About the Execution of LoLA for S_QuasiCertifProtocol-PT-22
| Execution Summary | |||||
| Max Memory Used (MB) |
Time wait (ms) | CPU Usage (ms) | I/O Wait (ms) | Computed Result | Execution Status |
| 8476.750 | 1180355.00 | 1182358.00 | 3962.40 | TFFTTFFFFF????FF | normal |
Execution Chart
We display below the execution chart for this examination (boot time has been removed).
Trace from the execution
Waiting for the VM to be ready (probing ssh)
................
=====================================================================
Generated by BenchKit 2-3254
Executing tool lola
Input is S_QuasiCertifProtocol-PT-22, examination is LTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r138-smll-149479231800275
=====================================================================
--------------------
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 QuasiCertifProtocol-COL-22-LTLCardinality-0
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-1
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-10
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-11
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-12
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-13
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-14
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-15
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-2
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-3
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-4
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-5
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-6
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-7
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-8
FORMULA_NAME QuasiCertifProtocol-COL-22-LTLCardinality-9
=== Now, execution of the tool begins
BK_START 1496390223765
Time: 3600 - MCC
----- Start make prepare stdout -----
===========================================================================================
S_QuasiCertifProtocol-PT-22: translating PT Petri net model.pnml into LoLA format
===========================================================================================
translating PT Petri net complete
checking for too many tokens
===========================================================================================
S_QuasiCertifProtocol-PT-22: translating PT formula LTLCardinality into LoLA format
===========================================================================================
translating formula complete
touch formulae;
----- Start make result stdout -----
LTLCardinality @ S_QuasiCertifProtocol-PT-22 @ 3540 seconds
----- Start make result stdout -----
lola: LoLA will run for 3540 seconds at most (--timelimit)
lola: NET
lola: reading net from model.pnml.lola
lola: finished parsing
lola: closed net file model.pnml.lola
lola: 2322/65536 symbol table entries, 0 collisions
lola: preprocessing...
lola: finding significant places
lola: 1966 places, 356 transitions, 355 significant places
lola: computing forward-conflicting sets
lola: computing back-conflicting sets
lola: 471 transition conflict sets
lola: TASK
lola: reading formula from QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: A ((X (F ((SstopAbort <= Astart))) U F ((s3_8 + s3_7 + s3_6 + s3_5 + s3_4 + s3_3 + s3_2 + s3_1 + s3_0 + s3_10 + s3_11 + s3_12 + s3_13 + s3_14 + s3_15 + s3_16 + s3_17 + s3_18 + s3_19 + s3_20 + s3_21 + s3_22 + s3_9 <= a4)))) : A (G (F (X (F ((3 <= s5_22 + s5_21 + s5_20 + s5_19 + s5_18 + s5_17 + s5_16 + s5_15 + s5_14 + s5_13 + s5_12 + s5_11 + s5_10 + s5_0 + s5_1 + s5_2 + s5_3 + s5_4 + s5_5 + s5_6 + s5_7 + s5_8 + s5_9)))))) : A (G (((1 <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n9_19_18 + n9_19_19 + n9_19_20 + n9_19_21 + n9_19_22 + n9_7_10 + n9_20_10 + n9_6_10 + n9_20_9 + n9_20_8 + n9_20_7 + n9_20_6 + n9_20_5 + n9_20_4 + n9_20_3 + n9_20_2 + n9_20_1 + n9_20_0 + n9_1_10 + n9_1_11 + n9_1_12 + n9_1_13 + n9_1_14 + n9_1_15 + n9_1_16 + n9_1_17 + n9_1_18 + n9_1_19 + n9_1_20 + n9_1_21 + n9_1_22 + n9_13_22 + n9_13_21 + n9_13_20 + n9_13_19 + n9_13_18 + n9_13_17 + n9_13_16 + n9_13_15 + n9_13_14 + n9_13_13 + n9_13_12 + n9_18_10 + n9_18_11 + n9_18_12 + n9_18_13 + n9_18_14 + n9_18_15 + n9_18_16 + n9_18_17 + n9_18_18 + n9_18_19 + n9_18_20 + n9_18_21 + n9_18_22 + n9_21_0 + n9_21_1 + n9_21_2 + n9_21_3 + n9_21_4 + n9_21_5 + n9_21_6 + n9_21_7 + n9_21_8 + n9_21_9 + n9_13_11 + n9_6_11 + n9_6_12 + n9_6_13 + n9_6_14 + n9_6_15 + n9_6_16 + n9_6_17 + n9_6_18 + n9_6_19 + n9_6_20 + n9_6_21 + n9_6_22 + n9_13_10 + n9_22_0 + n9_22_1 + n9_22_2 + n9_22_3 + n9_22_4 + n9_22_5 + n9_22_6 + n9_22_7 + n9_22_8 + n9_22_9 + n9_12_10 + n9_12_11 + n9_12_12 + n9_12_13 + n9_12_14 + n9_12_15 + n9_12_16 + n9_12_17 + n9_12_18 + n9_12_19 + n9_12_20 + n9_12_21 + n9_12_22 + n9_0_10 + n9_0_11 + n9_0_12 + n9_0_13 + n9_0_14 + n9_0_15 + n9_0_16 + n9_0_17 + n9_0_18 + n9_0_19 + n9_0_20 + n9_0_21 + n9_0_22 + n9_10_0 + n9_10_1 + n9_10_2 + n9_10_3 + n9_10_4 + n9_10_5 + n9_10_6 + n9_10_7 + n9_10_8 + n9_10_9 + n9_17_10 + n9_17_11 + n9_17_12 + n9_17_13 + n9_17_14 + n9_17_15 + n9_17_16 + n9_17_17 + n9_17_18 + n9_17_19 + n9_17_20 + n9_17_21 + n9_17_22 + n9_0_0 + n9_0_1 + n9_0_2 + n9_0_3 + n9_0_4 + n9_0_5 + n9_0_6 + n9_0_7 + n9_0_8 + n9_0_9 + n9_11_0 + n9_11_1 + n9_11_2 + n9_11_3 + n9_11_4 + n9_11_5 + n9_11_6 + n9_11_7 + n9_11_8 + n9_11_9 + n9_5_10 + n9_5_11 + n9_5_12 + n9_5_13 + n9_5_14 + n9_5_15 + n9_5_16 + n9_5_17 + n9_5_18 + n9_5_19 + n9_5_20 + n9_5_21 + n9_5_22 + n9_1_0 + n9_1_1 + n9_1_2 + n9_1_3 + n9_1_4 + n9_1_5 + n9_1_6 + n9_1_7 + n9_1_8 + n9_1_9 + n9_12_0 + n9_12_1 + n9_12_2 + n9_12_3 + n9_12_4 + n9_12_5 + n9_12_6 + n9_12_7 + n9_12_8 + n9_12_9 + n9_11_10 + n9_11_11 + n9_11_12 + n9_11_13 + n9_11_14 + n9_11_15 + n9_11_16 + n9_11_17 + n9_11_18 + n9_11_19 + n9_11_20 + n9_11_21 + n9_11_22 + n9_2_0 + n9_2_1 + n9_2_2 + n9_2_3 + n9_2_4 + n9_2_5 + n9_2_6 + n9_2_7 + n9_2_8 + n9_2_9 + n9_13_0 + n9_13_1 + n9_13_2 + n9_13_3 + n9_13_4 + n9_13_5 + n9_13_6 + n9_13_7 + n9_13_8 + n9_13_9 + n9_3_0 + n9_3_1 + n9_3_2 + n9_3_3 + n9_3_4 + n9_3_5 + n9_3_6 + n9_3_7 + n9_3_8 + n9_3_9 + n9_16_10 + n9_16_11 + n9_16_12 + n9_16_13 + n9_16_14 + n9_16_15 + n9_16_16 + n9_16_17 + n9_16_18 + n9_16_19 + n9_16_20 + n9_16_21 + n9_16_22 + n9_14_0 + n9_14_1 + n9_14_2 + n9_14_3 + n9_14_4 + n9_14_5 + n9_14_6 + n9_14_7 + n9_14_8 + n9_14_9 + n9_4_10 + n9_4_11 + n9_4_12 + n9_4_13 + n9_4_14 + n9_4_15 + n9_4_16 + n9_4_17 + n9_4_18 + n9_4_19 + n9_4_20 + n9_4_21 + n9_4_22 + n9_4_0 + n9_4_1 + n9_4_2 + n9_4_3 + n9_4_4 + n9_4_5 + n9_4_6 + n9_4_7 + n9_4_8 + n9_4_9 + n9_15_0 + n9_15_1 + n9_15_2 + n9_15_3 + n9_15_4 + n9_15_5 + n9_15_6 + n9_15_7 + n9_15_8 + n9_15_9 + n9_9_10 + n9_9_11 + n9_9_12 + n9_9_13 + n9_9_14 + n9_9_15 + n9_9_16 + n9_9_17 + n9_9_18 + n9_9_19 + n9_9_20 + n9_9_21 + n9_9_22 + n9_10_10 + n9_10_11 + n9_10_12 + n9_10_13 + n9_10_14 + n9_10_15 + n9_10_16 + n9_10_17 + n9_10_18 + n9_10_19 + n9_10_20 + n9_10_21 + n9_10_22 + n9_22_10 + n9_22_11 + n9_22_12 + n9_22_13 + n9_22_14 + n9_22_15 + n9_22_16 + n9_22_17 + n9_22_18 + n9_22_19 + n9_22_20 + n9_22_21 + n9_22_22 + n9_20_22 + n9_20_21 + n9_20_20 + n9_20_19 + n9_20_18 + n9_20_17 + n9_20_16 + n9_20_15 + n9_20_14 + n9_5_0 + n9_5_1 + n9_5_2 + n9_5_3 + n9_5_4 + n9_5_5 + n9_5_6 + n9_5_7 + n9_5_8 + n9_5_9 + n9_16_0 + n9_16_1 + n9_16_2 + n9_16_3 + n9_16_4 + n9_16_5 + n9_16_6 + n9_16_7 + n9_16_8 + n9_16_9 + n9_20_13 + n9_20_12 + n9_20_11 + n9_7_22 + n9_7_21 + n9_7_20 + n9_7_19 + n9_7_18 + n9_7_17 + n9_7_16 + n9_7_15 + n9_7_14 + n9_7_13 + n9_6_0 + n9_6_1 + n9_6_2 + n9_6_3 + n9_6_4 + n9_6_5 + n9_6_6 + n9_6_7 + n9_6_8 + n9_6_9 + n9_17_0 + n9_17_1 + n9_17_2 + n9_17_3 + n9_17_4 + n9_17_5 + n9_17_6 + n9_17_7 + n9_17_8 + n9_17_9 + n9_15_10 + n9_15_11 + n9_15_12 + n9_15_13 + n9_15_14 + n9_15_15 + n9_15_16 + n9_15_17 + n9_15_18 + n9_15_19 + n9_15_20 + n9_15_21 + n9_15_22 + n9_3_10 + n9_3_11 + n9_3_12 + n9_3_13 + n9_3_14 + n9_3_15 + n9_3_16 + n9_3_17 + n9_3_18 + n9_3_19 + n9_3_20 + n9_3_21 + n9_3_22 + n9_7_12 + n9_7_11 + n9_7_0 + n9_7_1 + n9_7_2 + n9_7_3 + n9_7_4 + n9_7_5 + n9_7_6 + n9_7_7 + n9_7_8 + n9_7_9 + n9_18_0 + n9_18_1 + n9_18_2 + n9_18_3 + n9_18_4 + n9_18_5 + n9_18_6 + n9_18_7 + n9_18_8 + n9_18_9 + n9_8_10 + n9_8_11 + n9_8_12 + n9_8_13 + n9_8_14 + n9_8_15 + n9_8_16 + n9_8_17 + n9_8_18 + n9_8_19 + n9_8_20 + n9_8_21 + n9_8_22 + n9_21_10 + n9_21_11 + n9_21_12 + n9_21_13 + n9_21_14 + n9_21_15 + n9_21_16 + n9_21_17 + n9_21_18 + n9_21_19 + n9_21_20 + n9_21_21 + n9_21_22 + n9_8_0 + n9_8_1 + n9_8_2 + n9_8_3 + n9_8_4 + n9_8_5 + n9_8_6 + n9_8_7 + n9_8_8 + n9_8_9 + n9_19_0 + n9_19_1 + n9_19_2 + n9_19_3 + n9_19_4 + n9_19_5 + n9_19_6 + n9_19_7 + n9_19_8 + n9_19_9 + n9_9_0 + n9_9_1 + n9_9_2 + n9_9_3 + n9_9_4 + n9_9_5 + n9_9_6 + n9_9_7 + n9_9_8 + n9_9_9 + n9_14_10 + n9_14_11 + n9_14_12 + n9_14_13 + n9_14_14 + n9_14_15 + n9_14_16 + n9_14_17 + n9_14_18 + n9_14_19 + n9_14_20 + n9_14_21 + n9_14_22 + n9_2_10 + n9_2_11 + n9_2_12 + n9_2_13 + n9_2_14 + n9_2_15 + n9_2_16 + n9_2_17 + n9_2_18 + n9_2_19 + n9_2_20 + n9_2_21 + n9_2_22) U (1 <= s2_9 + s2_8 + s2_7 + s2_6 + s2_5 + s2_4 + s2_3 + s2_2 + s2_1 + s2_0 + s2_22 + s2_21 + s2_20 + s2_19 + s2_18 + s2_17 + s2_16 + s2_15 + s2_14 + s2_13 + s2_12 + s2_11 + s2_10)))) : A ((X (F ((1 <= AstopOK))) U ((2 <= a1) U (3 <= n8_14_10 + n8_11_0 + n8_5_10 + n8_21_0 + n8_0_0 + n8_22_10 + n8_10_10 + n8_12_0 + n8_1_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_19_10 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_20_10 + n8_4_10 + n8_3_0 + n8_2_0 + n8_13_0 + n8_13_1 + n8_13_2 + n8_13_3 + n8_13_4 + n8_13_5 + n8_13_6 + n8_13_7 + n8_13_8 + n8_13_9 + n8_2_1 + n8_2_2 + n8_2_3 + n8_2_4 + n8_2_5 + n8_2_6 + n8_2_7 + n8_2_8 + n8_2_9 + n8_14_0 + n8_14_1 + n8_14_2 + n8_14_3 + n8_14_4 + n8_14_5 + n8_14_6 + n8_14_7 + n8_14_8 + n8_14_9 + n8_13_10 + n8_13_11 + n8_13_12 + n8_13_13 + n8_13_14 + n8_13_15 + n8_13_16 + n8_13_17 + n8_13_18 + n8_13_19 + n8_13_20 + n8_13_21 + n8_13_22 + n8_3_1 + n8_3_2 + n8_3_3 + n8_3_4 + n8_3_5 + n8_3_6 + n8_3_7 + n8_3_8 + n8_3_9 + n8_4_11 + n8_4_12 + n8_4_13 + n8_4_14 + n8_4_15 + n8_4_16 + n8_4_17 + n8_4_18 + n8_4_19 + n8_4_20 + n8_4_21 + n8_4_22 + n8_20_22 + n8_20_21 + n8_20_20 + n8_20_19 + n8_20_18 + n8_20_17 + n8_20_16 + n8_20_15 + n8_20_14 + n8_20_13 + n8_20_12 + n8_20_11 + n8_15_1 + n8_15_2 + n8_15_3 + n8_15_4 + n8_15_5 + n8_15_6 + n8_15_7 + n8_15_8 + n8_15_9 + n8_4_0 + n8_4_1 + n8_4_2 + n8_4_3 + n8_4_4 + n8_4_5 + n8_4_6 + n8_4_7 + n8_4_8 + n8_4_9 + n8_18_11 + n8_18_12 + n8_18_13 + n8_18_14 + n8_18_15 + n8_18_16 + n8_18_17 + n8_18_18 + n8_18_19 + n8_18_20 + n8_18_21 + n8_18_22 + n8_9_11 + n8_9_12 + n8_9_13 + n8_9_14 + n8_9_15 + n8_9_16 + n8_9_17 + n8_9_18 + n8_9_19 + n8_9_20 + n8_9_21 + n8_9_22 + n8_19_22 + n8_19_21 + n8_16_1 + n8_16_2 + n8_16_3 + n8_16_4 + n8_16_5 + n8_16_6 + n8_16_7 + n8_16_8 + n8_16_9 + n8_5_0 + n8_5_1 + n8_5_2 + n8_5_3 + n8_5_4 + n8_5_5 + n8_5_6 + n8_5_7 + n8_5_8 + n8_5_9 + n8_19_20 + n8_19_19 + n8_17_1 + n8_17_2 + n8_17_3 + n8_17_4 + n8_17_5 + n8_17_6 + n8_17_7 + n8_17_8 + n8_17_9 + n8_12_10 + n8_12_11 + n8_12_12 + n8_12_13 + n8_12_14 + n8_12_15 + n8_12_16 + n8_12_17 + n8_12_18 + n8_12_19 + n8_12_20 + n8_12_21 + n8_12_22 + n8_19_18 + n8_19_17 + n8_19_16 + n8_19_15 + n8_19_14 + n8_19_13 + n8_19_12 + n8_19_11 + n8_6_1 + n8_6_2 + n8_6_3 + n8_6_4 + n8_6_5 + n8_6_6 + n8_6_7 + n8_6_8 + n8_6_9 + n8_3_10 + n8_3_11 + n8_3_12 + n8_3_13 + n8_3_14 + n8_3_15 + n8_3_16 + n8_3_17 + n8_3_18 + n8_3_19 + n8_3_20 + n8_3_21 + n8_3_22 + n8_18_0 + n8_18_1 + n8_18_2 + n8_18_3 + n8_18_4 + n8_18_5 + n8_18_6 + n8_18_7 + n8_18_8 + n8_18_9 + n8_7_1 + n8_7_2 + n8_7_3 + n8_7_4 + n8_7_5 + n8_7_6 + n8_7_7 + n8_7_8 + n8_7_9 + n8_17_10 + n8_17_11 + n8_17_12 + n8_17_13 + n8_17_14 + n8_17_15 + n8_17_16 + n8_17_17 + n8_17_18 + n8_17_19 + n8_17_20 + n8_17_21 + n8_17_22 + n8_8_11 + n8_8_12 + n8_8_13 + n8_8_14 + n8_8_15 + n8_8_16 + n8_8_17 + n8_8_18 + n8_8_19 + n8_8_20 + n8_8_21 + n8_8_22 + n8_1_9 + n8_1_8 + n8_1_7 + n8_1_6 + n8_1_5 + n8_1_4 + n8_1_3 + n8_19_0 + n8_19_1 + n8_19_2 + n8_19_3 + n8_19_4 + n8_19_5 + n8_19_6 + n8_19_7 + n8_19_8 + n8_19_9 + n8_1_2 + n8_1_1 + n8_12_9 + n8_12_8 + n8_8_0 + n8_8_1 + n8_8_2 + n8_8_3 + n8_8_4 + n8_8_5 + n8_8_6 + n8_8_7 + n8_8_8 + n8_8_9 + n8_12_7 + n8_12_6 + n8_12_5 + n8_9_0 + n8_9_1 + n8_9_2 + n8_9_3 + n8_9_4 + n8_9_5 + n8_9_6 + n8_9_7 + n8_9_8 + n8_9_9 + n8_11_10 + n8_11_11 + n8_11_12 + n8_11_13 + n8_11_14 + n8_11_15 + n8_11_16 + n8_11_17 + n8_11_18 + n8_11_19 + n8_11_20 + n8_11_21 + n8_11_22 + n8_12_4 + n8_2_10 + n8_2_11 + n8_2_12 + n8_2_13 + n8_2_14 + n8_2_15 + n8_2_16 + n8_2_17 + n8_2_18 + n8_2_19 + n8_2_20 + n8_2_21 + n8_2_22 + n8_12_3 + n8_12_2 + n8_12_1 + n8_16_10 + n8_16_11 + n8_16_12 + n8_16_13 + n8_16_14 + n8_16_15 + n8_16_16 + n8_16_17 + n8_16_18 + n8_16_19 + n8_16_20 + n8_16_21 + n8_16_22 + n8_7_10 + n8_7_11 + n8_7_12 + n8_7_13 + n8_7_14 + n8_7_15 + n8_7_16 + n8_7_17 + n8_7_18 + n8_7_19 + n8_7_20 + n8_7_21 + n8_7_22 + n8_10_11 + n8_10_12 + n8_10_13 + n8_10_14 + n8_10_15 + n8_10_16 + n8_10_17 + n8_10_18 + n8_10_19 + n8_10_20 + n8_10_21 + n8_10_22 + n8_22_11 + n8_22_12 + n8_22_13 + n8_22_14 + n8_22_15 + n8_22_16 + n8_22_17 + n8_22_18 + n8_22_19 + n8_22_20 + n8_22_21 + n8_22_22 + n8_1_10 + n8_1_11 + n8_1_12 + n8_1_13 + n8_1_14 + n8_1_15 + n8_1_16 + n8_1_17 + n8_1_18 + n8_1_19 + n8_1_20 + n8_1_21 + n8_1_22 + n8_20_0 + n8_20_1 + n8_20_2 + n8_20_3 + n8_20_4 + n8_20_5 + n8_20_6 + n8_20_7 + n8_20_8 + n8_20_9 + n8_0_9 + n8_0_8 + n8_0_7 + n8_0_6 + n8_0_5 + n8_0_4 + n8_0_3 + n8_0_2 + n8_15_10 + n8_15_11 + n8_15_12 + n8_15_13 + n8_15_14 + n8_15_15 + n8_15_16 + n8_15_17 + n8_15_18 + n8_15_19 + n8_15_20 + n8_15_21 + n8_15_22 + n8_0_1 + n8_5_22 + n8_21_1 + n8_21_2 + n8_21_3 + n8_21_4 + n8_21_5 + n8_21_6 + n8_21_7 + n8_21_8 + n8_21_9 + n8_6_10 + n8_6_11 + n8_6_12 + n8_6_13 + n8_6_14 + n8_6_15 + n8_6_16 + n8_6_17 + n8_6_18 + n8_6_19 + n8_6_20 + n8_6_21 + n8_6_22 + n8_5_21 + n8_5_20 + n8_5_19 + n8_5_18 + n8_5_17 + n8_5_16 + n8_5_15 + n8_5_14 + n8_5_13 + n8_5_12 + n8_5_11 + n8_11_9 + n8_11_8 + n8_11_7 + n8_11_6 + n8_11_5 + n8_11_4 + n8_11_3 + n8_11_2 + n8_11_1 + n8_14_22 + n8_14_21 + n8_14_20 + n8_14_19 + n8_14_18 + n8_22_0 + n8_22_1 + n8_22_2 + n8_22_3 + n8_22_4 + n8_22_5 + n8_22_6 + n8_22_7 + n8_22_8 + n8_22_9 + n8_14_17 + n8_14_16 + n8_14_15 + n8_14_14 + n8_14_13 + n8_14_12 + n8_14_11 + n8_21_10 + n8_21_11 + n8_21_12 + n8_21_13 + n8_21_14 + n8_21_15 + n8_21_16 + n8_21_17 + n8_21_18 + n8_21_19 + n8_21_20 + n8_21_21 + n8_21_22 + n8_0_10 + n8_0_11 + n8_0_12 + n8_0_13 + n8_0_14 + n8_0_15 + n8_0_16 + n8_0_17 + n8_0_18 + n8_0_19 + n8_0_20 + n8_0_21 + n8_0_22 + n8_10_0 + n8_10_1 + n8_10_2 + n8_10_3 + n8_10_4 + n8_10_5 + n8_10_6 + n8_10_7 + n8_10_8 + n8_10_9)))) : A (F (G (G (X ((1 <= n1_9 + n1_8 + n1_7 + n1_6 + n1_5 + n1_4 + n1_3 + n1_2 + n1_1 + n1_0 + n1_10 + n1_11 + n1_12 + n1_13 + n1_14 + n1_15 + n1_16 + n1_17 + n1_18 + n1_19 + n1_20 + n1_21 + n1_22)))))) : A (X (G (G (F ((2 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cstart_22 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9)))))) : A (G (F (G ((n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9 <= a5))))) : A ((((CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22 <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n9_19_18 + n9_19_19 + n9_19_20 + n9_19_21 + n9_19_22 + n9_7_10 + n9_20_10 + n9_6_10 + n9_20_9 + n9_20_8 + n9_20_7 + n9_20_6 + n9_20_5 + n9_20_4 + n9_20_3 + n9_20_2 + n9_20_1 + n9_20_0 + n9_1_10 + n9_1_11 + n9_1_12 + n9_1_13 + n9_1_14 + n9_1_15 + n9_1_16 + n9_1_17 + n9_1_18 + n9_1_19 + n9_1_20 + n9_1_21 + n9_1_22 + n9_13_22 + n9_13_21 + n9_13_20 + n9_13_19 + n9_13_18 + n9_13_17 + n9_13_16 + n9_13_15 + n9_13_14 + n9_13_13 + n9_13_12 + n9_18_10 + n9_18_11 + n9_18_12 + n9_18_13 + n9_18_14 + n9_18_15 + n9_18_16 + n9_18_17 + n9_18_18 + n9_18_19 + n9_18_20 + n9_18_21 + n9_18_22 + n9_21_0 + n9_21_1 + n9_21_2 + n9_21_3 + n9_21_4 + n9_21_5 + n9_21_6 + n9_21_7 + n9_21_8 + n9_21_9 + n9_13_11 + n9_6_11 + n9_6_12 + n9_6_13 + n9_6_14 + n9_6_15 + n9_6_16 + n9_6_17 + n9_6_18 + n9_6_19 + n9_6_20 + n9_6_21 + n9_6_22 + n9_13_10 + n9_22_0 + n9_22_1 + n9_22_2 + n9_22_3 + n9_22_4 + n9_22_5 + n9_22_6 + n9_22_7 + n9_22_8 + n9_22_9 + n9_12_10 + n9_12_11 + n9_12_12 + n9_12_13 + n9_12_14 + n9_12_15 + n9_12_16 + n9_12_17 + n9_12_18 + n9_12_19 + n9_12_20 + n9_12_21 + n9_12_22 + n9_0_10 + n9_0_11 + n9_0_12 + n9_0_13 + n9_0_14 + n9_0_15 + n9_0_16 + n9_0_17 + n9_0_18 + n9_0_19 + n9_0_20 + n9_0_21 + n9_0_22 + n9_10_0 + n9_10_1 + n9_10_2 + n9_10_3 + n9_10_4 + n9_10_5 + n9_10_6 + n9_10_7 + n9_10_8 + n9_10_9 + n9_17_10 + n9_17_11 + n9_17_12 + n9_17_13 + n9_17_14 + n9_17_15 + n9_17_16 + n9_17_17 + n9_17_18 + n9_17_19 + n9_17_20 + n9_17_21 + n9_17_22 + n9_0_0 + n9_0_1 + n9_0_2 + n9_0_3 + n9_0_4 + n9_0_5 + n9_0_6 + n9_0_7 + n9_0_8 + n9_0_9 + n9_11_0 + n9_11_1 + n9_11_2 + n9_11_3 + n9_11_4 + n9_11_5 + n9_11_6 + n9_11_7 + n9_11_8 + n9_11_9 + n9_5_10 + n9_5_11 + n9_5_12 + n9_5_13 + n9_5_14 + n9_5_15 + n9_5_16 + n9_5_17 + n9_5_18 + n9_5_19 + n9_5_20 + n9_5_21 + n9_5_22 + n9_1_0 + n9_1_1 + n9_1_2 + n9_1_3 + n9_1_4 + n9_1_5 + n9_1_6 + n9_1_7 + n9_1_8 + n9_1_9 + n9_12_0 + n9_12_1 + n9_12_2 + n9_12_3 + n9_12_4 + n9_12_5 + n9_12_6 + n9_12_7 + n9_12_8 + n9_12_9 + n9_11_10 + n9_11_11 + n9_11_12 + n9_11_13 + n9_11_14 + n9_11_15 + n9_11_16 + n9_11_17 + n9_11_18 + n9_11_19 + n9_11_20 + n9_11_21 + n9_11_22 + n9_2_0 + n9_2_1 + n9_2_2 + n9_2_3 + n9_2_4 + n9_2_5 + n9_2_6 + n9_2_7 + n9_2_8 + n9_2_9 + n9_13_0 + n9_13_1 + n9_13_2 + n9_13_3 + n9_13_4 + n9_13_5 + n9_13_6 + n9_13_7 + n9_13_8 + n9_13_9 + n9_3_0 + n9_3_1 + n9_3_2 + n9_3_3 + n9_3_4 + n9_3_5 + n9_3_6 + n9_3_7 + n9_3_8 + n9_3_9 + n9_16_10 + n9_16_11 + n9_16_12 + n9_16_13 + n9_16_14 + n9_16_15 + n9_16_16 + n9_16_17 + n9_16_18 + n9_16_19 + n9_16_20 + n9_16_21 + n9_16_22 + n9_14_0 + n9_14_1 + n9_14_2 + n9_14_3 + n9_14_4 + n9_14_5 + n9_14_6 + n9_14_7 + n9_14_8 + n9_14_9 + n9_4_10 + n9_4_11 + n9_4_12 + n9_4_13 + n9_4_14 + n9_4_15 + n9_4_16 + n9_4_17 + n9_4_18 + n9_4_19 + n9_4_20 + n9_4_21 + n9_4_22 + n9_4_0 + n9_4_1 + n9_4_2 + n9_4_3 + n9_4_4 + n9_4_5 + n9_4_6 + n9_4_7 + n9_4_8 + n9_4_9 + n9_15_0 + n9_15_1 + n9_15_2 + n9_15_3 + n9_15_4 + n9_15_5 + n9_15_6 + n9_15_7 + n9_15_8 + n9_15_9 + n9_9_10 + n9_9_11 + n9_9_12 + n9_9_13 + n9_9_14 + n9_9_15 + n9_9_16 + n9_9_17 + n9_9_18 + n9_9_19 + n9_9_20 + n9_9_21 + n9_9_22 + n9_10_10 + n9_10_11 + n9_10_12 + n9_10_13 + n9_10_14 + n9_10_15 + n9_10_16 + n9_10_17 + n9_10_18 + n9_10_19 + n9_10_20 + n9_10_21 + n9_10_22 + n9_22_10 + n9_22_11 + n9_22_12 + n9_22_13 + n9_22_14 + n9_22_15 + n9_22_16 + n9_22_17 + n9_22_18 + n9_22_19 + n9_22_20 + n9_22_21 + n9_22_22 + n9_20_22 + n9_20_21 + n9_20_20 + n9_20_19 + n9_20_18 + n9_20_17 + n9_20_16 + n9_20_15 + n9_20_14 + n9_5_0 + n9_5_1 + n9_5_2 + n9_5_3 + n9_5_4 + n9_5_5 + n9_5_6 + n9_5_7 + n9_5_8 + n9_5_9 + n9_16_0 + n9_16_1 + n9_16_2 + n9_16_3 + n9_16_4 + n9_16_5 + n9_16_6 + n9_16_7 + n9_16_8 + n9_16_9 + n9_20_13 + n9_20_12 + n9_20_11 + n9_7_22 + n9_7_21 + n9_7_20 + n9_7_19 + n9_7_18 + n9_7_17 + n9_7_16 + n9_7_15 + n9_7_14 + n9_7_13 + n9_6_0 + n9_6_1 + n9_6_2 + n9_6_3 + n9_6_4 + n9_6_5 + n9_6_6 + n9_6_7 + n9_6_8 + n9_6_9 + n9_17_0 + n9_17_1 + n9_17_2 + n9_17_3 + n9_17_4 + n9_17_5 + n9_17_6 + n9_17_7 + n9_17_8 + n9_17_9 + n9_15_10 + n9_15_11 + n9_15_12 + n9_15_13 + n9_15_14 + n9_15_15 + n9_15_16 + n9_15_17 + n9_15_18 + n9_15_19 + n9_15_20 + n9_15_21 + n9_15_22 + n9_3_10 + n9_3_11 + n9_3_12 + n9_3_13 + n9_3_14 + n9_3_15 + n9_3_16 + n9_3_17 + n9_3_18 + n9_3_19 + n9_3_20 + n9_3_21 + n9_3_22 + n9_7_12 + n9_7_11 + n9_7_0 + n9_7_1 + n9_7_2 + n9_7_3 + n9_7_4 + n9_7_5 + n9_7_6 + n9_7_7 + n9_7_8 + n9_7_9 + n9_18_0 + n9_18_1 + n9_18_2 + n9_18_3 + n9_18_4 + n9_18_5 + n9_18_6 + n9_18_7 + n9_18_8 + n9_18_9 + n9_8_10 + n9_8_11 + n9_8_12 + n9_8_13 + n9_8_14 + n9_8_15 + n9_8_16 + n9_8_17 + n9_8_18 + n9_8_19 + n9_8_20 + n9_8_21 + n9_8_22 + n9_21_10 + n9_21_11 + n9_21_12 + n9_21_13 + n9_21_14 + n9_21_15 + n9_21_16 + n9_21_17 + n9_21_18 + n9_21_19 + n9_21_20 + n9_21_21 + n9_21_22 + n9_8_0 + n9_8_1 + n9_8_2 + n9_8_3 + n9_8_4 + n9_8_5 + n9_8_6 + n9_8_7 + n9_8_8 + n9_8_9 + n9_19_0 + n9_19_1 + n9_19_2 + n9_19_3 + n9_19_4 + n9_19_5 + n9_19_6 + n9_19_7 + n9_19_8 + n9_19_9 + n9_9_0 + n9_9_1 + n9_9_2 + n9_9_3 + n9_9_4 + n9_9_5 + n9_9_6 + n9_9_7 + n9_9_8 + n9_9_9 + n9_14_10 + n9_14_11 + n9_14_12 + n9_14_13 + n9_14_14 + n9_14_15 + n9_14_16 + n9_14_17 + n9_14_18 + n9_14_19 + n9_14_20 + n9_14_21 + n9_14_22 + n9_2_10 + n9_2_11 + n9_2_12 + n9_2_13 + n9_2_14 + n9_2_15 + n9_2_16 + n9_2_17 + n9_2_18 + n9_2_19 + n9_2_20 + n9_2_21 + n9_2_22) U (2 <= Sstart_9 + Sstart_8 + Sstart_7 + Sstart_6 + Sstart_5 + Sstart_4 + Sstart_3 + Sstart_2 + Sstart_1 + Sstart_0 + Sstart_10 + Sstart_11 + Sstart_12 + Sstart_13 + Sstart_14 + Sstart_15 + Sstart_16 + Sstart_17 + Sstart_18 + Sstart_19 + Sstart_20 + Sstart_21 + Sstart_22)) U G (X ((a2 <= CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22))))) : A (X (X ((2 <= n1_9 + n1_8 + n1_7 + n1_6 + n1_5 + n1_4 + n1_3 + n1_2 + n1_1 + n1_0 + n1_10 + n1_11 + n1_12 + n1_13 + n1_14 + n1_15 + n1_16 + n1_17 + n1_18 + n1_19 + n1_20 + n1_21 + n1_22)))) : A (((3 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9) U (3 <= n8_14_10 + n8_11_0 + n8_5_10 + n8_21_0 + n8_0_0 + n8_22_10 + n8_10_10 + n8_12_0 + n8_1_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_19_10 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_20_10 + n8_4_10 + n8_3_0 + n8_2_0 + n8_13_0 + n8_13_1 + n8_13_2 + n8_13_3 + n8_13_4 + n8_13_5 + n8_13_6 + n8_13_7 + n8_13_8 + n8_13_9 + n8_2_1 + n8_2_2 + n8_2_3 + n8_2_4 + n8_2_5 + n8_2_6 + n8_2_7 + n8_2_8 + n8_2_9 + n8_14_0 + n8_14_1 + n8_14_2 + n8_14_3 + n8_14_4 + n8_14_5 + n8_14_6 + n8_14_7 + n8_14_8 + n8_14_9 + n8_13_10 + n8_13_11 + n8_13_12 + n8_13_13 + n8_13_14 + n8_13_15 + n8_13_16 + n8_13_17 + n8_13_18 + n8_13_19 + n8_13_20 + n8_13_21 + n8_13_22 + n8_3_1 + n8_3_2 + n8_3_3 + n8_3_4 + n8_3_5 + n8_3_6 + n8_3_7 + n8_3_8 + n8_3_9 + n8_4_11 + n8_4_12 + n8_4_13 + n8_4_14 + n8_4_15 + n8_4_16 + n8_4_17 + n8_4_18 + n8_4_19 + n8_4_20 + n8_4_21 + n8_4_22 + n8_20_22 + n8_20_21 + n8_20_20 + n8_20_19 + n8_20_18 + n8_20_17 + n8_20_16 + n8_20_15 + n8_20_14 + n8_20_13 + n8_20_12 + n8_20_11 + n8_15_1 + n8_15_2 + n8_15_3 + n8_15_4 + n8_15_5 + n8_15_6 + n8_15_7 + n8_15_8 + n8_15_9 + n8_4_0 + n8_4_1 + n8_4_2 + n8_4_3 + n8_4_4 + n8_4_5 + n8_4_6 + n8_4_7 + n8_4_8 + n8_4_9 + n8_18_11 + n8_18_12 + n8_18_13 + n8_18_14 + n8_18_15 + n8_18_16 + n8_18_17 + n8_18_18 + n8_18_19 + n8_18_20 + n8_18_21 + n8_18_22 + n8_9_11 + n8_9_12 + n8_9_13 + n8_9_14 + n8_9_15 + n8_9_16 + n8_9_17 + n8_9_18 + n8_9_19 + n8_9_20 + n8_9_21 + n8_9_22 + n8_19_22 + n8_19_21 + n8_16_1 + n8_16_2 + n8_16_3 + n8_16_4 + n8_16_5 + n8_16_6 + n8_16_7 + n8_16_8 + n8_16_9 + n8_5_0 + n8_5_1 + n8_5_2 + n8_5_3 + n8_5_4 + n8_5_5 + n8_5_6 + n8_5_7 + n8_5_8 + n8_5_9 + n8_19_20 + n8_19_19 + n8_17_1 + n8_17_2 + n8_17_3 + n8_17_4 + n8_17_5 + n8_17_6 + n8_17_7 + n8_17_8 + n8_17_9 + n8_12_10 + n8_12_11 + n8_12_12 + n8_12_13 + n8_12_14 + n8_12_15 + n8_12_16 + n8_12_17 + n8_12_18 + n8_12_19 + n8_12_20 + n8_12_21 + n8_12_22 + n8_19_18 + n8_19_17 + n8_19_16 + n8_19_15 + n8_19_14 + n8_19_13 + n8_19_12 + n8_19_11 + n8_6_1 + n8_6_2 + n8_6_3 + n8_6_4 + n8_6_5 + n8_6_6 + n8_6_7 + n8_6_8 + n8_6_9 + n8_3_10 + n8_3_11 + n8_3_12 + n8_3_13 + n8_3_14 + n8_3_15 + n8_3_16 + n8_3_17 + n8_3_18 + n8_3_19 + n8_3_20 + n8_3_21 + n8_3_22 + n8_18_0 + n8_18_1 + n8_18_2 + n8_18_3 + n8_18_4 + n8_18_5 + n8_18_6 + n8_18_7 + n8_18_8 + n8_18_9 + n8_7_1 + n8_7_2 + n8_7_3 + n8_7_4 + n8_7_5 + n8_7_6 + n8_7_7 + n8_7_8 + n8_7_9 + n8_17_10 + n8_17_11 + n8_17_12 + n8_17_13 + n8_17_14 + n8_17_15 + n8_17_16 + n8_17_17 + n8_17_18 + n8_17_19 + n8_17_20 + n8_17_21 + n8_17_22 + n8_8_11 + n8_8_12 + n8_8_13 + n8_8_14 + n8_8_15 + n8_8_16 + n8_8_17 + n8_8_18 + n8_8_19 + n8_8_20 + n8_8_21 + n8_8_22 + n8_1_9 + n8_1_8 + n8_1_7 + n8_1_6 + n8_1_5 + n8_1_4 + n8_1_3 + n8_19_0 + n8_19_1 + n8_19_2 + n8_19_3 + n8_19_4 + n8_19_5 + n8_19_6 + n8_19_7 + n8_19_8 + n8_19_9 + n8_1_2 + n8_1_1 + n8_12_9 + n8_12_8 + n8_8_0 + n8_8_1 + n8_8_2 + n8_8_3 + n8_8_4 + n8_8_5 + n8_8_6 + n8_8_7 + n8_8_8 + n8_8_9 + n8_12_7 + n8_12_6 + n8_12_5 + n8_9_0 + n8_9_1 + n8_9_2 + n8_9_3 + n8_9_4 + n8_9_5 + n8_9_6 + n8_9_7 + n8_9_8 + n8_9_9 + n8_11_10 + n8_11_11 + n8_11_12 + n8_11_13 + n8_11_14 + n8_11_15 + n8_11_16 + n8_11_17 + n8_11_18 + n8_11_19 + n8_11_20 + n8_11_21 + n8_11_22 + n8_12_4 + n8_2_10 + n8_2_11 + n8_2_12 + n8_2_13 + n8_2_14 + n8_2_15 + n8_2_16 + n8_2_17 + n8_2_18 + n8_2_19 + n8_2_20 + n8_2_21 + n8_2_22 + n8_12_3 + n8_12_2 + n8_12_1 + n8_16_10 + n8_16_11 + n8_16_12 + n8_16_13 + n8_16_14 + n8_16_15 + n8_16_16 + n8_16_17 + n8_16_18 + n8_16_19 + n8_16_20 + n8_16_21 + n8_16_22 + n8_7_10 + n8_7_11 + n8_7_12 + n8_7_13 + n8_7_14 + n8_7_15 + n8_7_16 + n8_7_17 + n8_7_18 + n8_7_19 + n8_7_20 + n8_7_21 + n8_7_22 + n8_10_11 + n8_10_12 + n8_10_13 + n8_10_14 + n8_10_15 + n8_10_16 + n8_10_17 + n8_10_18 + n8_10_19 + n8_10_20 + n8_10_21 + n8_10_22 + n8_22_11 + n8_22_12 + n8_22_13 + n8_22_14 + n8_22_15 + n8_22_16 + n8_22_17 + n8_22_18 + n8_22_19 + n8_22_20 + n8_22_21 + n8_22_22 + n8_1_10 + n8_1_11 + n8_1_12 + n8_1_13 + n8_1_14 + n8_1_15 + n8_1_16 + n8_1_17 + n8_1_18 + n8_1_19 + n8_1_20 + n8_1_21 + n8_1_22 + n8_20_0 + n8_20_1 + n8_20_2 + n8_20_3 + n8_20_4 + n8_20_5 + n8_20_6 + n8_20_7 + n8_20_8 + n8_20_9 + n8_0_9 + n8_0_8 + n8_0_7 + n8_0_6 + n8_0_5 + n8_0_4 + n8_0_3 + n8_0_2 + n8_15_10 + n8_15_11 + n8_15_12 + n8_15_13 + n8_15_14 + n8_15_15 + n8_15_16 + n8_15_17 + n8_15_18 + n8_15_19 + n8_15_20 + n8_15_21 + n8_15_22 + n8_0_1 + n8_5_22 + n8_21_1 + n8_21_2 + n8_21_3 + n8_21_4 + n8_21_5 + n8_21_6 + n8_21_7 + n8_21_8 + n8_21_9 + n8_6_10 + n8_6_11 + n8_6_12 + n8_6_13 + n8_6_14 + n8_6_15 + n8_6_16 + n8_6_17 + n8_6_18 + n8_6_19 + n8_6_20 + n8_6_21 + n8_6_22 + n8_5_21 + n8_5_20 + n8_5_19 + n8_5_18 + n8_5_17 + n8_5_16 + n8_5_15 + n8_5_14 + n8_5_13 + n8_5_12 + n8_5_11 + n8_11_9 + n8_11_8 + n8_11_7 + n8_11_6 + n8_11_5 + n8_11_4 + n8_11_3 + n8_11_2 + n8_11_1 + n8_14_22 + n8_14_21 + n8_14_20 + n8_14_19 + n8_14_18 + n8_22_0 + n8_22_1 + n8_22_2 + n8_22_3 + n8_22_4 + n8_22_5 + n8_22_6 + n8_22_7 + n8_22_8 + n8_22_9 + n8_14_17 + n8_14_16 + n8_14_15 + n8_14_14 + n8_14_13 + n8_14_12 + n8_14_11 + n8_21_10 + n8_21_11 + n8_21_12 + n8_21_13 + n8_21_14 + n8_21_15 + n8_21_16 + n8_21_17 + n8_21_18 + n8_21_19 + n8_21_20 + n8_21_21 + n8_21_22 + n8_0_10 + n8_0_11 + n8_0_12 + n8_0_13 + n8_0_14 + n8_0_15 + n8_0_16 + n8_0_17 + n8_0_18 + n8_0_19 + n8_0_20 + n8_0_21 + n8_0_22 + n8_10_0 + n8_10_1 + n8_10_2 + n8_10_3 + n8_10_4 + n8_10_5 + n8_10_6 + n8_10_7 + n8_10_8 + n8_10_9))) : A ((2 <= SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_8 + SstopOK_21 + SstopOK_22 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_1 + SstopOK_6 + SstopOK_7 + SstopOK_20)) : A ((X (F ((2 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cstart_22 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9))) U F (F ((SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_8 + SstopOK_21 + SstopOK_22 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_1 + SstopOK_6 + SstopOK_7 + SstopOK_20 <= Astart))))) : A (F ((G ((2 <= c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_22 + c1_21 + c1_20 + c1_19 + c1_18 + c1_17 + c1_16 + c1_15 + c1_14 + c1_13 + c1_12 + c1_11 + c1_10 + c1_9)) U (n6_0 + n6_1 + n6_2 + n6_3 + n6_4 + n6_5 + n6_6 + n6_7 + n6_8 + n6_9 + n6_22 + n6_21 + n6_20 + n6_19 + n6_18 + n6_17 + n6_16 + n6_15 + n6_14 + n6_13 + n6_12 + n6_11 + n6_10 <= a5)))) : A (X ((1 <= CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22))) : A ((3 <= SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_8 + SstopOK_21 + SstopOK_22 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_1 + SstopOK_6 + SstopOK_7 + SstopOK_20)) : A ((((c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_22 + c1_21 + c1_20 + c1_19 + c1_18 + c1_17 + c1_16 + c1_15 + c1_14 + c1_13 + c1_12 + c1_11 + c1_10 + c1_9 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9) U (3 <= n7_17_0 + n7_17_1 + n7_17_2 + n7_17_3 + n7_17_4 + n7_17_5 + n7_17_6 + n7_17_7 + n7_17_8 + n7_17_9 + n7_21_10 + n7_21_11 + n7_21_12 + n7_21_13 + n7_21_14 + n7_21_15 + n7_21_16 + n7_21_17 + n7_21_18 + n7_21_19 + n7_21_20 + n7_21_21 + n7_21_22 + n7_3_10 + n7_6_0 + n7_15_0 + n7_4_10 + n7_16_10 + n7_18_0 + n7_7_0 + n7_5_10 + n7_11_10 + n7_10_0 + n7_0_10 + n7_22_0 + n7_14_10 + n7_8_10 + n7_12_10 + n7_1_10 + n7_19_0 + n7_13_10 + n7_9_0 + n7_2_10 + n7_20_10 + n7_8_0 + n7_8_9 + n7_8_8 + n7_8_7 + n7_8_6 + n7_8_5 + n7_8_4 + n7_8_3 + n7_8_2 + n7_8_1 + n7_19_10 + n7_19_11 + n7_19_12 + n7_19_13 + n7_19_14 + n7_19_15 + n7_19_16 + n7_19_17 + n7_19_18 + n7_19_19 + n7_19_20 + n7_19_21 + n7_19_22 + n7_20_11 + n7_20_12 + n7_20_13 + n7_20_14 + n7_20_15 + n7_20_16 + n7_20_17 + n7_20_18 + n7_20_19 + n7_20_20 + n7_20_21 + n7_20_22 + n7_2_11 + n7_2_12 + n7_2_13 + n7_2_14 + n7_2_15 + n7_2_16 + n7_2_17 + n7_2_18 + n7_2_19 + n7_2_20 + n7_2_21 + n7_2_22 + n7_9_1 + n7_9_2 + n7_9_3 + n7_9_4 + n7_9_5 + n7_9_6 + n7_9_7 + n7_9_8 + n7_9_9 + n7_19_9 + n7_19_8 + n7_13_11 + n7_13_12 + n7_13_13 + n7_13_14 + n7_13_15 + n7_13_16 + n7_13_17 + n7_13_18 + n7_13_19 + n7_13_20 + n7_13_21 + n7_13_22 + n7_7_10 + n7_7_11 + n7_7_12 + n7_7_13 + n7_7_14 + n7_7_15 + n7_7_16 + n7_7_17 + n7_7_18 + n7_7_19 + n7_7_20 + n7_7_21 + n7_7_22 + n7_19_7 + n7_19_6 + n7_19_5 + n7_19_4 + n7_19_3 + n7_19_2 + n7_19_1 + n7_18_10 + n7_18_11 + n7_18_12 + n7_18_13 + n7_18_14 + n7_18_15 + n7_18_16 + n7_18_17 + n7_18_18 + n7_18_19 + n7_18_20 + n7_18_21 + n7_18_22 + n7_1_11 + n7_1_12 + n7_1_13 + n7_1_14 + n7_1_15 + n7_1_16 + n7_1_17 + n7_1_18 + n7_1_19 + n7_1_20 + n7_1_21 + n7_1_22 + n7_8_22 + n7_8_21 + n7_8_20 + n7_8_19 + n7_8_18 + n7_8_17 + n7_20_0 + n7_20_1 + n7_20_2 + n7_20_3 + n7_20_4 + n7_20_5 + n7_20_6 + n7_20_7 + n7_20_8 + n7_20_9 + n7_8_16 + n7_8_15 + n7_12_11 + n7_12_12 + n7_12_13 + n7_12_14 + n7_12_15 + n7_12_16 + n7_12_17 + n7_12_18 + n7_12_19 + n7_21_0 + n7_21_1 + n7_21_2 + n7_21_3 + n7_21_4 + n7_21_5 + n7_21_6 + n7_21_7 + n7_21_8 + n7_21_9 + n7_12_20 + n7_12_21 + n7_12_22 + n7_6_10 + n7_6_11 + n7_6_12 + n7_6_13 + n7_6_14 + n7_6_15 + n7_6_16 + n7_6_17 + n7_6_18 + n7_6_19 + n7_6_20 + n7_6_21 + n7_6_22 + n7_8_14 + n7_8_13 + n7_8_12 + n7_8_11 + n7_14_22 + n7_14_21 + n7_14_20 + n7_14_19 + n7_14_18 + n7_14_17 + n7_14_16 + n7_14_15 + n7_14_14 + n7_14_13 + n7_14_12 + n7_14_11 + n7_22_1 + n7_22_2 + n7_22_3 + n7_22_4 + n7_22_5 + n7_22_6 + n7_22_7 + n7_22_8 + n7_22_9 + n7_17_10 + n7_17_11 + n7_17_12 + n7_17_13 + n7_17_14 + n7_17_15 + n7_17_16 + n7_17_17 + n7_17_18 + n7_17_19 + n7_17_20 + n7_17_21 + n7_17_22 + n7_0_11 + n7_0_12 + n7_0_13 + n7_0_14 + n7_0_15 + n7_0_16 + n7_0_17 + n7_0_18 + n7_0_19 + n7_0_20 + n7_0_21 + n7_0_22 + n7_10_1 + n7_10_2 + n7_10_3 + n7_10_4 + n7_10_5 + n7_10_6 + n7_10_7 + n7_10_8 + n7_10_9 + n7_11_11 + n7_11_12 + n7_11_13 + n7_11_14 + n7_11_15 + n7_11_16 + n7_11_17 + n7_11_18 + n7_11_19 + n7_11_0 + n7_11_1 + n7_11_2 + n7_11_3 + n7_11_4 + n7_11_5 + n7_11_6 + n7_11_7 + n7_11_8 + n7_11_9 + n7_11_20 + n7_11_21 + n7_11_22 + n7_5_11 + n7_5_12 + n7_5_13 + n7_5_14 + n7_5_15 + n7_5_16 + n7_5_17 + n7_5_18 + n7_5_19 + n7_5_20 + n7_5_21 + n7_5_22 + n7_7_9 + n7_7_8 + n7_7_7 + n7_7_6 + n7_7_5 + n7_7_4 + n7_7_3 + n7_7_2 + n7_7_1 + n7_18_9 + n7_18_8 + n7_18_7 + n7_18_6 + n7_0_0 + n7_0_1 + n7_0_2 + n7_0_3 + n7_0_4 + n7_0_5 + n7_0_6 + n7_0_7 + n7_0_8 + n7_0_9 + n7_18_5 + n7_18_4 + n7_18_3 + n7_18_2 + n7_18_1 + n7_12_0 + n7_12_1 + n7_12_2 + n7_12_3 + n7_12_4 + n7_12_5 + n7_12_6 + n7_12_7 + n7_12_8 + n7_12_9 + n7_1_0 + n7_1_1 + n7_1_2 + n7_1_3 + n7_1_4 + n7_1_5 + n7_1_6 + n7_1_7 + n7_1_8 + n7_1_9 + n7_16_11 + n7_16_12 + n7_16_13 + n7_16_14 + n7_16_15 + n7_16_16 + n7_16_17 + n7_16_18 + n7_16_19 + n7_16_20 + n7_16_21 + n7_16_22 + n7_13_0 + n7_13_1 + n7_13_2 + n7_13_3 + n7_13_4 + n7_13_5 + n7_13_6 + n7_13_7 + n7_13_8 + n7_13_9 + n7_2_0 + n7_2_1 + n7_2_2 + n7_2_3 + n7_2_4 + n7_2_5 + n7_2_6 + n7_2_7 + n7_2_8 + n7_2_9 + n7_14_0 + n7_14_1 + n7_14_2 + n7_14_3 + n7_14_4 + n7_14_5 + n7_14_6 + n7_14_7 + n7_14_8 + n7_14_9 + n7_10_10 + n7_10_11 + n7_10_12 + n7_10_13 + n7_10_14 + n7_10_15 + n7_10_16 + n7_10_17 + n7_10_18 + n7_10_19 + n7_10_20 + n7_10_21 + n7_10_22 + n7_22_10 + n7_22_11 + n7_22_12 + n7_22_13 + n7_22_14 + n7_22_15 + n7_22_16 + n7_22_17 + n7_22_18 + n7_22_19 + n7_22_20 + n7_22_21 + n7_22_22 + n7_4_11 + n7_4_12 + n7_4_13 + n7_4_14 + n7_4_15 + n7_4_16 + n7_4_17 + n7_4_18 + n7_4_19 + n7_4_20 + n7_4_21 + n7_4_22 + n7_3_0 + n7_3_1 + n7_3_2 + n7_3_3 + n7_3_4 + n7_3_5 + n7_3_6 + n7_3_7 + n7_3_8 + n7_3_9 + n7_6_9 + n7_15_1 + n7_15_2 + n7_15_3 + n7_15_4 + n7_15_5 + n7_15_6 + n7_15_7 + n7_15_8 + n7_15_9 + n7_6_8 + n7_6_7 + n7_6_6 + n7_6_5 + n7_6_4 + n7_6_3 + n7_6_2 + n7_6_1 + n7_4_0 + n7_4_1 + n7_4_2 + n7_4_3 + n7_4_4 + n7_4_5 + n7_4_6 + n7_4_7 + n7_4_8 + n7_4_9 + n7_3_22 + n7_3_21 + n7_3_20 + n7_15_10 + n7_15_11 + n7_15_12 + n7_15_13 + n7_15_14 + n7_15_15 + n7_15_16 + n7_15_17 + n7_15_18 + n7_15_19 + n7_15_20 + n7_15_21 + n7_15_22 + n7_9_10 + n7_9_11 + n7_9_12 + n7_9_13 + n7_9_14 + n7_9_15 + n7_9_16 + n7_9_17 + n7_9_18 + n7_9_19 + n7_9_20 + n7_9_21 + n7_9_22 + n7_16_0 + n7_16_1 + n7_16_2 + n7_16_3 + n7_16_4 + n7_16_5 + n7_16_6 + n7_16_7 + n7_16_8 + n7_16_9 + n7_3_19 + n7_3_18 + n7_3_17 + n7_3_16 + n7_3_15 + n7_3_14 + n7_3_13 + n7_3_12 + n7_3_11 + n7_5_0 + n7_5_1 + n7_5_2 + n7_5_3 + n7_5_4 + n7_5_5 + n7_5_6 + n7_5_7 + n7_5_8 + n7_5_9)) U (2 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9)))
lola: computing a collection of formulas
lola: RUNNING
lola: subprocess 0 will run for 221 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A ((X (F ((SstopAbort <= Astart))) U F ((s3_8 + s3_7 + s3_6 + s3_5 + s3_4 + s3_3 + s3_2 + s3_1 + s3_0 + s3_10 + s3_11 + s3_12 + s3_13 + s3_14 + s3_15 + s3_16 + s3_17 + s3_18 + s3_19 + s3_20 + s3_21 + s3_22 + s3_9 <= a4))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A ((X (F ((SstopAbort <= Astart))) U F ((s3_8 + s3_7 + s3_6 + s3_5 + s3_4 + s3_3 + s3_2 + s3_1 + s3_0 + s3_10 + s3_11 + s3_12 + s3_13 + s3_14 + s3_15 + s3_16 + s3_17 + s3_18 + s3_19 + s3_20 + s3_21 + s3_22 + s3_9 <= a4))))
lola: processed formula: A ((X (F ((SstopAbort <= Astart))) U F ((s3_8 + s3_7 + s3_6 + s3_5 + s3_4 + s3_3 + s3_2 + s3_1 + s3_0 + s3_10 + s3_11 + s3_12 + s3_13 + s3_14 + s3_15 + s3_16 + s3_17 + s3_18 + s3_19 + s3_20 + s3_21 + s3_22 + s3_9 <= a4))))
lola: processed formula length: 222
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 1 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 31 unused bits
lola: using a prefix tree store (--store=prefix)
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: ========================================
lola: subprocess 1 will run for 236 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G (F (X (F ((3 <= s5_22 + s5_21 + s5_20 + s5_19 + s5_18 + s5_17 + s5_16 + s5_15 + s5_14 + s5_13 + s5_12 + s5_11 + s5_10 + s5_0 + s5_1 + s5_2 + s5_3 + s5_4 + s5_5 + s5_6 + s5_7 + s5_8 + s5_9))))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (G (F (X (F ((3 <= s5_22 + s5_21 + s5_20 + s5_19 + s5_18 + s5_17 + s5_16 + s5_15 + s5_14 + s5_13 + s5_12 + s5_11 + s5_10 + s5_0 + s5_1 + s5_2 + s5_3 + s5_4 + s5_5 + s5_6 + s5_7 + s5_8 + s5_9))))))
lola: processed formula: A (G (F (X (F ((3 <= s5_22 + s5_21 + s5_20 + s5_19 + s5_18 + s5_17 + s5_16 + s5_15 + s5_14 + s5_13 + s5_12 + s5_11 + s5_10 + s5_0 + s5_1 + s5_2 + s5_3 + s5_4 + s5_5 + s5_6 + s5_7 + s5_8 + s5_9))))))
lola: processed formula length: 198
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: ========================================
lola: subprocess 2 will run for 252 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G (((1 <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n9_19_18 + n9_19_19 + n9_19_20 + n9_19_21 + n9_19_22 + n9_7_10 + n9_20_10 + n9_6_10 + n9_20_9 + n9_20_8 + n9_20_7 + n9_20_6 + n9_20_5 + n9_20_4 + n9_20_3 + n9_20_2 + n9_20_1 + n9_20_0 + n9_1_10 + n9_1_11 + n9_1_12 + n9_1_13 + n9_1_14 + n9_1_15 + n9_1_16 + n9_1_17 + n9_1_18 + n9_1_19 + n9_1_20 + n9_... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (G (((1 <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n9_19_18 + n9_19_19 + n9_19_20 + n9_19_21 + n9_19_22 + n9_7_10 + n9_20_10 + n9_6_10 + n9_20_9 + n9_20_8 + n9_20_7 + n9_20_6 + n9_20_5 + n9_20_4 + n9_20_3 + n9_20_2 + n9_20_1 + n9_20_0 + n9_1_10 + n9_1_11 + n9_1_12 + n9_1_13 + n9_1_14 + n9_1_15 + n9_1_16 + n9_1_17 + n9_1_18 + n9_1_19 + n9_1_20 + n9_1_21 + n9_1_22 + n9_13_22 + n9_13_21 + n9_13_20 + n9_13_19 + n9_13_18 + n9_13_17 + n9_13_16 + n9_13_15 + n9_13_14 + n9_13_13 + n9_13_12 + n9_18_10 + n9_18_11 + n9_18_12 + n9_18_13 + n9_18_14 + n9_18_15 + n9_18_16 + n9_18_17 + n9_18_18 + n9_18_19 + n9_18_20 + n9_18_21 + n9_18_22 + n9_21_0 + n9_21_1 + n9_21_2 + n9_21_3 + n9_21_4 + n9_21_5 + n9_21_6 + n9_21_7 + n9_21_8 + n9_21_9 + n9_13_11 + n9_6_11 + n9_6_12 + n9_6_13 + n9_6_14 + n9_6_15 + n9_6_16 + n9_6_17 + n9_6_18 + n9_6_19 + n9_6_20 + n9_6_21 + n9_6_22 + n9_13_10 + n9_22_0 + n9_22_1 + n9_22_2 + n9_22_3 + n9_22_4 + n9_22_5 + n9_22_6 + n9_22_7 + n9_22_8 + n9_22_9 + n9_12_10 + n9_12_11 + n9_12_12 + n9_12_13 + n9_12_14 + n9_12_15 + n9_12_16 + n9_12_17 + n9_12_18 + n9_12_19 + n9_12_20 + n9_12_21 + n9_12_22 + n9_0_10 + n9_0_11 + n9_0_12 + n9_0_13 + n9_0_14 + n9_0_15 + n9_0_16 + n9_0_17 + n9_0_18 + n9_0_19 + n9_0_20 + n9_0_21 + n9_0_22 + n9_10_0 + n9_10_1 + n9_10_2 + n9_10_3 + n9_10_4 + n9_10_5 + n9_10_6 + n9_10_7 + n9_10_8 + n9_10_9 + n9_17_10 + n9_17_11 + n9_17_12 + n9_17_13 + n9_17_14 + n9_17_15 + n9_17_16 + n9_17_17 + n9_17_18 + n9_17_19 + n9_17_20 + n9_17_21 + n9_17_22 + n9_0_0 + n9_0_1 + n9_0_2 + n9_0_3 + n9_0_4 + n9_0_5 + n9_0_6 + n9_0_7 + n9_0_8 + n9_0_9 + n9_11_0 + n9_11_1 + n9_11_2 + n9_11_3 + n9_11_4 + n9_11_5 + n9_11_6 + n9_11_7 + n9_11_8 + n9_11_9 + n9_5_10 + n9_5_11 + n9_5_12 + n9_5_13 + n9_5_14 + n9_5_15 + n9_5_16 + n9_5_17 + n9_5_18 + n9_5_19 + n9_5_20 + n9_5_21 + n9_5_22 + n9_1_0 + n9_1_1 + n9_1_2 + n9_1_3 + n9_1_4 + n9_1_5 + n9_1_6 + n9_1_7 + n9_1_8 + n9_1_9 + n9_12_0 + n9_12_1 + n9_12_2 + n9_12_3 + n9_12_4 + n9_12_5 + n9_12_6 + n9_12_7 + n9_12_8 + n9_12_9 + n9_11_10 + n9_11_11 + n9_11_12 + n9_11_13 + n9_11_14 + n9_11_15 + n9_11_16 + n9_11_17 + n9_11_18 + n9_11_19 + n9_11_20 + n9_11_21 + n9_11_22 + n9_2_0 + n9_2_1 + n9_2_2 + n9_2_3 + n9_2_4 + n9_2_5 + n9_2_6 + n9_2_7 + n9_2_8 + n9_2_9 + n9_13_0 + n9_13_1 + n9_13_2 + n9_13_3 + n9_13_4 + n9_13_5 + n9_13_6 + n9_13_7 + n9_13_8 + n9_13_9 + n9_3_0 + n9_3_1 + n9_3_2 + n9_3_3 + n9_3_4 + n9_3_5 + n9_3_6 + n9_3_7 + n9_3_8 + n9_3_9 + n9_16_10 + n9_16_11 + n9_16_12 + n9_16_13 + n9_16_14 + n9_16_15 + n9_16_16 + n9_16_17 + n9_16_18 + n9_16_19 + n9_16_20 + n9_16_21 + n9_16_22 + n9_14_0 + n9_14_1 + n9_14_2 + n9_14_3 + n9_14_4 + n9_14_5 + n9_14_6 + n9_14_7 + n9_14_8 + n9_14_9 + n9_4_10 + n9_4_11 + n9_4_12 + n9_4_13 + n9_4_14 + n9_4_15 + n9_4_16 + n9_4_17 + n9_4_18 + n9_4_19 + n9_4_20 + n9_4_21 + n9_4_22 + n9_4_0 + n9_4_1 + n9_4_2 + n9_4_3 + n9_4_4 + n9_4_5 + n9_4_6 + n9_4_7 + n9_4_8 + n9_4_9 + n9_15_0 + n9_15_1 + n9_15_2 + n9_15_3 + n9_15_4 + n9_15_5 + n9_15_6 + n9_15_7 + n9_15_8 + n9_15_9 + n9_9_10 + n9_9_11 + n9_9_12 + n9_9_13 + n9_9_14 + n9_9_15 + n9_9_16 + n9_9_17 + n9_9_18 + n9_9_19 + n9_9_20 + n9_9_21 + n9_9_22 + n9_10_10 + n9_10_11 + n9_10_12 + n9_10_13 + n9_10_14 + n9_10_15 + n9_10_16 + n9_10_17 + n9_10_18 + n9_10_19 + n9_10_20 + n9_10_21 + n9_10_22 + n9_22_10 + n9_22_11 + n9_22_12 + n9_22_13 + n9_22_14 + n9_22_15 + n9_22_16 + n9_22_17 + n9_22_18 + n9_22_19 + n9_22_20 + n9_22_21 + n9_22_22 + n9_20_22 + n9_20_21 + n9_20_20 + n9_20_19 + n9_20_18 + n9_20_17 + n9_20_16 + n9_20_15 + n9_20_14 + n9_5_0 + n9_5_1 + n9_5_2 + n9_5_3 + n9_5_4 + n9_5_5 + n9_5_6 + n9_5_7 + n9_5_8 + n9_5_9 + n9_16_0 + n9_16_1 + n9_16_2 + n9_16_3 + n9_16_4 + n9_16_5 + n9_16_6 + n9_16_7 + n9_16_8 + n9_16_9 + n9_20_13 + n9_20_12 + n9_20_11 + n9_7_22 + n9_7_21 + n9_7_20 + n9_7_19 + n9_7_18 + n9_7_17 + n9_7_16 + n9_7_15 + n9_7_14 + n9_7_13 + n9_6_0 + n9_6_1 + n9_6_2 + n9_6_3 + n9_6_4 + n9_6_5 + n9_6_6 + n9_6_7 + n9_6_8 + n9_6_9 + n9_17_0 + n9_17_1 + n9_17_2 + n9_17_3 + n9_17_4 + n9_17_5 + n9_17_6 + n9_17_7 + n9_17_8 + n9_17_9 + n9_15_10 + n9_15_11 + n9_15_12 + n9_15_13 + n9_15_14 + n9_15_15 + n9_15_16 + n9_15_17 + n9_15_18 + n9_15_19 + n9_15_20 + n9_15_21 + n9_15_22 + n9_3_10 + n9_3_11 + n9_3_12 + n9_3_13 + n9_3_14 + n9_3_15 + n9_3_16 + n9_3_17 + n9_3_18 + n9_3_19 + n9_3_20 + n9_3_21 + n9_3_22 + n9_7_12 + n9_7_11 + n9_7_0 + n9_7_1 + n9_7_2 + n9_7_3 + n9_7_4 + n9_7_5 + n9_7_6 + n9_7_7 + n9_7_8 + n9_7_9 + n9_18_0 + n9_18_1 + n9_18_2 + n9_18_3 + n9_18_4 + n9_18_5 + n9_18_6 + n9_18_7 + n9_18_8 + n9_18_9 + n9_8_10 + n9_8_11 + n9_8_12 + n9_8_13 + n9_8_14 + n9_8_15 + n9_8_16 + n9_8_17 + n9_8_18 + n9_8_19 + n9_8_20 + n9_8_21 + n9_8_22 + n9_21_10 + n9_21_11 + n9_21_12 + n9_21_13 + n9_21_14 + n9_21_15 + n9_21_16 + n9_21_17 + n9_21_18 + n9_21_19 + n9_21_20 + n9_21_21 + n9_21_22 + n9_8_0 + n9_8_1 + n9_8_2 + n9_8_3 + n9_8_4 + n9_8_5 + n9_8_6 + n9_8_7 + n9_8_8 + n9_8_9 + n9_19_0 + n9_19_1 + n9_19_2 + n9_19_3 + n9_19_4 + n9_19_5 + n9_19_6 + n9_19_7 + n9_19_8 + n9_19_9 + n9_9_0 + n9_9_1 + n9_9_2 + n9_9_3 + n9_9_4 + n9_9_5 + n9_9_6 + n9_9_7 + n9_9_8 + n9_9_9 + n9_14_10 + n9_14_11 + n9_14_12 + n9_14_13 + n9_14_14 + n9_14_15 + n9_14_16 + n9_14_17 + n9_14_18 + n9_14_19 + n9_14_20 + n9_14_21 + n9_14_22 + n9_2_10 + n9_2_11 + n9_2_12 + n9_2_13 + n9_2_14 + n9_2_15 + n9_2_16 + n9_2_17 + n9_2_18 + n9_2_19 + n9_2_20 + n9_2_21 + n9_2_22) U (1 <= s2_9 + s2_8 + s2_7 + s2_6 + s2_5 + s2_4 + s2_3 + s2_2 + s2_1 + s2_0 + s2_22 + s2_21 + s2_20 + s2_19 + s2_18 + s2_17 + s2_16 + s2_15 + s2_14 + s2_13 + s2_12 + s2_11 + s2_10))))
lola: processed formula: A (G (((1 <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n9_19_18 + n9_19_19 + n9_19_20 + n9_19_21 + n9_19_22 + n9_7_10 + n9_20_10 + n9_6_10 + n9_20_9 + n9_20_8 + n9_20_7 + n9_20_6 + n9_20_5 + n9_20_4 + n9_20_3 + n9_20_2 + n9_20_1 + n9_20_0 + n9_1_10 + n9_1_11 + n9_1_12 + n9_1_13 + n9_1_14 + n9_1_15 + n9_1_16 + n9_1_17 + n9_1_18 + n9_1_19 + n9_1_20 + n9_... (shortened)
lola: processed formula length: 5554
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
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: ========================================
lola: subprocess 3 will run for 272 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A ((X (F ((1 <= AstopOK))) U ((2 <= a1) U (3 <= n8_14_10 + n8_11_0 + n8_5_10 + n8_21_0 + n8_0_0 + n8_22_10 + n8_10_10 + n8_12_0 + n8_1_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_19_10 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_20_10 + n8_4_10 + n8_3_0 + n8_2_0 + n8_13_0 + n8_13_1 + n8_13_2 + n8_13_3 + n8_13_4 + n8_13_5 + n8_13_6 + n8_13_7 + n8_13_8 + n8_13_9 + n8_2_1 + n8_2_2 + n8_2_3 + n8_2_... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A ((X (F ((1 <= AstopOK))) U ((2 <= a1) U (3 <= n8_14_10 + n8_11_0 + n8_5_10 + n8_21_0 + n8_0_0 + n8_22_10 + n8_10_10 + n8_12_0 + n8_1_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_19_10 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_20_10 + n8_4_10 + n8_3_0 + n8_2_0 + n8_13_0 + n8_13_1 + n8_13_2 + n8_13_3 + n8_13_4 + n8_13_5 + n8_13_6 + n8_13_7 + n8_13_8 + n8_13_9 + n8_2_1 + n8_2_2 + n8_2_3 + n8_2_4 + n8_2_5 + n8_2_6 + n8_2_7 + n8_2_8 + n8_2_9 + n8_14_0 + n8_14_1 + n8_14_2 + n8_14_3 + n8_14_4 + n8_14_5 + n8_14_6 + n8_14_7 + n8_14_8 + n8_14_9 + n8_13_10 + n8_13_11 + n8_13_12 + n8_13_13 + n8_13_14 + n8_13_15 + n8_13_16 + n8_13_17 + n8_13_18 + n8_13_19 + n8_13_20 + n8_13_21 + n8_13_22 + n8_3_1 + n8_3_2 + n8_3_3 + n8_3_4 + n8_3_5 + n8_3_6 + n8_3_7 + n8_3_8 + n8_3_9 + n8_4_11 + n8_4_12 + n8_4_13 + n8_4_14 + n8_4_15 + n8_4_16 + n8_4_17 + n8_4_18 + n8_4_19 + n8_4_20 + n8_4_21 + n8_4_22 + n8_20_22 + n8_20_21 + n8_20_20 + n8_20_19 + n8_20_18 + n8_20_17 + n8_20_16 + n8_20_15 + n8_20_14 + n8_20_13 + n8_20_12 + n8_20_11 + n8_15_1 + n8_15_2 + n8_15_3 + n8_15_4 + n8_15_5 + n8_15_6 + n8_15_7 + n8_15_8 + n8_15_9 + n8_4_0 + n8_4_1 + n8_4_2 + n8_4_3 + n8_4_4 + n8_4_5 + n8_4_6 + n8_4_7 + n8_4_8 + n8_4_9 + n8_18_11 + n8_18_12 + n8_18_13 + n8_18_14 + n8_18_15 + n8_18_16 + n8_18_17 + n8_18_18 + n8_18_19 + n8_18_20 + n8_18_21 + n8_18_22 + n8_9_11 + n8_9_12 + n8_9_13 + n8_9_14 + n8_9_15 + n8_9_16 + n8_9_17 + n8_9_18 + n8_9_19 + n8_9_20 + n8_9_21 + n8_9_22 + n8_19_22 + n8_19_21 + n8_16_1 + n8_16_2 + n8_16_3 + n8_16_4 + n8_16_5 + n8_16_6 + n8_16_7 + n8_16_8 + n8_16_9 + n8_5_0 + n8_5_1 + n8_5_2 + n8_5_3 + n8_5_4 + n8_5_5 + n8_5_6 + n8_5_7 + n8_5_8 + n8_5_9 + n8_19_20 + n8_19_19 + n8_17_1 + n8_17_2 + n8_17_3 + n8_17_4 + n8_17_5 + n8_17_6 + n8_17_7 + n8_17_8 + n8_17_9 + n8_12_10 + n8_12_11 + n8_12_12 + n8_12_13 + n8_12_14 + n8_12_15 + n8_12_16 + n8_12_17 + n8_12_18 + n8_12_19 + n8_12_20 + n8_12_21 + n8_12_22 + n8_19_18 + n8_19_17 + n8_19_16 + n8_19_15 + n8_19_14 + n8_19_13 + n8_19_12 + n8_19_11 + n8_6_1 + n8_6_2 + n8_6_3 + n8_6_4 + n8_6_5 + n8_6_6 + n8_6_7 + n8_6_8 + n8_6_9 + n8_3_10 + n8_3_11 + n8_3_12 + n8_3_13 + n8_3_14 + n8_3_15 + n8_3_16 + n8_3_17 + n8_3_18 + n8_3_19 + n8_3_20 + n8_3_21 + n8_3_22 + n8_18_0 + n8_18_1 + n8_18_2 + n8_18_3 + n8_18_4 + n8_18_5 + n8_18_6 + n8_18_7 + n8_18_8 + n8_18_9 + n8_7_1 + n8_7_2 + n8_7_3 + n8_7_4 + n8_7_5 + n8_7_6 + n8_7_7 + n8_7_8 + n8_7_9 + n8_17_10 + n8_17_11 + n8_17_12 + n8_17_13 + n8_17_14 + n8_17_15 + n8_17_16 + n8_17_17 + n8_17_18 + n8_17_19 + n8_17_20 + n8_17_21 + n8_17_22 + n8_8_11 + n8_8_12 + n8_8_13 + n8_8_14 + n8_8_15 + n8_8_16 + n8_8_17 + n8_8_18 + n8_8_19 + n8_8_20 + n8_8_21 + n8_8_22 + n8_1_9 + n8_1_8 + n8_1_7 + n8_1_6 + n8_1_5 + n8_1_4 + n8_1_3 + n8_19_0 + n8_19_1 + n8_19_2 + n8_19_3 + n8_19_4 + n8_19_5 + n8_19_6 + n8_19_7 + n8_19_8 + n8_19_9 + n8_1_2 + n8_1_1 + n8_12_9 + n8_12_8 + n8_8_0 + n8_8_1 + n8_8_2 + n8_8_3 + n8_8_4 + n8_8_5 + n8_8_6 + n8_8_7 + n8_8_8 + n8_8_9 + n8_12_7 + n8_12_6 + n8_12_5 + n8_9_0 + n8_9_1 + n8_9_2 + n8_9_3 + n8_9_4 + n8_9_5 + n8_9_6 + n8_9_7 + n8_9_8 + n8_9_9 + n8_11_10 + n8_11_11 + n8_11_12 + n8_11_13 + n8_11_14 + n8_11_15 + n8_11_16 + n8_11_17 + n8_11_18 + n8_11_19 + n8_11_20 + n8_11_21 + n8_11_22 + n8_12_4 + n8_2_10 + n8_2_11 + n8_2_12 + n8_2_13 + n8_2_14 + n8_2_15 + n8_2_16 + n8_2_17 + n8_2_18 + n8_2_19 + n8_2_20 + n8_2_21 + n8_2_22 + n8_12_3 + n8_12_2 + n8_12_1 + n8_16_10 + n8_16_11 + n8_16_12 + n8_16_13 + n8_16_14 + n8_16_15 + n8_16_16 + n8_16_17 + n8_16_18 + n8_16_19 + n8_16_20 + n8_16_21 + n8_16_22 + n8_7_10 + n8_7_11 + n8_7_12 + n8_7_13 + n8_7_14 + n8_7_15 + n8_7_16 + n8_7_17 + n8_7_18 + n8_7_19 + n8_7_20 + n8_7_21 + n8_7_22 + n8_10_11 + n8_10_12 + n8_10_13 + n8_10_14 + n8_10_15 + n8_10_16 + n8_10_17 + n8_10_18 + n8_10_19 + n8_10_20 + n8_10_21 + n8_10_22 + n8_22_11 + n8_22_12 + n8_22_13 + n8_22_14 + n8_22_15 + n8_22_16 + n8_22_17 + n8_22_18 + n8_22_19 + n8_22_20 + n8_22_21 + n8_22_22 + n8_1_10 + n8_1_11 + n8_1_12 + n8_1_13 + n8_1_14 + n8_1_15 + n8_1_16 + n8_1_17 + n8_1_18 + n8_1_19 + n8_1_20 + n8_1_21 + n8_1_22 + n8_20_0 + n8_20_1 + n8_20_2 + n8_20_3 + n8_20_4 + n8_20_5 + n8_20_6 + n8_20_7 + n8_20_8 + n8_20_9 + n8_0_9 + n8_0_8 + n8_0_7 + n8_0_6 + n8_0_5 + n8_0_4 + n8_0_3 + n8_0_2 + n8_15_10 + n8_15_11 + n8_15_12 + n8_15_13 + n8_15_14 + n8_15_15 + n8_15_16 + n8_15_17 + n8_15_18 + n8_15_19 + n8_15_20 + n8_15_21 + n8_15_22 + n8_0_1 + n8_5_22 + n8_21_1 + n8_21_2 + n8_21_3 + n8_21_4 + n8_21_5 + n8_21_6 + n8_21_7 + n8_21_8 + n8_21_9 + n8_6_10 + n8_6_11 + n8_6_12 + n8_6_13 + n8_6_14 + n8_6_15 + n8_6_16 + n8_6_17 + n8_6_18 + n8_6_19 + n8_6_20 + n8_6_21 + n8_6_22 + n8_5_21 + n8_5_20 + n8_5_19 + n8_5_18 + n8_5_17 + n8_5_16 + n8_5_15 + n8_5_14 + n8_5_13 + n8_5_12 + n8_5_11 + n8_11_9 + n8_11_8 + n8_11_7 + n8_11_6 + n8_11_5 + n8_11_4 + n8_11_3 + n8_11_2 + n8_11_1 + n8_14_22 + n8_14_21 + n8_14_20 + n8_14_19 + n8_14_18 + n8_22_0 + n8_22_1 + n8_22_2 + n8_22_3 + n8_22_4 + n8_22_5 + n8_22_6 + n8_22_7 + n8_22_8 + n8_22_9 + n8_14_17 + n8_14_16 + n8_14_15 + n8_14_14 + n8_14_13 + n8_14_12 + n8_14_11 + n8_21_10 + n8_21_11 + n8_21_12 + n8_21_13 + n8_21_14 + n8_21_15 + n8_21_16 + n8_21_17 + n8_21_18 + n8_21_19 + n8_21_20 + n8_21_21 + n8_21_22 + n8_0_10 + n8_0_11 + n8_0_12 + n8_0_13 + n8_0_14 + n8_0_15 + n8_0_16 + n8_0_17 + n8_0_18 + n8_0_19 + n8_0_20 + n8_0_21 + n8_0_22 + n8_10_0 + n8_10_1 + n8_10_2 + n8_10_3 + n8_10_4 + n8_10_5 + n8_10_6 + n8_10_7 + n8_10_8 + n8_10_9))))
lola: processed formula: A ((X (F ((1 <= AstopOK))) U ((2 <= a1) U (3 <= n8_14_10 + n8_11_0 + n8_5_10 + n8_21_0 + n8_0_0 + n8_22_10 + n8_10_10 + n8_12_0 + n8_1_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_19_10 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_20_10 + n8_4_10 + n8_3_0 + n8_2_0 + n8_13_0 + n8_13_1 + n8_13_2 + n8_13_3 + n8_13_4 + n8_13_5 + n8_13_6 + n8_13_7 + n8_13_8 + n8_13_9 + n8_2_1 + n8_2_2 + n8_2_3 + n8_2_... (shortened)
lola: processed formula length: 5408
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: ========================================
lola: subprocess 4 will run for 294 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (F (G (G (X ((1 <= n1_9 + n1_8 + n1_7 + n1_6 + n1_5 + n1_4 + n1_3 + n1_2 + n1_1 + n1_0 + n1_10 + n1_11 + n1_12 + n1_13 + n1_14 + n1_15 + n1_16 + n1_17 + n1_18 + n1_19 + n1_20 + n1_21 + n1_22))))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (F (G (G (X ((1 <= n1_9 + n1_8 + n1_7 + n1_6 + n1_5 + n1_4 + n1_3 + n1_2 + n1_1 + n1_0 + n1_10 + n1_11 + n1_12 + n1_13 + n1_14 + n1_15 + n1_16 + n1_17 + n1_18 + n1_19 + n1_20 + n1_21 + n1_22))))))
lola: processed formula: A (F (G (G (X ((1 <= n1_9 + n1_8 + n1_7 + n1_6 + n1_5 + n1_4 + n1_3 + n1_2 + n1_1 + n1_0 + n1_10 + n1_11 + n1_12 + n1_13 + n1_14 + n1_15 + n1_16 + n1_17 + n1_18 + n1_19 + n1_20 + n1_21 + n1_22))))))
lola: processed formula length: 198
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: 511209 markings, 3314846 edges, 102242 markings/sec, 0 secs
lola: 934291 markings, 6453890 edges, 84616 markings/sec, 5 secs
lola: 1286314 markings, 9487638 edges, 70405 markings/sec, 10 secs
lola: 1730552 markings, 12440015 edges, 88848 markings/sec, 15 secs
lola: 2113466 markings, 15294597 edges, 76583 markings/sec, 20 secs
lola: 2465577 markings, 18253766 edges, 70422 markings/sec, 25 secs
lola: 2865797 markings, 21030515 edges, 80044 markings/sec, 30 secs
lola: 3242543 markings, 23837928 edges, 75349 markings/sec, 35 secs
lola: 3573481 markings, 26667495 edges, 66188 markings/sec, 40 secs
lola: 3963765 markings, 29307927 edges, 78057 markings/sec, 45 secs
lola: 4338604 markings, 31731686 edges, 74968 markings/sec, 50 secs
lola: 4739609 markings, 34545527 edges, 80201 markings/sec, 55 secs
lola: 5082944 markings, 37347147 edges, 68667 markings/sec, 60 secs
lola: 5390825 markings, 39842343 edges, 61576 markings/sec, 65 secs
lola: 5690583 markings, 42190714 edges, 59952 markings/sec, 70 secs
lola: 6050519 markings, 45042056 edges, 71987 markings/sec, 75 secs
lola: 6319125 markings, 47613313 edges, 53721 markings/sec, 80 secs
lola: 6622793 markings, 50124243 edges, 60734 markings/sec, 85 secs
lola: 6939411 markings, 52569883 edges, 63324 markings/sec, 90 secs
lola: 7292894 markings, 55402360 edges, 70697 markings/sec, 95 secs
lola: 7554942 markings, 57954248 edges, 52410 markings/sec, 100 secs
lola: 7825028 markings, 60466409 edges, 54017 markings/sec, 105 secs
lola: 8147585 markings, 63287784 edges, 64511 markings/sec, 110 secs
lola: 8419733 markings, 65926601 edges, 54430 markings/sec, 115 secs
lola: 8681886 markings, 68434792 edges, 52431 markings/sec, 120 secs
lola: 8993753 markings, 70848792 edges, 62373 markings/sec, 125 secs
lola: 9339076 markings, 73584120 edges, 69065 markings/sec, 130 secs
lola: 9645065 markings, 76259134 edges, 61198 markings/sec, 135 secs
lola: 9900955 markings, 78745444 edges, 51178 markings/sec, 140 secs
lola: 10198117 markings, 81411977 edges, 59432 markings/sec, 145 secs
lola: 10491182 markings, 84118623 edges, 58613 markings/sec, 150 secs
lola: 10705114 markings, 86566128 edges, 42786 markings/sec, 155 secs
lola: 11000350 markings, 89158576 edges, 59047 markings/sec, 160 secs
lola: 11313030 markings, 91945178 edges, 62536 markings/sec, 165 secs
lola: 11570688 markings, 94536950 edges, 51532 markings/sec, 170 secs
lola: 11817483 markings, 97177161 edges, 49359 markings/sec, 175 secs
lola: 12092678 markings, 99960838 edges, 55039 markings/sec, 180 secs
lola: 12318982 markings, 102583638 edges, 45261 markings/sec, 185 secs
lola: 12689887 markings, 105380232 edges, 74181 markings/sec, 190 secs
lola: 13046561 markings, 108042748 edges, 71335 markings/sec, 195 secs
lola: 13402288 markings, 110846418 edges, 71145 markings/sec, 200 secs
lola: 13770287 markings, 113602725 edges, 73600 markings/sec, 205 secs
lola: 14122619 markings, 116138494 edges, 70466 markings/sec, 210 secs
lola: 14444681 markings, 118701211 edges, 64412 markings/sec, 215 secs
lola: 14786432 markings, 121445653 edges, 68350 markings/sec, 220 secs
lola: 15173842 markings, 123941199 edges, 77482 markings/sec, 225 secs
lola: 15495127 markings, 126180272 edges, 64257 markings/sec, 230 secs
lola: 15875164 markings, 128776721 edges, 76007 markings/sec, 235 secs
lola: 16164097 markings, 131182726 edges, 57787 markings/sec, 240 secs
lola: 16460954 markings, 133577738 edges, 59371 markings/sec, 245 secs
lola: 16733117 markings, 135788971 edges, 54433 markings/sec, 250 secs
lola: 17047260 markings, 138205509 edges, 62829 markings/sec, 255 secs
lola: 17312551 markings, 140504593 edges, 53058 markings/sec, 260 secs
lola: 17541988 markings, 142732250 edges, 45887 markings/sec, 265 secs
lola: 17853211 markings, 145085638 edges, 62245 markings/sec, 270 secs
lola: 18145956 markings, 147435572 edges, 58549 markings/sec, 275 secs
lola: 18444193 markings, 149868917 edges, 59647 markings/sec, 280 secs
lola: 18663671 markings, 152099172 edges, 43896 markings/sec, 285 secs
lola: local time limit reached - aborting
lola: Child process aborted or communication problem between parent and child process
lola: subprocess 5 will run for 295 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (X (G (G (F ((2 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cstart_22 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9))))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (G (G (F ((2 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cstart_22 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9))))))
lola: processed formula: A (X (G (G (F ((2 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cstart_22 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9))))))
lola: processed formula length: 290
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: 424696 markings, 2936693 edges, 84939 markings/sec, 0 secs
lola: 777719 markings, 5591424 edges, 70605 markings/sec, 5 secs
lola: 1102192 markings, 7982770 edges, 64895 markings/sec, 10 secs
lola: 1407257 markings, 10338964 edges, 61013 markings/sec, 15 secs
lola: 1711591 markings, 12672064 edges, 60867 markings/sec, 20 secs
lola: 2021638 markings, 14879196 edges, 62009 markings/sec, 25 secs
lola: 2328434 markings, 16970569 edges, 61359 markings/sec, 30 secs
lola: 2615557 markings, 19309566 edges, 57425 markings/sec, 35 secs
lola: 2862407 markings, 21230833 edges, 49370 markings/sec, 40 secs
lola: 3137655 markings, 23560864 edges, 55050 markings/sec, 45 secs
lola: 3378615 markings, 25554965 edges, 48192 markings/sec, 50 secs
lola: 3659557 markings, 27813830 edges, 56188 markings/sec, 55 secs
lola: 3882129 markings, 29908778 edges, 44514 markings/sec, 60 secs
lola: 4140974 markings, 32259938 edges, 51769 markings/sec, 65 secs
lola: 4358184 markings, 34339881 edges, 43442 markings/sec, 70 secs
lola: 4611944 markings, 36360421 edges, 50752 markings/sec, 75 secs
lola: 4863484 markings, 38584273 edges, 50308 markings/sec, 80 secs
lola: 5104302 markings, 40746618 edges, 48164 markings/sec, 85 secs
lola: 5323816 markings, 42918411 edges, 43903 markings/sec, 90 secs
lola: 5555419 markings, 45065945 edges, 46321 markings/sec, 95 secs
lola: 5788690 markings, 47308967 edges, 46654 markings/sec, 100 secs
lola: 6012618 markings, 49623599 edges, 44786 markings/sec, 105 secs
lola: 6206046 markings, 51832238 edges, 38686 markings/sec, 110 secs
lola: 6526001 markings, 54042499 edges, 63991 markings/sec, 115 secs
lola: 6814037 markings, 56377012 edges, 57607 markings/sec, 120 secs
lola: 7095084 markings, 58388487 edges, 56209 markings/sec, 125 secs
lola: 7375451 markings, 60610289 edges, 56073 markings/sec, 130 secs
lola: 7658614 markings, 62490446 edges, 56633 markings/sec, 135 secs
lola: 7946212 markings, 64459876 edges, 57520 markings/sec, 140 secs
lola: 8173850 markings, 66362293 edges, 45528 markings/sec, 145 secs
lola: 8406070 markings, 68176320 edges, 46444 markings/sec, 150 secs
lola: 8636823 markings, 70065184 edges, 46151 markings/sec, 155 secs
lola: 8851393 markings, 71973300 edges, 42914 markings/sec, 160 secs
lola: 9106796 markings, 73977924 edges, 51081 markings/sec, 165 secs
lola: 9324213 markings, 75952569 edges, 43483 markings/sec, 170 secs
lola: 9553727 markings, 78018065 edges, 45903 markings/sec, 175 secs
lola: 9762899 markings, 80005656 edges, 41834 markings/sec, 180 secs
lola: 9981385 markings, 81939752 edges, 43697 markings/sec, 185 secs
lola: 10257390 markings, 84114812 edges, 55201 markings/sec, 190 secs
lola: 10476174 markings, 86174947 edges, 43757 markings/sec, 195 secs
lola: 10726036 markings, 88399121 edges, 49972 markings/sec, 200 secs
lola: 10915781 markings, 90423029 edges, 37949 markings/sec, 205 secs
lola: 11171899 markings, 92659276 edges, 51224 markings/sec, 210 secs
lola: 11370975 markings, 94735528 edges, 39815 markings/sec, 215 secs
lola: 11602736 markings, 97061871 edges, 46352 markings/sec, 220 secs
lola: 11813864 markings, 99174146 edges, 42226 markings/sec, 225 secs
lola: 12094625 markings, 101232082 edges, 56152 markings/sec, 230 secs
lola: 12374931 markings, 103408220 edges, 56061 markings/sec, 235 secs
lola: 12662485 markings, 105320099 edges, 57511 markings/sec, 240 secs
lola: 12938767 markings, 107279781 edges, 55256 markings/sec, 245 secs
lola: 13161824 markings, 109141254 edges, 44611 markings/sec, 250 secs
lola: 13396339 markings, 110991380 edges, 46903 markings/sec, 255 secs
lola: 13613769 markings, 112830104 edges, 43486 markings/sec, 260 secs
lola: 13826143 markings, 114697755 edges, 42475 markings/sec, 265 secs
lola: 14087268 markings, 116724309 edges, 52225 markings/sec, 270 secs
lola: 14287091 markings, 118632952 edges, 39965 markings/sec, 275 secs
lola: 14527483 markings, 120732130 edges, 48078 markings/sec, 280 secs
lola: 14724830 markings, 122670904 edges, 39469 markings/sec, 285 secs
lola: local time limit reached - aborting
lola: Child process aborted or communication problem between parent and child process
lola: subprocess 6 will run for 295 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G (F (G ((n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9 <= a5)))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (F (G ((n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9 <= a5))))
lola: processed formula: A (F (G ((n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9 <= a5))))
lola: processed formula length: 191
lola: 1 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
lola: SEARCH
lola: RUNNING
lola: 576098 markings, 1561695 edges, 115220 markings/sec, 0 secs
lola: 1000875 markings, 3032415 edges, 84955 markings/sec, 5 secs
lola: 1376796 markings, 4519487 edges, 75184 markings/sec, 10 secs
lola: 1780173 markings, 5984453 edges, 80675 markings/sec, 15 secs
lola: 2164125 markings, 7452716 edges, 76790 markings/sec, 20 secs
lola: 2630889 markings, 8946725 edges, 93353 markings/sec, 25 secs
lola: 3012605 markings, 10406947 edges, 76343 markings/sec, 30 secs
lola: 3397557 markings, 11863276 edges, 76990 markings/sec, 35 secs
lola: 3811709 markings, 13329100 edges, 82830 markings/sec, 40 secs
lola: 4205108 markings, 14788654 edges, 78680 markings/sec, 45 secs
lola: 4581707 markings, 16250996 edges, 75320 markings/sec, 50 secs
lola: 4995137 markings, 17525179 edges, 82686 markings/sec, 55 secs
lola: 5331222 markings, 18876121 edges, 67217 markings/sec, 60 secs
lola: 5690078 markings, 20192538 edges, 71771 markings/sec, 65 secs
lola: 6028021 markings, 21535587 edges, 67589 markings/sec, 70 secs
lola: 6377317 markings, 22860128 edges, 69859 markings/sec, 75 secs
lola: 6733795 markings, 24176161 edges, 71296 markings/sec, 80 secs
lola: 7068643 markings, 25505762 edges, 66970 markings/sec, 85 secs
lola: 7404458 markings, 26858950 edges, 67163 markings/sec, 90 secs
lola: 7701069 markings, 28290459 edges, 59322 markings/sec, 95 secs
lola: 7968808 markings, 29742303 edges, 53548 markings/sec, 100 secs
lola: 8268389 markings, 31149232 edges, 59916 markings/sec, 105 secs
lola: 8534145 markings, 32590268 edges, 53151 markings/sec, 110 secs
lola: 8805128 markings, 34020684 edges, 54197 markings/sec, 115 secs
lola: 9119037 markings, 35399201 edges, 62782 markings/sec, 120 secs
lola: 9446762 markings, 36755571 edges, 65545 markings/sec, 125 secs
lola: 9707390 markings, 38198866 edges, 52126 markings/sec, 130 secs
lola: 9987630 markings, 39608522 edges, 56048 markings/sec, 135 secs
lola: 10280656 markings, 41004701 edges, 58605 markings/sec, 140 secs
lola: 10564969 markings, 42399530 edges, 56863 markings/sec, 145 secs
lola: 10841652 markings, 43787425 edges, 55337 markings/sec, 150 secs
lola: 11115458 markings, 45179653 edges, 54761 markings/sec, 155 secs
lola: 11393124 markings, 46580869 edges, 55533 markings/sec, 160 secs
lola: 11747374 markings, 47879284 edges, 70850 markings/sec, 165 secs
lola: 12093658 markings, 49192633 edges, 69257 markings/sec, 170 secs
lola: 12430671 markings, 50518926 edges, 67403 markings/sec, 175 secs
lola: 12757515 markings, 51851177 edges, 65369 markings/sec, 180 secs
lola: 13023729 markings, 53258673 edges, 53243 markings/sec, 185 secs
lola: 13294499 markings, 54655896 edges, 54154 markings/sec, 190 secs
lola: 13573825 markings, 56041582 edges, 55865 markings/sec, 195 secs
lola: 13864735 markings, 57402542 edges, 58182 markings/sec, 200 secs
lola: 14131671 markings, 58799456 edges, 53387 markings/sec, 205 secs
lola: 14405815 markings, 60181703 edges, 54829 markings/sec, 210 secs
lola: 14677796 markings, 61573673 edges, 54396 markings/sec, 215 secs
lola: 15013517 markings, 62893373 edges, 67144 markings/sec, 220 secs
lola: 15343721 markings, 64220359 edges, 66041 markings/sec, 225 secs
lola: 15622395 markings, 65597799 edges, 55735 markings/sec, 230 secs
lola: 15898260 markings, 66973930 edges, 55173 markings/sec, 235 secs
lola: 16166781 markings, 68358106 edges, 53704 markings/sec, 240 secs
lola: 16442635 markings, 69741704 edges, 55171 markings/sec, 245 secs
lola: 16763829 markings, 71071044 edges, 64239 markings/sec, 250 secs
lola: 17026825 markings, 72458153 edges, 52599 markings/sec, 255 secs
lola: 17304811 markings, 73835125 edges, 55597 markings/sec, 260 secs
lola: 17583440 markings, 75209082 edges, 55726 markings/sec, 265 secs
lola: 17858824 markings, 76592608 edges, 55077 markings/sec, 270 secs
lola: 18190268 markings, 78013566 edges, 66289 markings/sec, 275 secs
lola: 18626944 markings, 79439688 edges, 87335 markings/sec, 280 secs
lola: 18991436 markings, 80864468 edges, 72898 markings/sec, 285 secs
lola: local time limit reached - aborting
lola: Child process aborted or communication problem between parent and child process
lola: subprocess 7 will run for 295 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A ((((CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22 <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n9_19_18 + n9_19... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A ((((CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22 <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n9_19_18 + n9_19_19 + n9_19_20 + n9_19_21 + n9_19_22 + n9_7_10 + n9_20_10 + n9_6_10 + n9_20_9 + n9_20_8 + n9_20_7 + n9_20_6 + n9_20_5 + n9_20_4 + n9_20_3 + n9_20_2 + n9_20_1 + n9_20_0 + n9_1_10 + n9_1_11 + n9_1_12 + n9_1_13 + n9_1_14 + n9_1_15 + n9_1_16 + n9_1_17 + n9_1_18 + n9_1_19 + n9_1_20 + n9_1_21 + n9_1_22 + n9_13_22 + n9_13_21 + n9_13_20 + n9_13_19 + n9_13_18 + n9_13_17 + n9_13_16 + n9_13_15 + n9_13_14 + n9_13_13 + n9_13_12 + n9_18_10 + n9_18_11 + n9_18_12 + n9_18_13 + n9_18_14 + n9_18_15 + n9_18_16 + n9_18_17 + n9_18_18 + n9_18_19 + n9_18_20 + n9_18_21 + n9_18_22 + n9_21_0 + n9_21_1 + n9_21_2 + n9_21_3 + n9_21_4 + n9_21_5 + n9_21_6 + n9_21_7 + n9_21_8 + n9_21_9 + n9_13_11 + n9_6_11 + n9_6_12 + n9_6_13 + n9_6_14 + n9_6_15 + n9_6_16 + n9_6_17 + n9_6_18 + n9_6_19 + n9_6_20 + n9_6_21 + n9_6_22 + n9_13_10 + n9_22_0 + n9_22_1 + n9_22_2 + n9_22_3 + n9_22_4 + n9_22_5 + n9_22_6 + n9_22_7 + n9_22_8 + n9_22_9 + n9_12_10 + n9_12_11 + n9_12_12 + n9_12_13 + n9_12_14 + n9_12_15 + n9_12_16 + n9_12_17 + n9_12_18 + n9_12_19 + n9_12_20 + n9_12_21 + n9_12_22 + n9_0_10 + n9_0_11 + n9_0_12 + n9_0_13 + n9_0_14 + n9_0_15 + n9_0_16 + n9_0_17 + n9_0_18 + n9_0_19 + n9_0_20 + n9_0_21 + n9_0_22 + n9_10_0 + n9_10_1 + n9_10_2 + n9_10_3 + n9_10_4 + n9_10_5 + n9_10_6 + n9_10_7 + n9_10_8 + n9_10_9 + n9_17_10 + n9_17_11 + n9_17_12 + n9_17_13 + n9_17_14 + n9_17_15 + n9_17_16 + n9_17_17 + n9_17_18 + n9_17_19 + n9_17_20 + n9_17_21 + n9_17_22 + n9_0_0 + n9_0_1 + n9_0_2 + n9_0_3 + n9_0_4 + n9_0_5 + n9_0_6 + n9_0_7 + n9_0_8 + n9_0_9 + n9_11_0 + n9_11_1 + n9_11_2 + n9_11_3 + n9_11_4 + n9_11_5 + n9_11_6 + n9_11_7 + n9_11_8 + n9_11_9 + n9_5_10 + n9_5_11 + n9_5_12 + n9_5_13 + n9_5_14 + n9_5_15 + n9_5_16 + n9_5_17 + n9_5_18 + n9_5_19 + n9_5_20 + n9_5_21 + n9_5_22 + n9_1_0 + n9_1_1 + n9_1_2 + n9_1_3 + n9_1_4 + n9_1_5 + n9_1_6 + n9_1_7 + n9_1_8 + n9_1_9 + n9_12_0 + n9_12_1 + n9_12_2 + n9_12_3 + n9_12_4 + n9_12_5 + n9_12_6 + n9_12_7 + n9_12_8 + n9_12_9 + n9_11_10 + n9_11_11 + n9_11_12 + n9_11_13 + n9_11_14 + n9_11_15 + n9_11_16 + n9_11_17 + n9_11_18 + n9_11_19 + n9_11_20 + n9_11_21 + n9_11_22 + n9_2_0 + n9_2_1 + n9_2_2 + n9_2_3 + n9_2_4 + n9_2_5 + n9_2_6 + n9_2_7 + n9_2_8 + n9_2_9 + n9_13_0 + n9_13_1 + n9_13_2 + n9_13_3 + n9_13_4 + n9_13_5 + n9_13_6 + n9_13_7 + n9_13_8 + n9_13_9 + n9_3_0 + n9_3_1 + n9_3_2 + n9_3_3 + n9_3_4 + n9_3_5 + n9_3_6 + n9_3_7 + n9_3_8 + n9_3_9 + n9_16_10 + n9_16_11 + n9_16_12 + n9_16_13 + n9_16_14 + n9_16_15 + n9_16_16 + n9_16_17 + n9_16_18 + n9_16_19 + n9_16_20 + n9_16_21 + n9_16_22 + n9_14_0 + n9_14_1 + n9_14_2 + n9_14_3 + n9_14_4 + n9_14_5 + n9_14_6 + n9_14_7 + n9_14_8 + n9_14_9 + n9_4_10 + n9_4_11 + n9_4_12 + n9_4_13 + n9_4_14 + n9_4_15 + n9_4_16 + n9_4_17 + n9_4_18 + n9_4_19 + n9_4_20 + n9_4_21 + n9_4_22 + n9_4_0 + n9_4_1 + n9_4_2 + n9_4_3 + n9_4_4 + n9_4_5 + n9_4_6 + n9_4_7 + n9_4_8 + n9_4_9 + n9_15_0 + n9_15_1 + n9_15_2 + n9_15_3 + n9_15_4 + n9_15_5 + n9_15_6 + n9_15_7 + n9_15_8 + n9_15_9 + n9_9_10 + n9_9_11 + n9_9_12 + n9_9_13 + n9_9_14 + n9_9_15 + n9_9_16 + n9_9_17 + n9_9_18 + n9_9_19 + n9_9_20 + n9_9_21 + n9_9_22 + n9_10_10 + n9_10_11 + n9_10_12 + n9_10_13 + n9_10_14 + n9_10_15 + n9_10_16 + n9_10_17 + n9_10_18 + n9_10_19 + n9_10_20 + n9_10_21 + n9_10_22 + n9_22_10 + n9_22_11 + n9_22_12 + n9_22_13 + n9_22_14 + n9_22_15 + n9_22_16 + n9_22_17 + n9_22_18 + n9_22_19 + n9_22_20 + n9_22_21 + n9_22_22 + n9_20_22 + n9_20_21 + n9_20_20 + n9_20_19 + n9_20_18 + n9_20_17 + n9_20_16 + n9_20_15 + n9_20_14 + n9_5_0 + n9_5_1 + n9_5_2 + n9_5_3 + n9_5_4 + n9_5_5 + n9_5_6 + n9_5_7 + n9_5_8 + n9_5_9 + n9_16_0 + n9_16_1 + n9_16_2 + n9_16_3 + n9_16_4 + n9_16_5 + n9_16_6 + n9_16_7 + n9_16_8 + n9_16_9 + n9_20_13 + n9_20_12 + n9_20_11 + n9_7_22 + n9_7_21 + n9_7_20 + n9_7_19 + n9_7_18 + n9_7_17 + n9_7_16 + n9_7_15 + n9_7_14 + n9_7_13 + n9_6_0 + n9_6_1 + n9_6_2 + n9_6_3 + n9_6_4 + n9_6_5 + n9_6_6 + n9_6_7 + n9_6_8 + n9_6_9 + n9_17_0 + n9_17_1 + n9_17_2 + n9_17_3 + n9_17_4 + n9_17_5 + n9_17_6 + n9_17_7 + n9_17_8 + n9_17_9 + n9_15_10 + n9_15_11 + n9_15_12 + n9_15_13 + n9_15_14 + n9_15_15 + n9_15_16 + n9_15_17 + n9_15_18 + n9_15_19 + n9_15_20 + n9_15_21 + n9_15_22 + n9_3_10 + n9_3_11 + n9_3_12 + n9_3_13 + n9_3_14 + n9_3_15 + n9_3_16 + n9_3_17 + n9_3_18 + n9_3_19 + n9_3_20 + n9_3_21 + n9_3_22 + n9_7_12 + n9_7_11 + n9_7_0 + n9_7_1 + n9_7_2 + n9_7_3 + n9_7_4 + n9_7_5 + n9_7_6 + n9_7_7 + n9_7_8 + n9_7_9 + n9_18_0 + n9_18_1 + n9_18_2 + n9_18_3 + n9_18_4 + n9_18_5 + n9_18_6 + n9_18_7 + n9_18_8 + n9_18_9 + n9_8_10 + n9_8_11 + n9_8_12 + n9_8_13 + n9_8_14 + n9_8_15 + n9_8_16 + n9_8_17 + n9_8_18 + n9_8_19 + n9_8_20 + n9_8_21 + n9_8_22 + n9_21_10 + n9_21_11 + n9_21_12 + n9_21_13 + n9_21_14 + n9_21_15 + n9_21_16 + n9_21_17 + n9_21_18 + n9_21_19 + n9_21_20 + n9_21_21 + n9_21_22 + n9_8_0 + n9_8_1 + n9_8_2 + n9_8_3 + n9_8_4 + n9_8_5 + n9_8_6 + n9_8_7 + n9_8_8 + n9_8_9 + n9_19_0 + n9_19_1 + n9_19_2 + n9_19_3 + n9_19_4 + n9_19_5 + n9_19_6 + n9_19_7 + n9_19_8 + n9_19_9 + n9_9_0 + n9_9_1 + n9_9_2 + n9_9_3 + n9_9_4 + n9_9_5 + n9_9_6 + n9_9_7 + n9_9_8 + n9_9_9 + n9_14_10 + n9_14_11 + n9_14_12 + n9_14_13 + n9_14_14 + n9_14_15 + n9_14_16 + n9_14_17 + n9_14_18 + n9_14_19 + n9_14_20 + n9_14_21 + n9_14_22 + n9_2_10 + n9_2_11 + n9_2_12 + n9_2_13 + n9_2_14 + n9_2_15 + n9_2_16 + n9_2_17 + n9_2_18 + n9_2_19 + n9_2_20 + n9_2_21 + n9_2_22) U (2 <= Sstart_9 + Sstart_8 + Sstart_7 + Sstart_6 + Sstart_5 + Sstart_4 + Sstart_3 + Sstart_2 + Sstart_1 + Sstart_0 + Sstart_10 + Sstart_11 + Sstart_12 + Sstart_13 + Sstart_14 + Sstart_15 + Sstart_16 + Sstart_17 + Sstart_18 + Sstart_19 + Sstart_20 + Sstart_21 + Sstart_22)) U G (X ((a2 <= CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22)))))
lola: processed formula: A ((((CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22 <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n9_19_18 + n9_19... (shortened)
lola: processed formula length: 6234
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 8 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 28 unused bits
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: 457432 markings, 2821772 edges, 91486 markings/sec, 0 secs
lola: 794480 markings, 5449189 edges, 67410 markings/sec, 5 secs
lola: 1132520 markings, 8064141 edges, 67608 markings/sec, 10 secs
lola: 1469141 markings, 10657402 edges, 67324 markings/sec, 15 secs
lola: 1823665 markings, 13051961 edges, 70905 markings/sec, 20 secs
lola: 2143008 markings, 15464745 edges, 63869 markings/sec, 25 secs
lola: 2451918 markings, 17998227 edges, 61782 markings/sec, 30 secs
lola: 2792213 markings, 20360676 edges, 68059 markings/sec, 35 secs
lola: 3098495 markings, 22710062 edges, 61256 markings/sec, 40 secs
lola: 3394357 markings, 25044031 edges, 59172 markings/sec, 45 secs
lola: 3706600 markings, 27538300 edges, 62449 markings/sec, 50 secs
lola: 4039543 markings, 29712713 edges, 66589 markings/sec, 55 secs
lola: 4351885 markings, 31752917 edges, 62468 markings/sec, 60 secs
lola: 4678506 markings, 34015566 edges, 65324 markings/sec, 65 secs
lola: 5023777 markings, 36516999 edges, 69054 markings/sec, 70 secs
lola: 5271198 markings, 38815678 edges, 49484 markings/sec, 75 secs
lola: 5546199 markings, 40916733 edges, 55000 markings/sec, 80 secs
lola: 5816923 markings, 43009668 edges, 54145 markings/sec, 85 secs
lola: 6122767 markings, 45444829 edges, 61169 markings/sec, 90 secs
lola: 6376024 markings, 47742961 edges, 50651 markings/sec, 95 secs
lola: 6631261 markings, 49958327 edges, 51047 markings/sec, 100 secs
lola: 6902496 markings, 52052030 edges, 54247 markings/sec, 105 secs
lola: 7151334 markings, 54077200 edges, 49768 markings/sec, 110 secs
lola: 7408541 markings, 56154553 edges, 51441 markings/sec, 115 secs
lola: 7630654 markings, 58273477 edges, 44423 markings/sec, 120 secs
lola: 7855959 markings, 60336267 edges, 45061 markings/sec, 125 secs
lola: 8122194 markings, 62744721 edges, 53247 markings/sec, 130 secs
lola: 8392012 markings, 65220882 edges, 53964 markings/sec, 135 secs
lola: 8604996 markings, 67544090 edges, 42597 markings/sec, 140 secs
lola: 8881502 markings, 69817825 edges, 55301 markings/sec, 145 secs
lola: 9144992 markings, 71937202 edges, 52698 markings/sec, 150 secs
lola: 9471716 markings, 74467033 edges, 65345 markings/sec, 155 secs
lola: 9749918 markings, 76879984 edges, 55640 markings/sec, 160 secs
lola: 9980141 markings, 79158244 edges, 46045 markings/sec, 165 secs
lola: 10248167 markings, 81539063 edges, 53605 markings/sec, 170 secs
lola: 10521346 markings, 84011971 edges, 54636 markings/sec, 175 secs
lola: 10745548 markings, 86343368 edges, 44840 markings/sec, 180 secs
lola: 10974523 markings, 88576226 edges, 45795 markings/sec, 185 secs
lola: 11232493 markings, 90933080 edges, 51594 markings/sec, 190 secs
lola: 11499483 markings, 93345571 edges, 53398 markings/sec, 195 secs
lola: 11713194 markings, 95621440 edges, 42742 markings/sec, 200 secs
lola: 11942887 markings, 98017744 edges, 45939 markings/sec, 205 secs
lola: 12189474 markings, 100483264 edges, 49317 markings/sec, 210 secs
lola: 12400151 markings, 102850989 edges, 42135 markings/sec, 215 secs
lola: 12669531 markings, 105262319 edges, 53876 markings/sec, 220 secs
lola: 13007652 markings, 107563558 edges, 67624 markings/sec, 225 secs
lola: 13315683 markings, 109889444 edges, 61606 markings/sec, 230 secs
lola: 13618525 markings, 112345939 edges, 60568 markings/sec, 235 secs
lola: 13940617 markings, 114616203 edges, 64418 markings/sec, 240 secs
lola: 14236165 markings, 116784885 edges, 59110 markings/sec, 245 secs
lola: 14527671 markings, 119019588 edges, 58301 markings/sec, 250 secs
lola: 14795752 markings, 121383885 edges, 53616 markings/sec, 255 secs
lola: 15125504 markings, 123570828 edges, 65950 markings/sec, 260 secs
lola: 15421447 markings, 125575170 edges, 59189 markings/sec, 265 secs
lola: 15718880 markings, 127538779 edges, 59487 markings/sec, 270 secs
lola: 16036862 markings, 129706417 edges, 63596 markings/sec, 275 secs
lola: 16280793 markings, 131612817 edges, 48786 markings/sec, 280 secs
lola: 16520197 markings, 133763489 edges, 47881 markings/sec, 285 secs
lola: local time limit reached - aborting
lola: Child process aborted or communication problem between parent and child process
lola: subprocess 8 will run for 294 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (X (X ((2 <= n1_9 + n1_8 + n1_7 + n1_6 + n1_5 + n1_4 + n1_3 + n1_2 + n1_1 + n1_0 + n1_10 + n1_11 + n1_12 + n1_13 + n1_14 + n1_15 + n1_16 + n1_17 + n1_18 + n1_19 + n1_20 + n1_21 + n1_22))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (X ((2 <= n1_9 + n1_8 + n1_7 + n1_6 + n1_5 + n1_4 + n1_3 + n1_2 + n1_1 + n1_0 + n1_10 + n1_11 + n1_12 + n1_13 + n1_14 + n1_15 + n1_16 + n1_17 + n1_18 + n1_19 + n1_20 + n1_21 + n1_22))))
lola: processed formula: A (X (X ((2 <= n1_9 + n1_8 + n1_7 + n1_6 + n1_5 + n1_4 + n1_3 + n1_2 + n1_1 + n1_0 + n1_10 + n1_11 + n1_12 + n1_13 + n1_14 + n1_15 + n1_16 + n1_17 + n1_18 + n1_19 + n1_20 + n1_21 + n1_22))))
lola: processed formula length: 190
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 4 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 29 unused bits
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: ========================================
lola: subprocess 9 will run for 337 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (((3 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9) U (3 <= n8_14_10 + n8_11_0 + n8_5_10 + n8_21_0 + n8_0_0 + n8_22_10 + n8_10_10 + n8_12_0 + n8_1_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_19_10 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_20_10 + n8_4_10 + n8_3_0 ... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (((3 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9) U (3 <= n8_14_10 + n8_11_0 + n8_5_10 + n8_21_0 + n8_0_0 + n8_22_10 + n8_10_10 + n8_12_0 + n8_1_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_19_10 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_20_10 + n8_4_10 + n8_3_0 + n8_2_0 + n8_13_0 + n8_13_1 + n8_13_2 + n8_13_3 + n8_13_4 + n8_13_5 + n8_13_6 + n8_13_7 + n8_13_8 + n8_13_9 + n8_2_1 + n8_2_2 + n8_2_3 + n8_2_4 + n8_2_5 + n8_2_6 + n8_2_7 + n8_2_8 + n8_2_9 + n8_14_0 + n8_14_1 + n8_14_2 + n8_14_3 + n8_14_4 + n8_14_5 + n8_14_6 + n8_14_7 + n8_14_8 + n8_14_9 + n8_13_10 + n8_13_11 + n8_13_12 + n8_13_13 + n8_13_14 + n8_13_15 + n8_13_16 + n8_13_17 + n8_13_18 + n8_13_19 + n8_13_20 + n8_13_21 + n8_13_22 + n8_3_1 + n8_3_2 + n8_3_3 + n8_3_4 + n8_3_5 + n8_3_6 + n8_3_7 + n8_3_8 + n8_3_9 + n8_4_11 + n8_4_12 + n8_4_13 + n8_4_14 + n8_4_15 + n8_4_16 + n8_4_17 + n8_4_18 + n8_4_19 + n8_4_20 + n8_4_21 + n8_4_22 + n8_20_22 + n8_20_21 + n8_20_20 + n8_20_19 + n8_20_18 + n8_20_17 + n8_20_16 + n8_20_15 + n8_20_14 + n8_20_13 + n8_20_12 + n8_20_11 + n8_15_1 + n8_15_2 + n8_15_3 + n8_15_4 + n8_15_5 + n8_15_6 + n8_15_7 + n8_15_8 + n8_15_9 + n8_4_0 + n8_4_1 + n8_4_2 + n8_4_3 + n8_4_4 + n8_4_5 + n8_4_6 + n8_4_7 + n8_4_8 + n8_4_9 + n8_18_11 + n8_18_12 + n8_18_13 + n8_18_14 + n8_18_15 + n8_18_16 + n8_18_17 + n8_18_18 + n8_18_19 + n8_18_20 + n8_18_21 + n8_18_22 + n8_9_11 + n8_9_12 + n8_9_13 + n8_9_14 + n8_9_15 + n8_9_16 + n8_9_17 + n8_9_18 + n8_9_19 + n8_9_20 + n8_9_21 + n8_9_22 + n8_19_22 + n8_19_21 + n8_16_1 + n8_16_2 + n8_16_3 + n8_16_4 + n8_16_5 + n8_16_6 + n8_16_7 + n8_16_8 + n8_16_9 + n8_5_0 + n8_5_1 + n8_5_2 + n8_5_3 + n8_5_4 + n8_5_5 + n8_5_6 + n8_5_7 + n8_5_8 + n8_5_9 + n8_19_20 + n8_19_19 + n8_17_1 + n8_17_2 + n8_17_3 + n8_17_4 + n8_17_5 + n8_17_6 + n8_17_7 + n8_17_8 + n8_17_9 + n8_12_10 + n8_12_11 + n8_12_12 + n8_12_13 + n8_12_14 + n8_12_15 + n8_12_16 + n8_12_17 + n8_12_18 + n8_12_19 + n8_12_20 + n8_12_21 + n8_12_22 + n8_19_18 + n8_19_17 + n8_19_16 + n8_19_15 + n8_19_14 + n8_19_13 + n8_19_12 + n8_19_11 + n8_6_1 + n8_6_2 + n8_6_3 + n8_6_4 + n8_6_5 + n8_6_6 + n8_6_7 + n8_6_8 + n8_6_9 + n8_3_10 + n8_3_11 + n8_3_12 + n8_3_13 + n8_3_14 + n8_3_15 + n8_3_16 + n8_3_17 + n8_3_18 + n8_3_19 + n8_3_20 + n8_3_21 + n8_3_22 + n8_18_0 + n8_18_1 + n8_18_2 + n8_18_3 + n8_18_4 + n8_18_5 + n8_18_6 + n8_18_7 + n8_18_8 + n8_18_9 + n8_7_1 + n8_7_2 + n8_7_3 + n8_7_4 + n8_7_5 + n8_7_6 + n8_7_7 + n8_7_8 + n8_7_9 + n8_17_10 + n8_17_11 + n8_17_12 + n8_17_13 + n8_17_14 + n8_17_15 + n8_17_16 + n8_17_17 + n8_17_18 + n8_17_19 + n8_17_20 + n8_17_21 + n8_17_22 + n8_8_11 + n8_8_12 + n8_8_13 + n8_8_14 + n8_8_15 + n8_8_16 + n8_8_17 + n8_8_18 + n8_8_19 + n8_8_20 + n8_8_21 + n8_8_22 + n8_1_9 + n8_1_8 + n8_1_7 + n8_1_6 + n8_1_5 + n8_1_4 + n8_1_3 + n8_19_0 + n8_19_1 + n8_19_2 + n8_19_3 + n8_19_4 + n8_19_5 + n8_19_6 + n8_19_7 + n8_19_8 + n8_19_9 + n8_1_2 + n8_1_1 + n8_12_9 + n8_12_8 + n8_8_0 + n8_8_1 + n8_8_2 + n8_8_3 + n8_8_4 + n8_8_5 + n8_8_6 + n8_8_7 + n8_8_8 + n8_8_9 + n8_12_7 + n8_12_6 + n8_12_5 + n8_9_0 + n8_9_1 + n8_9_2 + n8_9_3 + n8_9_4 + n8_9_5 + n8_9_6 + n8_9_7 + n8_9_8 + n8_9_9 + n8_11_10 + n8_11_11 + n8_11_12 + n8_11_13 + n8_11_14 + n8_11_15 + n8_11_16 + n8_11_17 + n8_11_18 + n8_11_19 + n8_11_20 + n8_11_21 + n8_11_22 + n8_12_4 + n8_2_10 + n8_2_11 + n8_2_12 + n8_2_13 + n8_2_14 + n8_2_15 + n8_2_16 + n8_2_17 + n8_2_18 + n8_2_19 + n8_2_20 + n8_2_21 + n8_2_22 + n8_12_3 + n8_12_2 + n8_12_1 + n8_16_10 + n8_16_11 + n8_16_12 + n8_16_13 + n8_16_14 + n8_16_15 + n8_16_16 + n8_16_17 + n8_16_18 + n8_16_19 + n8_16_20 + n8_16_21 + n8_16_22 + n8_7_10 + n8_7_11 + n8_7_12 + n8_7_13 + n8_7_14 + n8_7_15 + n8_7_16 + n8_7_17 + n8_7_18 + n8_7_19 + n8_7_20 + n8_7_21 + n8_7_22 + n8_10_11 + n8_10_12 + n8_10_13 + n8_10_14 + n8_10_15 + n8_10_16 + n8_10_17 + n8_10_18 + n8_10_19 + n8_10_20 + n8_10_21 + n8_10_22 + n8_22_11 + n8_22_12 + n8_22_13 + n8_22_14 + n8_22_15 + n8_22_16 + n8_22_17 + n8_22_18 + n8_22_19 + n8_22_20 + n8_22_21 + n8_22_22 + n8_1_10 + n8_1_11 + n8_1_12 + n8_1_13 + n8_1_14 + n8_1_15 + n8_1_16 + n8_1_17 + n8_1_18 + n8_1_19 + n8_1_20 + n8_1_21 + n8_1_22 + n8_20_0 + n8_20_1 + n8_20_2 + n8_20_3 + n8_20_4 + n8_20_5 + n8_20_6 + n8_20_7 + n8_20_8 + n8_20_9 + n8_0_9 + n8_0_8 + n8_0_7 + n8_0_6 + n8_0_5 + n8_0_4 + n8_0_3 + n8_0_2 + n8_15_10 + n8_15_11 + n8_15_12 + n8_15_13 + n8_15_14 + n8_15_15 + n8_15_16 + n8_15_17 + n8_15_18 + n8_15_19 + n8_15_20 + n8_15_21 + n8_15_22 + n8_0_1 + n8_5_22 + n8_21_1 + n8_21_2 + n8_21_3 + n8_21_4 + n8_21_5 + n8_21_6 + n8_21_7 + n8_21_8 + n8_21_9 + n8_6_10 + n8_6_11 + n8_6_12 + n8_6_13 + n8_6_14 + n8_6_15 + n8_6_16 + n8_6_17 + n8_6_18 + n8_6_19 + n8_6_20 + n8_6_21 + n8_6_22 + n8_5_21 + n8_5_20 + n8_5_19 + n8_5_18 + n8_5_17 + n8_5_16 + n8_5_15 + n8_5_14 + n8_5_13 + n8_5_12 + n8_5_11 + n8_11_9 + n8_11_8 + n8_11_7 + n8_11_6 + n8_11_5 + n8_11_4 + n8_11_3 + n8_11_2 + n8_11_1 + n8_14_22 + n8_14_21 + n8_14_20 + n8_14_19 + n8_14_18 + n8_22_0 + n8_22_1 + n8_22_2 + n8_22_3 + n8_22_4 + n8_22_5 + n8_22_6 + n8_22_7 + n8_22_8 + n8_22_9 + n8_14_17 + n8_14_16 + n8_14_15 + n8_14_14 + n8_14_13 + n8_14_12 + n8_14_11 + n8_21_10 + n8_21_11 + n8_21_12 + n8_21_13 + n8_21_14 + n8_21_15 + n8_21_16 + n8_21_17 + n8_21_18 + n8_21_19 + n8_21_20 + n8_21_21 + n8_21_22 + n8_0_10 + n8_0_11 + n8_0_12 + n8_0_13 + n8_0_14 + n8_0_15 + n8_0_16 + n8_0_17 + n8_0_18 + n8_0_19 + n8_0_20 + n8_0_21 + n8_0_22 + n8_10_0 + n8_10_1 + n8_10_2 + n8_10_3 + n8_10_4 + n8_10_5 + n8_10_6 + n8_10_7 + n8_10_8 + n8_10_9)))
lola: processed formula: A (((3 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9) U (3 <= n8_14_10 + n8_11_0 + n8_5_10 + n8_21_0 + n8_0_0 + n8_22_10 + n8_10_10 + n8_12_0 + n8_1_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_19_10 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_20_10 + n8_4_10 + n8_3_0 ... (shortened)
lola: processed formula length: 5550
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
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: ========================================
lola: subprocess 10 will run for 393 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A ((2 <= SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_8 + SstopOK_21 + SstopOK_22 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_1 + SstopOK_6 + SstopOK_7 + SstopOK_20))
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (2 <= SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_8 + SstopOK_21 + SstopOK_22 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_1 + SstopOK_6 + SstopOK_7 + SstopOK_20)
lola: processed formula length: 293
lola: 1 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: processed formula with 1 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: ========================================
lola: subprocess 11 will run for 471 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A ((X (F ((2 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cstart_22 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9))) U F (F ((SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + Sstop... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A ((X (F ((2 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cstart_22 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9))) U F ((SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_8 + SstopOK_21 + SstopOK_22 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_1 + SstopOK_6 + SstopOK_7 + SstopOK_20 <= Astart))))
lola: processed formula: A ((X (F ((2 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cstart_22 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9))) U F ((SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_... (shortened)
lola: processed formula length: 589
lola: 1 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 1 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 31 unused bits
lola: using a prefix tree store (--store=prefix)
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: ========================================
lola: subprocess 12 will run for 589 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (F ((G ((2 <= c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_22 + c1_21 + c1_20 + c1_19 + c1_18 + c1_17 + c1_16 + c1_15 + c1_14 + c1_13 + c1_12 + c1_11 + c1_10 + c1_9)) U (n6_0 + n6_1 + n6_2 + n6_3 + n6_4 + n6_5 + n6_6 + n6_7 + n6_8 + n6_9 + n6_22 + n6_21 + n6_20 + n6_19 + n6_18 + n6_17 + n6_16 + n6_15 + n6_14 + n6_13 + n6_12 + n6_11 + n6_10 <= a5))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (F ((G ((2 <= c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_22 + c1_21 + c1_20 + c1_19 + c1_18 + c1_17 + c1_16 + c1_15 + c1_14 + c1_13 + c1_12 + c1_11 + c1_10 + c1_9)) U (n6_0 + n6_1 + n6_2 + n6_3 + n6_4 + n6_5 + n6_6 + n6_7 + n6_8 + n6_9 + n6_22 + n6_21 + n6_20 + n6_19 + n6_18 + n6_17 + n6_16 + n6_15 + n6_14 + n6_13 + n6_12 + n6_11 + n6_10 <= a5))))
lola: processed formula: A (F ((G ((2 <= c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_22 + c1_21 + c1_20 + c1_19 + c1_18 + c1_17 + c1_16 + c1_15 + c1_14 + c1_13 + c1_12 + c1_11 + c1_10 + c1_9)) U (n6_0 + n6_1 + n6_2 + n6_3 + n6_4 + n6_5 + n6_6 + n6_7 + n6_8 + n6_9 + n6_22 + n6_21 + n6_20 + n6_19 + n6_18 + n6_17 + n6_16 + n6_15 + n6_14 + n6_13 + n6_12 + n6_11 + n6_10 <= a5))))
lola: processed formula length: 374
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 1 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 31 unused bits
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
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: ========================================
lola: subprocess 13 will run for 786 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (X ((1 <= CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22)))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X ((1 <= CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22)))
lola: processed formula: A (X ((1 <= CstopOK_0 + CstopOK_1 + CstopOK_2 + CstopOK_3 + CstopOK_4 + CstopOK_5 + CstopOK_6 + CstopOK_7 + CstopOK_8 + CstopOK_9 + CstopOK_10 + CstopOK_11 + CstopOK_12 + CstopOK_13 + CstopOK_14 + CstopOK_15 + CstopOK_16 + CstopOK_17 + CstopOK_18 + CstopOK_19 + CstopOK_20 + CstopOK_21 + CstopOK_22)))
lola: processed formula length: 301
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: ========================================
lola: subprocess 14 will run for 1179 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A ((3 <= SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_8 + SstopOK_21 + SstopOK_22 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_1 + SstopOK_6 + SstopOK_7 + SstopOK_20))
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: (3 <= SstopOK_9 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_8 + SstopOK_21 + SstopOK_22 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_1 + SstopOK_6 + SstopOK_7 + SstopOK_20)
lola: processed formula length: 293
lola: 1 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: processed formula with 1 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: ========================================
lola: subprocess 15 will run for 2359 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A ((((c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_22 + c1_21 + c1_20 + c1_19 + c1_18 + c1_17 + c1_16 + c1_15 + c1_14 + c1_13 + c1_12 + c1_11 + c1_10 + c1_9 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9) U (3 <= n7_17_0 + n7_17_1 + n7_17_2 + n7_17_3 ... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A ((((c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_22 + c1_21 + c1_20 + c1_19 + c1_18 + c1_17 + c1_16 + c1_15 + c1_14 + c1_13 + c1_12 + c1_11 + c1_10 + c1_9 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9) U (3 <= n7_17_0 + n7_17_1 + n7_17_2 + n7_17_3 + n7_17_4 + n7_17_5 + n7_17_6 + n7_17_7 + n7_17_8 + n7_17_9 + n7_21_10 + n7_21_11 + n7_21_12 + n7_21_13 + n7_21_14 + n7_21_15 + n7_21_16 + n7_21_17 + n7_21_18 + n7_21_19 + n7_21_20 + n7_21_21 + n7_21_22 + n7_3_10 + n7_6_0 + n7_15_0 + n7_4_10 + n7_16_10 + n7_18_0 + n7_7_0 + n7_5_10 + n7_11_10 + n7_10_0 + n7_0_10 + n7_22_0 + n7_14_10 + n7_8_10 + n7_12_10 + n7_1_10 + n7_19_0 + n7_13_10 + n7_9_0 + n7_2_10 + n7_20_10 + n7_8_0 + n7_8_9 + n7_8_8 + n7_8_7 + n7_8_6 + n7_8_5 + n7_8_4 + n7_8_3 + n7_8_2 + n7_8_1 + n7_19_10 + n7_19_11 + n7_19_12 + n7_19_13 + n7_19_14 + n7_19_15 + n7_19_16 + n7_19_17 + n7_19_18 + n7_19_19 + n7_19_20 + n7_19_21 + n7_19_22 + n7_20_11 + n7_20_12 + n7_20_13 + n7_20_14 + n7_20_15 + n7_20_16 + n7_20_17 + n7_20_18 + n7_20_19 + n7_20_20 + n7_20_21 + n7_20_22 + n7_2_11 + n7_2_12 + n7_2_13 + n7_2_14 + n7_2_15 + n7_2_16 + n7_2_17 + n7_2_18 + n7_2_19 + n7_2_20 + n7_2_21 + n7_2_22 + n7_9_1 + n7_9_2 + n7_9_3 + n7_9_4 + n7_9_5 + n7_9_6 + n7_9_7 + n7_9_8 + n7_9_9 + n7_19_9 + n7_19_8 + n7_13_11 + n7_13_12 + n7_13_13 + n7_13_14 + n7_13_15 + n7_13_16 + n7_13_17 + n7_13_18 + n7_13_19 + n7_13_20 + n7_13_21 + n7_13_22 + n7_7_10 + n7_7_11 + n7_7_12 + n7_7_13 + n7_7_14 + n7_7_15 + n7_7_16 + n7_7_17 + n7_7_18 + n7_7_19 + n7_7_20 + n7_7_21 + n7_7_22 + n7_19_7 + n7_19_6 + n7_19_5 + n7_19_4 + n7_19_3 + n7_19_2 + n7_19_1 + n7_18_10 + n7_18_11 + n7_18_12 + n7_18_13 + n7_18_14 + n7_18_15 + n7_18_16 + n7_18_17 + n7_18_18 + n7_18_19 + n7_18_20 + n7_18_21 + n7_18_22 + n7_1_11 + n7_1_12 + n7_1_13 + n7_1_14 + n7_1_15 + n7_1_16 + n7_1_17 + n7_1_18 + n7_1_19 + n7_1_20 + n7_1_21 + n7_1_22 + n7_8_22 + n7_8_21 + n7_8_20 + n7_8_19 + n7_8_18 + n7_8_17 + n7_20_0 + n7_20_1 + n7_20_2 + n7_20_3 + n7_20_4 + n7_20_5 + n7_20_6 + n7_20_7 + n7_20_8 + n7_20_9 + n7_8_16 + n7_8_15 + n7_12_11 + n7_12_12 + n7_12_13 + n7_12_14 + n7_12_15 + n7_12_16 + n7_12_17 + n7_12_18 + n7_12_19 + n7_21_0 + n7_21_1 + n7_21_2 + n7_21_3 + n7_21_4 + n7_21_5 + n7_21_6 + n7_21_7 + n7_21_8 + n7_21_9 + n7_12_20 + n7_12_21 + n7_12_22 + n7_6_10 + n7_6_11 + n7_6_12 + n7_6_13 + n7_6_14 + n7_6_15 + n7_6_16 + n7_6_17 + n7_6_18 + n7_6_19 + n7_6_20 + n7_6_21 + n7_6_22 + n7_8_14 + n7_8_13 + n7_8_12 + n7_8_11 + n7_14_22 + n7_14_21 + n7_14_20 + n7_14_19 + n7_14_18 + n7_14_17 + n7_14_16 + n7_14_15 + n7_14_14 + n7_14_13 + n7_14_12 + n7_14_11 + n7_22_1 + n7_22_2 + n7_22_3 + n7_22_4 + n7_22_5 + n7_22_6 + n7_22_7 + n7_22_8 + n7_22_9 + n7_17_10 + n7_17_11 + n7_17_12 + n7_17_13 + n7_17_14 + n7_17_15 + n7_17_16 + n7_17_17 + n7_17_18 + n7_17_19 + n7_17_20 + n7_17_21 + n7_17_22 + n7_0_11 + n7_0_12 + n7_0_13 + n7_0_14 + n7_0_15 + n7_0_16 + n7_0_17 + n7_0_18 + n7_0_19 + n7_0_20 + n7_0_21 + n7_0_22 + n7_10_1 + n7_10_2 + n7_10_3 + n7_10_4 + n7_10_5 + n7_10_6 + n7_10_7 + n7_10_8 + n7_10_9 + n7_11_11 + n7_11_12 + n7_11_13 + n7_11_14 + n7_11_15 + n7_11_16 + n7_11_17 + n7_11_18 + n7_11_19 + n7_11_0 + n7_11_1 + n7_11_2 + n7_11_3 + n7_11_4 + n7_11_5 + n7_11_6 + n7_11_7 + n7_11_8 + n7_11_9 + n7_11_20 + n7_11_21 + n7_11_22 + n7_5_11 + n7_5_12 + n7_5_13 + n7_5_14 + n7_5_15 + n7_5_16 + n7_5_17 + n7_5_18 + n7_5_19 + n7_5_20 + n7_5_21 + n7_5_22 + n7_7_9 + n7_7_8 + n7_7_7 + n7_7_6 + n7_7_5 + n7_7_4 + n7_7_3 + n7_7_2 + n7_7_1 + n7_18_9 + n7_18_8 + n7_18_7 + n7_18_6 + n7_0_0 + n7_0_1 + n7_0_2 + n7_0_3 + n7_0_4 + n7_0_5 + n7_0_6 + n7_0_7 + n7_0_8 + n7_0_9 + n7_18_5 + n7_18_4 + n7_18_3 + n7_18_2 + n7_18_1 + n7_12_0 + n7_12_1 + n7_12_2 + n7_12_3 + n7_12_4 + n7_12_5 + n7_12_6 + n7_12_7 + n7_12_8 + n7_12_9 + n7_1_0 + n7_1_1 + n7_1_2 + n7_1_3 + n7_1_4 + n7_1_5 + n7_1_6 + n7_1_7 + n7_1_8 + n7_1_9 + n7_16_11 + n7_16_12 + n7_16_13 + n7_16_14 + n7_16_15 + n7_16_16 + n7_16_17 + n7_16_18 + n7_16_19 + n7_16_20 + n7_16_21 + n7_16_22 + n7_13_0 + n7_13_1 + n7_13_2 + n7_13_3 + n7_13_4 + n7_13_5 + n7_13_6 + n7_13_7 + n7_13_8 + n7_13_9 + n7_2_0 + n7_2_1 + n7_2_2 + n7_2_3 + n7_2_4 + n7_2_5 + n7_2_6 + n7_2_7 + n7_2_8 + n7_2_9 + n7_14_0 + n7_14_1 + n7_14_2 + n7_14_3 + n7_14_4 + n7_14_5 + n7_14_6 + n7_14_7 + n7_14_8 + n7_14_9 + n7_10_10 + n7_10_11 + n7_10_12 + n7_10_13 + n7_10_14 + n7_10_15 + n7_10_16 + n7_10_17 + n7_10_18 + n7_10_19 + n7_10_20 + n7_10_21 + n7_10_22 + n7_22_10 + n7_22_11 + n7_22_12 + n7_22_13 + n7_22_14 + n7_22_15 + n7_22_16 + n7_22_17 + n7_22_18 + n7_22_19 + n7_22_20 + n7_22_21 + n7_22_22 + n7_4_11 + n7_4_12 + n7_4_13 + n7_4_14 + n7_4_15 + n7_4_16 + n7_4_17 + n7_4_18 + n7_4_19 + n7_4_20 + n7_4_21 + n7_4_22 + n7_3_0 + n7_3_1 + n7_3_2 + n7_3_3 + n7_3_4 + n7_3_5 + n7_3_6 + n7_3_7 + n7_3_8 + n7_3_9 + n7_6_9 + n7_15_1 + n7_15_2 + n7_15_3 + n7_15_4 + n7_15_5 + n7_15_6 + n7_15_7 + n7_15_8 + n7_15_9 + n7_6_8 + n7_6_7 + n7_6_6 + n7_6_5 + n7_6_4 + n7_6_3 + n7_6_2 + n7_6_1 + n7_4_0 + n7_4_1 + n7_4_2 + n7_4_3 + n7_4_4 + n7_4_5 + n7_4_6 + n7_4_7 + n7_4_8 + n7_4_9 + n7_3_22 + n7_3_21 + n7_3_20 + n7_15_10 + n7_15_11 + n7_15_12 + n7_15_13 + n7_15_14 + n7_15_15 + n7_15_16 + n7_15_17 + n7_15_18 + n7_15_19 + n7_15_20 + n7_15_21 + n7_15_22 + n7_9_10 + n7_9_11 + n7_9_12 + n7_9_13 + n7_9_14 + n7_9_15 + n7_9_16 + n7_9_17 + n7_9_18 + n7_9_19 + n7_9_20 + n7_9_21 + n7_9_22 + n7_16_0 + n7_16_1 + n7_16_2 + n7_16_3 + n7_16_4 + n7_16_5 + n7_16_6 + n7_16_7 + n7_16_8 + n7_16_9 + n7_3_19 + n7_3_18 + n7_3_17 + n7_3_16 + n7_3_15 + n7_3_14 + n7_3_13 + n7_3_12 + n7_3_11 + n7_5_0 + n7_5_1 + n7_5_2 + n7_5_3 + n7_5_4 + n7_5_5 + n7_5_6 + n7_5_7 + n7_5_8 + n7_5_9)) U (2 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9)))
lola: processed formula: A ((((c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_22 + c1_21 + c1_20 + c1_19 + c1_18 + c1_17 + c1_16 + c1_15 + c1_14 + c1_13 + c1_12 + c1_11 + c1_10 + c1_9 <= n4_10 + n4_11 + n4_12 + n4_13 + n4_14 + n4_15 + n4_16 + n4_17 + n4_18 + n4_19 + n4_20 + n4_21 + n4_22 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9) U (3 <= n7_17_0 + n7_17_1 + n7_17_2 + n7_17_3 ... (shortened)
lola: processed formula length: 5903
lola: 0 rewrites
lola: formula mentions 0 of 1966 places; total mentions: 0
lola: closed formula file QuasiCertifProtocol-COL-22-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1424 bytes per marking, with 30 unused bits
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
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: RESULT
lola:
SUMMARY: yes no no no unknown unknown unknown unknown no no no yes yes no no no
lola: ========================================
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-0 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-1 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-2 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-3 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-4 CANNOT_COMPUTE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-5 CANNOT_COMPUTE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-6 CANNOT_COMPUTE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-7 CANNOT_COMPUTE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-8 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-9 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-10 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-11 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-12 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-13 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-14 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-22-LTLCardinality-15 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
----- Kill lola and sara stdout -----
----- Finished stdout -----
BK_STOP 1496391404120
--------------------
content from stderr:
----- Start make prepare stderr -----
----- Start make result stderr -----
----- Start make result stderr -----
----- Kill lola and sara stderr -----
----- Finished 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="S_QuasiCertifProtocol-PT-22"
export BK_EXAMINATION="LTLCardinality"
export BK_TOOL="lola"
export BK_RESULT_DIR="/tmp/BK_RESULTS/OUTPUTS"
export BK_TIME_CONFINEMENT="3600"
export BK_MEMORY_CONFINEMENT="16384"
# this is specific to your benchmark or test
export BIN_DIR="$HOME/BenchKit/bin"
# remove the execution directoty if it exists (to avoid increse of .vmdk images)
if [ -d execution ] ; then
rm -rf execution
fi
tar xzf /home/mcc/BenchKit/INPUTS/S_QuasiCertifProtocol-PT-22.tgz
mv S_QuasiCertifProtocol-PT-22 execution
# this is for BenchKit: explicit launching of the test
cd execution
echo "====================================================================="
echo " Generated by BenchKit 2-3254"
echo " Executing tool lola"
echo " Input is S_QuasiCertifProtocol-PT-22, 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 r138-smll-149479231800275"
echo "====================================================================="
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
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 ;