About the Execution of 2019-Gold for BART-PT-002
Execution Summary | |||||
Max Memory Used (MB) |
Time wait (ms) | CPU Usage (ms) | I/O Wait (ms) | Computed Result | Execution Status |
4267.820 | 28206.00 | 5188.00 | 17.50 | FFFFFFTTTFFTFTTF | normal |
Execution Chart
We display below the execution chart for this examination (boot time has been removed).
Trace from the execution
Formatting '/data/fko/mcc2020-input.r030-oct2-158897741100017.qcow2', fmt=qcow2 size=4294967296 backing_file=/data/fko/mcc2020-input.qcow2 cluster_size=65536 lazy_refcounts=off refcount_bits=16
Waiting for the VM to be ready (probing ssh)
..................
=====================================================================
Generated by BenchKit 2-4028
Executing tool win2019
Input is BART-PT-002, examination is LTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r030-oct2-158897741100017
=====================================================================
--------------------
preparation of the directory to be used:
/home/mcc/execution
total 1.3M
-rw-r--r-- 1 mcc users 4.0K Apr 15 13:38 CTLCardinality.txt
-rw-r--r-- 1 mcc users 18K Apr 15 13:38 CTLCardinality.xml
-rw-r--r-- 1 mcc users 3.1K Apr 15 13:30 CTLFireability.txt
-rw-r--r-- 1 mcc users 14K Apr 15 13:30 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.0K Mar 24 05:37 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 6.1K Mar 24 05:37 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 85K Apr 8 14:42 LTLCardinality.txt
-rw-r--r-- 1 mcc users 236K Apr 28 14:00 LTLCardinality.xml
-rw-r--r-- 1 mcc users 71K Apr 8 14:42 LTLFireability.txt
-rw-r--r-- 1 mcc users 203K Apr 28 14:00 LTLFireability.xml
-rw-r--r-- 1 mcc users 4.4K Apr 15 13:26 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 20K Apr 15 13:26 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 4.2K Apr 15 13:21 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 19K Apr 15 13:21 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 1.7K Apr 15 13:29 UpperBounds.txt
-rw-r--r-- 1 mcc users 3.8K Apr 15 13:29 UpperBounds.xml
-rw-r--r-- 1 mcc users 5 Mar 24 05:37 equiv_col
-rw-r--r-- 1 mcc users 4 Mar 24 05:37 instance
-rw-r--r-- 1 mcc users 6 Mar 24 05:37 iscolored
-rw-r--r-- 1 mcc users 534K Mar 24 05:37 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 BART-PT-002-00
FORMULA_NAME BART-PT-002-01
FORMULA_NAME BART-PT-002-02
FORMULA_NAME BART-PT-002-03
FORMULA_NAME BART-PT-002-04
FORMULA_NAME BART-PT-002-05
FORMULA_NAME BART-PT-002-06
FORMULA_NAME BART-PT-002-07
FORMULA_NAME BART-PT-002-08
FORMULA_NAME BART-PT-002-09
FORMULA_NAME BART-PT-002-10
FORMULA_NAME BART-PT-002-11
FORMULA_NAME BART-PT-002-12
FORMULA_NAME BART-PT-002-13
FORMULA_NAME BART-PT-002-14
FORMULA_NAME BART-PT-002-15
=== Now, execution of the tool begins
BK_START 1589298814179
info: Time: 3600 - MCC
vrfy: Checking LTLCardinality @ BART-PT-002 @ 3570 seconds
FORMULA BART-PT-002-00 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-01 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-02 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-03 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-04 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-05 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-08 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-09 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-12 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-13 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-14 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-06 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-07 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-11 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-10 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
FORMULA BART-PT-002-15 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
vrfy: finished
info: timeLeft: 3542
rslt: Output for LTLCardinality @ BART-PT-002
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"U": 0,
"X": 0,
"aconj": 1,
"adisj": 0,
"aneg": 1,
"comp": 1,
"cont": 0,
"dl": 0,
"fir": 0,
"nodl": 0,
"place_references": 1,
"taut": 0,
"tconj": 0,
"tdisj": 0,
"tneg": 0,
"transition_references": 0,
"unfir": 0,
"visible_places": 1,
"visible_transitions": 0
},
"processed": "A (F (G (((TrainState_1_3_12 <= 0)))))",
"processed_size": 38,
"rewrites": 147
},
"result":
{
"edges": 343,
"markings": 231,
"produced_by": "LTL model checker",
"value": false
},
"task":
{
"buchi":
{
"states": 2
},
"compoundnumber": 14,
"search":
{
"store":
{
"encoder": "simple compression",
"type": "prefix"
},
"stubborn":
{
"type": "ltl preserving/insertion"
},
"type": "product automaton/dfs"
},
"type": "LTL",
"workflow": "product automaton"
}
},
{
"call":
{
"dynamic_timelimit": true,
"localtimelimit": 3566
},
"formula":
{
"count":
{
"A": 1,
"E": 0,
"F": 1,
"G": 1,
"U": 0,
"X": 0,
"aconj": 0,
"adisj": 0,
"aneg": 0,
"comp": 1,
"cont": 0,
"dl": 0,
"fir": 0,
"nodl": 0,
"place_references": 1,
"taut": 0,
"tconj": 0,
"tdisj": 0,
"tneg": 0,
"transition_references": 0,
"unfir": 0,
"visible_places": 1,
"visible_transitions": 0
},
"processed": "A (G (F ((1 <= TrainState_1_4_23))))",
"processed_size": 36,
"rewrites": 147
},
"result":
{
"edges": 12,
"markings": 12,
"produced_by": "LTL model checker",
"value": false
},
"task":
{
"buchi":
{
"states": 2
},
"compoundnumber": 15,
"search":
{
"store":
{
"encoder": "simple compression",
"type": "prefix"
},
"stubborn":
{
"type": "ltl preserving/insertion"
},
"type": "product automaton/dfs"
},
"type": "LTL",
"workflow": "product automaton"
}
}
],
"exit":
{
"error": null,
"memory": 22388,
"runtime": 4.000000,
"signal": null,
"timelimitreached": false
},
"files":
{
"formula": "LTLCardinality.xml",
"net": "model.pnml"
},
"formula":
{
"skeleton": "FALSE : FALSE : FALSE : FALSE : FALSE : FALSE : A(X(TRUE)) : A(X(TRUE)) : TRUE : FALSE : A(F(G(*))) : A(X(TRUE)) : FALSE : TRUE : TRUE : A(G(F(**)))"
},
"net":
{
"arcs": 3240,
"conflict_clusters": 4,
"places": 474,
"places_significant": 262,
"singleton_clusters": 0,
"transitions": 404
},
"result":
{
"preliminary_value": "no no no no no no yes yes yes no no yes no yes yes no ",
"value": "no no no no no no yes yes yes no no yes no yes yes no "
},
"task":
{
"type": "compound"
}
}
lola: LoLA will run for 3570 seconds at most (--timelimit)
lola: NET
lola: input: PNML file (--pnml)
lola: reading net from model.pnml
lola: reading pnml
lola: PNML file contains place/transition net
lola: finished parsing
lola: closed net file model.pnml
lola: 878/268435456 symbol table entries, 0 collisions
lola: preprocessing...
lola: Size of bit vector: 474
lola: finding significant places
lola: 474 places, 404 transitions, 262 significant places
lola: compute conflict clusters
lola: computed conflict clusters
lola: Computing conflicting sets
lola: Computing back conflicting sets
lola: TASK
lola: Reading formula in XML format (--xmlformula)
lola: reading pnml
lola: reading formula from LTLCardinality.xml
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_30_4_26 + NewDistTable_21_4_17 + NewDistTable_12_3_9 + NewDistTable_35_3_32 + NewDistTable_26_3_23 + NewDistTable_17_3_14 + NewDistTable_12_4_8 + NewDistTable_32_1_31 + NewDistTable_23_1_22 + NewDistTable_14_1_13 + NewDistTable_12_5_7 + NewDistTable_33_5_28 + NewDistTable_24_5_19 + NewDistTable_15_5_10 + NewDistTable_29_4_25 + NewDistTable_6_3_3 + NewDistTable_29_5_24 + NewDistTable_2_2_0 + NewDistTable_19_1_18 + NewDistTable_28_1_27 + NewDistTable_37_1_36 + NewDistTable_6_2_4 + NewDistTable_14_2_12 + NewDistTable_23_2_21 + NewDistTable_32_2_30 + NewDistTable_2_1_1 + NewDistTable_6_1_5 + NewDistTable_17_4_13 + NewDistTable_26_4_22 + NewDistTable_35_4_31 + NewDistTable_21_5_16 + NewDistTable_30_5_25 + NewDistTable_11_1_10 + NewDistTable_20_1_19 + NewDistTable_19_2_17 + NewDistTable_28_2_26 + NewDistTable_37_2_35 + NewDistTable_14_3_11 + NewDistTable_30_3_27 + NewDistTable_21_3_18 + NewDistTable_35_2_33 + NewDistTable_26_2_24 + NewDistTable_17_2_15 + NewDistTable_33_4_29 + NewDistTable_24_4_20 + NewDistTable_15_4_11 + NewDistTable_38_3_35 + NewDistTable_29_3_26 + NewDistTable_7_1_6 + NewDistTable_23_3_20 + NewDistTable_32_3_29 + NewDistTable_17_5_12 + NewDistTable_26_5_21 + NewDistTable_16_1_15 + NewDistTable_25_1_24 + NewDistTable_34_1_33 + NewDistTable_11_5_6 + NewDistTable_20_2_18 + NewDistTable_19_3_16 + NewDistTable_28_3_25 + NewDistTable_37_3_34 + NewDistTable_11_4_7 + NewDistTable_14_4_10 + NewDistTable_23_4_19 + NewDistTable_32_4_28 + NewDistTable_9_4_5 + NewDistTable_11_3_8 + NewDistTable_5_3_2 + NewDistTable_39_1_38 + NewDistTable_30_2_28 + NewDistTable_21_2_19 + NewDistTable_12_2_10 + NewDistTable_3_1_2 + NewDistTable_35_1_34 + NewDistTable_26_1_25 + NewDistTable_17_1_16 + NewDistTable_7_2_5 + NewDistTable_27_5_22 + NewDistTable_18_5_13 + NewDistTable_3_2_1 + NewDistTable_7_3_4 + NewDistTable_33_3_30 + NewDistTable_24_3_21 + NewDistTable_15_3_12 + NewDistTable_38_2_36 + NewDistTable_29_2_27 + NewDistTable_7_4_3 + NewDistTable_9_3_6 + NewDistTable_16_2_14 + NewDistTable_25_2_23 + NewDistTable_34_2_32 + NewDistTable_11_2_9 + NewDistTable_5_2_3 + NewDistTable_20_3_17 + NewDistTable_30_1_29 + NewDistTable_21_1_20 + NewDistTable_12_1_11 + NewDistTable_13_4_9 + NewDistTable_31_5_26 + NewDistTable_22_5_17 + NewDistTable_13_5_8 + NewDistTable_36_4_32 + NewDistTable_27_4_23 + NewDistTable_18_4_14 + NewDistTable_33_2_31 + NewDistTable_24_2_22 + NewDistTable_15_2_13 + NewDistTable_38_1_37 + NewDistTable_29_1_28 + NewDistTable_19_4_15 + NewDistTable_9_2_7 + NewDistTable_28_4_24 + NewDistTable_37_4_33 + NewDistTable_5_1_4 + NewDistTable_23_5_18 + NewDistTable_32_5_27 + NewDistTable_9_1_8 + NewDistTable_13_1_12 + NewDistTable_22_1_21 + NewDistTable_31_1_30 + NewDistTable_40_1_39 + NewDistTable_39_2_37 + NewDistTable_16_3_13 + NewDistTable_25_3_22 + NewDistTable_34_3_31 + NewDistTable_20_4_16 + NewDistTable_19_5_14 + NewDistTable_28_5_23 + NewDistTable_18_1_17 + NewDistTable_27_1_26 + NewDistTable_36_1_35 + NewDistTable_13_2_11 + NewDistTable_22_2_20 + NewDistTable_31_2_29 + NewDistTable_40_2_38 + NewDistTable_39_3_36 + NewDistTable_31_4_27 + NewDistTable_22_4_18 + NewDistTable_36_3_33 + NewDistTable_27_3_24 + NewDistTable_18_3_15 + NewDistTable_8_1_7 + NewDistTable_33_1_32 + NewDistTable_24_1_23 + NewDistTable_15_1_14 + NewDistTable_4_1_3 + NewDistTable_10_1_9 + NewDistTable_34_5_29 + NewDistTable_25_5_20 + NewDistTable_16_5_11 + NewDistTable_8_2_6 + NewDistTable_4_2_2 + NewDistTable_31_3_28 + NewDistTable_22_3_19 + NewDistTable_13_3_10 + NewDistTable_10_2_8 + NewDistTable_8_3_5 + NewDistTable_36_2_34 + NewDistTable_27_2_25 + NewDistTable_18_2_16 + NewDistTable_4_3_1 + NewDistTable_10_3_7 + NewDistTable_8_4_4 + NewDistTable_20_5_15 + NewDistTable_10_4_6 + NewDistTable_34_4_30 + NewDistTable_25_4_21 + NewDistTable_16_4_12 + NewDistTable_14_5_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (164 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (31 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (31 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (TrainState_2_1_39 + TrainState_2_1_38 + TrainState_2_1_37 + TrainState_2_1_36 + TrainState_2_1_35 + TrainState_1_0_0 + TrainState_2_1_34 + TrainState_2_1_33 + TrainState_2_1_32 + TrainState_2_1_31 + TrainState_2_1_30 + TrainState_2_1_29 + TrainState_1_1_1 + TrainState_1_1_2 + TrainState_1_1_3 + TrainState_1_1_4 + TrainState_1_1_5 + TrainState_1_1_6 + TrainState_1_1_7 + TrainState_1_1_8 + TrainState_1_1_9 + TrainState_2_1_28 + TrainState_2_1_27 + TrainState_2_1_26 + TrainState_2_1_25 + TrainState_1_2_4 + TrainState_1_2_5 + TrainState_1_2_6 + TrainState_1_2_7 + TrainState_1_2_8 + TrainState_1_2_9 + TrainState_2_1_24 + TrainState_2_1_23 + TrainState_2_1_22 + TrainState_2_1_21 + TrainState_2_1_20 + TrainState_2_1_19 + TrainState_2_1_18 + TrainState_1_3_7 + TrainState_1_3_8 + TrainState_1_3_9 + TrainState_2_1_17 + TrainState_2_1_16 + TrainState_2_1_15 + TrainState_2_1_14 + TrainState_2_1_13 + TrainState_2_1_12 + TrainState_2_1_11 + TrainState_2_1_10 + TrainState_1_4_11 + TrainState_1_4_12 + TrainState_1_4_13 + TrainState_1_4_14 + TrainState_1_4_15 + TrainState_1_4_16 + TrainState_1_4_17 + TrainState_1_4_18 + TrainState_1_4_19 + TrainState_1_4_20 + TrainState_1_4_21 + TrainState_1_4_22 + TrainState_1_4_23 + TrainState_1_4_24 + TrainState_1_4_25 + TrainState_1_4_26 + TrainState_1_4_27 + TrainState_1_4_28 + TrainState_1_4_29 + TrainState_1_4_30 + TrainState_1_4_31 + TrainState_1_4_32 + TrainState_1_4_33 + TrainState_1_4_34 + TrainState_2_2_39 + TrainState_2_2_38 + TrainState_2_2_37 + TrainState_2_2_36 + TrainState_2_2_35 + TrainState_2_2_34 + TrainState_2_2_33 + TrainState_2_2_32 + TrainState_2_2_31 + TrainState_2_2_30 + TrainState_2_2_29 + TrainState_2_2_28 + TrainState_2_2_27 + TrainState_2_2_26 + TrainState_2_2_25 + TrainState_2_2_24 + TrainState_2_2_23 + TrainState_2_2_22 + TrainState_2_2_21 + TrainState_2_2_20 + TrainState_2_2_19 + TrainState_2_2_18 + TrainState_2_2_17 + TrainState_2_2_16 + TrainState_2_2_15 + TrainState_2_2_14 + TrainState_2_2_13 + TrainState_2_2_12 + TrainState_2_2_11 + TrainState_2_2_10 + TrainState_2_3_37 + TrainState_2_3_36 + TrainState_2_3_35 + TrainState_2_3_34 + TrainState_2_3_33 + TrainState_2_3_32 + TrainState_2_3_31 + TrainState_2_3_30 + TrainState_2_3_29 + TrainState_2_3_28 + TrainState_2_3_27 + TrainState_2_3_26 + TrainState_2_3_25 + TrainState_2_3_24 + TrainState_2_3_23 + TrainState_2_3_22 + TrainState_2_3_21 + TrainState_2_3_20 + TrainState_2_3_19 + TrainState_1_3_10 + TrainState_1_3_11 + TrainState_1_3_12 + TrainState_1_3_13 + TrainState_1_3_14 + TrainState_1_3_15 + TrainState_1_3_16 + TrainState_1_3_17 + TrainState_1_3_18 + TrainState_1_3_19 + TrainState_1_3_20 + TrainState_1_3_21 + TrainState_1_3_22 + TrainState_1_3_23 + TrainState_1_3_24 + TrainState_1_3_25 + TrainState_1_3_26 + TrainState_1_3_27 + TrainState_1_3_28 + TrainState_1_3_29 + TrainState_1_3_30 + TrainState_1_3_31 + TrainState_1_3_32 + TrainState_1_3_33 + TrainState_1_3_34 + TrainState_1_3_35 + TrainState_1_3_36 + TrainState_1_3_37 + TrainState_2_3_18 + TrainState_2_3_17 + TrainState_2_3_16 + TrainState_2_3_15 + TrainState_2_3_14 + TrainState_2_0_0 + TrainState_2_3_13 + TrainState_2_3_12 + TrainState_2_1_1 + TrainState_2_1_2 + TrainState_2_1_3 + TrainState_2_1_4 + TrainState_2_1_5 + TrainState_2_1_6 + TrainState_2_1_7 + TrainState_2_1_8 + TrainState_2_1_9 + TrainState_2_3_11 + TrainState_2_3_10 + TrainState_2_4_34 + TrainState_2_4_33 + TrainState_2_4_32 + TrainState_2_4_31 + TrainState_1_2_10 + TrainState_1_2_11 + TrainState_1_2_12 + TrainState_1_2_13 + TrainState_1_2_14 + TrainState_1_2_15 + TrainState_1_2_16 + TrainState_1_2_17 + TrainState_1_2_18 + TrainState_1_2_19 + TrainState_1_2_20 + TrainState_1_2_21 + TrainState_1_2_22 + TrainState_1_2_23 + TrainState_1_2_24 + TrainState_1_2_25 + TrainState_1_2_26 + TrainState_1_2_27 + TrainState_1_2_28 + TrainState_1_2_29 + TrainState_1_2_30 + TrainState_1_2_31 + TrainState_1_2_32 + TrainState_1_2_33 + TrainState_1_2_34 + TrainState_1_2_35 + TrainState_1_2_36 + TrainState_1_2_37 + TrainState_1_2_38 + TrainState_1_2_39 + TrainState_2_2_4 + TrainState_2_2_5 + TrainState_2_2_6 + TrainState_2_2_7 + TrainState_2_2_8 + TrainState_2_2_9 + TrainState_2_4_30 + TrainState_2_4_29 + TrainState_2_4_28 + TrainState_2_4_27 + TrainState_2_3_7 + TrainState_2_3_8 + TrainState_2_3_9 + TrainState_2_4_26 + TrainState_2_4_25 + TrainState_2_4_24 + TrainState_2_4_23 + TrainState_2_4_22 + TrainState_2_4_21 + TrainState_2_4_20 + TrainState_2_4_19 + TrainState_2_4_18 + TrainState_2_4_17 + TrainState_2_4_16 + TrainState_2_4_15 + TrainState_1_1_10 + TrainState_1_1_11 + TrainState_1_1_12 + TrainState_1_1_13 + TrainState_1_1_14 + TrainState_1_1_15 + TrainState_1_1_16 + TrainState_1_1_17 + TrainState_1_1_18 + TrainState_1_1_19 + TrainState_1_1_20 + TrainState_1_1_21 + TrainState_1_1_22 + TrainState_1_1_23 + TrainState_1_1_24 + TrainState_1_1_25 + TrainState_1_1_26 + TrainState_1_1_27 + TrainState_1_1_28 + TrainState_1_1_29 + TrainState_1_1_30 + TrainState_1_1_31 + TrainState_1_1_32 + TrainState_1_1_33 + TrainState_1_1_34 + TrainState_1_1_35 + TrainState_1_1_36 + TrainState_1_1_37 + TrainState_1_1_38 + TrainState_1_1_39 + TrainState_2_4_14 + TrainState_2_4_13 + TrainState_2_4_12 + TrainState_2_4_11 + TrainState_1_1_40 + TrainState_2_1_40 <= NewDistTable_30_4_26 + NewDistTable_21_4_17 + NewDistTable_12_3_9 + NewDistTable_35_3_32 + NewDistTable_26_3_23 + NewDistTable_17_3_14 + NewDistTable_12_4_8 + NewDistTable_32_1_31 + NewDistTable_23_1_22 + NewDistTable_14_1_13 + NewDistTable_12_5_7 + NewDistTable_33_5_28 + NewDistTable_24_5_19 + NewDistTable_15_5_10 + NewDistTable_29_4_25 + NewDistTable_6_3_3 + NewDistTable_29_5_24 + NewDistTable_2_2_0 + NewDistTable_19_1_18 + NewDistTable_28_1_27 + NewDistTable_37_1_36 + NewDistTable_6_2_4 + NewDistTable_14_2_12 + NewDistTable_23_2_21 + NewDistTable_32_2_30 + NewDistTable_2_1_1 + NewDistTable_6_1_5 + NewDistTable_17_4_13 + NewDistTable_26_4_22 + NewDistTable_35_4_31 + NewDistTable_21_5_16 + NewDistTable_30_5_25 + NewDistTable_11_1_10 + NewDistTable_20_1_19 + NewDistTable_19_2_17 + NewDistTable_28_2_26 + NewDistTable_37_2_35 + NewDistTable_14_3_11 + NewDistTable_30_3_27 + NewDistTable_21_3_18 + NewDistTable_35_2_33 + NewDistTable_26_2_24 + NewDistTable_17_2_15 + NewDistTable_33_4_29 + NewDistTable_24_4_20 + NewDistTable_15_4_11 + NewDistTable_38_3_35 + NewDistTable_29_3_26 + NewDistTable_7_1_6 + NewDistTable_23_3_20 + NewDistTable_32_3_29 + NewDistTable_17_5_12 + NewDistTable_26_5_21 + NewDistTable_16_1_15 + NewDistTable_25_1_24 + NewDistTable_34_1_33 + NewDistTable_11_5_6 + NewDistTable_20_2_18 + NewDistTable_19_3_16 + NewDistTable_28_3_25 + NewDistTable_37_3_34 + NewDistTable_11_4_7 + NewDistTable_14_4_10 + NewDistTable_23_4_19 + NewDistTable_32_4_28 + NewDistTable_9_4_5 + NewDistTable_11_3_8 + NewDistTable_5_3_2 + NewDistTable_39_1_38 + NewDistTable_30_2_28 + NewDistTable_21_2_19 + NewDistTable_12_2_10 + NewDistTable_3_1_2 + NewDistTable_35_1_34 + NewDistTable_26_1_25 + NewDistTable_17_1_16 + NewDistTable_7_2_5 + NewDistTable_27_5_22 + NewDistTable_18_5_13 + NewDistTable_3_2_1 + NewDistTable_7_3_4 + NewDistTable_33_3_30 + NewDistTable_24_3_21 + NewDistTable_15_3_12 + NewDistTable_38_2_36 + NewDistTable_29_2_27 + NewDistTable_7_4_3 + NewDistTable_9_3_6 + NewDistTable_16_2_14 + NewDistTable_25_2_23 + NewDistTable_34_2_32 + NewDistTable_11_2_9 + NewDistTable_5_2_3 + NewDistTable_20_3_17 + NewDistTable_30_1_29 + NewDistTable_21_1_20 + NewDistTable_12_1_11 + NewDistTable_13_4_9 + NewDistTable_31_5_26 + NewDistTable_22_5_17 + NewDistTable_13_5_8 + NewDistTable_36_4_32 + NewDistTable_27_4_23 + NewDistTable_18_4_14 + NewDistTable_33_2_31 + NewDistTable_24_2_22 + NewDistTable_15_2_13 + NewDistTable_38_1_37 + NewDistTable_29_1_28 + NewDistTable_19_4_15 + NewDistTable_9_2_7 + NewDistTable_28_4_24 + NewDistTable_37_4_33 + NewDistTable_5_1_4 + NewDistTable_23_5_18 + NewDistTable_32_5_27 + NewDistTable_9_1_8 + NewDistTable_13_1_12 + NewDistTable_22_1_21 + NewDistTable_31_1_30 + NewDistTable_40_1_39 + NewDistTable_39_2_37 + NewDistTable_16_3_13 + NewDistTable_25_3_22 + NewDistTable_34_3_31 + NewDistTable_20_4_16 + NewDistTable_19_5_14 + NewDistTable_28_5_23 + NewDistTable_18_1_17 + NewDistTable_27_1_26 + NewDistTable_36_1_35 + NewDistTable_13_2_11 + NewDistTable_22_2_20 + NewDistTable_31_2_29 + NewDistTable_40_2_38 + NewDistTable_39_3_36 + NewDistTable_31_4_27 + NewDistTable_22_4_18 + NewDistTable_36_3_33 + NewDistTable_27_3_24 + NewDistTable_18_3_15 + NewDistTable_8_1_7 + NewDistTable_33_1_32 + NewDistTable_24_1_23 + NewDistTable_15_1_14 + NewDistTable_4_1_3 + NewDistTable_10_1_9 + NewDistTable_34_5_29 + NewDistTable_25_5_20 + NewDistTable_16_5_11 + NewDistTable_8_2_6 + NewDistTable_4_2_2 + NewDistTable_31_3_28 + NewDistTable_22_3_19 + NewDistTable_13_3_10 + NewDistTable_10_2_8 + NewDistTable_8_3_5 + NewDistTable_36_2_34 + NewDistTable_27_2_25 + NewDistTable_18_2_16 + NewDistTable_4_3_1 + NewDistTable_10_3_7 + NewDistTable_8_4_4 + NewDistTable_20_5_15 + NewDistTable_10_4_6 + NewDistTable_34_4_30 + NewDistTable_25_4_21 + NewDistTable_16_4_12 + NewDistTable_14_5_9)
lola: after: (0 <= 167)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_30_4_26 + NewDistTable_21_4_17 + NewDistTable_12_3_9 + NewDistTable_35_3_32 + NewDistTable_26_3_23 + NewDistTable_17_3_14 + NewDistTable_12_4_8 + NewDistTable_32_1_31 + NewDistTable_23_1_22 + NewDistTable_14_1_13 + NewDistTable_12_5_7 + NewDistTable_33_5_28 + NewDistTable_24_5_19 + NewDistTable_15_5_10 + NewDistTable_29_4_25 + NewDistTable_6_3_3 + NewDistTable_29_5_24 + NewDistTable_2_2_0 + NewDistTable_19_1_18 + NewDistTable_28_1_27 + NewDistTable_37_1_36 + NewDistTable_6_2_4 + NewDistTable_14_2_12 + NewDistTable_23_2_21 + NewDistTable_32_2_30 + NewDistTable_2_1_1 + NewDistTable_6_1_5 + NewDistTable_17_4_13 + NewDistTable_26_4_22 + NewDistTable_35_4_31 + NewDistTable_21_5_16 + NewDistTable_30_5_25 + NewDistTable_11_1_10 + NewDistTable_20_1_19 + NewDistTable_19_2_17 + NewDistTable_28_2_26 + NewDistTable_37_2_35 + NewDistTable_14_3_11 + NewDistTable_30_3_27 + NewDistTable_21_3_18 + NewDistTable_35_2_33 + NewDistTable_26_2_24 + NewDistTable_17_2_15 + NewDistTable_33_4_29 + NewDistTable_24_4_20 + NewDistTable_15_4_11 + NewDistTable_38_3_35 + NewDistTable_29_3_26 + NewDistTable_7_1_6 + NewDistTable_23_3_20 + NewDistTable_32_3_29 + NewDistTable_17_5_12 + NewDistTable_26_5_21 + NewDistTable_16_1_15 + NewDistTable_25_1_24 + NewDistTable_34_1_33 + NewDistTable_11_5_6 + NewDistTable_20_2_18 + NewDistTable_19_3_16 + NewDistTable_28_3_25 + NewDistTable_37_3_34 + NewDistTable_11_4_7 + NewDistTable_14_4_10 + NewDistTable_23_4_19 + NewDistTable_32_4_28 + NewDistTable_9_4_5 + NewDistTable_11_3_8 + NewDistTable_5_3_2 + NewDistTable_39_1_38 + NewDistTable_30_2_28 + NewDistTable_21_2_19 + NewDistTable_12_2_10 + NewDistTable_3_1_2 + NewDistTable_35_1_34 + NewDistTable_26_1_25 + NewDistTable_17_1_16 + NewDistTable_7_2_5 + NewDistTable_27_5_22 + NewDistTable_18_5_13 + NewDistTable_3_2_1 + NewDistTable_7_3_4 + NewDistTable_33_3_30 + NewDistTable_24_3_21 + NewDistTable_15_3_12 + NewDistTable_38_2_36 + NewDistTable_29_2_27 + NewDistTable_7_4_3 + NewDistTable_9_3_6 + NewDistTable_16_2_14 + NewDistTable_25_2_23 + NewDistTable_34_2_32 + NewDistTable_11_2_9 + NewDistTable_5_2_3 + NewDistTable_20_3_17 + NewDistTable_30_1_29 + NewDistTable_21_1_20 + NewDistTable_12_1_11 + NewDistTable_13_4_9 + NewDistTable_31_5_26 + NewDistTable_22_5_17 + NewDistTable_13_5_8 + NewDistTable_36_4_32 + NewDistTable_27_4_23 + NewDistTable_18_4_14 + NewDistTable_33_2_31 + NewDistTable_24_2_22 + NewDistTable_15_2_13 + NewDistTable_38_1_37 + NewDistTable_29_1_28 + NewDistTable_19_4_15 + NewDistTable_9_2_7 + NewDistTable_28_4_24 + NewDistTable_37_4_33 + NewDistTable_5_1_4 + NewDistTable_23_5_18 + NewDistTable_32_5_27 + NewDistTable_9_1_8 + NewDistTable_13_1_12 + NewDistTable_22_1_21 + NewDistTable_31_1_30 + NewDistTable_40_1_39 + NewDistTable_39_2_37 + NewDistTable_16_3_13 + NewDistTable_25_3_22 + NewDistTable_34_3_31 + NewDistTable_20_4_16 + NewDistTable_19_5_14 + NewDistTable_28_5_23 + NewDistTable_18_1_17 + NewDistTable_27_1_26 + NewDistTable_36_1_35 + NewDistTable_13_2_11 + NewDistTable_22_2_20 + NewDistTable_31_2_29 + NewDistTable_40_2_38 + NewDistTable_39_3_36 + NewDistTable_31_4_27 + NewDistTable_22_4_18 + NewDistTable_36_3_33 + NewDistTable_27_3_24 + NewDistTable_18_3_15 + NewDistTable_8_1_7 + NewDistTable_33_1_32 + NewDistTable_24_1_23 + NewDistTable_15_1_14 + NewDistTable_4_1_3 + NewDistTable_10_1_9 + NewDistTable_34_5_29 + NewDistTable_25_5_20 + NewDistTable_16_5_11 + NewDistTable_8_2_6 + NewDistTable_4_2_2 + NewDistTable_31_3_28 + NewDistTable_22_3_19 + NewDistTable_13_3_10 + NewDistTable_10_2_8 + NewDistTable_8_3_5 + NewDistTable_36_2_34 + NewDistTable_27_2_25 + NewDistTable_18_2_16 + NewDistTable_4_3_1 + NewDistTable_10_3_7 + NewDistTable_8_4_4 + NewDistTable_20_5_15 + NewDistTable_10_4_6 + NewDistTable_34_4_30 + NewDistTable_25_4_21 + NewDistTable_16_4_12 + NewDistTable_14_5_9 <= DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9)
lola: after: (133 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9)
lola: after: (0 <= 35)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1 <= TrainState_2_1_39 + TrainState_2_1_38 + TrainState_2_1_37 + TrainState_2_1_36 + TrainState_2_1_35 + TrainState_1_0_0 + TrainState_2_1_34 + TrainState_2_1_33 + TrainState_2_1_32 + TrainState_2_1_31 + TrainState_2_1_30 + TrainState_2_1_29 + TrainState_1_1_1 + TrainState_1_1_2 + TrainState_1_1_3 + TrainState_1_1_4 + TrainState_1_1_5 + TrainState_1_1_6 + TrainState_1_1_7 + TrainState_1_1_8 + TrainState_1_1_9 + TrainState_2_1_28 + TrainState_2_1_27 + TrainState_2_1_26 + TrainState_2_1_25 + TrainState_1_2_4 + TrainState_1_2_5 + TrainState_1_2_6 + TrainState_1_2_7 + TrainState_1_2_8 + TrainState_1_2_9 + TrainState_2_1_24 + TrainState_2_1_23 + TrainState_2_1_22 + TrainState_2_1_21 + TrainState_2_1_20 + TrainState_2_1_19 + TrainState_2_1_18 + TrainState_1_3_7 + TrainState_1_3_8 + TrainState_1_3_9 + TrainState_2_1_17 + TrainState_2_1_16 + TrainState_2_1_15 + TrainState_2_1_14 + TrainState_2_1_13 + TrainState_2_1_12 + TrainState_2_1_11 + TrainState_2_1_10 + TrainState_1_4_11 + TrainState_1_4_12 + TrainState_1_4_13 + TrainState_1_4_14 + TrainState_1_4_15 + TrainState_1_4_16 + TrainState_1_4_17 + TrainState_1_4_18 + TrainState_1_4_19 + TrainState_1_4_20 + TrainState_1_4_21 + TrainState_1_4_22 + TrainState_1_4_23 + TrainState_1_4_24 + TrainState_1_4_25 + TrainState_1_4_26 + TrainState_1_4_27 + TrainState_1_4_28 + TrainState_1_4_29 + TrainState_1_4_30 + TrainState_1_4_31 + TrainState_1_4_32 + TrainState_1_4_33 + TrainState_1_4_34 + TrainState_2_2_39 + TrainState_2_2_38 + TrainState_2_2_37 + TrainState_2_2_36 + TrainState_2_2_35 + TrainState_2_2_34 + TrainState_2_2_33 + TrainState_2_2_32 + TrainState_2_2_31 + TrainState_2_2_30 + TrainState_2_2_29 + TrainState_2_2_28 + TrainState_2_2_27 + TrainState_2_2_26 + TrainState_2_2_25 + TrainState_2_2_24 + TrainState_2_2_23 + TrainState_2_2_22 + TrainState_2_2_21 + TrainState_2_2_20 + TrainState_2_2_19 + TrainState_2_2_18 + TrainState_2_2_17 + TrainState_2_2_16 + TrainState_2_2_15 + TrainState_2_2_14 + TrainState_2_2_13 + TrainState_2_2_12 + TrainState_2_2_11 + TrainState_2_2_10 + TrainState_2_3_37 + TrainState_2_3_36 + TrainState_2_3_35 + TrainState_2_3_34 + TrainState_2_3_33 + TrainState_2_3_32 + TrainState_2_3_31 + TrainState_2_3_30 + TrainState_2_3_29 + TrainState_2_3_28 + TrainState_2_3_27 + TrainState_2_3_26 + TrainState_2_3_25 + TrainState_2_3_24 + TrainState_2_3_23 + TrainState_2_3_22 + TrainState_2_3_21 + TrainState_2_3_20 + TrainState_2_3_19 + TrainState_1_3_10 + TrainState_1_3_11 + TrainState_1_3_12 + TrainState_1_3_13 + TrainState_1_3_14 + TrainState_1_3_15 + TrainState_1_3_16 + TrainState_1_3_17 + TrainState_1_3_18 + TrainState_1_3_19 + TrainState_1_3_20 + TrainState_1_3_21 + TrainState_1_3_22 + TrainState_1_3_23 + TrainState_1_3_24 + TrainState_1_3_25 + TrainState_1_3_26 + TrainState_1_3_27 + TrainState_1_3_28 + TrainState_1_3_29 + TrainState_1_3_30 + TrainState_1_3_31 + TrainState_1_3_32 + TrainState_1_3_33 + TrainState_1_3_34 + TrainState_1_3_35 + TrainState_1_3_36 + TrainState_1_3_37 + TrainState_2_3_18 + TrainState_2_3_17 + TrainState_2_3_16 + TrainState_2_3_15 + TrainState_2_3_14 + TrainState_2_0_0 + TrainState_2_3_13 + TrainState_2_3_12 + TrainState_2_1_1 + TrainState_2_1_2 + TrainState_2_1_3 + TrainState_2_1_4 + TrainState_2_1_5 + TrainState_2_1_6 + TrainState_2_1_7 + TrainState_2_1_8 + TrainState_2_1_9 + TrainState_2_3_11 + TrainState_2_3_10 + TrainState_2_4_34 + TrainState_2_4_33 + TrainState_2_4_32 + TrainState_2_4_31 + TrainState_1_2_10 + TrainState_1_2_11 + TrainState_1_2_12 + TrainState_1_2_13 + TrainState_1_2_14 + TrainState_1_2_15 + TrainState_1_2_16 + TrainState_1_2_17 + TrainState_1_2_18 + TrainState_1_2_19 + TrainState_1_2_20 + TrainState_1_2_21 + TrainState_1_2_22 + TrainState_1_2_23 + TrainState_1_2_24 + TrainState_1_2_25 + TrainState_1_2_26 + TrainState_1_2_27 + TrainState_1_2_28 + TrainState_1_2_29 + TrainState_1_2_30 + TrainState_1_2_31 + TrainState_1_2_32 + TrainState_1_2_33 + TrainState_1_2_34 + TrainState_1_2_35 + TrainState_1_2_36 + TrainState_1_2_37 + TrainState_1_2_38 + TrainState_1_2_39 + TrainState_2_2_4 + TrainState_2_2_5 + TrainState_2_2_6 + TrainState_2_2_7 + TrainState_2_2_8 + TrainState_2_2_9 + TrainState_2_4_30 + TrainState_2_4_29 + TrainState_2_4_28 + TrainState_2_4_27 + TrainState_2_3_7 + TrainState_2_3_8 + TrainState_2_3_9 + TrainState_2_4_26 + TrainState_2_4_25 + TrainState_2_4_24 + TrainState_2_4_23 + TrainState_2_4_22 + TrainState_2_4_21 + TrainState_2_4_20 + TrainState_2_4_19 + TrainState_2_4_18 + TrainState_2_4_17 + TrainState_2_4_16 + TrainState_2_4_15 + TrainState_1_1_10 + TrainState_1_1_11 + TrainState_1_1_12 + TrainState_1_1_13 + TrainState_1_1_14 + TrainState_1_1_15 + TrainState_1_1_16 + TrainState_1_1_17 + TrainState_1_1_18 + TrainState_1_1_19 + TrainState_1_1_20 + TrainState_1_1_21 + TrainState_1_1_22 + TrainState_1_1_23 + TrainState_1_1_24 + TrainState_1_1_25 + TrainState_1_1_26 + TrainState_1_1_27 + TrainState_1_1_28 + TrainState_1_1_29 + TrainState_1_1_30 + TrainState_1_1_31 + TrainState_1_1_32 + TrainState_1_1_33 + TrainState_1_1_34 + TrainState_1_1_35 + TrainState_1_1_36 + TrainState_1_1_37 + TrainState_1_1_38 + TrainState_1_1_39 + TrainState_2_4_14 + TrainState_2_4_13 + TrainState_2_4_12 + TrainState_2_4_11 + TrainState_1_1_40 + TrainState_2_1_40)
lola: after: (3 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1 <= TrainState_2_1_39 + TrainState_2_1_38 + TrainState_2_1_37 + TrainState_2_1_36 + TrainState_2_1_35 + TrainState_1_0_0 + TrainState_2_1_34 + TrainState_2_1_33 + TrainState_2_1_32 + TrainState_2_1_31 + TrainState_2_1_30 + TrainState_2_1_29 + TrainState_1_1_1 + TrainState_1_1_2 + TrainState_1_1_3 + TrainState_1_1_4 + TrainState_1_1_5 + TrainState_1_1_6 + TrainState_1_1_7 + TrainState_1_1_8 + TrainState_1_1_9 + TrainState_2_1_28 + TrainState_2_1_27 + TrainState_2_1_26 + TrainState_2_1_25 + TrainState_1_2_4 + TrainState_1_2_5 + TrainState_1_2_6 + TrainState_1_2_7 + TrainState_1_2_8 + TrainState_1_2_9 + TrainState_2_1_24 + TrainState_2_1_23 + TrainState_2_1_22 + TrainState_2_1_21 + TrainState_2_1_20 + TrainState_2_1_19 + TrainState_2_1_18 + TrainState_1_3_7 + TrainState_1_3_8 + TrainState_1_3_9 + TrainState_2_1_17 + TrainState_2_1_16 + TrainState_2_1_15 + TrainState_2_1_14 + TrainState_2_1_13 + TrainState_2_1_12 + TrainState_2_1_11 + TrainState_2_1_10 + TrainState_1_4_11 + TrainState_1_4_12 + TrainState_1_4_13 + TrainState_1_4_14 + TrainState_1_4_15 + TrainState_1_4_16 + TrainState_1_4_17 + TrainState_1_4_18 + TrainState_1_4_19 + TrainState_1_4_20 + TrainState_1_4_21 + TrainState_1_4_22 + TrainState_1_4_23 + TrainState_1_4_24 + TrainState_1_4_25 + TrainState_1_4_26 + TrainState_1_4_27 + TrainState_1_4_28 + TrainState_1_4_29 + TrainState_1_4_30 + TrainState_1_4_31 + TrainState_1_4_32 + TrainState_1_4_33 + TrainState_1_4_34 + TrainState_2_2_39 + TrainState_2_2_38 + TrainState_2_2_37 + TrainState_2_2_36 + TrainState_2_2_35 + TrainState_2_2_34 + TrainState_2_2_33 + TrainState_2_2_32 + TrainState_2_2_31 + TrainState_2_2_30 + TrainState_2_2_29 + TrainState_2_2_28 + TrainState_2_2_27 + TrainState_2_2_26 + TrainState_2_2_25 + TrainState_2_2_24 + TrainState_2_2_23 + TrainState_2_2_22 + TrainState_2_2_21 + TrainState_2_2_20 + TrainState_2_2_19 + TrainState_2_2_18 + TrainState_2_2_17 + TrainState_2_2_16 + TrainState_2_2_15 + TrainState_2_2_14 + TrainState_2_2_13 + TrainState_2_2_12 + TrainState_2_2_11 + TrainState_2_2_10 + TrainState_2_3_37 + TrainState_2_3_36 + TrainState_2_3_35 + TrainState_2_3_34 + TrainState_2_3_33 + TrainState_2_3_32 + TrainState_2_3_31 + TrainState_2_3_30 + TrainState_2_3_29 + TrainState_2_3_28 + TrainState_2_3_27 + TrainState_2_3_26 + TrainState_2_3_25 + TrainState_2_3_24 + TrainState_2_3_23 + TrainState_2_3_22 + TrainState_2_3_21 + TrainState_2_3_20 + TrainState_2_3_19 + TrainState_1_3_10 + TrainState_1_3_11 + TrainState_1_3_12 + TrainState_1_3_13 + TrainState_1_3_14 + TrainState_1_3_15 + TrainState_1_3_16 + TrainState_1_3_17 + TrainState_1_3_18 + TrainState_1_3_19 + TrainState_1_3_20 + TrainState_1_3_21 + TrainState_1_3_22 + TrainState_1_3_23 + TrainState_1_3_24 + TrainState_1_3_25 + TrainState_1_3_26 + TrainState_1_3_27 + TrainState_1_3_28 + TrainState_1_3_29 + TrainState_1_3_30 + TrainState_1_3_31 + TrainState_1_3_32 + TrainState_1_3_33 + TrainState_1_3_34 + TrainState_1_3_35 + TrainState_1_3_36 + TrainState_1_3_37 + TrainState_2_3_18 + TrainState_2_3_17 + TrainState_2_3_16 + TrainState_2_3_15 + TrainState_2_3_14 + TrainState_2_0_0 + TrainState_2_3_13 + TrainState_2_3_12 + TrainState_2_1_1 + TrainState_2_1_2 + TrainState_2_1_3 + TrainState_2_1_4 + TrainState_2_1_5 + TrainState_2_1_6 + TrainState_2_1_7 + TrainState_2_1_8 + TrainState_2_1_9 + TrainState_2_3_11 + TrainState_2_3_10 + TrainState_2_4_34 + TrainState_2_4_33 + TrainState_2_4_32 + TrainState_2_4_31 + TrainState_1_2_10 + TrainState_1_2_11 + TrainState_1_2_12 + TrainState_1_2_13 + TrainState_1_2_14 + TrainState_1_2_15 + TrainState_1_2_16 + TrainState_1_2_17 + TrainState_1_2_18 + TrainState_1_2_19 + TrainState_1_2_20 + TrainState_1_2_21 + TrainState_1_2_22 + TrainState_1_2_23 + TrainState_1_2_24 + TrainState_1_2_25 + TrainState_1_2_26 + TrainState_1_2_27 + TrainState_1_2_28 + TrainState_1_2_29 + TrainState_1_2_30 + TrainState_1_2_31 + TrainState_1_2_32 + TrainState_1_2_33 + TrainState_1_2_34 + TrainState_1_2_35 + TrainState_1_2_36 + TrainState_1_2_37 + TrainState_1_2_38 + TrainState_1_2_39 + TrainState_2_2_4 + TrainState_2_2_5 + TrainState_2_2_6 + TrainState_2_2_7 + TrainState_2_2_8 + TrainState_2_2_9 + TrainState_2_4_30 + TrainState_2_4_29 + TrainState_2_4_28 + TrainState_2_4_27 + TrainState_2_3_7 + TrainState_2_3_8 + TrainState_2_3_9 + TrainState_2_4_26 + TrainState_2_4_25 + TrainState_2_4_24 + TrainState_2_4_23 + TrainState_2_4_22 + TrainState_2_4_21 + TrainState_2_4_20 + TrainState_2_4_19 + TrainState_2_4_18 + TrainState_2_4_17 + TrainState_2_4_16 + TrainState_2_4_15 + TrainState_1_1_10 + TrainState_1_1_11 + TrainState_1_1_12 + TrainState_1_1_13 + TrainState_1_1_14 + TrainState_1_1_15 + TrainState_1_1_16 + TrainState_1_1_17 + TrainState_1_1_18 + TrainState_1_1_19 + TrainState_1_1_20 + TrainState_1_1_21 + TrainState_1_1_22 + TrainState_1_1_23 + TrainState_1_1_24 + TrainState_1_1_25 + TrainState_1_1_26 + TrainState_1_1_27 + TrainState_1_1_28 + TrainState_1_1_29 + TrainState_1_1_30 + TrainState_1_1_31 + TrainState_1_1_32 + TrainState_1_1_33 + TrainState_1_1_34 + TrainState_1_1_35 + TrainState_1_1_36 + TrainState_1_1_37 + TrainState_1_1_38 + TrainState_1_1_39 + TrainState_2_4_14 + TrainState_2_4_13 + TrainState_2_4_12 + TrainState_2_4_11 + TrainState_1_1_40 + TrainState_2_1_40)
lola: after: (3 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (31 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (31 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (0 <= DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9)
lola: after: (0 <= 36)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= TrainState_2_1_39 + TrainState_2_1_38 + TrainState_2_1_37 + TrainState_2_1_36 + TrainState_2_1_35 + TrainState_1_0_0 + TrainState_2_1_34 + TrainState_2_1_33 + TrainState_2_1_32 + TrainState_2_1_31 + TrainState_2_1_30 + TrainState_2_1_29 + TrainState_1_1_1 + TrainState_1_1_2 + TrainState_1_1_3 + TrainState_1_1_4 + TrainState_1_1_5 + TrainState_1_1_6 + TrainState_1_1_7 + TrainState_1_1_8 + TrainState_1_1_9 + TrainState_2_1_28 + TrainState_2_1_27 + TrainState_2_1_26 + TrainState_2_1_25 + TrainState_1_2_4 + TrainState_1_2_5 + TrainState_1_2_6 + TrainState_1_2_7 + TrainState_1_2_8 + TrainState_1_2_9 + TrainState_2_1_24 + TrainState_2_1_23 + TrainState_2_1_22 + TrainState_2_1_21 + TrainState_2_1_20 + TrainState_2_1_19 + TrainState_2_1_18 + TrainState_1_3_7 + TrainState_1_3_8 + TrainState_1_3_9 + TrainState_2_1_17 + TrainState_2_1_16 + TrainState_2_1_15 + TrainState_2_1_14 + TrainState_2_1_13 + TrainState_2_1_12 + TrainState_2_1_11 + TrainState_2_1_10 + TrainState_1_4_11 + TrainState_1_4_12 + TrainState_1_4_13 + TrainState_1_4_14 + TrainState_1_4_15 + TrainState_1_4_16 + TrainState_1_4_17 + TrainState_1_4_18 + TrainState_1_4_19 + TrainState_1_4_20 + TrainState_1_4_21 + TrainState_1_4_22 + TrainState_1_4_23 + TrainState_1_4_24 + TrainState_1_4_25 + TrainState_1_4_26 + TrainState_1_4_27 + TrainState_1_4_28 + TrainState_1_4_29 + TrainState_1_4_30 + TrainState_1_4_31 + TrainState_1_4_32 + TrainState_1_4_33 + TrainState_1_4_34 + TrainState_2_2_39 + TrainState_2_2_38 + TrainState_2_2_37 + TrainState_2_2_36 + TrainState_2_2_35 + TrainState_2_2_34 + TrainState_2_2_33 + TrainState_2_2_32 + TrainState_2_2_31 + TrainState_2_2_30 + TrainState_2_2_29 + TrainState_2_2_28 + TrainState_2_2_27 + TrainState_2_2_26 + TrainState_2_2_25 + TrainState_2_2_24 + TrainState_2_2_23 + TrainState_2_2_22 + TrainState_2_2_21 + TrainState_2_2_20 + TrainState_2_2_19 + TrainState_2_2_18 + TrainState_2_2_17 + TrainState_2_2_16 + TrainState_2_2_15 + TrainState_2_2_14 + TrainState_2_2_13 + TrainState_2_2_12 + TrainState_2_2_11 + TrainState_2_2_10 + TrainState_2_3_37 + TrainState_2_3_36 + TrainState_2_3_35 + TrainState_2_3_34 + TrainState_2_3_33 + TrainState_2_3_32 + TrainState_2_3_31 + TrainState_2_3_30 + TrainState_2_3_29 + TrainState_2_3_28 + TrainState_2_3_27 + TrainState_2_3_26 + TrainState_2_3_25 + TrainState_2_3_24 + TrainState_2_3_23 + TrainState_2_3_22 + TrainState_2_3_21 + TrainState_2_3_20 + TrainState_2_3_19 + TrainState_1_3_10 + TrainState_1_3_11 + TrainState_1_3_12 + TrainState_1_3_13 + TrainState_1_3_14 + TrainState_1_3_15 + TrainState_1_3_16 + TrainState_1_3_17 + TrainState_1_3_18 + TrainState_1_3_19 + TrainState_1_3_20 + TrainState_1_3_21 + TrainState_1_3_22 + TrainState_1_3_23 + TrainState_1_3_24 + TrainState_1_3_25 + TrainState_1_3_26 + TrainState_1_3_27 + TrainState_1_3_28 + TrainState_1_3_29 + TrainState_1_3_30 + TrainState_1_3_31 + TrainState_1_3_32 + TrainState_1_3_33 + TrainState_1_3_34 + TrainState_1_3_35 + TrainState_1_3_36 + TrainState_1_3_37 + TrainState_2_3_18 + TrainState_2_3_17 + TrainState_2_3_16 + TrainState_2_3_15 + TrainState_2_3_14 + TrainState_2_0_0 + TrainState_2_3_13 + TrainState_2_3_12 + TrainState_2_1_1 + TrainState_2_1_2 + TrainState_2_1_3 + TrainState_2_1_4 + TrainState_2_1_5 + TrainState_2_1_6 + TrainState_2_1_7 + TrainState_2_1_8 + TrainState_2_1_9 + TrainState_2_3_11 + TrainState_2_3_10 + TrainState_2_4_34 + TrainState_2_4_33 + TrainState_2_4_32 + TrainState_2_4_31 + TrainState_1_2_10 + TrainState_1_2_11 + TrainState_1_2_12 + TrainState_1_2_13 + TrainState_1_2_14 + TrainState_1_2_15 + TrainState_1_2_16 + TrainState_1_2_17 + TrainState_1_2_18 + TrainState_1_2_19 + TrainState_1_2_20 + TrainState_1_2_21 + TrainState_1_2_22 + TrainState_1_2_23 + TrainState_1_2_24 + TrainState_1_2_25 + TrainState_1_2_26 + TrainState_1_2_27 + TrainState_1_2_28 + TrainState_1_2_29 + TrainState_1_2_30 + TrainState_1_2_31 + TrainState_1_2_32 + TrainState_1_2_33 + TrainState_1_2_34 + TrainState_1_2_35 + TrainState_1_2_36 + TrainState_1_2_37 + TrainState_1_2_38 + TrainState_1_2_39 + TrainState_2_2_4 + TrainState_2_2_5 + TrainState_2_2_6 + TrainState_2_2_7 + TrainState_2_2_8 + TrainState_2_2_9 + TrainState_2_4_30 + TrainState_2_4_29 + TrainState_2_4_28 + TrainState_2_4_27 + TrainState_2_3_7 + TrainState_2_3_8 + TrainState_2_3_9 + TrainState_2_4_26 + TrainState_2_4_25 + TrainState_2_4_24 + TrainState_2_4_23 + TrainState_2_4_22 + TrainState_2_4_21 + TrainState_2_4_20 + TrainState_2_4_19 + TrainState_2_4_18 + TrainState_2_4_17 + TrainState_2_4_16 + TrainState_2_4_15 + TrainState_1_1_10 + TrainState_1_1_11 + TrainState_1_1_12 + TrainState_1_1_13 + TrainState_1_1_14 + TrainState_1_1_15 + TrainState_1_1_16 + TrainState_1_1_17 + TrainState_1_1_18 + TrainState_1_1_19 + TrainState_1_1_20 + TrainState_1_1_21 + TrainState_1_1_22 + TrainState_1_1_23 + TrainState_1_1_24 + TrainState_1_1_25 + TrainState_1_1_26 + TrainState_1_1_27 + TrainState_1_1_28 + TrainState_1_1_29 + TrainState_1_1_30 + TrainState_1_1_31 + TrainState_1_1_32 + TrainState_1_1_33 + TrainState_1_1_34 + TrainState_1_1_35 + TrainState_1_1_36 + TrainState_1_1_37 + TrainState_1_1_38 + TrainState_1_1_39 + TrainState_2_4_14 + TrainState_2_4_13 + TrainState_2_4_12 + TrainState_2_4_11 + TrainState_1_1_40 + TrainState_2_1_40)
lola: after: (1 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (31 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1 <= NewDistTable_30_4_26 + NewDistTable_21_4_17 + NewDistTable_12_3_9 + NewDistTable_35_3_32 + NewDistTable_26_3_23 + NewDistTable_17_3_14 + NewDistTable_12_4_8 + NewDistTable_32_1_31 + NewDistTable_23_1_22 + NewDistTable_14_1_13 + NewDistTable_12_5_7 + NewDistTable_33_5_28 + NewDistTable_24_5_19 + NewDistTable_15_5_10 + NewDistTable_29_4_25 + NewDistTable_6_3_3 + NewDistTable_29_5_24 + NewDistTable_2_2_0 + NewDistTable_19_1_18 + NewDistTable_28_1_27 + NewDistTable_37_1_36 + NewDistTable_6_2_4 + NewDistTable_14_2_12 + NewDistTable_23_2_21 + NewDistTable_32_2_30 + NewDistTable_2_1_1 + NewDistTable_6_1_5 + NewDistTable_17_4_13 + NewDistTable_26_4_22 + NewDistTable_35_4_31 + NewDistTable_21_5_16 + NewDistTable_30_5_25 + NewDistTable_11_1_10 + NewDistTable_20_1_19 + NewDistTable_19_2_17 + NewDistTable_28_2_26 + NewDistTable_37_2_35 + NewDistTable_14_3_11 + NewDistTable_30_3_27 + NewDistTable_21_3_18 + NewDistTable_35_2_33 + NewDistTable_26_2_24 + NewDistTable_17_2_15 + NewDistTable_33_4_29 + NewDistTable_24_4_20 + NewDistTable_15_4_11 + NewDistTable_38_3_35 + NewDistTable_29_3_26 + NewDistTable_7_1_6 + NewDistTable_23_3_20 + NewDistTable_32_3_29 + NewDistTable_17_5_12 + NewDistTable_26_5_21 + NewDistTable_16_1_15 + NewDistTable_25_1_24 + NewDistTable_34_1_33 + NewDistTable_11_5_6 + NewDistTable_20_2_18 + NewDistTable_19_3_16 + NewDistTable_28_3_25 + NewDistTable_37_3_34 + NewDistTable_11_4_7 + NewDistTable_14_4_10 + NewDistTable_23_4_19 + NewDistTable_32_4_28 + NewDistTable_9_4_5 + NewDistTable_11_3_8 + NewDistTable_5_3_2 + NewDistTable_39_1_38 + NewDistTable_30_2_28 + NewDistTable_21_2_19 + NewDistTable_12_2_10 + NewDistTable_3_1_2 + NewDistTable_35_1_34 + NewDistTable_26_1_25 + NewDistTable_17_1_16 + NewDistTable_7_2_5 + NewDistTable_27_5_22 + NewDistTable_18_5_13 + NewDistTable_3_2_1 + NewDistTable_7_3_4 + NewDistTable_33_3_30 + NewDistTable_24_3_21 + NewDistTable_15_3_12 + NewDistTable_38_2_36 + NewDistTable_29_2_27 + NewDistTable_7_4_3 + NewDistTable_9_3_6 + NewDistTable_16_2_14 + NewDistTable_25_2_23 + NewDistTable_34_2_32 + NewDistTable_11_2_9 + NewDistTable_5_2_3 + NewDistTable_20_3_17 + NewDistTable_30_1_29 + NewDistTable_21_1_20 + NewDistTable_12_1_11 + NewDistTable_13_4_9 + NewDistTable_31_5_26 + NewDistTable_22_5_17 + NewDistTable_13_5_8 + NewDistTable_36_4_32 + NewDistTable_27_4_23 + NewDistTable_18_4_14 + NewDistTable_33_2_31 + NewDistTable_24_2_22 + NewDistTable_15_2_13 + NewDistTable_38_1_37 + NewDistTable_29_1_28 + NewDistTable_19_4_15 + NewDistTable_9_2_7 + NewDistTable_28_4_24 + NewDistTable_37_4_33 + NewDistTable_5_1_4 + NewDistTable_23_5_18 + NewDistTable_32_5_27 + NewDistTable_9_1_8 + NewDistTable_13_1_12 + NewDistTable_22_1_21 + NewDistTable_31_1_30 + NewDistTable_40_1_39 + NewDistTable_39_2_37 + NewDistTable_16_3_13 + NewDistTable_25_3_22 + NewDistTable_34_3_31 + NewDistTable_20_4_16 + NewDistTable_19_5_14 + NewDistTable_28_5_23 + NewDistTable_18_1_17 + NewDistTable_27_1_26 + NewDistTable_36_1_35 + NewDistTable_13_2_11 + NewDistTable_22_2_20 + NewDistTable_31_2_29 + NewDistTable_40_2_38 + NewDistTable_39_3_36 + NewDistTable_31_4_27 + NewDistTable_22_4_18 + NewDistTable_36_3_33 + NewDistTable_27_3_24 + NewDistTable_18_3_15 + NewDistTable_8_1_7 + NewDistTable_33_1_32 + NewDistTable_24_1_23 + NewDistTable_15_1_14 + NewDistTable_4_1_3 + NewDistTable_10_1_9 + NewDistTable_34_5_29 + NewDistTable_25_5_20 + NewDistTable_16_5_11 + NewDistTable_8_2_6 + NewDistTable_4_2_2 + NewDistTable_31_3_28 + NewDistTable_22_3_19 + NewDistTable_13_3_10 + NewDistTable_10_2_8 + NewDistTable_8_3_5 + NewDistTable_36_2_34 + NewDistTable_27_2_25 + NewDistTable_18_2_16 + NewDistTable_4_3_1 + NewDistTable_10_3_7 + NewDistTable_8_4_4 + NewDistTable_20_5_15 + NewDistTable_10_4_6 + NewDistTable_34_4_30 + NewDistTable_25_4_21 + NewDistTable_16_4_12 + NewDistTable_14_5_9)
lola: after: (0 <= 164)
lola: place invariant simplifies atomic proposition
lola: before: (TrainState_2_1_39 + TrainState_2_1_38 + TrainState_2_1_37 + TrainState_2_1_36 + TrainState_2_1_35 + TrainState_1_0_0 + TrainState_2_1_34 + TrainState_2_1_33 + TrainState_2_1_32 + TrainState_2_1_31 + TrainState_2_1_30 + TrainState_2_1_29 + TrainState_1_1_1 + TrainState_1_1_2 + TrainState_1_1_3 + TrainState_1_1_4 + TrainState_1_1_5 + TrainState_1_1_6 + TrainState_1_1_7 + TrainState_1_1_8 + TrainState_1_1_9 + TrainState_2_1_28 + TrainState_2_1_27 + TrainState_2_1_26 + TrainState_2_1_25 + TrainState_1_2_4 + TrainState_1_2_5 + TrainState_1_2_6 + TrainState_1_2_7 + TrainState_1_2_8 + TrainState_1_2_9 + TrainState_2_1_24 + TrainState_2_1_23 + TrainState_2_1_22 + TrainState_2_1_21 + TrainState_2_1_20 + TrainState_2_1_19 + TrainState_2_1_18 + TrainState_1_3_7 + TrainState_1_3_8 + TrainState_1_3_9 + TrainState_2_1_17 + TrainState_2_1_16 + TrainState_2_1_15 + TrainState_2_1_14 + TrainState_2_1_13 + TrainState_2_1_12 + TrainState_2_1_11 + TrainState_2_1_10 + TrainState_1_4_11 + TrainState_1_4_12 + TrainState_1_4_13 + TrainState_1_4_14 + TrainState_1_4_15 + TrainState_1_4_16 + TrainState_1_4_17 + TrainState_1_4_18 + TrainState_1_4_19 + TrainState_1_4_20 + TrainState_1_4_21 + TrainState_1_4_22 + TrainState_1_4_23 + TrainState_1_4_24 + TrainState_1_4_25 + TrainState_1_4_26 + TrainState_1_4_27 + TrainState_1_4_28 + TrainState_1_4_29 + TrainState_1_4_30 + TrainState_1_4_31 + TrainState_1_4_32 + TrainState_1_4_33 + TrainState_1_4_34 + TrainState_2_2_39 + TrainState_2_2_38 + TrainState_2_2_37 + TrainState_2_2_36 + TrainState_2_2_35 + TrainState_2_2_34 + TrainState_2_2_33 + TrainState_2_2_32 + TrainState_2_2_31 + TrainState_2_2_30 + TrainState_2_2_29 + TrainState_2_2_28 + TrainState_2_2_27 + TrainState_2_2_26 + TrainState_2_2_25 + TrainState_2_2_24 + TrainState_2_2_23 + TrainState_2_2_22 + TrainState_2_2_21 + TrainState_2_2_20 + TrainState_2_2_19 + TrainState_2_2_18 + TrainState_2_2_17 + TrainState_2_2_16 + TrainState_2_2_15 + TrainState_2_2_14 + TrainState_2_2_13 + TrainState_2_2_12 + TrainState_2_2_11 + TrainState_2_2_10 + TrainState_2_3_37 + TrainState_2_3_36 + TrainState_2_3_35 + TrainState_2_3_34 + TrainState_2_3_33 + TrainState_2_3_32 + TrainState_2_3_31 + TrainState_2_3_30 + TrainState_2_3_29 + TrainState_2_3_28 + TrainState_2_3_27 + TrainState_2_3_26 + TrainState_2_3_25 + TrainState_2_3_24 + TrainState_2_3_23 + TrainState_2_3_22 + TrainState_2_3_21 + TrainState_2_3_20 + TrainState_2_3_19 + TrainState_1_3_10 + TrainState_1_3_11 + TrainState_1_3_12 + TrainState_1_3_13 + TrainState_1_3_14 + TrainState_1_3_15 + TrainState_1_3_16 + TrainState_1_3_17 + TrainState_1_3_18 + TrainState_1_3_19 + TrainState_1_3_20 + TrainState_1_3_21 + TrainState_1_3_22 + TrainState_1_3_23 + TrainState_1_3_24 + TrainState_1_3_25 + TrainState_1_3_26 + TrainState_1_3_27 + TrainState_1_3_28 + TrainState_1_3_29 + TrainState_1_3_30 + TrainState_1_3_31 + TrainState_1_3_32 + TrainState_1_3_33 + TrainState_1_3_34 + TrainState_1_3_35 + TrainState_1_3_36 + TrainState_1_3_37 + TrainState_2_3_18 + TrainState_2_3_17 + TrainState_2_3_16 + TrainState_2_3_15 + TrainState_2_3_14 + TrainState_2_0_0 + TrainState_2_3_13 + TrainState_2_3_12 + TrainState_2_1_1 + TrainState_2_1_2 + TrainState_2_1_3 + TrainState_2_1_4 + TrainState_2_1_5 + TrainState_2_1_6 + TrainState_2_1_7 + TrainState_2_1_8 + TrainState_2_1_9 + TrainState_2_3_11 + TrainState_2_3_10 + TrainState_2_4_34 + TrainState_2_4_33 + TrainState_2_4_32 + TrainState_2_4_31 + TrainState_1_2_10 + TrainState_1_2_11 + TrainState_1_2_12 + TrainState_1_2_13 + TrainState_1_2_14 + TrainState_1_2_15 + TrainState_1_2_16 + TrainState_1_2_17 + TrainState_1_2_18 + TrainState_1_2_19 + TrainState_1_2_20 + TrainState_1_2_21 + TrainState_1_2_22 + TrainState_1_2_23 + TrainState_1_2_24 + TrainState_1_2_25 + TrainState_1_2_26 + TrainState_1_2_27 + TrainState_1_2_28 + TrainState_1_2_29 + TrainState_1_2_30 + TrainState_1_2_31 + TrainState_1_2_32 + TrainState_1_2_33 + TrainState_1_2_34 + TrainState_1_2_35 + TrainState_1_2_36 + TrainState_1_2_37 + TrainState_1_2_38 + TrainState_1_2_39 + TrainState_2_2_4 + TrainState_2_2_5 + TrainState_2_2_6 + TrainState_2_2_7 + TrainState_2_2_8 + TrainState_2_2_9 + TrainState_2_4_30 + TrainState_2_4_29 + TrainState_2_4_28 + TrainState_2_4_27 + TrainState_2_3_7 + TrainState_2_3_8 + TrainState_2_3_9 + TrainState_2_4_26 + TrainState_2_4_25 + TrainState_2_4_24 + TrainState_2_4_23 + TrainState_2_4_22 + TrainState_2_4_21 + TrainState_2_4_20 + TrainState_2_4_19 + TrainState_2_4_18 + TrainState_2_4_17 + TrainState_2_4_16 + TrainState_2_4_15 + TrainState_1_1_10 + TrainState_1_1_11 + TrainState_1_1_12 + TrainState_1_1_13 + TrainState_1_1_14 + TrainState_1_1_15 + TrainState_1_1_16 + TrainState_1_1_17 + TrainState_1_1_18 + TrainState_1_1_19 + TrainState_1_1_20 + TrainState_1_1_21 + TrainState_1_1_22 + TrainState_1_1_23 + TrainState_1_1_24 + TrainState_1_1_25 + TrainState_1_1_26 + TrainState_1_1_27 + TrainState_1_1_28 + TrainState_1_1_29 + TrainState_1_1_30 + TrainState_1_1_31 + TrainState_1_1_32 + TrainState_1_1_33 + TrainState_1_1_34 + TrainState_1_1_35 + TrainState_1_1_36 + TrainState_1_1_37 + TrainState_1_1_38 + TrainState_1_1_39 + TrainState_2_4_14 + TrainState_2_4_13 + TrainState_2_4_12 + TrainState_2_4_11 + TrainState_1_1_40 + TrainState_2_1_40 <= DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9)
lola: after: (0 <= 34)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_30_4_26 + NewDistTable_21_4_17 + NewDistTable_12_3_9 + NewDistTable_35_3_32 + NewDistTable_26_3_23 + NewDistTable_17_3_14 + NewDistTable_12_4_8 + NewDistTable_32_1_31 + NewDistTable_23_1_22 + NewDistTable_14_1_13 + NewDistTable_12_5_7 + NewDistTable_33_5_28 + NewDistTable_24_5_19 + NewDistTable_15_5_10 + NewDistTable_29_4_25 + NewDistTable_6_3_3 + NewDistTable_29_5_24 + NewDistTable_2_2_0 + NewDistTable_19_1_18 + NewDistTable_28_1_27 + NewDistTable_37_1_36 + NewDistTable_6_2_4 + NewDistTable_14_2_12 + NewDistTable_23_2_21 + NewDistTable_32_2_30 + NewDistTable_2_1_1 + NewDistTable_6_1_5 + NewDistTable_17_4_13 + NewDistTable_26_4_22 + NewDistTable_35_4_31 + NewDistTable_21_5_16 + NewDistTable_30_5_25 + NewDistTable_11_1_10 + NewDistTable_20_1_19 + NewDistTable_19_2_17 + NewDistTable_28_2_26 + NewDistTable_37_2_35 + NewDistTable_14_3_11 + NewDistTable_30_3_27 + NewDistTable_21_3_18 + NewDistTable_35_2_33 + NewDistTable_26_2_24 + NewDistTable_17_2_15 + NewDistTable_33_4_29 + NewDistTable_24_4_20 + NewDistTable_15_4_11 + NewDistTable_38_3_35 + NewDistTable_29_3_26 + NewDistTable_7_1_6 + NewDistTable_23_3_20 + NewDistTable_32_3_29 + NewDistTable_17_5_12 + NewDistTable_26_5_21 + NewDistTable_16_1_15 + NewDistTable_25_1_24 + NewDistTable_34_1_33 + NewDistTable_11_5_6 + NewDistTable_20_2_18 + NewDistTable_19_3_16 + NewDistTable_28_3_25 + NewDistTable_37_3_34 + NewDistTable_11_4_7 + NewDistTable_14_4_10 + NewDistTable_23_4_19 + NewDistTable_32_4_28 + NewDistTable_9_4_5 + NewDistTable_11_3_8 + NewDistTable_5_3_2 + NewDistTable_39_1_38 + NewDistTable_30_2_28 + NewDistTable_21_2_19 + NewDistTable_12_2_10 + NewDistTable_3_1_2 + NewDistTable_35_1_34 + NewDistTable_26_1_25 + NewDistTable_17_1_16 + NewDistTable_7_2_5 + NewDistTable_27_5_22 + NewDistTable_18_5_13 + NewDistTable_3_2_1 + NewDistTable_7_3_4 + NewDistTable_33_3_30 + NewDistTable_24_3_21 + NewDistTable_15_3_12 + NewDistTable_38_2_36 + NewDistTable_29_2_27 + NewDistTable_7_4_3 + NewDistTable_9_3_6 + NewDistTable_16_2_14 + NewDistTable_25_2_23 + NewDistTable_34_2_32 + NewDistTable_11_2_9 + NewDistTable_5_2_3 + NewDistTable_20_3_17 + NewDistTable_30_1_29 + NewDistTable_21_1_20 + NewDistTable_12_1_11 + NewDistTable_13_4_9 + NewDistTable_31_5_26 + NewDistTable_22_5_17 + NewDistTable_13_5_8 + NewDistTable_36_4_32 + NewDistTable_27_4_23 + NewDistTable_18_4_14 + NewDistTable_33_2_31 + NewDistTable_24_2_22 + NewDistTable_15_2_13 + NewDistTable_38_1_37 + NewDistTable_29_1_28 + NewDistTable_19_4_15 + NewDistTable_9_2_7 + NewDistTable_28_4_24 + NewDistTable_37_4_33 + NewDistTable_5_1_4 + NewDistTable_23_5_18 + NewDistTable_32_5_27 + NewDistTable_9_1_8 + NewDistTable_13_1_12 + NewDistTable_22_1_21 + NewDistTable_31_1_30 + NewDistTable_40_1_39 + NewDistTable_39_2_37 + NewDistTable_16_3_13 + NewDistTable_25_3_22 + NewDistTable_34_3_31 + NewDistTable_20_4_16 + NewDistTable_19_5_14 + NewDistTable_28_5_23 + NewDistTable_18_1_17 + NewDistTable_27_1_26 + NewDistTable_36_1_35 + NewDistTable_13_2_11 + NewDistTable_22_2_20 + NewDistTable_31_2_29 + NewDistTable_40_2_38 + NewDistTable_39_3_36 + NewDistTable_31_4_27 + NewDistTable_22_4_18 + NewDistTable_36_3_33 + NewDistTable_27_3_24 + NewDistTable_18_3_15 + NewDistTable_8_1_7 + NewDistTable_33_1_32 + NewDistTable_24_1_23 + NewDistTable_15_1_14 + NewDistTable_4_1_3 + NewDistTable_10_1_9 + NewDistTable_34_5_29 + NewDistTable_25_5_20 + NewDistTable_16_5_11 + NewDistTable_8_2_6 + NewDistTable_4_2_2 + NewDistTable_31_3_28 + NewDistTable_22_3_19 + NewDistTable_13_3_10 + NewDistTable_10_2_8 + NewDistTable_8_3_5 + NewDistTable_36_2_34 + NewDistTable_27_2_25 + NewDistTable_18_2_16 + NewDistTable_4_3_1 + NewDistTable_10_3_7 + NewDistTable_8_4_4 + NewDistTable_20_5_15 + NewDistTable_10_4_6 + NewDistTable_34_4_30 + NewDistTable_25_4_21 + NewDistTable_16_4_12 + NewDistTable_14_5_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (164 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (2 <= NewDistTable_30_4_26 + NewDistTable_21_4_17 + NewDistTable_12_3_9 + NewDistTable_35_3_32 + NewDistTable_26_3_23 + NewDistTable_17_3_14 + NewDistTable_12_4_8 + NewDistTable_32_1_31 + NewDistTable_23_1_22 + NewDistTable_14_1_13 + NewDistTable_12_5_7 + NewDistTable_33_5_28 + NewDistTable_24_5_19 + NewDistTable_15_5_10 + NewDistTable_29_4_25 + NewDistTable_6_3_3 + NewDistTable_29_5_24 + NewDistTable_2_2_0 + NewDistTable_19_1_18 + NewDistTable_28_1_27 + NewDistTable_37_1_36 + NewDistTable_6_2_4 + NewDistTable_14_2_12 + NewDistTable_23_2_21 + NewDistTable_32_2_30 + NewDistTable_2_1_1 + NewDistTable_6_1_5 + NewDistTable_17_4_13 + NewDistTable_26_4_22 + NewDistTable_35_4_31 + NewDistTable_21_5_16 + NewDistTable_30_5_25 + NewDistTable_11_1_10 + NewDistTable_20_1_19 + NewDistTable_19_2_17 + NewDistTable_28_2_26 + NewDistTable_37_2_35 + NewDistTable_14_3_11 + NewDistTable_30_3_27 + NewDistTable_21_3_18 + NewDistTable_35_2_33 + NewDistTable_26_2_24 + NewDistTable_17_2_15 + NewDistTable_33_4_29 + NewDistTable_24_4_20 + NewDistTable_15_4_11 + NewDistTable_38_3_35 + NewDistTable_29_3_26 + NewDistTable_7_1_6 + NewDistTable_23_3_20 + NewDistTable_32_3_29 + NewDistTable_17_5_12 + NewDistTable_26_5_21 + NewDistTable_16_1_15 + NewDistTable_25_1_24 + NewDistTable_34_1_33 + NewDistTable_11_5_6 + NewDistTable_20_2_18 + NewDistTable_19_3_16 + NewDistTable_28_3_25 + NewDistTable_37_3_34 + NewDistTable_11_4_7 + NewDistTable_14_4_10 + NewDistTable_23_4_19 + NewDistTable_32_4_28 + NewDistTable_9_4_5 + NewDistTable_11_3_8 + NewDistTable_5_3_2 + NewDistTable_39_1_38 + NewDistTable_30_2_28 + NewDistTable_21_2_19 + NewDistTable_12_2_10 + NewDistTable_3_1_2 + NewDistTable_35_1_34 + NewDistTable_26_1_25 + NewDistTable_17_1_16 + NewDistTable_7_2_5 + NewDistTable_27_5_22 + NewDistTable_18_5_13 + NewDistTable_3_2_1 + NewDistTable_7_3_4 + NewDistTable_33_3_30 + NewDistTable_24_3_21 + NewDistTable_15_3_12 + NewDistTable_38_2_36 + NewDistTable_29_2_27 + NewDistTable_7_4_3 + NewDistTable_9_3_6 + NewDistTable_16_2_14 + NewDistTable_25_2_23 + NewDistTable_34_2_32 + NewDistTable_11_2_9 + NewDistTable_5_2_3 + NewDistTable_20_3_17 + NewDistTable_30_1_29 + NewDistTable_21_1_20 + NewDistTable_12_1_11 + NewDistTable_13_4_9 + NewDistTable_31_5_26 + NewDistTable_22_5_17 + NewDistTable_13_5_8 + NewDistTable_36_4_32 + NewDistTable_27_4_23 + NewDistTable_18_4_14 + NewDistTable_33_2_31 + NewDistTable_24_2_22 + NewDistTable_15_2_13 + NewDistTable_38_1_37 + NewDistTable_29_1_28 + NewDistTable_19_4_15 + NewDistTable_9_2_7 + NewDistTable_28_4_24 + NewDistTable_37_4_33 + NewDistTable_5_1_4 + NewDistTable_23_5_18 + NewDistTable_32_5_27 + NewDistTable_9_1_8 + NewDistTable_13_1_12 + NewDistTable_22_1_21 + NewDistTable_31_1_30 + NewDistTable_40_1_39 + NewDistTable_39_2_37 + NewDistTable_16_3_13 + NewDistTable_25_3_22 + NewDistTable_34_3_31 + NewDistTable_20_4_16 + NewDistTable_19_5_14 + NewDistTable_28_5_23 + NewDistTable_18_1_17 + NewDistTable_27_1_26 + NewDistTable_36_1_35 + NewDistTable_13_2_11 + NewDistTable_22_2_20 + NewDistTable_31_2_29 + NewDistTable_40_2_38 + NewDistTable_39_3_36 + NewDistTable_31_4_27 + NewDistTable_22_4_18 + NewDistTable_36_3_33 + NewDistTable_27_3_24 + NewDistTable_18_3_15 + NewDistTable_8_1_7 + NewDistTable_33_1_32 + NewDistTable_24_1_23 + NewDistTable_15_1_14 + NewDistTable_4_1_3 + NewDistTable_10_1_9 + NewDistTable_34_5_29 + NewDistTable_25_5_20 + NewDistTable_16_5_11 + NewDistTable_8_2_6 + NewDistTable_4_2_2 + NewDistTable_31_3_28 + NewDistTable_22_3_19 + NewDistTable_13_3_10 + NewDistTable_10_2_8 + NewDistTable_8_3_5 + NewDistTable_36_2_34 + NewDistTable_27_2_25 + NewDistTable_18_2_16 + NewDistTable_4_3_1 + NewDistTable_10_3_7 + NewDistTable_8_4_4 + NewDistTable_20_5_15 + NewDistTable_10_4_6 + NewDistTable_34_4_30 + NewDistTable_25_4_21 + NewDistTable_16_4_12 + NewDistTable_14_5_9)
lola: after: (0 <= 167)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_30_4_26 + NewDistTable_21_4_17 + NewDistTable_12_3_9 + NewDistTable_35_3_32 + NewDistTable_26_3_23 + NewDistTable_17_3_14 + NewDistTable_12_4_8 + NewDistTable_32_1_31 + NewDistTable_23_1_22 + NewDistTable_14_1_13 + NewDistTable_12_5_7 + NewDistTable_33_5_28 + NewDistTable_24_5_19 + NewDistTable_15_5_10 + NewDistTable_29_4_25 + NewDistTable_6_3_3 + NewDistTable_29_5_24 + NewDistTable_2_2_0 + NewDistTable_19_1_18 + NewDistTable_28_1_27 + NewDistTable_37_1_36 + NewDistTable_6_2_4 + NewDistTable_14_2_12 + NewDistTable_23_2_21 + NewDistTable_32_2_30 + NewDistTable_2_1_1 + NewDistTable_6_1_5 + NewDistTable_17_4_13 + NewDistTable_26_4_22 + NewDistTable_35_4_31 + NewDistTable_21_5_16 + NewDistTable_30_5_25 + NewDistTable_11_1_10 + NewDistTable_20_1_19 + NewDistTable_19_2_17 + NewDistTable_28_2_26 + NewDistTable_37_2_35 + NewDistTable_14_3_11 + NewDistTable_30_3_27 + NewDistTable_21_3_18 + NewDistTable_35_2_33 + NewDistTable_26_2_24 + NewDistTable_17_2_15 + NewDistTable_33_4_29 + NewDistTable_24_4_20 + NewDistTable_15_4_11 + NewDistTable_38_3_35 + NewDistTable_29_3_26 + NewDistTable_7_1_6 + NewDistTable_23_3_20 + NewDistTable_32_3_29 + NewDistTable_17_5_12 + NewDistTable_26_5_21 + NewDistTable_16_1_15 + NewDistTable_25_1_24 + NewDistTable_34_1_33 + NewDistTable_11_5_6 + NewDistTable_20_2_18 + NewDistTable_19_3_16 + NewDistTable_28_3_25 + NewDistTable_37_3_34 + NewDistTable_11_4_7 + NewDistTable_14_4_10 + NewDistTable_23_4_19 + NewDistTable_32_4_28 + NewDistTable_9_4_5 + NewDistTable_11_3_8 + NewDistTable_5_3_2 + NewDistTable_39_1_38 + NewDistTable_30_2_28 + NewDistTable_21_2_19 + NewDistTable_12_2_10 + NewDistTable_3_1_2 + NewDistTable_35_1_34 + NewDistTable_26_1_25 + NewDistTable_17_1_16 + NewDistTable_7_2_5 + NewDistTable_27_5_22 + NewDistTable_18_5_13 + NewDistTable_3_2_1 + NewDistTable_7_3_4 + NewDistTable_33_3_30 + NewDistTable_24_3_21 + NewDistTable_15_3_12 + NewDistTable_38_2_36 + NewDistTable_29_2_27 + NewDistTable_7_4_3 + NewDistTable_9_3_6 + NewDistTable_16_2_14 + NewDistTable_25_2_23 + NewDistTable_34_2_32 + NewDistTable_11_2_9 + NewDistTable_5_2_3 + NewDistTable_20_3_17 + NewDistTable_30_1_29 + NewDistTable_21_1_20 + NewDistTable_12_1_11 + NewDistTable_13_4_9 + NewDistTable_31_5_26 + NewDistTable_22_5_17 + NewDistTable_13_5_8 + NewDistTable_36_4_32 + NewDistTable_27_4_23 + NewDistTable_18_4_14 + NewDistTable_33_2_31 + NewDistTable_24_2_22 + NewDistTable_15_2_13 + NewDistTable_38_1_37 + NewDistTable_29_1_28 + NewDistTable_19_4_15 + NewDistTable_9_2_7 + NewDistTable_28_4_24 + NewDistTable_37_4_33 + NewDistTable_5_1_4 + NewDistTable_23_5_18 + NewDistTable_32_5_27 + NewDistTable_9_1_8 + NewDistTable_13_1_12 + NewDistTable_22_1_21 + NewDistTable_31_1_30 + NewDistTable_40_1_39 + NewDistTable_39_2_37 + NewDistTable_16_3_13 + NewDistTable_25_3_22 + NewDistTable_34_3_31 + NewDistTable_20_4_16 + NewDistTable_19_5_14 + NewDistTable_28_5_23 + NewDistTable_18_1_17 + NewDistTable_27_1_26 + NewDistTable_36_1_35 + NewDistTable_13_2_11 + NewDistTable_22_2_20 + NewDistTable_31_2_29 + NewDistTable_40_2_38 + NewDistTable_39_3_36 + NewDistTable_31_4_27 + NewDistTable_22_4_18 + NewDistTable_36_3_33 + NewDistTable_27_3_24 + NewDistTable_18_3_15 + NewDistTable_8_1_7 + NewDistTable_33_1_32 + NewDistTable_24_1_23 + NewDistTable_15_1_14 + NewDistTable_4_1_3 + NewDistTable_10_1_9 + NewDistTable_34_5_29 + NewDistTable_25_5_20 + NewDistTable_16_5_11 + NewDistTable_8_2_6 + NewDistTable_4_2_2 + NewDistTable_31_3_28 + NewDistTable_22_3_19 + NewDistTable_13_3_10 + NewDistTable_10_2_8 + NewDistTable_8_3_5 + NewDistTable_36_2_34 + NewDistTable_27_2_25 + NewDistTable_18_2_16 + NewDistTable_4_3_1 + NewDistTable_10_3_7 + NewDistTable_8_4_4 + NewDistTable_20_5_15 + NewDistTable_10_4_6 + NewDistTable_34_4_30 + NewDistTable_25_4_21 + NewDistTable_16_4_12 + NewDistTable_14_5_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (164 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (2 <= TrainState_2_1_39 + TrainState_2_1_38 + TrainState_2_1_37 + TrainState_2_1_36 + TrainState_2_1_35 + TrainState_1_0_0 + TrainState_2_1_34 + TrainState_2_1_33 + TrainState_2_1_32 + TrainState_2_1_31 + TrainState_2_1_30 + TrainState_2_1_29 + TrainState_1_1_1 + TrainState_1_1_2 + TrainState_1_1_3 + TrainState_1_1_4 + TrainState_1_1_5 + TrainState_1_1_6 + TrainState_1_1_7 + TrainState_1_1_8 + TrainState_1_1_9 + TrainState_2_1_28 + TrainState_2_1_27 + TrainState_2_1_26 + TrainState_2_1_25 + TrainState_1_2_4 + TrainState_1_2_5 + TrainState_1_2_6 + TrainState_1_2_7 + TrainState_1_2_8 + TrainState_1_2_9 + TrainState_2_1_24 + TrainState_2_1_23 + TrainState_2_1_22 + TrainState_2_1_21 + TrainState_2_1_20 + TrainState_2_1_19 + TrainState_2_1_18 + TrainState_1_3_7 + TrainState_1_3_8 + TrainState_1_3_9 + TrainState_2_1_17 + TrainState_2_1_16 + TrainState_2_1_15 + TrainState_2_1_14 + TrainState_2_1_13 + TrainState_2_1_12 + TrainState_2_1_11 + TrainState_2_1_10 + TrainState_1_4_11 + TrainState_1_4_12 + TrainState_1_4_13 + TrainState_1_4_14 + TrainState_1_4_15 + TrainState_1_4_16 + TrainState_1_4_17 + TrainState_1_4_18 + TrainState_1_4_19 + TrainState_1_4_20 + TrainState_1_4_21 + TrainState_1_4_22 + TrainState_1_4_23 + TrainState_1_4_24 + TrainState_1_4_25 + TrainState_1_4_26 + TrainState_1_4_27 + TrainState_1_4_28 + TrainState_1_4_29 + TrainState_1_4_30 + TrainState_1_4_31 + TrainState_1_4_32 + TrainState_1_4_33 + TrainState_1_4_34 + TrainState_2_2_39 + TrainState_2_2_38 + TrainState_2_2_37 + TrainState_2_2_36 + TrainState_2_2_35 + TrainState_2_2_34 + TrainState_2_2_33 + TrainState_2_2_32 + TrainState_2_2_31 + TrainState_2_2_30 + TrainState_2_2_29 + TrainState_2_2_28 + TrainState_2_2_27 + TrainState_2_2_26 + TrainState_2_2_25 + TrainState_2_2_24 + TrainState_2_2_23 + TrainState_2_2_22 + TrainState_2_2_21 + TrainState_2_2_20 + TrainState_2_2_19 + TrainState_2_2_18 + TrainState_2_2_17 + TrainState_2_2_16 + TrainState_2_2_15 + TrainState_2_2_14 + TrainState_2_2_13 + TrainState_2_2_12 + TrainState_2_2_11 + TrainState_2_2_10 + TrainState_2_3_37 + TrainState_2_3_36 + TrainState_2_3_35 + TrainState_2_3_34 + TrainState_2_3_33 + TrainState_2_3_32 + TrainState_2_3_31 + TrainState_2_3_30 + TrainState_2_3_29 + TrainState_2_3_28 + TrainState_2_3_27 + TrainState_2_3_26 + TrainState_2_3_25 + TrainState_2_3_24 + TrainState_2_3_23 + TrainState_2_3_22 + TrainState_2_3_21 + TrainState_2_3_20 + TrainState_2_3_19 + TrainState_1_3_10 + TrainState_1_3_11 + TrainState_1_3_12 + TrainState_1_3_13 + TrainState_1_3_14 + TrainState_1_3_15 + TrainState_1_3_16 + TrainState_1_3_17 + TrainState_1_3_18 + TrainState_1_3_19 + TrainState_1_3_20 + TrainState_1_3_21 + TrainState_1_3_22 + TrainState_1_3_23 + TrainState_1_3_24 + TrainState_1_3_25 + TrainState_1_3_26 + TrainState_1_3_27 + TrainState_1_3_28 + TrainState_1_3_29 + TrainState_1_3_30 + TrainState_1_3_31 + TrainState_1_3_32 + TrainState_1_3_33 + TrainState_1_3_34 + TrainState_1_3_35 + TrainState_1_3_36 + TrainState_1_3_37 + TrainState_2_3_18 + TrainState_2_3_17 + TrainState_2_3_16 + TrainState_2_3_15 + TrainState_2_3_14 + TrainState_2_0_0 + TrainState_2_3_13 + TrainState_2_3_12 + TrainState_2_1_1 + TrainState_2_1_2 + TrainState_2_1_3 + TrainState_2_1_4 + TrainState_2_1_5 + TrainState_2_1_6 + TrainState_2_1_7 + TrainState_2_1_8 + TrainState_2_1_9 + TrainState_2_3_11 + TrainState_2_3_10 + TrainState_2_4_34 + TrainState_2_4_33 + TrainState_2_4_32 + TrainState_2_4_31 + TrainState_1_2_10 + TrainState_1_2_11 + TrainState_1_2_12 + TrainState_1_2_13 + TrainState_1_2_14 + TrainState_1_2_15 + TrainState_1_2_16 + TrainState_1_2_17 + TrainState_1_2_18 + TrainState_1_2_19 + TrainState_1_2_20 + TrainState_1_2_21 + TrainState_1_2_22 + TrainState_1_2_23 + TrainState_1_2_24 + TrainState_1_2_25 + TrainState_1_2_26 + TrainState_1_2_27 + TrainState_1_2_28 + TrainState_1_2_29 + TrainState_1_2_30 + TrainState_1_2_31 + TrainState_1_2_32 + TrainState_1_2_33 + TrainState_1_2_34 + TrainState_1_2_35 + TrainState_1_2_36 + TrainState_1_2_37 + TrainState_1_2_38 + TrainState_1_2_39 + TrainState_2_2_4 + TrainState_2_2_5 + TrainState_2_2_6 + TrainState_2_2_7 + TrainState_2_2_8 + TrainState_2_2_9 + TrainState_2_4_30 + TrainState_2_4_29 + TrainState_2_4_28 + TrainState_2_4_27 + TrainState_2_3_7 + TrainState_2_3_8 + TrainState_2_3_9 + TrainState_2_4_26 + TrainState_2_4_25 + TrainState_2_4_24 + TrainState_2_4_23 + TrainState_2_4_22 + TrainState_2_4_21 + TrainState_2_4_20 + TrainState_2_4_19 + TrainState_2_4_18 + TrainState_2_4_17 + TrainState_2_4_16 + TrainState_2_4_15 + TrainState_1_1_10 + TrainState_1_1_11 + TrainState_1_1_12 + TrainState_1_1_13 + TrainState_1_1_14 + TrainState_1_1_15 + TrainState_1_1_16 + TrainState_1_1_17 + TrainState_1_1_18 + TrainState_1_1_19 + TrainState_1_1_20 + TrainState_1_1_21 + TrainState_1_1_22 + TrainState_1_1_23 + TrainState_1_1_24 + TrainState_1_1_25 + TrainState_1_1_26 + TrainState_1_1_27 + TrainState_1_1_28 + TrainState_1_1_29 + TrainState_1_1_30 + TrainState_1_1_31 + TrainState_1_1_32 + TrainState_1_1_33 + TrainState_1_1_34 + TrainState_1_1_35 + TrainState_1_1_36 + TrainState_1_1_37 + TrainState_1_1_38 + TrainState_1_1_39 + TrainState_2_4_14 + TrainState_2_4_13 + TrainState_2_4_12 + TrainState_2_4_11 + TrainState_1_1_40 + TrainState_2_1_40)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_30_4_26 + NewDistTable_21_4_17 + NewDistTable_12_3_9 + NewDistTable_35_3_32 + NewDistTable_26_3_23 + NewDistTable_17_3_14 + NewDistTable_12_4_8 + NewDistTable_32_1_31 + NewDistTable_23_1_22 + NewDistTable_14_1_13 + NewDistTable_12_5_7 + NewDistTable_33_5_28 + NewDistTable_24_5_19 + NewDistTable_15_5_10 + NewDistTable_29_4_25 + NewDistTable_6_3_3 + NewDistTable_29_5_24 + NewDistTable_2_2_0 + NewDistTable_19_1_18 + NewDistTable_28_1_27 + NewDistTable_37_1_36 + NewDistTable_6_2_4 + NewDistTable_14_2_12 + NewDistTable_23_2_21 + NewDistTable_32_2_30 + NewDistTable_2_1_1 + NewDistTable_6_1_5 + NewDistTable_17_4_13 + NewDistTable_26_4_22 + NewDistTable_35_4_31 + NewDistTable_21_5_16 + NewDistTable_30_5_25 + NewDistTable_11_1_10 + NewDistTable_20_1_19 + NewDistTable_19_2_17 + NewDistTable_28_2_26 + NewDistTable_37_2_35 + NewDistTable_14_3_11 + NewDistTable_30_3_27 + NewDistTable_21_3_18 + NewDistTable_35_2_33 + NewDistTable_26_2_24 + NewDistTable_17_2_15 + NewDistTable_33_4_29 + NewDistTable_24_4_20 + NewDistTable_15_4_11 + NewDistTable_38_3_35 + NewDistTable_29_3_26 + NewDistTable_7_1_6 + NewDistTable_23_3_20 + NewDistTable_32_3_29 + NewDistTable_17_5_12 + NewDistTable_26_5_21 + NewDistTable_16_1_15 + NewDistTable_25_1_24 + NewDistTable_34_1_33 + NewDistTable_11_5_6 + NewDistTable_20_2_18 + NewDistTable_19_3_16 + NewDistTable_28_3_25 + NewDistTable_37_3_34 + NewDistTable_11_4_7 + NewDistTable_14_4_10 + NewDistTable_23_4_19 + NewDistTable_32_4_28 + NewDistTable_9_4_5 + NewDistTable_11_3_8 + NewDistTable_5_3_2 + NewDistTable_39_1_38 + NewDistTable_30_2_28 + NewDistTable_21_2_19 + NewDistTable_12_2_10 + NewDistTable_3_1_2 + NewDistTable_35_1_34 + NewDistTable_26_1_25 + NewDistTable_17_1_16 + NewDistTable_7_2_5 + NewDistTable_27_5_22 + NewDistTable_18_5_13 + NewDistTable_3_2_1 + NewDistTable_7_3_4 + NewDistTable_33_3_30 + NewDistTable_24_3_21 + NewDistTable_15_3_12 + NewDistTable_38_2_36 + NewDistTable_29_2_27 + NewDistTable_7_4_3 + NewDistTable_9_3_6 + NewDistTable_16_2_14 + NewDistTable_25_2_23 + NewDistTable_34_2_32 + NewDistTable_11_2_9 + NewDistTable_5_2_3 + NewDistTable_20_3_17 + NewDistTable_30_1_29 + NewDistTable_21_1_20 + NewDistTable_12_1_11 + NewDistTable_13_4_9 + NewDistTable_31_5_26 + NewDistTable_22_5_17 + NewDistTable_13_5_8 + NewDistTable_36_4_32 + NewDistTable_27_4_23 + NewDistTable_18_4_14 + NewDistTable_33_2_31 + NewDistTable_24_2_22 + NewDistTable_15_2_13 + NewDistTable_38_1_37 + NewDistTable_29_1_28 + NewDistTable_19_4_15 + NewDistTable_9_2_7 + NewDistTable_28_4_24 + NewDistTable_37_4_33 + NewDistTable_5_1_4 + NewDistTable_23_5_18 + NewDistTable_32_5_27 + NewDistTable_9_1_8 + NewDistTable_13_1_12 + NewDistTable_22_1_21 + NewDistTable_31_1_30 + NewDistTable_40_1_39 + NewDistTable_39_2_37 + NewDistTable_16_3_13 + NewDistTable_25_3_22 + NewDistTable_34_3_31 + NewDistTable_20_4_16 + NewDistTable_19_5_14 + NewDistTable_28_5_23 + NewDistTable_18_1_17 + NewDistTable_27_1_26 + NewDistTable_36_1_35 + NewDistTable_13_2_11 + NewDistTable_22_2_20 + NewDistTable_31_2_29 + NewDistTable_40_2_38 + NewDistTable_39_3_36 + NewDistTable_31_4_27 + NewDistTable_22_4_18 + NewDistTable_36_3_33 + NewDistTable_27_3_24 + NewDistTable_18_3_15 + NewDistTable_8_1_7 + NewDistTable_33_1_32 + NewDistTable_24_1_23 + NewDistTable_15_1_14 + NewDistTable_4_1_3 + NewDistTable_10_1_9 + NewDistTable_34_5_29 + NewDistTable_25_5_20 + NewDistTable_16_5_11 + NewDistTable_8_2_6 + NewDistTable_4_2_2 + NewDistTable_31_3_28 + NewDistTable_22_3_19 + NewDistTable_13_3_10 + NewDistTable_10_2_8 + NewDistTable_8_3_5 + NewDistTable_36_2_34 + NewDistTable_27_2_25 + NewDistTable_18_2_16 + NewDistTable_4_3_1 + NewDistTable_10_3_7 + NewDistTable_8_4_4 + NewDistTable_20_5_15 + NewDistTable_10_4_6 + NewDistTable_34_4_30 + NewDistTable_25_4_21 + NewDistTable_16_4_12 + NewDistTable_14_5_9 <= StopTable_5_15 + StopTable_4_10 + StopTable_3_6 + StopTable_2_3 + StopTable_1_1)
lola: after: (164 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (2 <= TrainState_2_1_39 + TrainState_2_1_38 + TrainState_2_1_37 + TrainState_2_1_36 + TrainState_2_1_35 + TrainState_1_0_0 + TrainState_2_1_34 + TrainState_2_1_33 + TrainState_2_1_32 + TrainState_2_1_31 + TrainState_2_1_30 + TrainState_2_1_29 + TrainState_1_1_1 + TrainState_1_1_2 + TrainState_1_1_3 + TrainState_1_1_4 + TrainState_1_1_5 + TrainState_1_1_6 + TrainState_1_1_7 + TrainState_1_1_8 + TrainState_1_1_9 + TrainState_2_1_28 + TrainState_2_1_27 + TrainState_2_1_26 + TrainState_2_1_25 + TrainState_1_2_4 + TrainState_1_2_5 + TrainState_1_2_6 + TrainState_1_2_7 + TrainState_1_2_8 + TrainState_1_2_9 + TrainState_2_1_24 + TrainState_2_1_23 + TrainState_2_1_22 + TrainState_2_1_21 + TrainState_2_1_20 + TrainState_2_1_19 + TrainState_2_1_18 + TrainState_1_3_7 + TrainState_1_3_8 + TrainState_1_3_9 + TrainState_2_1_17 + TrainState_2_1_16 + TrainState_2_1_15 + TrainState_2_1_14 + TrainState_2_1_13 + TrainState_2_1_12 + TrainState_2_1_11 + TrainState_2_1_10 + TrainState_1_4_11 + TrainState_1_4_12 + TrainState_1_4_13 + TrainState_1_4_14 + TrainState_1_4_15 + TrainState_1_4_16 + TrainState_1_4_17 + TrainState_1_4_18 + TrainState_1_4_19 + TrainState_1_4_20 + TrainState_1_4_21 + TrainState_1_4_22 + TrainState_1_4_23 + TrainState_1_4_24 + TrainState_1_4_25 + TrainState_1_4_26 + TrainState_1_4_27 + TrainState_1_4_28 + TrainState_1_4_29 + TrainState_1_4_30 + TrainState_1_4_31 + TrainState_1_4_32 + TrainState_1_4_33 + TrainState_1_4_34 + TrainState_2_2_39 + TrainState_2_2_38 + TrainState_2_2_37 + TrainState_2_2_36 + TrainState_2_2_35 + TrainState_2_2_34 + TrainState_2_2_33 + TrainState_2_2_32 + TrainState_2_2_31 + TrainState_2_2_30 + TrainState_2_2_29 + TrainState_2_2_28 + TrainState_2_2_27 + TrainState_2_2_26 + TrainState_2_2_25 + TrainState_2_2_24 + TrainState_2_2_23 + TrainState_2_2_22 + TrainState_2_2_21 + TrainState_2_2_20 + TrainState_2_2_19 + TrainState_2_2_18 + TrainState_2_2_17 + TrainState_2_2_16 + TrainState_2_2_15 + TrainState_2_2_14 + TrainState_2_2_13 + TrainState_2_2_12 + TrainState_2_2_11 + TrainState_2_2_10 + TrainState_2_3_37 + TrainState_2_3_36 + TrainState_2_3_35 + TrainState_2_3_34 + TrainState_2_3_33 + TrainState_2_3_32 + TrainState_2_3_31 + TrainState_2_3_30 + TrainState_2_3_29 + TrainState_2_3_28 + TrainState_2_3_27 + TrainState_2_3_26 + TrainState_2_3_25 + TrainState_2_3_24 + TrainState_2_3_23 + TrainState_2_3_22 + TrainState_2_3_21 + TrainState_2_3_20 + TrainState_2_3_19 + TrainState_1_3_10 + TrainState_1_3_11 + TrainState_1_3_12 + TrainState_1_3_13 + TrainState_1_3_14 + TrainState_1_3_15 + TrainState_1_3_16 + TrainState_1_3_17 + TrainState_1_3_18 + TrainState_1_3_19 + TrainState_1_3_20 + TrainState_1_3_21 + TrainState_1_3_22 + TrainState_1_3_23 + TrainState_1_3_24 + TrainState_1_3_25 + TrainState_1_3_26 + TrainState_1_3_27 + TrainState_1_3_28 + TrainState_1_3_29 + TrainState_1_3_30 + TrainState_1_3_31 + TrainState_1_3_32 + TrainState_1_3_33 + TrainState_1_3_34 + TrainState_1_3_35 + TrainState_1_3_36 + TrainState_1_3_37 + TrainState_2_3_18 + TrainState_2_3_17 + TrainState_2_3_16 + TrainState_2_3_15 + TrainState_2_3_14 + TrainState_2_0_0 + TrainState_2_3_13 + TrainState_2_3_12 + TrainState_2_1_1 + TrainState_2_1_2 + TrainState_2_1_3 + TrainState_2_1_4 + TrainState_2_1_5 + TrainState_2_1_6 + TrainState_2_1_7 + TrainState_2_1_8 + TrainState_2_1_9 + TrainState_2_3_11 + TrainState_2_3_10 + TrainState_2_4_34 + TrainState_2_4_33 + TrainState_2_4_32 + TrainState_2_4_31 + TrainState_1_2_10 + TrainState_1_2_11 + TrainState_1_2_12 + TrainState_1_2_13 + TrainState_1_2_14 + TrainState_1_2_15 + TrainState_1_2_16 + TrainState_1_2_17 + TrainState_1_2_18 + TrainState_1_2_19 + TrainState_1_2_20 + TrainState_1_2_21 + TrainState_1_2_22 + TrainState_1_2_23 + TrainState_1_2_24 + TrainState_1_2_25 + TrainState_1_2_26 + TrainState_1_2_27 + TrainState_1_2_28 + TrainState_1_2_29 + TrainState_1_2_30 + TrainState_1_2_31 + TrainState_1_2_32 + TrainState_1_2_33 + TrainState_1_2_34 + TrainState_1_2_35 + TrainState_1_2_36 + TrainState_1_2_37 + TrainState_1_2_38 + TrainState_1_2_39 + TrainState_2_2_4 + TrainState_2_2_5 + TrainState_2_2_6 + TrainState_2_2_7 + TrainState_2_2_8 + TrainState_2_2_9 + TrainState_2_4_30 + TrainState_2_4_29 + TrainState_2_4_28 + TrainState_2_4_27 + TrainState_2_3_7 + TrainState_2_3_8 + TrainState_2_3_9 + TrainState_2_4_26 + TrainState_2_4_25 + TrainState_2_4_24 + TrainState_2_4_23 + TrainState_2_4_22 + TrainState_2_4_21 + TrainState_2_4_20 + TrainState_2_4_19 + TrainState_2_4_18 + TrainState_2_4_17 + TrainState_2_4_16 + TrainState_2_4_15 + TrainState_1_1_10 + TrainState_1_1_11 + TrainState_1_1_12 + TrainState_1_1_13 + TrainState_1_1_14 + TrainState_1_1_15 + TrainState_1_1_16 + TrainState_1_1_17 + TrainState_1_1_18 + TrainState_1_1_19 + TrainState_1_1_20 + TrainState_1_1_21 + TrainState_1_1_22 + TrainState_1_1_23 + TrainState_1_1_24 + TrainState_1_1_25 + TrainState_1_1_26 + TrainState_1_1_27 + TrainState_1_1_28 + TrainState_1_1_29 + TrainState_1_1_30 + TrainState_1_1_31 + TrainState_1_1_32 + TrainState_1_1_33 + TrainState_1_1_34 + TrainState_1_1_35 + TrainState_1_1_36 + TrainState_1_1_37 + TrainState_1_1_38 + TrainState_1_1_39 + TrainState_2_4_14 + TrainState_2_4_13 + TrainState_2_4_12 + TrainState_2_4_11 + TrainState_1_1_40 + TrainState_2_1_40)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (TrainState_2_1_39 + TrainState_2_1_38 + TrainState_2_1_37 + TrainState_2_1_36 + TrainState_2_1_35 + TrainState_1_0_0 + TrainState_2_1_34 + TrainState_2_1_33 + TrainState_2_1_32 + TrainState_2_1_31 + TrainState_2_1_30 + TrainState_2_1_29 + TrainState_1_1_1 + TrainState_1_1_2 + TrainState_1_1_3 + TrainState_1_1_4 + TrainState_1_1_5 + TrainState_1_1_6 + TrainState_1_1_7 + TrainState_1_1_8 + TrainState_1_1_9 + TrainState_2_1_28 + TrainState_2_1_27 + TrainState_2_1_26 + TrainState_2_1_25 + TrainState_1_2_4 + TrainState_1_2_5 + TrainState_1_2_6 + TrainState_1_2_7 + TrainState_1_2_8 + TrainState_1_2_9 + TrainState_2_1_24 + TrainState_2_1_23 + TrainState_2_1_22 + TrainState_2_1_21 + TrainState_2_1_20 + TrainState_2_1_19 + TrainState_2_1_18 + TrainState_1_3_7 + TrainState_1_3_8 + TrainState_1_3_9 + TrainState_2_1_17 + TrainState_2_1_16 + TrainState_2_1_15 + TrainState_2_1_14 + TrainState_2_1_13 + TrainState_2_1_12 + TrainState_2_1_11 + TrainState_2_1_10 + TrainState_1_4_11 + TrainState_1_4_12 + TrainState_1_4_13 + TrainState_1_4_14 + TrainState_1_4_15 + TrainState_1_4_16 + TrainState_1_4_17 + TrainState_1_4_18 + TrainState_1_4_19 + TrainState_1_4_20 + TrainState_1_4_21 + TrainState_1_4_22 + TrainState_1_4_23 + TrainState_1_4_24 + TrainState_1_4_25 + TrainState_1_4_26 + TrainState_1_4_27 + TrainState_1_4_28 + TrainState_1_4_29 + TrainState_1_4_30 + TrainState_1_4_31 + TrainState_1_4_32 + TrainState_1_4_33 + TrainState_1_4_34 + TrainState_2_2_39 + TrainState_2_2_38 + TrainState_2_2_37 + TrainState_2_2_36 + TrainState_2_2_35 + TrainState_2_2_34 + TrainState_2_2_33 + TrainState_2_2_32 + TrainState_2_2_31 + TrainState_2_2_30 + TrainState_2_2_29 + TrainState_2_2_28 + TrainState_2_2_27 + TrainState_2_2_26 + TrainState_2_2_25 + TrainState_2_2_24 + TrainState_2_2_23 + TrainState_2_2_22 + TrainState_2_2_21 + TrainState_2_2_20 + TrainState_2_2_19 + TrainState_2_2_18 + TrainState_2_2_17 + TrainState_2_2_16 + TrainState_2_2_15 + TrainState_2_2_14 + TrainState_2_2_13 + TrainState_2_2_12 + TrainState_2_2_11 + TrainState_2_2_10 + TrainState_2_3_37 + TrainState_2_3_36 + TrainState_2_3_35 + TrainState_2_3_34 + TrainState_2_3_33 + TrainState_2_3_32 + TrainState_2_3_31 + TrainState_2_3_30 + TrainState_2_3_29 + TrainState_2_3_28 + TrainState_2_3_27 + TrainState_2_3_26 + TrainState_2_3_25 + TrainState_2_3_24 + TrainState_2_3_23 + TrainState_2_3_22 + TrainState_2_3_21 + TrainState_2_3_20 + TrainState_2_3_19 + TrainState_1_3_10 + TrainState_1_3_11 + TrainState_1_3_12 + TrainState_1_3_13 + TrainState_1_3_14 + TrainState_1_3_15 + TrainState_1_3_16 + TrainState_1_3_17 + TrainState_1_3_18 + TrainState_1_3_19 + TrainState_1_3_20 + TrainState_1_3_21 + TrainState_1_3_22 + TrainState_1_3_23 + TrainState_1_3_24 + TrainState_1_3_25 + TrainState_1_3_26 + TrainState_1_3_27 + TrainState_1_3_28 + TrainState_1_3_29 + TrainState_1_3_30 + TrainState_1_3_31 + TrainState_1_3_32 + TrainState_1_3_33 + TrainState_1_3_34 + TrainState_1_3_35 + TrainState_1_3_36 + TrainState_1_3_37 + TrainState_2_3_18 + TrainState_2_3_17 + TrainState_2_3_16 + TrainState_2_3_15 + TrainState_2_3_14 + TrainState_2_0_0 + TrainState_2_3_13 + TrainState_2_3_12 + TrainState_2_1_1 + TrainState_2_1_2 + TrainState_2_1_3 + TrainState_2_1_4 + TrainState_2_1_5 + TrainState_2_1_6 + TrainState_2_1_7 + TrainState_2_1_8 + TrainState_2_1_9 + TrainState_2_3_11 + TrainState_2_3_10 + TrainState_2_4_34 + TrainState_2_4_33 + TrainState_2_4_32 + TrainState_2_4_31 + TrainState_1_2_10 + TrainState_1_2_11 + TrainState_1_2_12 + TrainState_1_2_13 + TrainState_1_2_14 + TrainState_1_2_15 + TrainState_1_2_16 + TrainState_1_2_17 + TrainState_1_2_18 + TrainState_1_2_19 + TrainState_1_2_20 + TrainState_1_2_21 + TrainState_1_2_22 + TrainState_1_2_23 + TrainState_1_2_24 + TrainState_1_2_25 + TrainState_1_2_26 + TrainState_1_2_27 + TrainState_1_2_28 + TrainState_1_2_29 + TrainState_1_2_30 + TrainState_1_2_31 + TrainState_1_2_32 + TrainState_1_2_33 + TrainState_1_2_34 + TrainState_1_2_35 + TrainState_1_2_36 + TrainState_1_2_37 + TrainState_1_2_38 + TrainState_1_2_39 + TrainState_2_2_4 + TrainState_2_2_5 + TrainState_2_2_6 + TrainState_2_2_7 + TrainState_2_2_8 + TrainState_2_2_9 + TrainState_2_4_30 + TrainState_2_4_29 + TrainState_2_4_28 + TrainState_2_4_27 + TrainState_2_3_7 + TrainState_2_3_8 + TrainState_2_3_9 + TrainState_2_4_26 + TrainState_2_4_25 + TrainState_2_4_24 + TrainState_2_4_23 + TrainState_2_4_22 + TrainState_2_4_21 + TrainState_2_4_20 + TrainState_2_4_19 + TrainState_2_4_18 + TrainState_2_4_17 + TrainState_2_4_16 + TrainState_2_4_15 + TrainState_1_1_10 + TrainState_1_1_11 + TrainState_1_1_12 + TrainState_1_1_13 + TrainState_1_1_14 + TrainState_1_1_15 + TrainState_1_1_16 + TrainState_1_1_17 + TrainState_1_1_18 + TrainState_1_1_19 + TrainState_1_1_20 + TrainState_1_1_21 + TrainState_1_1_22 + TrainState_1_1_23 + TrainState_1_1_24 + TrainState_1_1_25 + TrainState_1_1_26 + TrainState_1_1_27 + TrainState_1_1_28 + TrainState_1_1_29 + TrainState_1_1_30 + TrainState_1_1_31 + TrainState_1_1_32 + TrainState_1_1_33 + TrainState_1_1_34 + TrainState_1_1_35 + TrainState_1_1_36 + TrainState_1_1_37 + TrainState_1_1_38 + TrainState_1_1_39 + TrainState_2_4_14 + TrainState_2_4_13 + TrainState_2_4_12 + TrainState_2_4_11 + TrainState_1_1_40 + TrainState_2_1_40 <= DistStation_40 + DistStation_39 + DistStation_38 + DistStation_37 + DistStation_36 + DistStation_35 + DistStation_34 + DistStation_33 + DistStation_32 + DistStation_31 + DistStation_30 + DistStation_29 + DistStation_28 + DistStation_27 + DistStation_26 + DistStation_25 + DistStation_24 + DistStation_23 + DistStation_22 + DistStation_21 + DistStation_20 + DistStation_19 + DistStation_18 + DistStation_17 + DistStation_16 + DistStation_15 + DistStation_14 + DistStation_13 + DistStation_12 + DistStation_11 + DistStation_10 + DistStation_5 + DistStation_6 + DistStation_7 + DistStation_8 + DistStation_9)
lola: after: (0 <= 34)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_29 <= NewDistTable_25_1_24)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= StopTable_5_15)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_5_15 <= NewDistTable_37_3_34)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= NewDistTable_36_4_32)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_24 <= StopTable_4_10)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_3_6 <= NewDistTable_34_3_31)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_4_10 <= DistStation_30)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_27_5_22 <= TrainState_1_3_12)
lola: after: (1 <= TrainState_1_3_12)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_23_5_18 <= DistStation_38)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_22_5_17 <= TrainState_1_2_39)
lola: after: (1 <= TrainState_1_2_39)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= StopTable_2_3)
lola: after: (2 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (0 <= StopTable_1_1)
lola: after: (0 <= 1)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= StopTable_2_3)
lola: after: (2 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= StopTable_4_10)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_38 <= NewDistTable_23_1_22)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= StopTable_4_10)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_5_3_2 <= StopTable_4_10)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_1_1 <= DistStation_13)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_1_1 <= DistStation_33)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (StopTable_2_3 <= DistStation_27)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= StopTable_5_15)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (DistStation_27 <= TrainState_2_1_26)
lola: after: (1 <= TrainState_2_1_26)
lola: place invariant simplifies atomic proposition
lola: before: (1 <= StopTable_5_15)
lola: after: (0 <= 0)
lola: place invariant simplifies atomic proposition
lola: before: (NewDistTable_33_4_29 <= TrainState_1_4_23)
lola: after: (1 <= TrainState_1_4_23)
lola: A (G (X (G ((164 <= 0))))) : A ((G ((31 <= 0)) AND X (((31 <= 0) OR F (X (F ((0 <= 167)))))))) : A (F ((133 <= 0))) : A (G (F (NOT((X ((0 <= 35)) AND NOT((F ((3 <= 0)) U G (F (G ((3 <= 0))))))))))) : A (G (F (NOT(F (X ((0 <= 30))))))) : A (NOT((NOT((() OR F ((1 <= 0)))) U ()))) : A ((() U X (((0 <= 167) OR F ((164 <= 0)))))) : A (F ((((F (NOT(G ((0 <= 0)))) U (164 <= 0)) U NOT(F ((0 <= 0)))) U X ((0 <= 34))))) : A (F (G ((F ((0 <= 0)) U ())))) : A (NOT(G ((G ((1 <= 0)) U F (((1 <= 0) U X ((0 <= 0)))))))) : A (G (X (X (X (NOT(G (F (((0 <= 0) AND F (((1 <= TrainState_1_3_12)))))))))))) : A (X ((NOT(X (G ((TrainState_1_2_39 <= 0)))) OR (G ((2 <= 0)) U X (()))))) : A ((X (G (X ((1 <= 0)))) OR (X ((0 <= 0)) AND NOT(X (G ((0 <= 0))))))) : A ((X ((0 <= 0)) OR G (((0 <= 0) OR F (X ((0 <= 0))))))) : A (G ((0 <= 0))) : A (G (F ((X ((X (F (X ((0 <= 0)))) U ((1 <= TrainState_2_1_26)))) U (1 <= TrainState_1_4_23)))))
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:122
lola: rewrite Frontend/Parser/formula_rewrite.k:142
lola: rewrite Frontend/Parser/formula_rewrite.k:118
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:282
lola: rewrite Frontend/Parser/formula_rewrite.k:115
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:124
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:124
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:157
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:353
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:116
lola: rewrite Frontend/Parser/formula_rewrite.k:347
lola: rewrite Frontend/Parser/formula_rewrite.k:329
lola: rewrite Frontend/Parser/formula_rewrite.k:332
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:380
lola: rewrite Frontend/Parser/formula_rewrite.k:380
lola: rewrite Frontend/Parser/formula_rewrite.k:380
lola: rewrite Frontend/Parser/formula_rewrite.k:374
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:329
lola: rewrite Frontend/Parser/formula_rewrite.k:297
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:528
lola: rewrite Frontend/Parser/formula_rewrite.k:123
lola: rewrite Frontend/Parser/formula_rewrite.k:142
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:335
lola: rewrite Frontend/Parser/formula_rewrite.k:279
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:117
lola: rewrite Frontend/Parser/formula_rewrite.k:122
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:124
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:123
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:142
lola: rewrite Frontend/Parser/formula_rewrite.k:434
lola: computing a collection of formulas
lola: RUNNING
lola: subprocess 0 will run for 222 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 1 will run for 237 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 2 will run for 254 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 3 will run for 274 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 4 will run for 297 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 5 will run for 324 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 6 will run for 356 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 7 will run for 396 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 8 will run for 445 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 9 will run for 509 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 10 will run for 594 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================
lola: subprocess 11 will run for 713 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 73 markings, 72 edges
lola: ========================================
lola: subprocess 12 will run for 891 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 73 markings, 72 edges
lola: ========================================
lola: subprocess 13 will run for 1188 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 73 markings, 72 edges
lola: ========================================
lola: subprocess 14 will run for 1783 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (F (G (((TrainState_1_3_12 <= 0)))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (F (G (((TrainState_1_3_12 <= 0)))))
lola: processed formula length: 38
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method with deletion algorithm (--stubborn=deletion)
lola: using ltl preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 231 markings, 343 edges
lola: ========================================
lola: subprocess 15 will run for 3566 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (G (F ((1 <= TrainState_1_4_23))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (G (F ((1 <= TrainState_1_4_23))))
lola: processed formula length: 36
lola: 147 rewrites
lola: closed formula file LTLCardinality.xml
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method with deletion algorithm (--stubborn=deletion)
lola: using ltl preserving stubborn set method with insertion algorithm(--stubborn=tarjan)
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 12 markings, 12 edges
lola: ========================================
lola: RESULT
lola:
SUMMARY: no no no no no no yes yes yes no no yes no yes yes no
lola:
preliminary result: no no no no no no yes yes yes no no yes no yes yes no
lola: memory consumption: 22388 KB
lola: time consumption: 4 seconds
lola: print data as JSON (--json)
lola: writing JSON to LTLCardinality.json
lola: closed JSON file LTLCardinality.json
rslt: finished
BK_STOP 1589298842385
--------------------
content from stderr:
Sequence of Actions to be Executed by the VM
This is useful if one wants to reexecute the tool in the VM from the submitted image disk.
set -x
# this is for BenchKit: configuration of major elements for the test
export BK_INPUT="BART-PT-002"
export BK_EXAMINATION="LTLCardinality"
export BK_TOOL="win2019"
export BK_RESULT_DIR="/tmp/BK_RESULTS/OUTPUTS"
export BK_TIME_CONFINEMENT="3600"
export BK_MEMORY_CONFINEMENT="16384"
# this is specific to your benchmark or test
export BIN_DIR="$HOME/BenchKit/bin"
# remove the execution directoty if it exists (to avoid increse of .vmdk images)
if [ -d execution ] ; then
rm -rf execution
fi
# this is for BenchKit: explicit launching of the test
echo "====================================================================="
echo " Generated by BenchKit 2-4028"
echo " Executing tool win2019"
echo " Input is BART-PT-002, examination is LTLCardinality"
echo " Time confinement is $BK_TIME_CONFINEMENT seconds"
echo " Memory confinement is 16384 MBytes"
echo " Number of cores is 4"
echo " Run identifier is r030-oct2-158897741100017"
echo "====================================================================="
echo
echo "--------------------"
echo "preparation of the directory to be used:"
tar xzf /home/mcc/BenchKit/INPUTS/BART-PT-002.tgz
mv BART-PT-002 execution
cd execution
if [ "LTLCardinality" = "ReachabilityDeadlock" ] || [ "LTLCardinality" = "UpperBounds" ] || [ "LTLCardinality" = "QuasiLiveness" ] || [ "LTLCardinality" = "StableMarking" ] || [ "LTLCardinality" = "Liveness" ] || [ "LTLCardinality" = "OneSafe" ] || [ "LTLCardinality" = "StateSpace" ]; then
rm -f GenericPropertiesVerdict.xml
fi
pwd
ls -lh
echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "LTLCardinality" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "LTLCardinality" != "StateSpace" ] ; then
echo "The expected result is a vector of booleans"
echo BOOL_VECTOR
else
echo "no data necessary for post analysis"
fi
echo
if [ -f "LTLCardinality.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property LTLCardinality.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "LTLCardinality.xml" ] ; then # for cunf (txt files deleted;-)
echo echo "here is the order used to build the result vector(from xml file)"
for x in $(grep '
echo "FORMULA_NAME $x"
done
elif [ "LTLCardinality" = "ReachabilityDeadlock" ] || [ "LTLCardinality" = "QuasiLiveness" ] || [ "LTLCardinality" = "StableMarking" ] || [ "LTLCardinality" = "Liveness" ] || [ "LTLCardinality" = "OneSafe" ] ; then
echo "FORMULA_NAME LTLCardinality"
fi
echo
echo "=== Now, execution of the tool begins"
echo
echo -n "BK_START "
date -u +%s%3N
echo
timeout -s 9 $BK_TIME_CONFINEMENT bash -c "/home/mcc/BenchKit/BenchKit_head.sh 2> STDERR ; echo ; echo -n \"BK_STOP \" ; date -u +%s%3N"
if [ $? -eq 137 ] ; then
echo
echo "BK_TIME_CONFINEMENT_REACHED"
fi
echo
echo "--------------------"
echo "content from stderr:"
echo
cat STDERR ;