] | [1<=p3 & [1<=p11 & 1<=p15]]] | [[1<=p2 & [1<=p14 & 1<=p15]] | [1<=p6 & [1<=p11 & 1<=p15]]]]] | [[[[1<=p0 & [1<=p15 & 1<=p16]] | [1<=p1 & [1<=p8 & 1<=p15]]] | [[1<=p4 & [1<=p9 & 1<=p15]] | [1<=p5 & [1<=p13 & 1<=p15]]]] | [[[1<=p3 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p11 & 1<=p15]]] | [[1<=p6 & [1<=p15 & 1<=p16]] | [1<=p0 & [1<=p12 & 1<=p15]]]]]] | [[[[[1<=p1 & [1<=p9 & 1<=p15]] | [1<=p4 & [1<=p10 & 1<=p15]]] | [[1<=p1 & [1<=p14 & 1<=p15]] | [1<=p7 & [1<=p11 & 1<=p15]]]] | [[[1<=p6 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p15 & 1<=p16]]] | [[1<=p3 & [1<=p9 & 1<=p15]] | [1<=p6 & [1<=p13 & 1<=p15]]]]] | [[[[1<=p2 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p8 & 1<=p15]]] | [[1<=p7 & [1<=p10 & 1<=p15]] | [1<=p0 & [1<=p9 & 1<=p15]]]] | [[[1<=p7 & [1<=p8 & 1<=p15]] | [1<=p3 & [1<=p10 & 1<=p15]]] | [[1<=p6 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p13 & 1<=p15]]]]]]]]]]]]] U [~ [EX [[[[[[[[p7<=0 | [p13<=0 | p17<=0]] & [p0<=0 | [p12<=0 | p17<=0]]] & [[p3<=0 | [p13<=0 | p17<=0]] & [p2<=0 | [p16<=0 | p17<=0]]]] & [[[p0<=0 | [p14<=0 | p17<=0]] & [p4<=0 | [p12<=0 | p17<=0]]] & [[p5<=0 | [p9<=0 | p17<=0]] & [p6<=0 | [p16<=0 | p17<=0]]]]] & [[[[p0<=0 | [p13<=0 | p17<=0]] & [p7<=0 | [p12<=0 | p17<=0]]] & [[p3<=0 | [p14<=0 | p17<=0]] & [p2<=0 | [p8<=0 | p17<=0]]]] & [[[p4<=0 | [p11<=0 | p17<=0]] & [p1<=0 | [p11<=0 | p17<=0]]] & [[p6<=0 | [p14<=0 | p17<=0]] & [p5<=0 | [p8<=0 | p17<=0]]]]]] & [[[[[p1<=0 | [p10<=0 | p17<=0]] & [p7<=0 | [p14<=0 | p17<=0]]] & [[p2<=0 | [p10<=0 | p17<=0]] & [p3<=0 | [p16<=0 | p17<=0]]]] & [[[p6<=0 | [p8<=0 | p17<=0]] & [p1<=0 | [p12<=0 | p17<=0]]] & [[p3<=0 | [p8<=0 | p17<=0]] & [p4<=0 | [p13<=0 | p17<=0]]]]] & [[[[p5<=0 | [p10<=0 | p17<=0]] & [p2<=0 | [p11<=0 | p17<=0]]] & [[p2<=0 | [p9<=0 | p17<=0]] & [p0<=0 | [p16<=0 | p17<=0]]]] & [[[p5<=0 | [p12<=0 | p17<=0]] & [p6<=0 | [p9<=0 | p17<=0]]] & [[p1<=0 | [p13<=0 | p17<=0]] & [p5<=0 | [p11<=0 | p17<=0]]]]]]] & [[[[[[p4<=0 | [p14<=0 | p17<=0]] & [p7<=0 | [p16<=0 | p17<=0]]] & [[p2<=0 | [p12<=0 | p17<=0]] & [p6<=0 | [p10<=0 | p17<=0]]]] & [[[p0<=0 | [p9<=0 | p17<=0]] & [p5<=0 | [p13<=0 | p17<=0]]] & [[p1<=0 | [p14<=0 | p17<=0]] & [p5<=0 | [p14<=0 | p17<=0]]]]] & [[[[p0<=0 | [p8<=0 | p17<=0]] & [p1<=0 | [p16<=0 | p17<=0]]] & [[p2<=0 | [p13<=0 | p17<=0]] & [p3<=0 | [p9<=0 | p17<=0]]]] & [[[p4<=0 | [p16<=0 | p17<=0]] & [p3<=0 | [p10<=0 | p17<=0]]] & [[p6<=0 | [p11<=0 | p17<=0]] & [p7<=0 | [p8<=0 | p17<=0]]]]]] & [[[[[p4<=0 | [p9<=0 | p17<=0]] & [p0<=0 | [p11<=0 | p17<=0]]] & [[p7<=0 | [p10<=0 | p17<=0]] & [p2<=0 | [p14<=0 | p17<=0]]]] & [[[p3<=0 | [p11<=0 | p17<=0]] & [p7<=0 | [p9<=0 | p17<=0]]] & [[p1<=0 | [p9<=0 | p17<=0]] & [p6<=0 | [p12<=0 | p17<=0]]]]] & [[[[p5<=0 | [p16<=0 | p17<=0]] & [p4<=0 | [p8<=0 | p17<=0]]] & [[p0<=0 | [p10<=0 | p17<=0]] & [p4<=0 | [p10<=0 | p17<=0]]]] & [[[p7<=0 | [p11<=0 | p17<=0]] & [p6<=0 | [p13<=0 | p17<=0]]] & [[p1<=0 | [p8<=0 | p17<=0]] & [p3<=0 | [p12<=0 | p17<=0]]]]]]]]]] & ~ [[[[[1<=p82 & [1<=p83 & 1<=p98]] | [1<=p82 & [1<=p84 & 1<=p98]]] | [[1<=p81 & [1<=p83 & 1<=p98]] | [1<=p81 & [1<=p84 & 1<=p98]]]] & ~ [EX [~ [[[[[[[[1<=p5 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p13 & 1<=p15]]] | [[1<=p1 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p9 & 1<=p15]]]] | [[[1<=p6 & [1<=p8 & 1<=p15]] | [1<=p1 & [1<=p15 & 1<=p16]]] | [[1<=p5 & [1<=p11 & 1<=p15]] | [1<=p3 & [1<=p14 & 1<=p15]]]]] | [[[[1<=p2 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p12 & 1<=p15]]] | [[1<=p1 & [1<=p13 & 1<=p15]] | [1<=p6 & [1<=p9 & 1<=p15]]]] | [[[1<=p6 & [1<=p14 & 1<=p15]] | [1<=p2 & [1<=p11 & 1<=p15]]] | [[1<=p4 & [1<=p15 & 1<=p16]] | [1<=p3 & [1<=p8 & 1<=p15]]]]]] | [[[[[1<=p3 & [1<=p13 & 1<=p15]] | [1<=p5 & [1<=p12 & 1<=p15]]] | [[1<=p5 & [1<=p8 & 1<=p15]] | [1<=p2 & [1<=p15 & 1<=p16]]]] | [[[1<=p4 & [1<=p14 & 1<=p15]] | [1<=p4 & [1<=p11 & 1<=p15]]] | [[1<=p1 & [1<=p10 & 1<=p15]] | [1<=p0 & [1<=p13 & 1<=p15]]]]] | [[[[1<=p5 & [1<=p15 & 1<=p16]] | [1<=p1 & [1<=p11 & 1<=p15]]] | [[1<=p2 & [1<=p8 & 1<=p15]] | [1<=p5 & [1<=p9 & 1<=p15]]]] | [[[1<=p4 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p14 & 1<=p15]]] | [[1<=p4 & [1<=p13 & 1<=p15]] | [1<=p7 & [1<=p14 & 1<=p15]]]]]]] | [[[[[[1<=p3 & [1<=p15 & 1<=p16]] | [1<=p7 & [1<=p9 & 1<=p15]]] | [[1<=p4 & [1<=p8 & 1<=p15]] | [1<=p0 & [1<=p10 & 1<=p15]]]] | [[[1<=p5 & [1<=p14 & 1<=p15]] | [1<=p3 & [1<=p11 & 1<=p15]]] | [[1<=p2 & [1<=p14 & 1<=p15]] | [1<=p6 & [1<=p11 & 1<=p15]]]]] | [[[[1<=p0 & [1<=p15 & 1<=p16]] | [1<=p1 & [1<=p8 & 1<=p15]]] | [[1<=p4 & [1<=p9 & 1<=p15]] | [1<=p5 & [1<=p13 & 1<=p15]]]] | [[[1<=p3 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p11 & 1<=p15]]] | [[1<=p6 & [1<=p15 & 1<=p16]] | [1<=p0 & [1<=p12 & 1<=p15]]]]]] | [[[[[1<=p1 & [1<=p9 & 1<=p15]] | [1<=p4 & [1<=p10 & 1<=p15]]] | [[1<=p1 & [1<=p14 & 1<=p15]] | [1<=p7 & [1<=p11 & 1<=p15]]]] | [[[1<=p6 & [1<=p10 & 1<=p15]] | [1<=p7 & [1<=p15 & 1<=p16]]] | [[1<=p3 & [1<=p9 & 1<=p15]] | [1<=p6 & [1<=p13 & 1<=p15]]]]] | [[[[1<=p2 & [1<=p12 & 1<=p15]] | [1<=p0 & [1<=p8 & 1<=p15]]] | [[1<=p7 & [1<=p10 & 1<=p15]] | [1<=p0 & [1<=p9 & 1<=p15]]]] | [[[1<=p7 & [1<=p8 & 1<=p15]] | [1<=p3 & [1<=p10 & 1<=p15]]] | [[1<=p6 & [1<=p12 & 1<=p15]] | [1<=p2 & [1<=p13 & 1<=p15]]]]]]]]]]]]]]]]]

abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
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states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
.abstracting: (1<=p98)
states: 4
abstracting: (1<=p84)
states: 17
abstracting: (1<=p81)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p83)
states: 17
abstracting: (1<=p81)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p84)
states: 17
abstracting: (1<=p82)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p83)
states: 17
abstracting: (1<=p82)
states: 17
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p0)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p4)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p14)
states: 2,064 (3)
abstracting: (1<=p3)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p11)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
abstracting: (1<=p16)
states: 2,064 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p8)
states: 2,064 (3)
abstracting: (1<=p6)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p9)
states: 2,064 (3)
abstracting: (1<=p2)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p12)
states: 2,064 (3)
abstracting: (1<=p1)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p13)
states: 2,064 (3)
abstracting: (1<=p7)
states: 1,296 (3)
abstracting: (1<=p15)
states: 56
abstracting: (1<=p10)
states: 2,064 (3)
abstracting: (1<=p5)
states: 1,296 (3)
.abstracting: (1<=p98)
states: 4
abstracting: (1<=p84)
states: 17
abstracting: (1<=p81)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p83)
states: 17
abstracting: (1<=p81)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p84)
states: 17
abstracting: (1<=p82)
states: 17
abstracting: (1<=p98)
states: 4
abstracting: (1<=p83)
states: 17
abstracting: (1<=p82)
states: 17

EG iterations: 0
-> the formula is FALSE

FORMULA PermAdmissibility-PT-01-CTLFireability-06 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 7.827sec

checking: EX [EG [EF [[[[[[[[[[[p47<=0 | [p85<=0 | p94<=0]] & [p50<=0 | [p86<=0 | p94<=0]]] & [[p50<=0 | [p67<=0 | p94<=0]] & [p50<=0 | [p87<=0 | p94<=0]]]] & [[[p47<=0 | [p65<=0 | p94<=0]] & [p47<=0 | [p86<=0 | p94<=0]]] & [[p51<=0 | [p65<=0 | p94<=0]] & [p60<=0 | [p67<=0 | p94<=0]]]]] & [[[[p51<=0 | [p63<=0 | p94<=0]] & [p50<=0 | [p66<=0 | p94<=0]]] & [[p45<=0 | [p63<=0 | p94<=0]] & [p47<=0 | [p87<=0 | p94<=0]]]] & [[[p60<=0 | [p66<=0 | p94<=0]] & [p46<=0 | [p68<=0 | p94<=0]]] & [[p47<=0 | [p66<=0 | p94<=0]] & [p60<=0 | [p87<=0 | p94<=0]]]]]] & [[[[[p48<=0 | [p63<=0 | p94<=0]] & [p51<=0 | [p85<=0 | p94<=0]]] & [[p47<=0 | [p68<=0 | p94<=0]] & [p48<=0 | [p65<=0 | p94<=0]]]] & [[[p46<=0 | [p86<=0 | p94<=0]] & [p48<=0 | [p66<=0 | p94<=0]]] & [[p49<=0 | [p87<=0 | p94<=0]] & [p60<=0 | [p86<=0 | p94<=0]]]]] & [[[[p51<=0 | [p67<=0 | p94<=0]] & [p47<=0 | [p67<=0 | p94<=0]]] & [[p46<=0 | [p87<=0 | p94<=0]] & [p45<=0 | [p65<=0 | p94<=0]]]] & [[[p50<=0 | [p85<=0 | p94<=0]] & [p50<=0 | [p68<=0 | p94<=0]]] & [[p49<=0 | [p63<=0 | p94<=0]] & [p60<=0 | [p85<=0 | p94<=0]]]]]]] & [[[[[[p51<=0 | [p66<=0 | p94<=0]] & [p60<=0 | [p68<=0 | p94<=0]]] & [[p45<=0 | [p86<=0 | p94<=0]] & [p49<=0 | [p65<=0 | p94<=0]]]] & [[[p60<=0 | [p63<=0 | p94<=0]] & [p48<=0 | [p68<=0 | p94<=0]]] & [[p48<=0 | [p87<=0 | p94<=0]] & [p49<=0 | [p85<=0 | p94<=0]]]]] & [[[[p46<=0 | [p63<=0 | p94<=0]] & [p45<=0 | [p66<=0 | p94<=0]]] & [[p45<=0 | [p87<=0 | p94<=0]] & [p50<=0 | [p63<=0 | p94<=0]]]] & [[[p46<=0 | [p85<=0 | p94<=0]] & [p45<=0 | [p67<=0 | p94<=0]]] & [[p48<=0 | [p67<=0 | p94<=0]] & [p51<=0 | [p68<=0 | p94<=0]]]]]] & [[[[[p49<=0 | [p86<=0 | p94<=0]] & [p51<=0 | [p86<=0 | p94<=0]]] & [[p46<=0 | [p66<=0 | p94<=0]] & [p48<=0 | [p85<=0 | p94<=0]]]] & [[[p47<=0 | [p63<=0 | p94<=0]] & [p50<=0 | [p65<=0 | p94<=0]]] & [[p45<=0 | [p68<=0 | p94<=0]] & [p60<=0 | [p65<=0 | p94<=0]]]]] & [[[[p46<=0 | [p65<=0 | p94<=0]] & [p49<=0 | [p68<=0 | p94<=0]]] & [[p48<=0 | [p86<=0 | p94<=0]] & [p49<=0 | [p66<=0 | p94<=0]]]] & [[[p45<=0 | [p85<=0 | p94<=0]] & [p46<=0 | [p67<=0 | p94<=0]]] & [[p49<=0 | [p67<=0 | p94<=0]] & [p51<=0 | [p87<=0 | p94<=0]]]]]]]] | [1<=p81 & [1<=p83 & 1<=p99]]] | [[1<=p82 & [1<=p84 & 1<=p99]] | [[1<=p82 & [1<=p83 & 1<=p99]] | [1<=p81 & [1<=p84 & 1<=p99]]]]] & [[[[[[[1<=p42 & [1<=p43 & 1<=p59]] | [1<=p39 & [1<=p44 & 1<=p59]]] | [[1<=p40 & [1<=p41 & 1<=p59]] | [[1<=p40 & [1<=p43 & 1<=p59]] | [1<=p39 & [1<=p41 & 1<=p59]]]]] | [[[1<=p36 & [1<=p39 & 1<=p59]] | [1<=p42 & [1<=p44 & 1<=p59]]] | [[1<=p36 & [1<=p37 & 1<=p59]] | [[1<=p39 & [1<=p43 & 1<=p59]] | [1<=p41 & [1<=p42 & 1<=p59]]]]]] | [[[[1<=p37 & [1<=p44 & 1<=p59]] | [1<=p36 & [1<=p42 & 1<=p59]]] | [[1<=p37 & [1<=p43 & 1<=p59]] | [[1<=p36 & [1<=p40 & 1<=p59]] | [1<=p37 & [1<=p41 & 1<=p59]]]]] | [[[1<=p40 & [1<=p44 & 1<=p59]] | [1<=p47 & [1<=p85 & 1<=p94]]] | [[1<=p50 & [1<=p86 & 1<=p94]] | [[1<=p50 & [1<=p67 & 1<=p94]] | [1<=p50 & [1<=p87 & 1<=p94]]]]]]] | [[[[[1<=p47 & [1<=p65 & 1<=p94]] | [1<=p47 & [1<=p86 & 1<=p94]]] | [[1<=p51 & [1<=p65 & 1<=p94]] | [[1<=p60 & [1<=p67 & 1<=p94]] | [1<=p51 & [1<=p63 & 1<=p94]]]]] | [[[1<=p50 & [1<=p66 & 1<=p94]] | [1<=p45 & [1<=p63 & 1<=p94]]] | [[1<=p47 & [1<=p87 & 1<=p94]] | [[1<=p60 & [1<=p66 & 1<=p94]] | [1<=p46 & [1<=p68 & 1<=p94]]]]]] | [[[[1<=p47 & [1<=p66 & 1<=p94]] | [1<=p60 & [1<=p87 & 1<=p94]]] | [[1<=p48 & [1<=p63 & 1<=p94]] | [[1<=p51 & [1<=p85 & 1<=p94]] | [1<=p47 & [1<=p68 & 1<=p94]]]]] | [[[1<=p48 & [1<=p65 & 1<=p94]] | [1<=p46 & [1<=p86 & 1<=p94]]] | [[1<=p48 & [1<=p66 & 1<=p94]] | [[1<=p49 & [1<=p87 & 1<=p94]] | [1<=p60 & [1<=p86 & 1<=p94]]]]]]]] | [[[[[[1<=p51 & [1<=p67 & 1<=p94]] | [1<=p47 & [1<=p67 & 1<=p94]]] | [[1<=p46 & [1<=p87 & 1<=p94]] | [[1<=p45 & [1<=p65 & 1<=p94]] | [1<=p50 & [1<=p85 & 1<=p94]]]]] | [[[1<=p50 & [1<=p68 & 1<=p94]] | [1<=p49 & [1<=p63 & 1<=p94]]] | [[1<=p60 & [1<=p85 & 1<=p94]] | [[1<=p51 & [1<=p66 & 1<=p94]] | [1<=p60 & [1<=p68 & 1<=p94]]]]]] | [[[[1<=p45 & [1<=p86 & 1<=p94]] | [1<=p49 & [1<=p65 & 1<=p94]]] | [[1<=p60 & [1<=p63 & 1<=p94]] | [[1<=p48 & [1<=p68 & 1<=p94]] | [1<=p48 & [1<=p87 & 1<=p94]]]]] | [[[1<=p49 & [1<=p85 & 1<=p94]] | [1<=p46 & [1<=p63 & 1<=p94]]] | [[1<=p45 & [1<=p66 & 1<=p94]] | [[1<=p45 & [1<=p87 & 1<=p94]] | [1<=p50 & [1<=p63 & 1<=p94]]]]]]] | [[[[[1<=p46 & [1<=p85 & 1<=p94]] | [1<=p45 & [1<=p67 & 1<=p94]]] | [[1<=p48 & [1<=p67 & 1<=p94]] | [[1<=p51 & [1<=p68 & 1<=p94]] | [1<=p49 & [1<=p86 & 1<=p94]]]]] | [[[1<=p51 & [1<=p86 & 1<=p94]] | [1<=p46 & [1<=p66 & 1<=p94]]] | [[1<=p48 & [1<=p85 & 1<=p94]] | [[1<=p47 & [1<=p63 & 1<=p94]] | [1<=p50 & [1<=p65 & 1<=p94]]]]]] | [[[[1<=p45 & [1<=p68 & 1<=p94]] | [1<=p60 & [1<=p65 & 1<=p94]]] | [[1<=p46 & [1<=p65 & 1<=p94]] | [[1<=p49 & [1<=p68 & 1<=p94]] | [1<=p48 & [1<=p86 & 1<=p94]]]]] | [[[1<=p49 & [1<=p66 & 1<=p94]] | [[1<=p45 & [1<=p85 & 1<=p94]] | [1<=p46 & [1<=p67 & 1<=p94]]]] | [[1<=p49 & [1<=p67 & 1<=p94]] | [[1<=p51 & [1<=p87 & 1<=p94]] | [[[[[[[p23<=0 | [p30<=0 | p31<=0]] & [p19<=0 | [p29<=0 | p30<=0]]] & [[p22<=0 | [p27<=0 | p30<=0]] & [p28<=0 | [p30<=0 | p34<=0]]]] & [[[p19<=0 | [p30<=0 | p32<=0]] & [p28<=0 | [p30<=0 | p32<=0]]] & [[p19<=0 | [p30<=0 | p34<=0]] & [p20<=0 | [p26<=0 | p30<=0]]]]] & [[[[p23<=0 | [p30<=0 | p33<=0]] & [p23<=0 | [p26<=0 | p30<=0]]] & [[p20<=0 | [p27<=0 | p30<=0]] & [p25<=0 | [p28<=0 | p30<=0]]]] & [[[p21<=0 | [p30<=0 | p34<=0]] & [p21<=0 | [p30<=0 | p32<=0]]] & [[p23<=0 | [p25<=0 | p30<=0]] & [p28<=0 | [p29<=0 | p30<=0]]]]]] & [[[[[p18<=0 | [p30<=0 | p34<=0]] & [p18<=0 | [p30<=0 | p32<=0]]] & [[p24<=0 | [p30<=0 | p34<=0]] & [p22<=0 | [p30<=0 | p31<=0]]]] & [[[p19<=0 | [p27<=0 | p30<=0]] & [p22<=0 | [p30<=0 | p33<=0]]] & [[p22<=0 | [p25<=0 | p30<=0]] & [p24<=0 | [p30<=0 | p32<=0]]]]] & [[[[p18<=0 | [p29<=0 | p30<=0]] & [p19<=0 | [p26<=0 | p30<=0]]] & [[p20<=0 | [p30<=0 | p33<=0]] & [p20<=0 | [p30<=0 | p31<=0]]]] & [[[p21<=0 | [p29<=0 | p30<=0]] & [p21<=0 | [p27<=0 | p30<=0]]] & [[p20<=0 | [p25<=0 | p30<=0]] & [p22<=0 | [p26<=0 | p30<=0]]]]]]] & [[[[[[p24<=0 | [p29<=0 | p30<=0]] & [p23<=0 | [p30<=0 | p32<=0]]] & [[p27<=0 | [p28<=0 | p30<=0]] & [p18<=0 | [p27<=0 | p30<=0]]]] & [[[p24<=0 | [p27<=0 | p30<=0]] & [p21<=0 | [p25<=0 | p30<=0]]] & [[p19<=0 | [p30<=0 | p31<=0]] & [p28<=0 | [p30<=0 | p33<=0]]]]] & [[[[p19<=0 | [p30<=0 | p33<=0]] & [p28<=0 | [p30<=0 | p31<=0]]] & [[p23<=0 | [p30<=0 | p34<=0]] & [p24<=0 | [p26<=0 | p30<=0]]]] & [[[p19<=0 | [p25<=0 | p30<=0]] & [p23<=0 | [p29<=0 | p30<=0]]] & [[p21<=0 | [p30<=0 | p33<=0]] & [p21<=0 | [p26<=0 | p30<=0]]]]]] & [[[[[p21<=0 | [p30<=0 | p31<=0]] & [p18<=0 | [p30<=0 | p33<=0]]] & [[p18<=0 | [p30<=0 | p31<=0]] & [p18<=0 | [p25<=0 | p30<=0]]]] & [[[p24<=0 | [p30<=0 | p33<=0]] & [p22<=0 | [p30<=0 | p32<=0]]] & [[p24<=0 | [p30<=0 | p31<=0]] & [p22<=0 | [p30<=0 | p34<=0]]]]] & [[[[p20<=0 | [p30<=0 | p34<=0]] & [p20<=0 | [p30<=0 | p32<=0]]] & [[p22<=0 | [p29<=0 | p30<=0]] & [p18<=0 | [p26<=0 | p30<=0]]]] & [[[p24<=0 | [p25<=0 | p30<=0]] & [p26<=0 | [p28<=0 | p30<=0]]] & [[p23<=0 | [p27<=0 | p30<=0]] & [p20<=0 | [p29<=0 | p30<=0]]]]]]]]]]]]]]]]]]]
normalized: EX [EG [E [true U [[[[[[[[[[[[[[[p21<=0 | [p25<=0 | p30<=0]] & [p24<=0 | [p27<=0 | p30<=0]]] & [[p28<=0 | [p30<=0 | p33<=0]] & [p19<=0 | [p30<=0 | p31<=0]]]] & [[[p18<=0 | [p27<=0 | p30<=0]] & [p27<=0 | [p28<=0 | p30<=0]]] & [[p23<=0 | [p30<=0 | p32<=0]] & [p24<=0 | [p29<=0 | p30<=0]]]]] & [[[[p21<=0 | [p26<=0 | p30<=0]] & [p21<=0 | [p30<=0 | p33<=0]]] & [[p23<=0 | [p29<=0 | p30<=0]] & [p19<=0 | [p25<=0 | p30<=0]]]] & [[[p24<=0 | [p26<=0 | p30<=0]] & [p23<=0 | [p30<=0 | p34<=0]]] & [[p28<=0 | [p30<=0 | p31<=0]] & [p19<=0 | [p30<=0 | p33<=0]]]]]] & [[[[[p22<=0 | [p30<=0 | p32<=0]] & [p24<=0 | [p30<=0 | p33<=0]]] & [[p22<=0 | [p30<=0 | p34<=0]] & [p24<=0 | [p30<=0 | p31<=0]]]] & [[[p18<=0 | [p25<=0 | p30<=0]] & [p18<=0 | [p30<=0 | p31<=0]]] & [[p18<=0 | [p30<=0 | p33<=0]] & [p21<=0 | [p30<=0 | p31<=0]]]]] & [[[[p20<=0 | [p29<=0 | p30<=0]] & [p23<=0 | [p27<=0 | p30<=0]]] & [[p26<=0 | [p28<=0 | p30<=0]] & [p24<=0 | [p25<=0 | p30<=0]]]] & [[[p18<=0 | [p26<=0 | p30<=0]] & [p22<=0 | [p29<=0 | p30<=0]]] & [[p20<=0 | [p30<=0 | p32<=0]] & [p20<=0 | [p30<=0 | p34<=0]]]]]]] & [[[[[[p22<=0 | [p26<=0 | p30<=0]] & [p20<=0 | [p25<=0 | p30<=0]]] & [[p21<=0 | [p27<=0 | p30<=0]] & [p21<=0 | [p29<=0 | p30<=0]]]] & [[[p20<=0 | [p30<=0 | p31<=0]] & [p20<=0 | [p30<=0 | p33<=0]]] & [[p19<=0 | [p26<=0 | p30<=0]] & [p18<=0 | [p29<=0 | p30<=0]]]]] & [[[[p24<=0 | [p30<=0 | p32<=0]] & [p22<=0 | [p25<=0 | p30<=0]]] & [[p22<=0 | [p30<=0 | p33<=0]] & [p19<=0 | [p27<=0 | p30<=0]]]] & [[[p22<=0 | [p30<=0 | p31<=0]] & [p24<=0 | [p30<=0 | p34<=0]]] & [[p18<=0 | [p30<=0 | p32<=0]] & [p18<=0 | [p30<=0 | p34<=0]]]]]] & [[[[[p28<=0 | [p29<=0 | p30<=0]] & [p23<=0 | [p25<=0 | p30<=0]]] & [[p21<=0 | [p30<=0 | p32<=0]] & [p21<=0 | [p30<=0 | p34<=0]]]] & [[[p25<=0 | [p28<=0 | p30<=0]] & [p20<=0 | [p27<=0 | p30<=0]]] & [[p23<=0 | [p26<=0 | p30<=0]] & [p23<=0 | [p30<=0 | p33<=0]]]]] & [[[[p20<=0 | [p26<=0 | p30<=0]] & [p19<=0 | [p30<=0 | p34<=0]]] & [[p28<=0 | [p30<=0 | p32<=0]] & [p19<=0 | [p30<=0 | p32<=0]]]] & [[[p28<=0 | [p30<=0 | p34<=0]] & [p22<=0 | [p27<=0 | p30<=0]]] & [[p19<=0 | [p29<=0 | p30<=0]] & [p23<=0 | [p30<=0 | p31<=0]]]]]]]] | [1<=p51 & [1<=p87 & 1<=p94]]] | [1<=p49 & [1<=p67 & 1<=p94]]] | [[[1<=p46 & [1<=p67 & 1<=p94]] | [1<=p45 & [1<=p85 & 1<=p94]]] | [1<=p49 & [1<=p66 & 1<=p94]]]] | [[[[1<=p48 & [1<=p86 & 1<=p94]] | [1<=p49 & [1<=p68 & 1<=p94]]] | [1<=p46 & [1<=p65 & 1<=p94]]] | [[1<=p60 & [1<=p65 & 1<=p94]] | [1<=p45 & [1<=p68 & 1<=p94]]]]] | [[[[[1<=p50 & [1<=p65 & 1<=p94]] | [1<=p47 & [1<=p63 & 1<=p94]]] | [1<=p48 & [1<=p85 & 1<=p94]]] | [[1<=p46 & [1<=p66 & 1<=p94]] | [1<=p51 & [1<=p86 & 1<=p94]]]] | [[[[1<=p49 & [1<=p86 & 1<=p94]] | [1<=p51 & [1<=p68 & 1<=p94]]] | [1<=p48 & [1<=p67 & 1<=p94]]] | [[1<=p45 & [1<=p67 & 1<=p94]] | [1<=p46 & [1<=p85 & 1<=p94]]]]]] | [[[[[[1<=p50 & [1<=p63 & 1<=p94]] | [1<=p45 & [1<=p87 & 1<=p94]]] | [1<=p45 & [1<=p66 & 1<=p94]]] | [[1<=p46 & [1<=p63 & 1<=p94]] | [1<=p49 & [1<=p85 & 1<=p94]]]] | [[[[1<=p48 & [1<=p87 & 1<=p94]] | [1<=p48 & [1<=p68 & 1<=p94]]] | [1<=p60 & [1<=p63 & 1<=p94]]] | [[1<=p49 & [1<=p65 & 1<=p94]] | [1<=p45 & [1<=p86 & 1<=p94]]]]] | [[[[[1<=p60 & [1<=p68 & 1<=p94]] | [1<=p51 & [1<=p66 & 1<=p94]]] | [1<=p60 & [1<=p85 & 1<=p94]]] | [[1<=p49 & [1<=p63 & 1<=p94]] | [1<=p50 & [1<=p68 & 1<=p94]]]] | [[[[1<=p50 & [1<=p85 & 1<=p94]] | [1<=p45 & [1<=p65 & 1<=p94]]] | [1<=p46 & [1<=p87 & 1<=p94]]] | [[1<=p47 & [1<=p67 & 1<=p94]] | [1<=p51 & [1<=p67 & 1<=p94]]]]]]] | [[[[[[[1<=p60 & [1<=p86 & 1<=p94]] | [1<=p49 & [1<=p87 & 1<=p94]]] | [1<=p48 & [1<=p66 & 1<=p94]]] | [[1<=p46 & [1<=p86 & 1<=p94]] | [1<=p48 & [1<=p65 & 1<=p94]]]] | [[[[1<=p47 & [1<=p68 & 1<=p94]] | [1<=p51 & [1<=p85 & 1<=p94]]] | [1<=p48 & [1<=p63 & 1<=p94]]] | [[1<=p60 & [1<=p87 & 1<=p94]] | [1<=p47 & [1<=p66 & 1<=p94]]]]] | [[[[[1<=p46 & [1<=p68 & 1<=p94]] | [1<=p60 & [1<=p66 & 1<=p94]]] | [1<=p47 & [1<=p87 & 1<=p94]]] | [[1<=p45 & [1<=p63 & 1<=p94]] | [1<=p50 & [1<=p66 & 1<=p94]]]] | [[[[1<=p51 & [1<=p63 & 1<=p94]] | [1<=p60 & [1<=p67 & 1<=p94]]] | [1<=p51 & [1<=p65 & 1<=p94]]] | [[1<=p47 & [1<=p86 & 1<=p94]] | [1<=p47 & [1<=p65 & 1<=p94]]]]]] | [[[[[[1<=p50 & [1<=p87 & 1<=p94]] | [1<=p50 & [1<=p67 & 1<=p94]]] | [1<=p50 & [1<=p86 & 1<=p94]]] | [[1<=p47 & [1<=p85 & 1<=p94]] | [1<=p40 & [1<=p44 & 1<=p59]]]] | [[[[1<=p37 & [1<=p41 & 1<=p59]] | [1<=p36 & [1<=p40 & 1<=p59]]] | [1<=p37 & [1<=p43 & 1<=p59]]] | [[1<=p36 & [1<=p42 & 1<=p59]] | [1<=p37 & [1<=p44 & 1<=p59]]]]] | [[[[[1<=p41 & [1<=p42 & 1<=p59]] | [1<=p39 & [1<=p43 & 1<=p59]]] | [1<=p36 & [1<=p37 & 1<=p59]]] | [[1<=p42 & [1<=p44 & 1<=p59]] | [1<=p36 & [1<=p39 & 1<=p59]]]] | [[[[1<=p39 & [1<=p41 & 1<=p59]] | [1<=p40 & [1<=p43 & 1<=p59]]] | [1<=p40 & [1<=p41 & 1<=p59]]] | [[1<=p39 & [1<=p44 & 1<=p59]] | [1<=p42 & [1<=p43 & 1<=p59]]]]]]]] & [[[[1<=p81 & [1<=p84 & 1<=p99]] | [1<=p82 & [1<=p83 & 1<=p99]]] | [1<=p82 & [1<=p84 & 1<=p99]]] | [[1<=p81 & [1<=p83 & 1<=p99]] | [[[[[[[p51<=0 | [p87<=0 | p94<=0]] & [p49<=0 | [p67<=0 | p94<=0]]] & [[p46<=0 | [p67<=0 | p94<=0]] & [p45<=0 | [p85<=0 | p94<=0]]]] & [[[p49<=0 | [p66<=0 | p94<=0]] & [p48<=0 | [p86<=0 | p94<=0]]] & [[p49<=0 | [p68<=0 | p94<=0]] & [p46<=0 | [p65<=0 | p94<=0]]]]] & [[[[p60<=0 | [p65<=0 | p94<=0]] & [p45<=0 | [p68<=0 | p94<=0]]] & [[p50<=0 | [p65<=0 | p94<=0]] & [p47<=0 | [p63<=0 | p94<=0]]]] & [[[p48<=0 | [p85<=0 | p94<=0]] & [p46<=0 | [p66<=0 | p94<=0]]] & [[p51<=0 | [p86<=0 | p94<=0]] & [p49<=0 | [p86<=0 | p94<=0]]]]]] & [[[[[p51<=0 | [p68<=0 | p94<=0]] & [p48<=0 | [p67<=0 | p94<=0]]] & [[p45<=0 | [p67<=0 | p94<=0]] & [p46<=0 | [p85<=0 | p94<=0]]]] & [[[p50<=0 | [p63<=0 | p94<=0]] & [p45<=0 | [p87<=0 | p94<=0]]] & [[p45<=0 | [p66<=0 | p94<=0]] & [p46<=0 | [p63<=0 | p94<=0]]]]] & [[[[p49<=0 | [p85<=0 | p94<=0]] & [p48<=0 | [p87<=0 | p94<=0]]] & [[p48<=0 | [p68<=0 | p94<=0]] & [p60<=0 | [p63<=0 | p94<=0]]]] & [[[p49<=0 | [p65<=0 | p94<=0]] & [p45<=0 | [p86<=0 | p94<=0]]] & [[p60<=0 | [p68<=0 | p94<=0]] & [p51<=0 | [p66<=0 | p94<=0]]]]]]] & [[[[[[p60<=0 | [p85<=0 | p94<=0]] & [p49<=0 | [p63<=0 | p94<=0]]] & [[p50<=0 | [p68<=0 | p94<=0]] & [p50<=0 | [p85<=0 | p94<=0]]]] & [[[p45<=0 | [p65<=0 | p94<=0]] & [p46<=0 | [p87<=0 | p94<=0]]] & [[p47<=0 | [p67<=0 | p94<=0]] & [p51<=0 | [p67<=0 | p94<=0]]]]] & [[[[p60<=0 | [p86<=0 | p94<=0]] & [p49<=0 | [p87<=0 | p94<=0]]] & [[p48<=0 | [p66<=0 | p94<=0]] & [p46<=0 | [p86<=0 | p94<=0]]]] & [[[p48<=0 | [p65<=0 | p94<=0]] & [p47<=0 | [p68<=0 | p94<=0]]] & [[p51<=0 | [p85<=0 | p94<=0]] & [p48<=0 | [p63<=0 | p94<=0]]]]]] & [[[[[p60<=0 | [p87<=0 | p94<=0]] & [p47<=0 | [p66<=0 | p94<=0]]] & [[p46<=0 | [p68<=0 | p94<=0]] & [p60<=0 | [p66<=0 | p94<=0]]]] & [[[p47<=0 | [p87<=0 | p94<=0]] & [p45<=0 | [p63<=0 | p94<=0]]] & [[p50<=0 | [p66<=0 | p94<=0]] & [p51<=0 | [p63<=0 | p94<=0]]]]] & [[[[p60<=0 | [p67<=0 | p94<=0]] & [p51<=0 | [p65<=0 | p94<=0]]] & [[p47<=0 | [p86<=0 | p94<=0]] & [p47<=0 | [p65<=0 | p94<=0]]]] & [[[p50<=0 | [p87<=0 | p94<=0]] & [p50<=0 | [p67<=0 | p94<=0]]] & [[p50<=0 | [p86<=0 | p94<=0]] & [p47<=0 | [p85<=0 | p94<=0]]]]]]]]]]]]]]

abstracting: (p94<=0)
states: 9,126 (3)
abstracting: (p85<=0)
states: 9,018 (3)
abstracting: (p47<=0)
states: 9,098 (3)
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abstracting: (1<=p94)
states: 736
abstracting: (1<=p87)
states: 844
abstracting: (1<=p51)
states: 764
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p20<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p22<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p34<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p26<=0)
states: 8,132 (3)
abstracting: (p21<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p29<=0)
states: 8,132 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p32<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p23<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p18<=0)
states: 8,540 (3)
abstracting: (p31<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p19<=0)
states: 8,540 (3)
abstracting: (p33<=0)
states: 8,132 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p28<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p27<=0)
states: 8,132 (3)
abstracting: (p24<=0)
states: 8,540 (3)
abstracting: (p30<=0)
states: 6,294 (3)
abstracting: (p25<=0)
states: 8,132 (3)
abstracting: (p21<=0)
states: 8,540 (3)

EG iterations: 0
.-> the formula is TRUE

FORMULA PermAdmissibility-PT-01-CTLFireability-05 TRUE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 1.001sec

checking: [EF [[[[[[[p88<=0 | p74<=0] | p62<=0] & [p71<=0 | [p75<=0 | p88<=0]]] & [[p61<=0 | [p74<=0 | p88<=0]] & [p72<=0 | [p75<=0 | p88<=0]]]] & [[[p62<=0 | [p71<=0 | p88<=0]] & [p74<=0 | [p76<=0 | p88<=0]]] & [[p62<=0 | [p73<=0 | p88<=0]] & [p73<=0 | [p76<=0 | p88<=0]]]]] & [[[[p61<=0 | [p71<=0 | p88<=0]] & [p61<=0 | [p73<=0 | p88<=0]]] & [[p72<=0 | [p76<=0 | p88<=0]] & [p74<=0 | [p75<=0 | p88<=0]]]] & [[[p62<=0 | [p72<=0 | p88<=0]] & [p73<=0 | [p75<=0 | p88<=0]]] & [[p71<=0 | [p76<=0 | p88<=0]] & [p61<=0 | [p72<=0 | p88<=0]]]]]]] & [EX [AX [[[[[[[[p3<=0 | [p12<=0 | p17<=0]] & [p1<=0 | [p8<=0 | p17<=0]]] & [[p6<=0 | [p13<=0 | p17<=0]] & [p7<=0 | [p11<=0 | p17<=0]]]] & [[[p4<=0 | [p10<=0 | p17<=0]] & [p0<=0 | [p10<=0 | p17<=0]]] & [[p4<=0 | [p8<=0 | p17<=0]] & [p5<=0 | [p16<=0 | p17<=0]]]]] & [[[[p6<=0 | [p12<=0 | p17<=0]] & [p1<=0 | [p9<=0 | p17<=0]]] & [[p7<=0 | [p9<=0 | p17<=0]] & [p3<=0 | [p11<=0 | p17<=0]]]] & [[[p2<=0 | [p14<=0 | p17<=0]] & [p7<=0 | [p10<=0 | p17<=0]]] & [[p0<=0 | [p11<=0 | p17<=0]] & [p4<=0 | [p9<=0 | p17<=0]]]]]] & [[[[[p7<=0 | [p8<=0 | p17<=0]] & [p6<=0 | [p11<=0 | p17<=0]]] & [[p3<=0 | [p10<=0 | p17<=0]] & [p4<=0 | [p16<=0 | p17<=0]]]] & [[[p3<=0 | [p9<=0 | p17<=0]] & [p2<=0 | [p13<=0 | p17<=0]]] & [[p1<=0 | [p16<=0 | p17<=0]] & [p0<=0 | [p8<=0 | p17<=0]]]]] & [[[[p5<=0 | [p14<=0 | p17<=0]] & [p1<=0 | [p14<=0 | p17<=0]]] & [[p5<=0 | [p13<=0 | p17<=0]] & [p0<=0 | [p9<=0 | p17<=0]]]] & [[[p6<=0 | [p10<=0 | p17<=0]] & [p2<=0 | [p12<=0 | p17<=0]]] & [[p7<=0 | [p16<=0 | p17<=0]] & [p4<=0 | [p14<=0 | p17<=0]]]]]]] & [[[[[[p5<=0 | [p11<=0 | p17<=0]] & [p1<=0 | [p13<=0 | p17<=0]]] & [[p6<=0 | [p9<=0 | p17<=0]] & [p5<=0 | [p12<=0 | p17<=0]]]] & [[[p0<=0 | [p16<=0 | p17<=0]] & [p2<=0 | [p9<=0 | p17<=0]]] & [[p2<=0 | [p11<=0 | p17<=0]] & [p5<=0 | [p10<=0 | p17<=0]]]]] & [[[[p4<=0 | [p13<=0 | p17<=0]] & [p3<=0 | [p8<=0 | p17<=0]]] & [[p1<=0 | [p12<=0 | p17<=0]] & [p6<=0 | [p8<=0 | p17<=0]]]] & [[[p3<=0 | [p16<=0 | p17<=0]] & [p2<=0 | [p10<=0 | p17<=0]]] & [[p7<=0 | [p14<=0 | p17<=0]] & [p1<=0 | [p10<=0 | p17<=0]]]]]] & [[[[[p6<=0 | [p16<=0 | p17<=0]] & [p5<=0 | [p9<=0 | p17<=0]]] & [[p4<=0 | [p12<=0 | p17<=0]] & [p0<=0 | [p14<=0 | p17<=0]]]] & [[[p7<=0 | [p13<=0 | p17<=0]] & [p0<=0 | [p12<=0 | p17<=0]]] & [[p2<=0 | [p16<=0 | p17<=0]] & [p3<=0 | [p13<=0 | p17<=0]]]]] & [[[[p5<=0 | [p8<=0 | p17<=0]] & [p6<=0 | [p14<=0 | p17<=0]]] & [[p1<=0 | [p11<=0 | p17<=0]] & [p4<=0 | [p11<=0 | p17<=0]]]] & [[[p2<=0 | [p8<=0 | p17<=0]] & [p3<=0 | [p14<=0 | p17<=0]]] & [[p7<=0 | [p12<=0 | p17<=0]] & [p0<=0 | [p13<=0 | p17<=0]]]]]]]]]] & EF [EG [[[[[[[[[1<=p97 & [1<=p100 & 1<=p102]] | [[1<=p58 & [1<=p78 & 1<=p95]] | [1<=p48 & [1<=p87 & 1<=p93]]]] | [[1<=p45 & [1<=p85 & 1<=p93]] | [[1<=p47 & [1<=p86 & 1<=p94]] | [1<=p58 & [1<=p89 & 1<=p95]]]]] | [[[1<=p50 & [1<=p63 & 1<=p93]] | [[1<=p51 & [1<=p63 & 1<=p94]] | [1<=p50 & [1<=p66 & 1<=p94]]]] | [[[1<=p45 & [1<=p63 & 1<=p94]] | [1<=p45 & [1<=p67 & 1<=p93]]] | [[1<=p60 & [1<=p87 & 1<=p94]] | [1<=p54 & [1<=p90 & 1<=p95]]]]]] | [[[[1<=p51 & [1<=p85 & 1<=p94]] | [[1<=p47 & [1<=p68 & 1<=p94]] | [1<=p48 & [1<=p65 & 1<=p94]]]] | [[1<=p49 & [1<=p87 & 1<=p94]] | [[1<=p51 & [1<=p67 & 1<=p94]] | [1<=p49 & [1<=p66 & 1<=p93]]]]] | [[[1<=p54 & [1<=p79 & 1<=p95]] | [[1<=p70 & [1<=p89 & 1<=p95]] | [1<=p56 & [1<=p91 & 1<=p95]]]] | [[[1<=p53 & [1<=p78 & 1<=p95]] | [1<=p48 & [1<=p68 & 1<=p94]]] | [[1<=p46 & [1<=p68 & 1<=p93]] | [1<=p97 & [1<=p100 & 1<=p103]]]]]]] | [[[[[1<=p50 & [1<=p93 & 1<=p67]] | [[1<=p57 & [1<=p77 & 1<=p95]] | [1<=p46 & [1<=p63 & 1<=p94]]]] | [[1<=p51 & [1<=p63 & 1<=p93]] | [[1<=p47 & [1<=p86 & 1<=p93]] | [1<=p70 & [1<=p79 & 1<=p95]]]]] | [[[1<=p53 & [1<=p89 & 1<=p95]] | [[1<=p45 & [1<=p63 & 1<=p93]] | [1<=p46 & [1<=p85 & 1<=p94]]]] | [[[1<=p45 & [1<=p67 & 1<=p94]] | [1<=p51 & [1<=p85 & 1<=p93]]] | [[1<=p60 & [1<=p66 & 1<=p93]] | [1<=p47 & [1<=p68 & 1<=p93]]]]]] | [[[[1<=p56 & [1<=p77 & 1<=p95]] | [[1<=p55 & [1<=p90 & 1<=p95]] | [1<=p51 & [1<=p67 & 1<=p93]]]] | [[[1<=p46 & [1<=p86 & 1<=p93]] | [1<=p60 & [1<=p65 & 1<=p94]]] | [[1<=p49 & [1<=p87 & 1<=p93]] | [1<=p48 & [1<=p86 & 1<=p94]]]]] | [[[1<=p49 & [1<=p66 & 1<=p94]] | [[1<=p45 & [1<=p85 & 1<=p94]] | [1<=p46 & [1<=p67 & 1<=p94]]]] | [[[1<=p48 & [1<=p66 & 1<=p93]] | [1<=p50 & [1<=p85 & 1<=p93]]] | [[1<=p54 & [1<=p80 & 1<=p95]] | [1<=p45 & [1<=p86 & 1<=p93]]]]]]]] | [[[[[[1<=p50 & [1<=p87 & 1<=p94]] | [[1<=p47 & [1<=p65 & 1<=p94]] | [1<=p54 & [1<=p89 & 1<=p95]]]] | [[1<=p55 & [1<=p79 & 1<=p95]] | [[1<=p53 & [1<=p92 & 1<=p95]] | [1<=p47 & [1<=p87 & 1<=p94]]]]] | [[[1<=p46 & [1<=p68 & 1<=p94]] | [[1<=p49 & [1<=p65 & 1<=p93]] | [1<=p57 & [1<=p89 & 1<=p95]]]] | [[[1<=p70 & [1<=p90 & 1<=p95]] | [1<=p46 & [1<=p86 & 1<=p94]]] | [[1<=p45 & [1<=p68 & 1<=p93]] | [1<=p46 & [1<=p65 & 1<=p93]]]]]] | [[[[1<=p60 & [1<=p65 & 1<=p93]] | [[1<=p96 & [1<=p100 & 1<=p102]] | [1<=p60 & [1<=p86 & 1<=p94]]]] | [[1<=p57 & [1<=p80 & 1<=p95]] | [[1<=p58 & [1<=p77 & 1<=p95]] | [1<=p51 & [1<=p66 & 1<=p94]]]]] | [[[1<=p60 & [1<=p68 & 1<=p94]] | [[1<=p56 & [1<=p89 & 1<=p95]] | [1<=p45 & [1<=p86 & 1<=p94]]]] | [[[1<=p49 & [1<=p65 & 1<=p94]] | [1<=p48 & [1<=p87 & 1<=p94]]] | [[1<=p47 & [1<=p65 & 1<=p93]] | [1<=p53 & [1<=p79 & 1<=p95]]]]]]] | [[[[[1<=p56 & [1<=p80 & 1<=p95]] | [[1<=p69 & [1<=p80 & 1<=p95]] | [1<=p50 & [1<=p66 & 1<=p93]]]] | [[1<=p69 & [1<=p89 & 1<=p95]] | [[1<=p60 & [1<=p87 & 1<=p93]] | [1<=p47 & [1<=p87 & 1<=p93]]]]] | [[[1<=p48 & [1<=p65 & 1<=p93]] | [[1<=p55 & [1<=p89 & 1<=p95]] | [1<=p50 & [1<=p65 & 1<=p94]]]] | [[[1<=p45 & [1<=p68 & 1<=p94]] | [1<=p55 & [1<=p80 & 1<=p95]]] | [[1<=p46 & [1<=p87 & 1<=p93]] | [1<=p58 & [1<=p90 & 1<=p95]]]]]] | [[[[1<=p51 & [1<=p66 & 1<=p93]] | [[1<=p50 & [1<=p86 & 1<=p94]] | [1<=p55 & [1<=p78 & 1<=p95]]]] | [[[1<=p51 & [1<=p65 & 1<=p94]] | [1<=p60 & [1<=p67 & 1<=p94]]] | [[1<=p45 & [1<=p87 & 1<=p93]] | [1<=p57 & [1<=p90 & 1<=p95]]]]] | [[[1<=p58 & [1<=p80 & 1<=p95]] | [[1<=p48 & [1<=p67 & 1<=p93]] | [1<=p47 & [1<=p66 & 1<=p94]]]] | [[[1<=p48 & [1<=p63 & 1<=p94]] | [1<=p49 & [1<=p86 & 1<=p93]]] | [[1<=p47 & [1<=p63 & 1<=p93]] | [1<=p46 & [1<=p66 & 1<=p93]]]]]]]]] | [[[[[[[1<=p48 & [1<=p85 & 1<=p93]] | [[1<=p50 & [1<=p65 & 1<=p93]] | [1<=p57 & [1<=p79 & 1<=p95]]]] | [[1<=p49 & [1<=p68 & 1<=p93]] | [[1<=p51 & [1<=p87 & 1<=p93]] | [1<=p53 & [1<=p91 & 1<=p95]]]]] | [[[1<=p46 & [1<=p87 & 1<=p94]] | [[1<=p45 & [1<=p65 & 1<=p94]] | [1<=p50 & [1<=p68 & 1<=p94]]]] | [[[1<=p70 & [1<=p80 & 1<=p95]] | [1<=p60 & [1<=p85 & 1<=p94]]] | [[1<=p60 & [1<=p63 & 1<=p94]] | [1<=p56 & [1<=p79 & 1<=p95]]]]]] | [[[[1<=p55 & [1<=p92 & 1<=p95]] | [[1<=p50 & [1<=p87 & 1<=p93]] | [1<=p45 & [1<=p87 & 1<=p94]]]] | [[1<=p51 & [1<=p65 & 1<=p93]] | [[1<=p56 & [1<=p90 & 1<=p95]] | [1<=p69 & [1<=p90 & 1<=p95]]]]] | [[[1<=p47 & [1<=p66 & 1<=p93]] | [[1<=p53 & [1<=p80 & 1<=p95]] | [1<=p49 & [1<=p86 & 1<=p94]]]] | [[[1<=p70 & [1<=p91 & 1<=p95]] | [1<=p47 & [1<=p63 & 1<=p94]]] | [[1<=p69 & [1<=p79 & 1<=p95]] | [1<=p70 & [1<=p77 & 1<=p95]]]]]]] | [[[[[1<=p58 & [1<=p91 & 1<=p95]] | [[1<=p46 & [1<=p65 & 1<=p94]] | [1<=p96 & [1<=p100 & 1<=p103]]]] | [[1<=p49 & [1<=p68 & 1<=p94]] | [[1<=p60 & [1<=p86 & 1<=p93]] | [1<=p45 & [1<=p65 & 1<=p93]]]]] | [[[1<=p60 & [1<=p68 & 1<=p93]] | [[1<=p51 & [1<=p87 & 1<=p94]] | [1<=p54 & [1<=p92 & 1<=p95]]]] | [[[1<=p57 & [1<=p91 & 1<=p95]] | [1<=p55 & [1<=p77 & 1<=p95]]] | [[1<=p47 & [1<=p85 & 1<=p94]] | [1<=p60 & [1<=p63 & 1<=p93]]]]]] | [[[[1<=p50 & [1<=p67 & 1<=p94]] | [[[1<=p68 & 1<=p93] & 1<=p48] | [1<=p69 & [1<=p77 & 1<=p95]]]] | [[[1<=p46 & [1<=p63 & 1<=p93]] | [1<=p45 & [1<=p66 & 1<=p93]]] | [[1<=p49 & [1<=p85 & 1<=p93]] | [1<=p58 & [1<=p79 & 1<=p95]]]]] | [[[1<=p60 & [1<=p66 & 1<=p94]] | [[1<=p46 & [1<=p85 & 1<=p93]] | [1<=p51 & [1<=p68 & 1<=p93]]]] | [[[1<=p51 & [1<=p86 & 1<=p93]] | [1<=p53 & [1<=p90 & 1<=p95]]] | [[1<=p56 & [1<=p92 & 1<=p95]] | [1<=p54 & [1<=p78 & 1<=p95]]]]]]]] | [[[[[[1<=p48 & [1<=p66 & 1<=p94]] | [[1<=p47 & [1<=p67 & 1<=p94]] | [1<=p46 & [1<=p67 & 1<=p93]]]] | [[1<=p50 & [1<=p85 & 1<=p94]] | [[1<=p48 & [1<=p86 & 1<=p93]] | [1<=p49 & [1<=p63 & 1<=p94]]]]] | [[[1<=p49 & [1<=p67 & 1<=p93]] | [[1<=p47 & [1<=p85 & 1<=p93]] | [1<=p69 & [1<=p91 & 1<=p95]]]] | [[[1<=p50 & [1<=p86 & 1<=p93]] | [1<=p49 & [1<=p85 & 1<=p94]]] | [[1<=p45 & [1<=p66 & 1<=p94]] | [1<=p69 & [1<=p92 & 1<=p95]]]]]] | [[[[1<=p60 & [1<=p67 & 1<=p93]] | [[1<=p58 & [1<=p92 & 1<=p95]] | [1<=p50 & [1<=p63 & 1<=p94]]]] | [[1<=p55 & [1<=p91 & 1<=p95]] | [[1<=p54 & [1<=p77 & 1<=p95]] | [1<=p48 & [1<=p67 & 1<=p94]]]]] | [[[1<=p48 & [1<=p63 & 1<=p93]] | [[1<=p51 & [1<=p68 & 1<=p94]] | [1<=p57 & [1<=p78 & 1<=p95]]]] | [[[1<=p70 & [1<=p78 & 1<=p95]] | [1<=p51 & [1<=p86 & 1<=p94]]] | [[1<=p46 & [1<=p66 & 1<=p94]] | [1<=p48 & [1<=p85 & 1<=p94]]]]]]] | [[[[[1<=p47 & [1<=p67 & 1<=p93]] | [[1<=p56 & [1<=p78 & 1<=p95]] | [1<=p54 & [1<=p91 & 1<=p95]]]] | [[1<=p50 & [1<=p68 & 1<=p93]] | [[1<=p70 & [1<=p92 & 1<=p95]] | [1<=p69 & [1<=p78 & 1<=p95]]]]] | [[[1<=p53 & [1<=p77 & 1<=p95]] | [[1<=p57 & [1<=p92 & 1<=p95]] | [1<=p49 & [1<=p63 & 1<=p93]]]] | [[[1<=p49 & [1<=p67 & 1<=p94]] | [1<=p60 & [1<=p85 & 1<=p93]]] | [[1<=p62 & [1<=p74 & 1<=p88]] | [1<=p71 & [1<=p75 & 1<=p88]]]]]] | [[[[1<=p61 & [1<=p74 & 1<=p88]] | [[1<=p72 & [1<=p75 & 1<=p88]] | [1<=p62 & [1<=p71 & 1<=p88]]]] | [[[1<=p74 & [1<=p76 & 1<=p88]] | [1<=p62 & [1<=p73 & 1<=p88]]] | [[1<=p73 & [1<=p76 & 1<=p88]] | [1<=p61 & [1<=p71 & 1<=p88]]]]] | [[[1<=p61 & [1<=p73 & 1<=p88]] | [[1<=p72 & [1<=p76 & 1<=p88]] | [1<=p74 & [1<=p75 & 1<=p88]]]] | [[[1<=p62 & [1<=p72 & 1<=p88]] | [1<=p73 & [1<=p75 & 1<=p88]]] | [[1<=p71 & [1<=p76 & 1<=p88]] | [1<=p61 & [1<=p72 & 1<=p88]]]]]]]]]]]]]]
normalized: [[E [true U EG [[[[[[[[[[1<=p62 & [1<=p72 & 1<=p88]] | [1<=p73 & [1<=p75 & 1<=p88]]] | [[1<=p61 & [1<=p72 & 1<=p88]] | [1<=p71 & [1<=p76 & 1<=p88]]]] | [[[1<=p72 & [1<=p76 & 1<=p88]] | [1<=p74 & [1<=p75 & 1<=p88]]] | [1<=p61 & [1<=p73 & 1<=p88]]]] | [[[[1<=p61 & [1<=p71 & 1<=p88]] | [1<=p73 & [1<=p76 & 1<=p88]]] | [[1<=p62 & [1<=p73 & 1<=p88]] | [1<=p74 & [1<=p76 & 1<=p88]]]] | [[[1<=p62 & [1<=p71 & 1<=p88]] | [1<=p72 & [1<=p75 & 1<=p88]]] | [1<=p61 & [1<=p74 & 1<=p88]]]]] | [[[[[1<=p71 & [1<=p75 & 1<=p88]] | [1<=p62 & [1<=p74 & 1<=p88]]] | [[1<=p60 & [1<=p85 & 1<=p93]] | [1<=p49 & [1<=p67 & 1<=p94]]]] | [[[1<=p49 & [1<=p63 & 1<=p93]] | [1<=p57 & [1<=p92 & 1<=p95]]] | [1<=p53 & [1<=p77 & 1<=p95]]]] | [[[[1<=p69 & [1<=p78 & 1<=p95]] | [1<=p70 & [1<=p92 & 1<=p95]]] | [1<=p50 & [1<=p68 & 1<=p93]]] | [[[1<=p54 & [1<=p91 & 1<=p95]] | [1<=p56 & [1<=p78 & 1<=p95]]] | [1<=p47 & [1<=p67 & 1<=p93]]]]]] | [[[[[[1<=p51 & [1<=p68 & 1<=p94]] | [1<=p57 & [1<=p78 & 1<=p95]]] | [1<=p48 & [1<=p63 & 1<=p93]]] | [[[1<=p48 & [1<=p85 & 1<=p94]] | [1<=p46 & [1<=p66 & 1<=p94]]] | [[1<=p51 & [1<=p86 & 1<=p94]] | [1<=p70 & [1<=p78 & 1<=p95]]]]] | [[[[1<=p48 & [1<=p67 & 1<=p94]] | [1<=p54 & [1<=p77 & 1<=p95]]] | [1<=p55 & [1<=p91 & 1<=p95]]] | [[[1<=p50 & [1<=p63 & 1<=p94]] | [1<=p58 & [1<=p92 & 1<=p95]]] | [1<=p60 & [1<=p67 & 1<=p93]]]]] | [[[[[1<=p69 & [1<=p92 & 1<=p95]] | [1<=p45 & [1<=p66 & 1<=p94]]] | [[1<=p49 & [1<=p85 & 1<=p94]] | [1<=p50 & [1<=p86 & 1<=p93]]]] | [[[1<=p69 & [1<=p91 & 1<=p95]] | [1<=p47 & [1<=p85 & 1<=p93]]] | [1<=p49 & [1<=p67 & 1<=p93]]]] | [[[[1<=p49 & [1<=p63 & 1<=p94]] | [1<=p48 & [1<=p86 & 1<=p93]]] | [1<=p50 & [1<=p85 & 1<=p94]]] | [[[1<=p46 & [1<=p67 & 1<=p93]] | [1<=p47 & [1<=p67 & 1<=p94]]] | [1<=p48 & [1<=p66 & 1<=p94]]]]]]] | [[[[[[[1<=p54 & [1<=p78 & 1<=p95]] | [1<=p56 & [1<=p92 & 1<=p95]]] | [[1<=p53 & [1<=p90 & 1<=p95]] | [1<=p51 & [1<=p86 & 1<=p93]]]] | [[[1<=p51 & [1<=p68 & 1<=p93]] | [1<=p46 & [1<=p85 & 1<=p93]]] | [1<=p60 & [1<=p66 & 1<=p94]]]] | [[[[1<=p58 & [1<=p79 & 1<=p95]] | [1<=p49 & [1<=p85 & 1<=p93]]] | [[1<=p45 & [1<=p66 & 1<=p93]] | [1<=p46 & [1<=p63 & 1<=p93]]]] | [[[1<=p69 & [1<=p77 & 1<=p95]] | [1<=p48 & [1<=p68 & 1<=p93]]] | [1<=p50 & [1<=p67 & 1<=p94]]]]] | [[[[[1<=p60 & [1<=p63 & 1<=p93]] | [1<=p47 & [1<=p85 & 1<=p94]]] | [[1<=p55 & [1<=p77 & 1<=p95]] | [1<=p57 & [1<=p91 & 1<=p95]]]] | [[[1<=p54 & [1<=p92 & 1<=p95]] | [1<=p51 & [1<=p87 & 1<=p94]]] | [1<=p60 & [1<=p68 & 1<=p93]]]] | [[[[1<=p45 & [1<=p65 & 1<=p93]] | [1<=p60 & [1<=p86 & 1<=p93]]] | [1<=p49 & [1<=p68 & 1<=p94]]] | [[[1<=p96 & [1<=p100 & 1<=p103]] | [1<=p46 & [1<=p65 & 1<=p94]]] | [1<=p58 & [1<=p91 & 1<=p95]]]]]] | [[[[[[1<=p70 & [1<=p77 & 1<=p95]] | [1<=p69 & [1<=p79 & 1<=p95]]] | [[1<=p47 & [1<=p63 & 1<=p94]] | [1<=p70 & [1<=p91 & 1<=p95]]]] | [[[1<=p49 & [1<=p86 & 1<=p94]] | [1<=p53 & [1<=p80 & 1<=p95]]] | [1<=p47 & [1<=p66 & 1<=p93]]]] | [[[[1<=p69 & [1<=p90 & 1<=p95]] | [1<=p56 & [1<=p90 & 1<=p95]]] | [1<=p51 & [1<=p65 & 1<=p93]]] | [[[1<=p45 & [1<=p87 & 1<=p94]] | [1<=p50 & [1<=p87 & 1<=p93]]] | [1<=p55 & [1<=p92 & 1<=p95]]]]] | [[[[[1<=p56 & [1<=p79 & 1<=p95]] | [1<=p60 & [1<=p63 & 1<=p94]]] | [[1<=p60 & [1<=p85 & 1<=p94]] | [1<=p70 & [1<=p80 & 1<=p95]]]] | [[[1<=p50 & [1<=p68 & 1<=p94]] | [1<=p45 & [1<=p65 & 1<=p94]]] | [1<=p46 & [1<=p87 & 1<=p94]]]] | [[[[1<=p53 & [1<=p91 & 1<=p95]] | [1<=p51 & [1<=p87 & 1<=p93]]] | [1<=p49 & [1<=p68 & 1<=p93]]] | [[[1<=p57 & [1<=p79 & 1<=p95]] | [1<=p50 & [1<=p65 & 1<=p93]]] | [1<=p48 & [1<=p85 & 1<=p93]]]]]]]] | [[[[[[[[1<=p46 & [1<=p66 & 1<=p93]] | [1<=p47 & [1<=p63 & 1<=p93]]] | [[1<=p49 & [1<=p86 & 1<=p93]] | [1<=p48 & [1<=p63 & 1<=p94]]]] | [[[1<=p47 & [1<=p66 & 1<=p94]] | [1<=p48 & [1<=p67 & 1<=p93]]] | [1<=p58 & [1<=p80 & 1<=p95]]]] | [[[[1<=p57 & [1<=p90 & 1<=p95]] | [1<=p45 & [1<=p87 & 1<=p93]]] | [[1<=p60 & [1<=p67 & 1<=p94]] | [1<=p51 & [1<=p65 & 1<=p94]]]] | [[[1<=p55 & [1<=p78 & 1<=p95]] | [1<=p50 & [1<=p86 & 1<=p94]]] | [1<=p51 & [1<=p66 & 1<=p93]]]]] | [[[[[1<=p58 & [1<=p90 & 1<=p95]] | [1<=p46 & [1<=p87 & 1<=p93]]] | [[1<=p55 & [1<=p80 & 1<=p95]] | [1<=p45 & [1<=p68 & 1<=p94]]]] | [[[1<=p50 & [1<=p65 & 1<=p94]] | [1<=p55 & [1<=p89 & 1<=p95]]] | [1<=p48 & [1<=p65 & 1<=p93]]]] | [[[[1<=p47 & [1<=p87 & 1<=p93]] | [1<=p60 & [1<=p87 & 1<=p93]]] | [1<=p69 & [1<=p89 & 1<=p95]]] | [[[1<=p50 & [1<=p66 & 1<=p93]] | [1<=p69 & [1<=p80 & 1<=p95]]] | [1<=p56 & [1<=p80 & 1<=p95]]]]]] | [[[[[[1<=p53 & [1<=p79 & 1<=p95]] | [1<=p47 & [1<=p65 & 1<=p93]]] | [[1<=p48 & [1<=p87 & 1<=p94]] | [1<=p49 & [1<=p65 & 1<=p94]]]] | [[[1<=p45 & [1<=p86 & 1<=p94]] | [1<=p56 & [1<=p89 & 1<=p95]]] | [1<=p60 & [1<=p68 & 1<=p94]]]] | [[[[1<=p51 & [1<=p66 & 1<=p94]] | [1<=p58 & [1<=p77 & 1<=p95]]] | [1<=p57 & [1<=p80 & 1<=p95]]] | [[[1<=p60 & [1<=p86 & 1<=p94]] | [1<=p96 & [1<=p100 & 1<=p102]]] | [1<=p60 & [1<=p65 & 1<=p93]]]]] | [[[[[1<=p46 & [1<=p65 & 1<=p93]] | [1<=p45 & [1<=p68 & 1<=p93]]] | [[1<=p46 & [1<=p86 & 1<=p94]] | [1<=p70 & [1<=p90 & 1<=p95]]]] | [[[1<=p57 & [1<=p89 & 1<=p95]] | [1<=p49 & [1<=p65 & 1<=p93]]] | [1<=p46 & [1<=p68 & 1<=p94]]]] | [[[[1<=p47 & [1<=p87 & 1<=p94]] | [1<=p53 & [1<=p92 & 1<=p95]]] | [1<=p55 & [1<=p79 & 1<=p95]]] | [[[1<=p54 & [1<=p89 & 1<=p95]] | [1<=p47 & [1<=p65 & 1<=p94]]] | [1<=p50 & [1<=p87 & 1<=p94]]]]]]] | [[[[[[[1<=p45 & [1<=p86 & 1<=p93]] | [1<=p54 & [1<=p80 & 1<=p95]]] | [[1<=p50 & [1<=p85 & 1<=p93]] | [1<=p48 & [1<=p66 & 1<=p93]]]] | [[[1<=p46 & [1<=p67 & 1<=p94]] | [1<=p45 & [1<=p85 & 1<=p94]]] | [1<=p49 & [1<=p66 & 1<=p94]]]] | [[[[1<=p48 & [1<=p86 & 1<=p94]] | [1<=p49 & [1<=p87 & 1<=p93]]] | [[1<=p60 & [1<=p65 & 1<=p94]] | [1<=p46 & [1<=p86 & 1<=p93]]]] | [[[1<=p51 & [1<=p67 & 1<=p93]] | [1<=p55 & [1<=p90 & 1<=p95]]] | [1<=p56 & [1<=p77 & 1<=p95]]]]] | [[[[[1<=p47 & [1<=p68 & 1<=p93]] | [1<=p60 & [1<=p66 & 1<=p93]]] | [[1<=p51 & [1<=p85 & 1<=p93]] | [1<=p45 & [1<=p67 & 1<=p94]]]] | [[[1<=p46 & [1<=p85 & 1<=p94]] | [1<=p45 & [1<=p63 & 1<=p93]]] | [1<=p53 & [1<=p89 & 1<=p95]]]] | [[[[1<=p70 & [1<=p79 & 1<=p95]] | [1<=p47 & [1<=p86 & 1<=p93]]] | [1<=p51 & [1<=p63 & 1<=p93]]] | [[[1<=p46 & [1<=p63 & 1<=p94]] | [1<=p57 & [1<=p77 & 1<=p95]]] | [1<=p50 & [1<=p93 & 1<=p67]]]]]] | [[[[[[1<=p97 & [1<=p100 & 1<=p103]] | [1<=p46 & [1<=p68 & 1<=p93]]] | [[1<=p48 & [1<=p68 & 1<=p94]] | [1<=p53 & [1<=p78 & 1<=p95]]]] | [[[1<=p56 & [1<=p91 & 1<=p95]] | [1<=p70 & [1<=p89 & 1<=p95]]] | [1<=p54 & [1<=p79 & 1<=p95]]]] | [[[[1<=p49 & [1<=p66 & 1<=p93]] | [1<=p51 & [1<=p67 & 1<=p94]]] | [1<=p49 & [1<=p87 & 1<=p94]]] | [[[1<=p48 & [1<=p65 & 1<=p94]] | [1<=p47 & [1<=p68 & 1<=p94]]] | [1<=p51 & [1<=p85 & 1<=p94]]]]] | [[[[[1<=p54 & [1<=p90 & 1<=p95]] | [1<=p60 & [1<=p87 & 1<=p94]]] | [[1<=p45 & [1<=p67 & 1<=p93]] | [1<=p45 & [1<=p63 & 1<=p94]]]] | [[[1<=p50 & [1<=p66 & 1<=p94]] | [1<=p51 & [1<=p63 & 1<=p94]]] | [1<=p50 & [1<=p63 & 1<=p93]]]] | [[[[1<=p58 & [1<=p89 & 1<=p95]] | [1<=p47 & [1<=p86 & 1<=p94]]] | [1<=p45 & [1<=p85 & 1<=p93]]] | [[[1<=p48 & [1<=p87 & 1<=p93]] | [1<=p58 & [1<=p78 & 1<=p95]]] | [1<=p97 & [1<=p100 & 1<=p102]]]]]]]]]]] & EX [~ [EX [~ [[[[[[[[p0<=0 | [p13<=0 | p17<=0]] & [p7<=0 | [p12<=0 | p17<=0]]] & [[p3<=0 | [p14<=0 | p17<=0]] & [p2<=0 | [p8<=0 | p17<=0]]]] & [[[p4<=0 | [p11<=0 | p17<=0]] & [p1<=0 | [p11<=0 | p17<=0]]] & [[p6<=0 | [p14<=0 | p17<=0]] & [p5<=0 | [p8<=0 | p17<=0]]]]] & [[[[p3<=0 | [p13<=0 | p17<=0]] & [p2<=0 | [p16<=0 | p17<=0]]] & [[p0<=0 | [p12<=0 | p17<=0]] & [p7<=0 | [p13<=0 | p17<=0]]]] & [[[p0<=0 | [p14<=0 | p17<=0]] & [p4<=0 | [p12<=0 | p17<=0]]] & [[p5<=0 | [p9<=0 | p17<=0]] & [p6<=0 | [p16<=0 | p17<=0]]]]]] & [[[[[p1<=0 | [p10<=0 | p17<=0]] & [p7<=0 | [p14<=0 | p17<=0]]] & [[p2<=0 | [p10<=0 | p17<=0]] & [p3<=0 | [p16<=0 | p17<=0]]]] & [[[p6<=0 | [p8<=0 | p17<=0]] & [p1<=0 | [p12<=0 | p17<=0]]] & [[p3<=0 | [p8<=0 | p17<=0]] & [p4<=0 | [p13<=0 | p17<=0]]]]] & [[[[p5<=0 | [p10<=0 | p17<=0]] & [p2<=0 | [p11<=0 | p17<=0]]] & [[p2<=0 | [p9<=0 | p17<=0]] & [p0<=0 | [p16<=0 | p17<=0]]]] & [[[p5<=0 | [p12<=0 | p17<=0]] & [p6<=0 | [p9<=0 | p17<=0]]] & [[p1<=0 | [p13<=0 | p17<=0]] & [p5<=0 | [p11<=0 | p17<=0]]]]]]] & [[[[[[p4<=0 | [p14<=0 | p17<=0]] & [p7<=0 | [p16<=0 | p17<=0]]] & [[p2<=0 | [p12<=0 | p17<=0]] & [p6<=0 | [p10<=0 | p17<=0]]]] & [[[p0<=0 | [p9<=0 | p17<=0]] & [p5<=0 | [p13<=0 | p17<=0]]] & [[p1<=0 | [p14<=0 | p17<=0]] & [p5<=0 | [p14<=0 | p17<=0]]]]] & [[[[p0<=0 | [p8<=0 | p17<=0]] & [p1<=0 | [p16<=0 | p17<=0]]] & [[p2<=0 | [p13<=0 | p17<=0]] & [p3<=0 | [p9<=0 | p17<=0]]]] & [[[p4<=0 | [p16<=0 | p17<=0]] & [p3<=0 | [p10<=0 | p17<=0]]] & [[p6<=0 | [p11<=0 | p17<=0]] & [p7<=0 | [p8<=0 | p17<=0]]]]]] & [[[[[p4<=0 | [p9<=0 | p17<=0]] & [p0<=0 | [p11<=0 | p17<=0]]] & [[p7<=0 | [p10<=0 | p17<=0]] & [p2<=0 | [p14<=0 | p17<=0]]]] & [[[p3<=0 | [p11<=0 | p17<=0]] & [p7<=0 | [p9<=0 | p17<=0]]] & [[p1<=0 | [p9<=0 | p17<=0]] & [p6<=0 | [p12<=0 | p17<=0]]]]] & [[[[p5<=0 | [p16<=0 | p17<=0]] & [p4<=0 | [p8<=0 | p17<=0]]] & [[p0<=0 | [p10<=0 | p17<=0]] & [p4<=0 | [p10<=0 | p17<=0]]]] & [[[p7<=0 | [p11<=0 | p17<=0]] & [p6<=0 | [p13<=0 | p17<=0]]] & [[p1<=0 | [p8<=0 | p17<=0]] & [p3<=0 | [p12<=0 | p17<=0]]]]]]]]]]]]] & E [true U [[[[[p61<=0 | [p72<=0 | p88<=0]] & [p71<=0 | [p76<=0 | p88<=0]]] & [[p73<=0 | [p75<=0 | p88<=0]] & [p62<=0 | [p72<=0 | p88<=0]]]] & [[[p74<=0 | [p75<=0 | p88<=0]] & [p72<=0 | [p76<=0 | p88<=0]]] & [[p61<=0 | [p73<=0 | p88<=0]] & [p61<=0 | [p71<=0 | p88<=0]]]]] & [[[[p73<=0 | [p76<=0 | p88<=0]] & [p62<=0 | [p73<=0 | p88<=0]]] & [[p74<=0 | [p76<=0 | p88<=0]] & [p62<=0 | [p71<=0 | p88<=0]]]] & [[[p72<=0 | [p75<=0 | p88<=0]] & [p61<=0 | [p74<=0 | p88<=0]]] & [[p71<=0 | [p75<=0 | p88<=0]] & [p62<=0 | [p88<=0 | p74<=0]]]]]]]]

abstracting: (p74<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p62<=0)
states: 9,830 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p75<=0)
states: 9,830 (3)
abstracting: (p71<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p74<=0)
states: 9,826 (3)
abstracting: (p61<=0)
states: 9,830 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p75<=0)
states: 9,830 (3)
abstracting: (p72<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p71<=0)
states: 9,826 (3)
abstracting: (p62<=0)
states: 9,830 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p76<=0)
states: 9,830 (3)
abstracting: (p74<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p73<=0)
states: 9,826 (3)
abstracting: (p62<=0)
states: 9,830 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p76<=0)
states: 9,830 (3)
abstracting: (p73<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p71<=0)
states: 9,826 (3)
abstracting: (p61<=0)
states: 9,830 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p73<=0)
states: 9,826 (3)
abstracting: (p61<=0)
states: 9,830 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p76<=0)
states: 9,830 (3)
abstracting: (p72<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p75<=0)
states: 9,830 (3)
abstracting: (p74<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p72<=0)
states: 9,826 (3)
abstracting: (p62<=0)
states: 9,830 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p75<=0)
states: 9,830 (3)
abstracting: (p73<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p76<=0)
states: 9,830 (3)
abstracting: (p71<=0)
states: 9,826 (3)
abstracting: (p88<=0)
states: 9,846 (3)
abstracting: (p72<=0)
states: 9,826 (3)
abstracting: (p61<=0)
states: 9,830 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p12<=0)
states: 7,798 (3)
abstracting: (p3<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p8<=0)
states: 7,798 (3)
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p13<=0)
states: 7,798 (3)
abstracting: (p6<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p11<=0)
states: 7,798 (3)
abstracting: (p7<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p10<=0)
states: 7,798 (3)
abstracting: (p4<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p10<=0)
states: 7,798 (3)
abstracting: (p0<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p8<=0)
states: 7,798 (3)
abstracting: (p4<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p16<=0)
states: 7,798 (3)
abstracting: (p5<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p12<=0)
states: 7,798 (3)
abstracting: (p6<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p9<=0)
states: 7,798 (3)
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p9<=0)
states: 7,798 (3)
abstracting: (p7<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p11<=0)
states: 7,798 (3)
abstracting: (p3<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p14<=0)
states: 7,798 (3)
abstracting: (p2<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p10<=0)
states: 7,798 (3)
abstracting: (p7<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p11<=0)
states: 7,798 (3)
abstracting: (p0<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p9<=0)
states: 7,798 (3)
abstracting: (p4<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p8<=0)
states: 7,798 (3)
abstracting: (p7<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p11<=0)
states: 7,798 (3)
abstracting: (p6<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p10<=0)
states: 7,798 (3)
abstracting: (p3<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p16<=0)
states: 7,798 (3)
abstracting: (p4<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p9<=0)
states: 7,798 (3)
abstracting: (p3<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p13<=0)
states: 7,798 (3)
abstracting: (p2<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p16<=0)
states: 7,798 (3)
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p8<=0)
states: 7,798 (3)
abstracting: (p0<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p14<=0)
states: 7,798 (3)
abstracting: (p5<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p14<=0)
states: 7,798 (3)
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p13<=0)
states: 7,798 (3)
abstracting: (p5<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p9<=0)
states: 7,798 (3)
abstracting: (p0<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p10<=0)
states: 7,798 (3)
abstracting: (p6<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p12<=0)
states: 7,798 (3)
abstracting: (p2<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p16<=0)
states: 7,798 (3)
abstracting: (p7<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p14<=0)
states: 7,798 (3)
abstracting: (p4<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p11<=0)
states: 7,798 (3)
abstracting: (p5<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p13<=0)
states: 7,798 (3)
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p9<=0)
states: 7,798 (3)
abstracting: (p6<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p12<=0)
states: 7,798 (3)
abstracting: (p5<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p16<=0)
states: 7,798 (3)
abstracting: (p0<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p9<=0)
states: 7,798 (3)
abstracting: (p2<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p11<=0)
states: 7,798 (3)
abstracting: (p2<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p10<=0)
states: 7,798 (3)
abstracting: (p5<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p13<=0)
states: 7,798 (3)
abstracting: (p4<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p8<=0)
states: 7,798 (3)
abstracting: (p3<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p12<=0)
states: 7,798 (3)
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p8<=0)
states: 7,798 (3)
abstracting: (p6<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p16<=0)
states: 7,798 (3)
abstracting: (p3<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p10<=0)
states: 7,798 (3)
abstracting: (p2<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p14<=0)
states: 7,798 (3)
abstracting: (p7<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p10<=0)
states: 7,798 (3)
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p16<=0)
states: 7,798 (3)
abstracting: (p6<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p9<=0)
states: 7,798 (3)
abstracting: (p5<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p12<=0)
states: 7,798 (3)
abstracting: (p4<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p14<=0)
states: 7,798 (3)
abstracting: (p0<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p13<=0)
states: 7,798 (3)
abstracting: (p7<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p12<=0)
states: 7,798 (3)
abstracting: (p0<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p16<=0)
states: 7,798 (3)
abstracting: (p2<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p13<=0)
states: 7,798 (3)
abstracting: (p3<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p8<=0)
states: 7,798 (3)
abstracting: (p5<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p14<=0)
states: 7,798 (3)
abstracting: (p6<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p11<=0)
states: 7,798 (3)
abstracting: (p1<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p11<=0)
states: 7,798 (3)
abstracting: (p4<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p8<=0)
states: 7,798 (3)
abstracting: (p2<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p14<=0)
states: 7,798 (3)
abstracting: (p3<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p12<=0)
states: 7,798 (3)
abstracting: (p7<=0)
states: 8,566 (3)
abstracting: (p17<=0)
states: 9,442 (3)
abstracting: (p13<=0)
states: 7,798 (3)
abstracting: (p0<=0)
states: 8,566 (3)
..abstracting: (1<=p102)
states: 3
abstracting: (1<=p100)
states: 1
abstracting: (1<=p97)
states: 3
abstracting: (1<=p95)
states: 896
abstracting: (1<=p78)
states: 272
abstracting: (1<=p58)
states: 240
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p87)
states: 844
abstracting: (1<=p48)
states: 764
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p85)
states: 844
abstracting: (1<=p45)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p86)
states: 844
abstracting: (1<=p47)
states: 764
abstracting: (1<=p95)
states: 896
abstracting: (1<=p89)
states: 272
abstracting: (1<=p58)
states: 240
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p63)
states: 844
abstracting: (1<=p50)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p63)
states: 844
abstracting: (1<=p51)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p66)
states: 844
abstracting: (1<=p50)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p63)
states: 844
abstracting: (1<=p45)
states: 764
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p67)
states: 844
abstracting: (1<=p45)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p87)
states: 844
abstracting: (1<=p60)
states: 764
abstracting: (1<=p95)
states: 896
abstracting: (1<=p90)
states: 272
abstracting: (1<=p54)
states: 240
abstracting: (1<=p94)
states: 736
abstracting: (1<=p85)
states: 844
abstracting: (1<=p51)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p68)
states: 844
abstracting: (1<=p47)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p65)
states: 844
abstracting: (1<=p48)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p87)
states: 844
abstracting: (1<=p49)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p67)
states: 844
abstracting: (1<=p51)
states: 764
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abstracting: (1<=p55)
states: 240
abstracting: (1<=p95)
states: 896
abstracting: (1<=p77)
states: 272
abstracting: (1<=p54)
states: 240
abstracting: (1<=p94)
states: 736
abstracting: (1<=p67)
states: 844
abstracting: (1<=p48)
states: 764
abstracting: (1<=p95)
states: 896
abstracting: (1<=p78)
states: 272
abstracting: (1<=p70)
states: 240
abstracting: (1<=p94)
states: 736
abstracting: (1<=p86)
states: 844
abstracting: (1<=p51)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p66)
states: 844
abstracting: (1<=p46)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p85)
states: 844
abstracting: (1<=p48)
states: 764
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p63)
states: 844
abstracting: (1<=p48)
states: 764
abstracting: (1<=p95)
states: 896
abstracting: (1<=p78)
states: 272
abstracting: (1<=p57)
states: 240
abstracting: (1<=p94)
states: 736
abstracting: (1<=p68)
states: 844
abstracting: (1<=p51)
states: 764
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p67)
states: 844
abstracting: (1<=p47)
states: 764
abstracting: (1<=p95)
states: 896
abstracting: (1<=p78)
states: 272
abstracting: (1<=p56)
states: 240
abstracting: (1<=p95)
states: 896
abstracting: (1<=p91)
states: 272
abstracting: (1<=p54)
states: 240
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p68)
states: 844
abstracting: (1<=p50)
states: 764
abstracting: (1<=p95)
states: 896
abstracting: (1<=p92)
states: 272
abstracting: (1<=p70)
states: 240
abstracting: (1<=p95)
states: 896
abstracting: (1<=p78)
states: 272
abstracting: (1<=p69)
states: 240
abstracting: (1<=p95)
states: 896
abstracting: (1<=p77)
states: 272
abstracting: (1<=p53)
states: 240
abstracting: (1<=p95)
states: 896
abstracting: (1<=p92)
states: 272
abstracting: (1<=p57)
states: 240
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p63)
states: 844
abstracting: (1<=p49)
states: 764
abstracting: (1<=p94)
states: 736
abstracting: (1<=p67)
states: 844
abstracting: (1<=p49)
states: 764
abstracting: (1<=p93)
states: 2,336 (3)
abstracting: (1<=p85)
states: 844
abstracting: (1<=p60)
states: 764
abstracting: (1<=p88)
states: 16
abstracting: (1<=p74)
states: 36
abstracting: (1<=p62)
states: 32
abstracting: (1<=p88)
states: 16
abstracting: (1<=p75)
states: 32
abstracting: (1<=p71)
states: 36
abstracting: (1<=p88)
states: 16
abstracting: (1<=p74)
states: 36
abstracting: (1<=p61)
states: 32
abstracting: (1<=p88)
states: 16
abstracting: (1<=p75)
states: 32
abstracting: (1<=p72)
states: 36
abstracting: (1<=p88)
states: 16
abstracting: (1<=p71)
states: 36
abstracting: (1<=p62)
states: 32
abstracting: (1<=p88)
states: 16
abstracting: (1<=p76)
states: 32
abstracting: (1<=p74)
states: 36
abstracting: (1<=p88)
states: 16
abstracting: (1<=p73)
states: 36
abstracting: (1<=p62)
states: 32
abstracting: (1<=p88)
states: 16
abstracting: (1<=p76)
states: 32
abstracting: (1<=p73)
states: 36
abstracting: (1<=p88)
states: 16
abstracting: (1<=p71)
states: 36
abstracting: (1<=p61)
states: 32
abstracting: (1<=p88)
states: 16
abstracting: (1<=p73)
states: 36
abstracting: (1<=p61)
states: 32
abstracting: (1<=p88)
states: 16
abstracting: (1<=p75)
states: 32
abstracting: (1<=p74)
states: 36
abstracting: (1<=p88)
states: 16
abstracting: (1<=p76)
states: 32
abstracting: (1<=p72)
states: 36
abstracting: (1<=p88)
states: 16
abstracting: (1<=p76)
states: 32
abstracting: (1<=p71)
states: 36
abstracting: (1<=p88)
states: 16
abstracting: (1<=p72)
states: 36
abstracting: (1<=p61)
states: 32
abstracting: (1<=p88)
states: 16
abstracting: (1<=p75)
states: 32
abstracting: (1<=p73)
states: 36
abstracting: (1<=p88)
states: 16
abstracting: (1<=p72)
states: 36
abstracting: (1<=p62)
states: 32
....
EG iterations: 4
-> the formula is FALSE

FORMULA PermAdmissibility-PT-01-CTLFireability-00 FALSE TECHNIQUES SEQUENTIAL_PROCESSING DECISION_DIAGRAMS UNFOLDING_TO_PT

MC time: 0m 0.719sec

totally nodes used: 28313945 (2.8e+07)
number of garbage collections: 0
fire ops cache: hits/miss/sum: 56258144 146164375 202422519
used/not used/entry size/cache size: 61668305 5440559 16 1024MB
basic ops cache: hits/miss/sum: 18031891 27907352 45939243
used/not used/entry size/cache size: 15895826 881390 12 192MB
unary ops cache: hits/miss/sum: 0 0 0
used/not used/entry size/cache size: 0 16777216 8 128MB
abstract ops cache: hits/miss/sum: 0 0 0
used/not used/entry size/cache size: 0 16777216 12 192MB
state nr cache: hits/miss/sum: 39421 207972 247393
used/not used/entry size/cache size: 205343 8183265 32 256MB
max state cache: hits/miss/sum: 0 0 0
used/not used/entry size/cache size: 0 8388608 32 256MB
uniqueHash elements/entry size/size: 67108864 4 256MB
0 44625983
1 17632764
2 4017183
3 707675
4 107679
5 14877
6 2038
7 328
8 101
9 34
>= 10 202

Total processing time: 1m31.449sec


BK_STOP 1679103817450

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

+ ulimit -s 65536
+ [[ -z '' ]]
+ export LTSMIN_MEM_SIZE=8589934592
+ LTSMIN_MEM_SIZE=8589934592
+ export PYTHONPATH=/home/mcc/BenchKit/itstools/pylibs
+ PYTHONPATH=/home/mcc/BenchKit/itstools/pylibs
+ export LD_LIBRARY_PATH=/home/mcc/BenchKit/itstools/pylibs:
+ LD_LIBRARY_PATH=/home/mcc/BenchKit/itstools/pylibs:
++ sed s/.jar//
++ perl -pe 's/.*\.//g'
++ ls /home/mcc/BenchKit/bin//../reducer/bin//../../itstools//itstools/plugins/fr.lip6.move.gal.application.pnmcc_1.0.0.202303021504.jar
+ VERSION=202303021504
+ echo 'Running Version 202303021504'
+ /home/mcc/BenchKit/bin//../reducer/bin//../../itstools//itstools/its-tools -pnfolder /home/mcc/execution -examination CTLFireability -timeout 360 -rebuildPNML
check for maximal unmarked siphon
ok
check for constant places
ok
check if there are places and transitions
ok
check if there are transitions without pre-places
ok
check if at least one transition is enabled in m0
ok
check if there are transitions that can never fire
ok


initing FirstDep: 0m 0.001sec

5956 16277
iterations count:214417 (362), effective:2061 (3)

initing FirstDep: 0m 0.001sec


iterations count:2608 (4), effective:26 (0)

iterations count:592 (1), effective:0 (0)

iterations count:2520 (4), effective:23 (0)

iterations count:961 (1), effective:1 (0)

iterations count:1155 (1), effective:5 (0)

iterations count:592 (1), effective:0 (0)

iterations count:3563 (6), effective:38 (0)

iterations count:2600 (4), effective:26 (0)

iterations count:592 (1), effective:0 (0)

iterations count:592 (1), effective:0 (0)

iterations count:592 (1), effective:0 (0)

iterations count:72975 (123), effective:587 (0)

iterations count:3137 (5), effective:29 (0)

iterations count:40226 (67), effective:373 (0)

iterations count:40226 (67), effective:373 (0)
17827
iterations count:100844 (170), effective:425 (0)

iterations count:40226 (67), effective:373 (0)

iterations count:621 (1), effective:6 (0)

iterations count:621 (1), effective:6 (0)
5746 9388 10636 13540 14933 15895 16902 17207 17918 18203 17849 18021
iterations count:1238228 (2091), effective:6584 (11)
12782 15455 16808
iterations count:332202 (561), effective:2703 (4)
7732 10340 13111 15163 16162 17152 18035
iterations count:713544 (1205), effective:5070 (8)

iterations count:592 (1), effective:0 (0)
12782 15455 16808 17250 17745
iterations count:517784 (874), effective:3179 (5)

iterations count:24491 (41), effective:85 (0)

iterations count:714 (1), effective:4 (0)

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="PermAdmissibility-PT-01"
export BK_EXAMINATION="CTLFireability"
export BK_TOOL="marciexred"
export BK_RESULT_DIR="/tmp/BK_RESULTS/OUTPUTS"
export BK_TIME_CONFINEMENT="3600"
export BK_MEMORY_CONFINEMENT="16384"
export BK_BIN_PATH="/home/mcc/BenchKit/bin/"

# 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 2-5348"
echo " Executing tool marciexred"
echo " Input is PermAdmissibility-PT-01, examination is CTLFireability"
echo " Time confinement is $BK_TIME_CONFINEMENT seconds"
echo " Memory confinement is 16384 MBytes"
echo " Number of cores is 4"
echo " Run identifier is r266-smll-167863541000506"
echo "====================================================================="
echo
echo "--------------------"
echo "preparation of the directory to be used:"

tar xzf /home/mcc/BenchKit/INPUTS/PermAdmissibility-PT-01.tgz
mv PermAdmissibility-PT-01 execution
cd execution
if [ "CTLFireability" = "ReachabilityDeadlock" ] || [ "CTLFireability" = "UpperBounds" ] || [ "CTLFireability" = "QuasiLiveness" ] || [ "CTLFireability" = "StableMarking" ] || [ "CTLFireability" = "Liveness" ] || [ "CTLFireability" = "OneSafe" ] || [ "CTLFireability" = "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 [ "CTLFireability" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "CTLFireability" != "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 "CTLFireability.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property CTLFireability.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "CTLFireability.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 '' CTLFireability.xml | cut -d '>' -f 2 | cut -d '<' -f 1 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ "CTLFireability" = "ReachabilityDeadlock" ] || [ "CTLFireability" = "QuasiLiveness" ] || [ "CTLFireability" = "StableMarking" ] || [ "CTLFireability" = "Liveness" ] || [ "CTLFireability" = "OneSafe" ] ; then
echo "FORMULA_NAME CTLFireability"
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 ;