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Model Checking Contest @ Petri Nets 2017
7th edition, Zaragoza, Spain, June 27, 2017
Execution of r058-smll-149440926300286
Last Updated
June 27, 2017

About the Execution of LoLA for QuasiCertifProtocol-PT-28

Execution Summary
Max Memory
Used (MB)		 Time wait (ms) CPU Usage (ms) I/O Wait (ms) Computed Result Execution
Status
15356.320 601034.00 1202535.00 1535.10 TF?FFFTTFFTFFTTF 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 QuasiCertifProtocol-PT-28, examination is ReachabilityCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r058-smll-149440926300286
=====================================================================

--------------------
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-28-ReachabilityCardinality-0
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-1
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-10
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-11
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-12
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-13
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-14
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-15
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-2
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-3
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-4
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-5
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-6
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-7
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-8
FORMULA_NAME QuasiCertifProtocol-COL-28-ReachabilityCardinality-9

=== Now, execution of the tool begins

BK_START 1494782281790


Time: 3600 - MCC
----- Start make prepare stdout -----
checking for too many tokens
----- Start make result stdout -----
ReachabilityCardinality @ QuasiCertifProtocol-PT-28 @ 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: 3444/65536 symbol table entries, 25 collisions
lola: preprocessing...
lola: finding significant places
lola: 2998 places, 446 transitions, 445 significant places
lola: computing forward-conflicting sets
lola: computing back-conflicting sets
lola: 591 transition conflict sets
lola: TASK
lola: reading formula from QuasiCertifProtocol-COL-28-ReachabilityCardinality.task
lola: E (F ((((1 <= 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_23 + s3_24 + s3_25 + s3_26 + s3_27 + s3_28 + s3_9) OR (2 <= s5_28 + s5_27 + s5_26 + s5_25 + s5_24 + s5_23 + 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) OR ((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_19_23 + n9_19_24 + n9_19_25 + n9_19_26 + n9_19_27 + n9_19_28 + 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_13_10 + n9_13_11 + n9_13_12 + n9_13_13 + n9_13_14 + n9_13_15 + n9_13_16 + n9_13_17 + n9_13_18 + n9_13_19 + n9_13_20 + n9_13_21 + n9_13_22 + n9_13_23 + n9_13_24 + n9_13_25 + n9_13_26 + n9_13_27 + n9_13_28 + n9_25_10 + n9_25_11 + n9_25_12 + n9_25_13 + n9_25_14 + n9_25_15 + n9_25_16 + n9_25_17 + n9_25_18 + n9_25_19 + n9_25_20 + n9_25_21 + n9_25_22 + n9_25_23 + n9_25_24 + n9_25_25 + n9_25_26 + n9_25_27 + n9_25_28 + 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_1_23 + n9_1_24 + n9_1_25 + n9_1_26 + n9_1_27 + n9_1_28 + 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_18_23 + n9_18_24 + n9_18_25 + n9_18_26 + n9_18_27 + n9_18_28 + 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_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_6_23 + n9_6_24 + n9_6_25 + n9_6_26 + n9_6_27 + n9_6_28 + 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_12_23 + n9_12_24 + n9_12_25 + n9_12_26 + n9_12_27 + n9_12_28 + n9_24_10 + n9_24_11 + n9_24_12 + n9_24_13 + n9_24_14 + n9_24_15 + n9_24_16 + n9_24_17 + n9_24_18 + n9_24_19 + n9_24_20 + n9_24_21 + n9_24_22 + n9_24_23 + n9_24_24 + n9_24_25 + n9_24_26 + n9_24_27 + n9_24_28 + 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_0_23 + n9_0_24 + n9_0_25 + n9_0_26 + n9_0_27 + n9_0_28 + n9_23_0 + n9_23_1 + n9_23_2 + n9_23_3 + n9_23_4 + n9_23_5 + n9_23_6 + n9_23_7 + n9_23_8 + n9_23_9 + 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_17_23 + n9_17_24 + n9_17_25 + n9_17_26 + n9_17_27 + n9_17_28 + n9_24_0 + n9_24_1 + n9_24_2 + n9_24_3 + n9_24_4 + n9_24_5 + n9_0_0 + n9_24_6 + n9_0_1 + n9_24_7 + n9_0_2 + n9_24_8 + n9_0_3 + n9_24_9 + 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_5_23 + n9_5_24 + n9_5_25 + n9_5_26 + n9_5_27 + n9_5_28 + n9_25_0 + n9_25_1 + n9_25_2 + n9_25_3 + n9_25_4 + n9_25_5 + n9_1_0 + n9_25_6 + n9_1_1 + n9_25_7 + n9_1_2 + n9_25_8 + n9_1_3 + n9_25_9 + 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_11_23 + n9_11_24 + n9_11_25 + n9_11_26 + n9_11_27 + n9_11_28 + n9_23_10 + n9_23_11 + n9_23_12 + n9_23_13 + n9_23_14 + n9_23_15 + n9_23_16 + n9_23_17 + n9_23_18 + n9_23_19 + n9_23_20 + n9_23_21 + n9_23_22 + n9_23_23 + n9_23_24 + n9_23_25 + n9_23_26 + n9_23_27 + n9_23_28 + n9_20_28 + n9_20_27 + n9_20_26 + n9_20_25 + n9_20_24 + n9_20_23 + n9_20_22 + n9_20_21 + n9_20_20 + n9_20_19 + n9_20_18 + n9_26_0 + n9_26_1 + n9_26_2 + n9_26_3 + n9_26_4 + n9_26_5 + n9_2_0 + n9_26_6 + n9_2_1 + n9_26_7 + n9_2_2 + n9_26_8 + n9_2_3 + n9_26_9 + 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_20_17 + n9_20_16 + n9_20_15 + n9_20_14 + n9_20_13 + n9_27_0 + n9_27_1 + n9_27_2 + n9_27_3 + n9_27_4 + n9_27_5 + n9_3_0 + n9_27_6 + n9_3_1 + n9_27_7 + n9_3_2 + n9_27_8 + n9_3_3 + n9_27_9 + n9_3_4 + n9_3_5 + n9_3_6 + n9_3_7 + n9_3_8 + n9_3_9 + n9_20_12 + 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_16_23 + n9_16_24 + n9_16_25 + n9_16_26 + n9_16_27 + n9_16_28 + 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_28_10 + n9_28_11 + n9_28_12 + n9_28_13 + n9_28_14 + n9_28_15 + n9_28_16 + n9_28_17 + n9_28_18 + n9_28_19 + n9_28_20 + n9_28_21 + n9_28_22 + n9_28_23 + n9_28_24 + n9_28_25 + n9_28_26 + n9_28_27 + n9_28_28 + 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_23 + n9_4_24 + n9_4_25 + n9_4_26 + n9_4_27 + n9_4_28 + n9_28_0 + n9_28_1 + n9_28_2 + n9_28_3 + n9_28_4 + n9_28_5 + n9_4_0 + n9_28_6 + n9_4_1 + n9_28_7 + n9_4_2 + n9_28_8 + n9_4_3 + n9_28_9 + n9_4_4 + n9_4_5 + n9_4_6 + n9_4_7 + n9_4_8 + n9_4_9 + n9_20_11 + 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_7_28 + n9_7_27 + n9_7_26 + n9_7_25 + n9_7_24 + n9_7_23 + 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_7_12 + n9_7_11 + 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_9_23 + n9_9_24 + n9_9_25 + n9_9_26 + n9_9_27 + n9_9_28 + 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_10_23 + n9_10_24 + n9_10_25 + n9_10_26 + n9_10_27 + n9_10_28 + 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_22_23 + n9_22_24 + n9_22_25 + n9_22_26 + n9_22_27 + n9_22_28 + 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_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_15_23 + n9_15_24 + n9_15_25 + n9_15_26 + n9_15_27 + n9_15_28 + n9_27_10 + n9_27_11 + n9_27_12 + n9_27_13 + n9_27_14 + n9_27_15 + n9_27_16 + n9_27_17 + n9_27_18 + n9_27_19 + n9_27_20 + n9_27_21 + n9_27_22 + n9_27_23 + n9_27_24 + n9_27_25 + n9_27_26 + n9_27_27 + n9_27_28 + 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_3_23 + n9_3_24 + n9_3_25 + n9_3_26 + n9_3_27 + n9_3_28 + 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_8_23 + n9_8_24 + n9_8_25 + n9_8_26 + n9_8_27 + n9_8_28 + 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_21_23 + n9_21_24 + n9_21_25 + n9_21_26 + n9_21_27 + n9_21_28 + 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_14_23 + n9_14_24 + n9_14_25 + n9_14_26 + n9_14_27 + n9_14_28 + n9_26_10 + n9_26_11 + n9_26_12 + n9_26_13 + n9_26_14 + n9_26_15 + n9_26_16 + n9_26_17 + n9_26_18 + n9_26_19 + n9_26_20 + n9_26_21 + n9_26_22 + n9_26_23 + n9_26_24 + n9_26_25 + n9_26_26 + n9_26_27 + n9_26_28 + 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 + n9_2_23 + n9_2_24 + n9_2_25 + n9_2_26 + n9_2_27 + n9_2_28 <= 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_23 + s3_24 + s3_25 + s3_26 + s3_27 + s3_28 + s3_9) AND (1 <= 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_23 + Cstart_24 + Cstart_25 + Cstart_26 + Cstart_27 + Cstart_28 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9))) AND (3 <= s6_28 + s6_27 + s6_26 + s6_25 + s6_24 + s6_23 + s6_22 + s6_21 + s6_20 + s6_19 + s6_18 + s6_17 + s6_16 + s6_15 + s6_14 + s6_13 + s6_12 + s6_11 + s6_10 + s6_9 + s6_8 + s6_7 + s6_6 + s6_5 + s6_4 + s6_3 + s6_2 + s6_1 + s6_0)))) : A (G ((a3 <= a1))) : A (G ((c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_28 + c1_27 + c1_26 + c1_25 + c1_24 + c1_23 + 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 <= AstopOK))) : E (F (((2 <= n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28) AND (CstopAbort <= a5) AND ((3 <= AstopAbort) OR (1 <= a5)) AND (AstopOK <= 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_19_23 + n9_19_24 + n9_19_25 + n9_19_26 + n9_19_27 + n9_19_28 + 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_13_10 + n9_13_11 + n9_13_12 + n9_13_13 + n9_13_14 + n9_13_15 + n9_13_16 + n9_13_17 + n9_13_18 + n9_13_19 + n9_13_20 + n9_13_21 + n9_13_22 + n9_13_23 + n9_13_24 + n9_13_25 + n9_13_26 + n9_13_27 + n9_13_28 + n9_25_10 + n9_25_11 + n9_25_12 + n9_25_13 + n9_25_14 + n9_25_15 + n9_25_16 + n9_25_17 + n9_25_18 + n9_25_19 + n9_25_20 + n9_25_21 + n9_25_22 + n9_25_23 + n9_25_24 + n9_25_25 + n9_25_26 + n9_25_27 + n9_25_28 + 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_1_23 + n9_1_24 + n9_1_25 + n9_1_26 + n9_1_27 + n9_1_28 + 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_18_23 + n9_18_24 + n9_18_25 + n9_18_26 + n9_18_27 + n9_18_28 + 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_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_6_23 + n9_6_24 + n9_6_25 + n9_6_26 + n9_6_27 + n9_6_28 + 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_12_23 + n9_12_24 + n9_12_25 + n9_12_26 + n9_12_27 + n9_12_28 + n9_24_10 + n9_24_11 + n9_24_12 + n9_24_13 + n9_24_14 + n9_24_15 + n9_24_16 + n9_24_17 + n9_24_18 + n9_24_19 + n9_24_20 + n9_24_21 + n9_24_22 + n9_24_23 + n9_24_24 + n9_24_25 + n9_24_26 + n9_24_27 + n9_24_28 + 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_0_23 + n9_0_24 + n9_0_25 + n9_0_26 + n9_0_27 + n9_0_28 + n9_23_0 + n9_23_1 + n9_23_2 + n9_23_3 + n9_23_4 + n9_23_5 + n9_23_6 + n9_23_7 + n9_23_8 + n9_23_9 + 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_17_23 + n9_17_24 + n9_17_25 + n9_17_26 + n9_17_27 + n9_17_28 + n9_24_0 + n9_24_1 + n9_24_2 + n9_24_3 + n9_24_4 + n9_24_5 + n9_0_0 + n9_24_6 + n9_0_1 + n9_24_7 + n9_0_2 + n9_24_8 + n9_0_3 + n9_24_9 + 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_5_23 + n9_5_24 + n9_5_25 + n9_5_26 + n9_5_27 + n9_5_28 + n9_25_0 + n9_25_1 + n9_25_2 + n9_25_3 + n9_25_4 + n9_25_5 + n9_1_0 + n9_25_6 + n9_1_1 + n9_25_7 + n9_1_2 + n9_25_8 + n9_1_3 + n9_25_9 + 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_11_23 + n9_11_24 + n9_11_25 + n9_11_26 + n9_11_27 + n9_11_28 + n9_23_10 + n9_23_11 + n9_23_12 + n9_23_13 + n9_23_14 + n9_23_15 + n9_23_16 + n9_23_17 + n9_23_18 + n9_23_19 + n9_23_20 + n9_23_21 + n9_23_22 + n9_23_23 + n9_23_24 + n9_23_25 + n9_23_26 + n9_23_27 + n9_23_28 + n9_20_28 + n9_20_27 + n9_20_26 + n9_20_25 + n9_20_24 + n9_20_23 + n9_20_22 + n9_20_21 + n9_20_20 + n9_20_19 + n9_20_18 + n9_26_0 + n9_26_1 + n9_26_2 + n9_26_3 + n9_26_4 + n9_26_5 + n9_2_0 + n9_26_6 + n9_2_1 + n9_26_7 + n9_2_2 + n9_26_8 + n9_2_3 + n9_26_9 + 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_20_17 + n9_20_16 + n9_20_15 + n9_20_14 + n9_20_13 + n9_27_0 + n9_27_1 + n9_27_2 + n9_27_3 + n9_27_4 + n9_27_5 + n9_3_0 + n9_27_6 + n9_3_1 + n9_27_7 + n9_3_2 + n9_27_8 + n9_3_3 + n9_27_9 + n9_3_4 + n9_3_5 + n9_3_6 + n9_3_7 + n9_3_8 + n9_3_9 + n9_20_12 + 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_16_23 + n9_16_24 + n9_16_25 + n9_16_26 + n9_16_27 + n9_16_28 + 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_28_10 + n9_28_11 + n9_28_12 + n9_28_13 + n9_28_14 + n9_28_15 + n9_28_16 + n9_28_17 + n9_28_18 + n9_28_19 + n9_28_20 + n9_28_21 + n9_28_22 + n9_28_23 + n9_28_24 + n9_28_25 + n9_28_26 + n9_28_27 + n9_28_28 + 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_23 + n9_4_24 + n9_4_25 + n9_4_26 + n9_4_27 + n9_4_28 + n9_28_0 + n9_28_1 + n9_28_2 + n9_28_3 + n9_28_4 + n9_28_5 + n9_4_0 + n9_28_6 + n9_4_1 + n9_28_7 + n9_4_2 + n9_28_8 + n9_4_3 + n9_28_9 + n9_4_4 + n9_4_5 + n9_4_6 + n9_4_7 + n9_4_8 + n9_4_9 + n9_20_11 + 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_7_28 + n9_7_27 + n9_7_26 + n9_7_25 + n9_7_24 + n9_7_23 + 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_7_12 + n9_7_11 + 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_9_23 + n9_9_24 + n9_9_25 + n9_9_26 + n9_9_27 + n9_9_28 + 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_10_23 + n9_10_24 + n9_10_25 + n9_10_26 + n9_10_27 + n9_10_28 + 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_22_23 + n9_22_24 + n9_22_25 + n9_22_26 + n9_22_27 + n9_22_28 + 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_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_15_23 + n9_15_24 + n9_15_25 + n9_15_26 + n9_15_27 + n9_15_28 + n9_27_10 + n9_27_11 + n9_27_12 + n9_27_13 + n9_27_14 + n9_27_15 + n9_27_16 + n9_27_17 + n9_27_18 + n9_27_19 + n9_27_20 + n9_27_21 + n9_27_22 + n9_27_23 + n9_27_24 + n9_27_25 + n9_27_26 + n9_27_27 + n9_27_28 + 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_3_23 + n9_3_24 + n9_3_25 + n9_3_26 + n9_3_27 + n9_3_28 + 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_8_23 + n9_8_24 + n9_8_25 + n9_8_26 + n9_8_27 + n9_8_28 + 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_21_23 + n9_21_24 + n9_21_25 + n9_21_26 + n9_21_27 + n9_21_28 + 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_14_23 + n9_14_24 + n9_14_25 + n9_14_26 + n9_14_27 + n9_14_28 + n9_26_10 + n9_26_11 + n9_26_12 + n9_26_13 + n9_26_14 + n9_26_15 + n9_26_16 + n9_26_17 + n9_26_18 + n9_26_19 + n9_26_20 + n9_26_21 + n9_26_22 + n9_26_23 + n9_26_24 + n9_26_25 + n9_26_26 + n9_26_27 + n9_26_28 + 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 + n9_2_23 + n9_2_24 + n9_2_25 + n9_2_26 + n9_2_27 + n9_2_28)))) : E (F ((((Astart <= 0) AND (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_21_23 + n7_21_24 + n7_21_25 + n7_21_26 + n7_21_27 + n7_21_28 + n7_3_10 + n7_15_0 + n7_6_0 + n7_4_10 + n7_27_0 + n7_28_10 + n7_16_10 + n7_5_10 + n7_11_10 + n7_10_0 + n7_23_0 + n7_0_10 + n7_22_0 + n7_18_0 + n7_7_0 + n7_24_10 + n7_12_10 + n7_14_10 + n7_1_10 + n7_26_10 + n7_25_10 + n7_13_10 + n7_8_10 + n7_9_0 + n7_2_10 + n7_20_10 + n7_19_0 + n7_19_4 + n7_19_5 + n7_19_6 + n7_19_7 + n7_19_8 + n7_19_9 + n7_19_3 + n7_19_2 + n7_19_1 + n7_8_0 + n7_8_1 + n7_8_2 + n7_8_3 + n7_8_4 + n7_8_5 + n7_8_6 + n7_8_7 + n7_8_8 + n7_8_9 + n7_8_28 + n7_8_27 + n7_8_26 + 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_19_23 + n7_19_24 + n7_19_25 + n7_19_26 + n7_19_27 + n7_19_28 + n7_8_25 + n7_8_24 + 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_20_23 + n7_20_24 + n7_20_25 + n7_20_26 + n7_20_27 + n7_20_28 + n7_8_23 + 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_2_23 + n7_2_24 + n7_2_25 + n7_2_26 + n7_2_27 + n7_2_28 + n7_8_22 + n7_8_21 + 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_8_20 + n7_8_19 + n7_8_18 + n7_8_17 + n7_8_16 + n7_8_15 + n7_8_14 + n7_8_13 + n7_8_12 + n7_8_11 + n7_26_28 + n7_26_27 + n7_26_26 + n7_26_25 + n7_26_24 + n7_26_23 + n7_26_22 + n7_26_21 + n7_26_20 + n7_26_19 + n7_26_18 + n7_26_17 + n7_26_16 + n7_26_15 + n7_26_14 + n7_26_13 + 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_13_23 + n7_13_24 + n7_13_25 + n7_13_26 + n7_13_27 + n7_13_28 + n7_26_12 + n7_25_11 + n7_25_12 + n7_25_13 + n7_25_14 + n7_25_15 + n7_25_16 + n7_25_17 + n7_25_18 + n7_25_19 + n7_25_20 + n7_25_21 + n7_25_22 + n7_25_23 + n7_25_24 + n7_25_25 + n7_25_26 + n7_25_27 + n7_25_28 + 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_7_23 + n7_7_24 + n7_7_25 + n7_7_26 + n7_7_27 + n7_7_28 + n7_26_11 + n7_14_28 + n7_14_27 + n7_14_26 + n7_14_25 + n7_14_24 + n7_14_23 + n7_14_22 + n7_14_21 + n7_14_20 + 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_18_23 + n7_18_24 + n7_18_25 + n7_18_26 + n7_18_27 + n7_18_28 + 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_1_23 + n7_1_24 + n7_1_25 + n7_1_26 + n7_1_27 + n7_1_28 + 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_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_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_12_23 + n7_12_24 + n7_12_25 + n7_12_26 + n7_12_27 + n7_12_28 + n7_24_11 + n7_24_12 + n7_24_13 + n7_24_14 + n7_24_15 + n7_24_16 + n7_24_17 + n7_24_18 + n7_24_19 + n7_24_20 + n7_24_21 + n7_24_22 + n7_24_23 + n7_24_24 + n7_24_25 + n7_24_26 + n7_24_27 + n7_24_28 + 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_6_23 + n7_6_24 + n7_6_25 + n7_6_26 + n7_6_27 + n7_6_28 + 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_18_5 + n7_18_4 + n7_18_3 + n7_18_2 + n7_18_1 + 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_17_23 + n7_17_24 + n7_17_25 + n7_17_26 + n7_17_27 + n7_17_28 + 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_0_23 + n7_0_24 + n7_0_25 + n7_0_26 + n7_0_27 + n7_0_28 + n7_23_1 + n7_23_2 + n7_23_3 + n7_23_4 + n7_23_5 + n7_23_6 + n7_23_7 + n7_23_8 + n7_23_9 + 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_24_0 + n7_24_1 + n7_24_2 + n7_24_3 + n7_24_4 + n7_24_5 + n7_24_6 + n7_24_7 + n7_24_8 + n7_24_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_11_23 + n7_11_24 + n7_11_25 + n7_11_26 + n7_11_27 + n7_11_28 + n7_23_10 + n7_23_11 + n7_23_12 + n7_23_13 + n7_23_14 + n7_23_15 + n7_23_16 + n7_23_17 + n7_23_18 + n7_23_19 + n7_23_20 + n7_23_21 + n7_23_22 + n7_23_23 + n7_23_24 + n7_23_25 + n7_23_26 + n7_23_27 + n7_23_28 + 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_5_23 + n7_5_24 + n7_5_25 + n7_5_26 + n7_5_27 + n7_5_28 + 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_25_0 + n7_25_1 + n7_25_2 + n7_25_3 + n7_25_4 + n7_25_5 + n7_25_6 + n7_25_7 + n7_25_8 + n7_25_9 + 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_16_23 + n7_16_24 + n7_16_25 + n7_16_26 + n7_16_27 + n7_16_28 + n7_28_11 + n7_28_12 + n7_28_13 + n7_28_14 + n7_28_15 + n7_28_16 + n7_28_17 + n7_28_18 + n7_28_19 + n7_28_20 + n7_28_21 + n7_28_22 + n7_28_23 + n7_28_24 + n7_28_25 + n7_28_26 + n7_28_27 + n7_28_28 + n7_26_0 + n7_26_1 + n7_26_2 + n7_26_3 + n7_26_4 + n7_26_5 + n7_26_6 + n7_26_7 + n7_26_8 + n7_26_9 + 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_27_1 + n7_27_2 + n7_27_3 + n7_27_4 + n7_27_5 + n7_27_6 + n7_27_7 + n7_27_8 + n7_27_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_10_23 + n7_10_24 + n7_10_25 + n7_10_26 + n7_10_27 + n7_10_28 + 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_22_23 + n7_22_24 + n7_22_25 + n7_22_26 + n7_22_27 + n7_22_28 + 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_4_23 + n7_4_24 + n7_4_25 + n7_4_26 + n7_4_27 + n7_4_28 + 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_6_8 + n7_6_7 + n7_6_6 + n7_6_5 + n7_6_4 + n7_6_3 + n7_6_2 + n7_6_1 + n7_28_0 + n7_28_1 + n7_28_2 + n7_28_3 + n7_28_4 + n7_28_5 + n7_28_6 + n7_28_7 + n7_28_8 + n7_28_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_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_28 + n7_3_27 + n7_3_26 + n7_3_25 + n7_3_24 + n7_3_23 + 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_15_23 + n7_15_24 + n7_15_25 + n7_15_26 + n7_15_27 + n7_15_28 + n7_27_10 + n7_27_11 + n7_27_12 + n7_27_13 + n7_27_14 + n7_27_15 + n7_27_16 + n7_27_17 + n7_27_18 + n7_27_19 + n7_27_20 + n7_27_21 + n7_27_22 + n7_27_23 + n7_27_24 + n7_27_25 + n7_27_26 + n7_27_27 + n7_27_28 + 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_9_23 + n7_9_24 + n7_9_25 + n7_9_26 + n7_9_27 + n7_9_28 + 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 + 1 <= n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28)) OR (((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_23 + Cstart_24 + Cstart_25 + Cstart_26 + Cstart_27 + Cstart_28 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9 <= AstopAbort) OR (3 <= s2_9 + s2_8 + s2_7 + s2_6 + s2_5 + s2_4 + s2_3 + s2_2 + s2_1 + s2_0 + s2_28 + s2_27 + s2_26 + s2_25 + s2_24 + s2_23 + 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)) AND (n8_24_0 + n8_14_10 + n8_26_10 + n8_21_0 + n8_11_0 + n8_22_10 + n8_10_10 + n8_5_10 + n8_0_0 + n8_23_10 + n8_25_0 + n8_12_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_1_0 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_28_0 + n8_4_10 + n8_3_0 + n8_27_0 + n8_19_10 + n8_2_0 + n8_13_0 + n8_26_0 + n8_20_10 + n8_20_11 + n8_20_12 + n8_20_13 + n8_20_14 + n8_20_15 + n8_20_16 + n8_20_17 + n8_20_18 + n8_20_19 + n8_20_20 + n8_20_21 + n8_20_22 + n8_20_23 + n8_20_24 + n8_20_25 + n8_20_26 + n8_20_27 + n8_20_28 + n8_19_28 + n8_19_27 + n8_19_26 + n8_19_25 + n8_19_24 + n8_19_23 + n8_19_22 + n8_19_21 + n8_26_1 + n8_26_2 + n8_26_3 + n8_26_4 + n8_26_5 + n8_26_6 + n8_26_7 + n8_26_8 + n8_26_9 + n8_19_20 + 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_19_19 + n8_19_18 + 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_19_17 + n8_19_16 + n8_19_15 + n8_19_14 + n8_19_13 + n8_19_12 + n8_19_11 + n8_27_1 + n8_27_2 + n8_27_3 + n8_27_4 + n8_27_5 + n8_27_6 + n8_27_7 + n8_27_8 + n8_27_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_13_23 + n8_13_24 + n8_13_25 + n8_13_26 + n8_13_27 + n8_13_28 + n8_25_10 + n8_25_11 + n8_25_12 + n8_25_13 + n8_25_14 + n8_25_15 + n8_25_16 + n8_25_17 + n8_25_18 + n8_25_19 + n8_25_20 + n8_25_21 + n8_25_22 + n8_25_23 + n8_25_24 + n8_25_25 + n8_25_26 + n8_25_27 + n8_25_28 + 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_4_23 + n8_4_24 + n8_4_25 + n8_4_26 + n8_4_27 + n8_4_28 + n8_28_1 + n8_28_2 + n8_28_3 + n8_28_4 + n8_28_5 + n8_28_6 + n8_28_7 + n8_28_8 + n8_28_9 + 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_18_23 + n8_18_24 + n8_18_25 + n8_18_26 + n8_18_27 + n8_18_28 + 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_9_23 + n8_9_24 + n8_9_25 + n8_9_26 + n8_9_27 + n8_9_28 + 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_1_9 + n8_1_8 + 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_12_23 + n8_12_24 + n8_12_25 + n8_12_26 + n8_12_27 + n8_12_28 + n8_24_10 + n8_24_11 + n8_24_12 + n8_24_13 + n8_24_14 + n8_24_15 + n8_24_16 + n8_24_17 + n8_24_18 + n8_24_19 + n8_1_7 + n8_1_6 + n8_1_5 + n8_1_4 + n8_1_3 + n8_1_2 + n8_1_1 + 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_24_20 + n8_24_21 + n8_24_22 + n8_24_23 + n8_24_24 + n8_24_25 + n8_24_26 + n8_24_27 + n8_24_28 + n8_12_9 + n8_12_8 + n8_12_7 + n8_12_6 + 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_3_23 + n8_3_24 + n8_3_25 + n8_3_26 + n8_3_27 + n8_3_28 + 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_12_5 + 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_12_4 + n8_12_3 + 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_17_23 + n8_17_24 + n8_17_25 + n8_17_26 + n8_17_27 + n8_17_28 + n8_12_2 + 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_8_23 + n8_8_24 + n8_8_25 + n8_8_26 + n8_8_27 + n8_8_28 + n8_12_1 + n8_25_9 + n8_25_8 + n8_25_7 + n8_25_6 + n8_25_5 + n8_25_4 + n8_25_3 + n8_25_2 + n8_25_1 + 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_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_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_11_23 + n8_11_24 + n8_11_25 + n8_11_26 + n8_11_27 + n8_11_28 + n8_23_11 + n8_23_12 + n8_23_13 + n8_23_14 + n8_23_15 + n8_23_16 + n8_23_17 + n8_23_18 + n8_23_19 + n8_23_20 + n8_23_21 + n8_23_22 + n8_23_23 + n8_23_24 + n8_23_25 + n8_23_26 + n8_23_27 + n8_23_28 + 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_2_23 + n8_2_24 + n8_2_25 + n8_2_26 + n8_2_27 + n8_2_28 + 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_16_23 + n8_16_24 + n8_16_25 + n8_16_26 + n8_16_27 + n8_16_28 + n8_28_10 + n8_28_11 + n8_28_12 + n8_28_13 + n8_28_14 + n8_28_15 + n8_28_16 + n8_28_17 + n8_28_18 + n8_28_19 + n8_28_20 + n8_28_21 + n8_28_22 + n8_28_23 + n8_28_24 + n8_28_25 + n8_28_26 + n8_28_27 + n8_28_28 + n8_0_9 + n8_0_8 + 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_7_23 + n8_7_24 + n8_7_25 + n8_7_26 + n8_7_27 + n8_7_28 + n8_0_7 + n8_0_6 + n8_0_5 + n8_0_4 + n8_0_3 + n8_0_2 + n8_0_1 + n8_5_28 + n8_5_27 + n8_5_26 + n8_5_25 + n8_5_24 + n8_5_23 + n8_5_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_26_28 + n8_26_27 + n8_26_26 + n8_26_25 + n8_26_24 + n8_26_23 + n8_26_22 + n8_26_21 + 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_10_23 + n8_10_24 + n8_10_25 + n8_10_26 + n8_10_27 + n8_10_28 + n8_26_20 + 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_22_23 + n8_22_24 + n8_22_25 + n8_22_26 + n8_22_27 + n8_22_28 + 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_1_23 + n8_1_24 + n8_1_25 + n8_1_26 + n8_1_27 + n8_1_28 + 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_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_26_19 + n8_26_18 + 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_15_23 + n8_15_24 + n8_15_25 + n8_15_26 + n8_15_27 + n8_15_28 + n8_27_10 + n8_27_11 + n8_27_12 + n8_27_13 + n8_27_14 + n8_27_15 + n8_27_16 + n8_27_17 + n8_27_18 + n8_27_19 + n8_26_17 + n8_26_16 + 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_27_20 + n8_27_21 + n8_27_22 + n8_27_23 + n8_27_24 + n8_27_25 + n8_27_26 + n8_27_27 + n8_27_28 + 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_6_23 + n8_6_24 + n8_6_25 + n8_6_26 + n8_6_27 + n8_6_28 + n8_26_15 + n8_26_14 + n8_26_13 + n8_26_12 + n8_26_11 + n8_14_28 + n8_14_27 + n8_14_26 + n8_14_25 + n8_14_24 + n8_14_23 + n8_14_22 + n8_14_21 + n8_14_20 + n8_14_19 + n8_14_18 + n8_14_17 + n8_14_16 + n8_14_15 + n8_14_14 + n8_14_13 + n8_14_12 + n8_14_11 + n8_24_9 + n8_24_8 + n8_24_7 + n8_24_6 + n8_24_5 + n8_24_4 + n8_24_3 + n8_24_2 + 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_24_1 + 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_21_23 + n8_21_24 + n8_21_25 + n8_21_26 + n8_21_27 + n8_21_28 + 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_0_23 + n8_0_24 + n8_0_25 + n8_0_26 + n8_0_27 + n8_0_28 + n8_23_0 + n8_23_1 + n8_23_2 + n8_23_3 + n8_23_4 + n8_23_5 + n8_23_6 + n8_23_7 + n8_23_8 + n8_23_9 + 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 <= malicious_reservoir))))) : E (F (((n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28 + 1 <= a2) AND (((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_23 + n4_24 + n4_25 + n4_26 + n4_27 + n4_28 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9)) OR ((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_23 + s3_24 + s3_25 + s3_26 + s3_27 + s3_28 + s3_9 <= c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_28 + c1_27 + c1_26 + c1_25 + c1_24 + c1_23 + 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) AND (2 <= SstopOK_9 + SstopOK_8 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_21 + SstopOK_22 + SstopOK_23 + SstopOK_24 + SstopOK_25 + SstopOK_26 + SstopOK_27 + SstopOK_28 + SstopOK_20 + SstopOK_1 + SstopOK_6 + SstopOK_7)))))) : E (F ((3 <= a3))) : E (F ((((1 <= CstopAbort) OR (1 <= 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_23 + s3_24 + s3_25 + s3_26 + s3_27 + s3_28 + s3_9) OR ((a3 <= n8_24_0 + n8_14_10 + n8_26_10 + n8_21_0 + n8_11_0 + n8_22_10 + n8_10_10 + n8_5_10 + n8_0_0 + n8_23_10 + n8_25_0 + n8_12_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_1_0 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_28_0 + n8_4_10 + n8_3_0 + n8_27_0 + n8_19_10 + n8_2_0 + n8_13_0 + n8_26_0 + n8_20_10 + n8_20_11 + n8_20_12 + n8_20_13 + n8_20_14 + n8_20_15 + n8_20_16 + n8_20_17 + n8_20_18 + n8_20_19 + n8_20_20 + n8_20_21 + n8_20_22 + n8_20_23 + n8_20_24 + n8_20_25 + n8_20_26 + n8_20_27 + n8_20_28 + n8_19_28 + n8_19_27 + n8_19_26 + n8_19_25 + n8_19_24 + n8_19_23 + n8_19_22 + n8_19_21 + n8_26_1 + n8_26_2 + n8_26_3 + n8_26_4 + n8_26_5 + n8_26_6 + n8_26_7 + n8_26_8 + n8_26_9 + n8_19_20 + 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_19_19 + n8_19_18 + 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_19_17 + n8_19_16 + n8_19_15 + n8_19_14 + n8_19_13 + n8_19_12 + n8_19_11 + n8_27_1 + n8_27_2 + n8_27_3 + n8_27_4 + n8_27_5 + n8_27_6 + n8_27_7 + n8_27_8 + n8_27_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_13_23 + n8_13_24 + n8_13_25 + n8_13_26 + n8_13_27 + n8_13_28 + n8_25_10 + n8_25_11 + n8_25_12 + n8_25_13 + n8_25_14 + n8_25_15 + n8_25_16 + n8_25_17 + n8_25_18 + n8_25_19 + n8_25_20 + n8_25_21 + n8_25_22 + n8_25_23 + n8_25_24 + n8_25_25 + n8_25_26 + n8_25_27 + n8_25_28 + 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_4_23 + n8_4_24 + n8_4_25 + n8_4_26 + n8_4_27 + n8_4_28 + n8_28_1 + n8_28_2 + n8_28_3 + n8_28_4 + n8_28_5 + n8_28_6 + n8_28_7 + n8_28_8 + n8_28_9 + 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_18_23 + n8_18_24 + n8_18_25 + n8_18_26 + n8_18_27 + n8_18_28 + 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_9_23 + n8_9_24 + n8_9_25 + n8_9_26 + n8_9_27 + n8_9_28 + 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_1_9 + n8_1_8 + 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_12_23 + n8_12_24 + n8_12_25 + n8_12_26 + n8_12_27 + n8_12_28 + n8_24_10 + n8_24_11 + n8_24_12 + n8_24_13 + n8_24_14 + n8_24_15 + n8_24_16 + n8_24_17 + n8_24_18 + n8_24_19 + n8_1_7 + n8_1_6 + n8_1_5 + n8_1_4 + n8_1_3 + n8_1_2 + n8_1_1 + 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_24_20 + n8_24_21 + n8_24_22 + n8_24_23 + n8_24_24 + n8_24_25 + n8_24_26 + n8_24_27 + n8_24_28 + n8_12_9 + n8_12_8 + n8_12_7 + n8_12_6 + 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_3_23 + n8_3_24 + n8_3_25 + n8_3_26 + n8_3_27 + n8_3_28 + 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_12_5 + 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_12_4 + n8_12_3 + 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_17_23 + n8_17_24 + n8_17_25 + n8_17_26 + n8_17_27 + n8_17_28 + n8_12_2 + 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_8_23 + n8_8_24 + n8_8_25 + n8_8_26 + n8_8_27 + n8_8_28 + n8_12_1 + n8_25_9 + n8_25_8 + n8_25_7 + n8_25_6 + n8_25_5 + n8_25_4 + n8_25_3 + n8_25_2 + n8_25_1 + 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_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_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_11_23 + n8_11_24 + n8_11_25 + n8_11_26 + n8_11_27 + n8_11_28 + n8_23_11 + n8_23_12 + n8_23_13 + n8_23_14 + n8_23_15 + n8_23_16 + n8_23_17 + n8_23_18 + n8_23_19 + n8_23_20 + n8_23_21 + n8_23_22 + n8_23_23 + n8_23_24 + n8_23_25 + n8_23_26 + n8_23_27 + n8_23_28 + 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_2_23 + n8_2_24 + n8_2_25 + n8_2_26 + n8_2_27 + n8_2_28 + 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_16_23 + n8_16_24 + n8_16_25 + n8_16_26 + n8_16_27 + n8_16_28 + n8_28_10 + n8_28_11 + n8_28_12 + n8_28_13 + n8_28_14 + n8_28_15 + n8_28_16 + n8_28_17 + n8_28_18 + n8_28_19 + n8_28_20 + n8_28_21 + n8_28_22 + n8_28_23 + n8_28_24 + n8_28_25 + n8_28_26 + n8_28_27 + n8_28_28 + n8_0_9 + n8_0_8 + 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_7_23 + n8_7_24 + n8_7_25 + n8_7_26 + n8_7_27 + n8_7_28 + n8_0_7 + n8_0_6 + n8_0_5 + n8_0_4 + n8_0_3 + n8_0_2 + n8_0_1 + n8_5_28 + n8_5_27 + n8_5_26 + n8_5_25 + n8_5_24 + n8_5_23 + n8_5_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_26_28 + n8_26_27 + n8_26_26 + n8_26_25 + n8_26_24 + n8_26_23 + n8_26_22 + n8_26_21 + 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_10_23 + n8_10_24 + n8_10_25 + n8_10_26 + n8_10_27 + n8_10_28 + n8_26_20 + 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_22_23 + n8_22_24 + n8_22_25 + n8_22_26 + n8_22_27 + n8_22_28 + 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_1_23 + n8_1_24 + n8_1_25 + n8_1_26 + n8_1_27 + n8_1_28 + 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_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_26_19 + n8_26_18 + 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_15_23 + n8_15_24 + n8_15_25 + n8_15_26 + n8_15_27 + n8_15_28 + n8_27_10 + n8_27_11 + n8_27_12 + n8_27_13 + n8_27_14 + n8_27_15 + n8_27_16 + n8_27_17 + n8_27_18 + n8_27_19 + n8_26_17 + n8_26_16 + 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_27_20 + n8_27_21 + n8_27_22 + n8_27_23 + n8_27_24 + n8_27_25 + n8_27_26 + n8_27_27 + n8_27_28 + 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_6_23 + n8_6_24 + n8_6_25 + n8_6_26 + n8_6_27 + n8_6_28 + n8_26_15 + n8_26_14 + n8_26_13 + n8_26_12 + n8_26_11 + n8_14_28 + n8_14_27 + n8_14_26 + n8_14_25 + n8_14_24 + n8_14_23 + n8_14_22 + n8_14_21 + n8_14_20 + n8_14_19 + n8_14_18 + n8_14_17 + n8_14_16 + n8_14_15 + n8_14_14 + n8_14_13 + n8_14_12 + n8_14_11 + n8_24_9 + n8_24_8 + n8_24_7 + n8_24_6 + n8_24_5 + n8_24_4 + n8_24_3 + n8_24_2 + 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_24_1 + 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_21_23 + n8_21_24 + n8_21_25 + n8_21_26 + n8_21_27 + n8_21_28 + 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_0_23 + n8_0_24 + n8_0_25 + n8_0_26 + n8_0_27 + n8_0_28 + n8_23_0 + n8_23_1 + n8_23_2 + n8_23_3 + n8_23_4 + n8_23_5 + n8_23_6 + n8_23_7 + n8_23_8 + n8_23_9 + 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))) AND (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_19_23 + n9_19_24 + n9_19_25 + n9_19_26 + n9_19_27 + n9_19_28 + 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_13_10 + n9_13_11 + n9_13_12 + n9_13_13 + n9_13_14 + n9_13_15 + n9_13_16 + n9_13_17 + n9_13_18 + n9_13_19 + n9_13_20 + n9_13_21 + n9_13_22 + n9_13_23 + n9_13_24 + n9_13_25 + n9_13_26 + n9_13_27 + n9_13_28 + n9_25_10 + n9_25_11 + n9_25_12 + n9_25_13 + n9_25_14 + n9_25_15 + n9_25_16 + n9_25_17 + n9_25_18 + n9_25_19 + n9_25_20 + n9_25_21 + n9_25_22 + n9_25_23 + n9_25_24 + n9_25_25 + n9_25_26 + n9_25_27 + n9_25_28 + 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_1_23 + n9_1_24 + n9_1_25 + n9_1_26 + n9_1_27 + n9_1_28 + 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_18_23 + n9_18_24 + n9_18_25 + n9_18_26 + n9_18_27 + n9_18_28 + 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_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_6_23 + n9_6_24 + n9_6_25 + n9_6_26 + n9_6_27 + n9_6_28 + 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_12_23 + n9_12_24 + n9_12_25 + n9_12_26 + n9_12_27 + n9_12_28 + n9_24_10 + n9_24_11 + n9_24_12 + n9_24_13 + n9_24_14 + n9_24_15 + n9_24_16 + n9_24_17 + n9_24_18 + n9_24_19 + n9_24_20 + n9_24_21 + n9_24_22 + n9_24_23 + n9_24_24 + n9_24_25 + n9_24_26 + n9_24_27 + n9_24_28 + 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_0_23 + n9_0_24 + n9_0_25 + n9_0_26 + n9_0_27 + n9_0_28 + n9_23_0 + n9_23_1 + n9_23_2 + n9_23_3 + n9_23_4 + n9_23_5 + n9_23_6 + n9_23_7 + n9_23_8 + n9_23_9 + 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_17_23 + n9_17_24 + n9_17_25 + n9_17_26 + n9_17_27 + n9_17_28 + n9_24_0 + n9_24_1 + n9_24_2 + n9_24_3 + n9_24_4 + n9_24_5 + n9_0_0 + n9_24_6 + n9_0_1 + n9_24_7 + n9_0_2 + n9_24_8 + n9_0_3 + n9_24_9 + 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_5_23 + n9_5_24 + n9_5_25 + n9_5_26 + n9_5_27 + n9_5_28 + n9_25_0 + n9_25_1 + n9_25_2 + n9_25_3 + n9_25_4 + n9_25_5 + n9_1_0 + n9_25_6 + n9_1_1 + n9_25_7 + n9_1_2 + n9_25_8 + n9_1_3 + n9_25_9 + 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_11_23 + n9_11_24 + n9_11_25 + n9_11_26 + n9_11_27 + n9_11_28 + n9_23_10 + n9_23_11 + n9_23_12 + n9_23_13 + n9_23_14 + n9_23_15 + n9_23_16 + n9_23_17 + n9_23_18 + n9_23_19 + n9_23_20 + n9_23_21 + n9_23_22 + n9_23_23 + n9_23_24 + n9_23_25 + n9_23_26 + n9_23_27 + n9_23_28 + n9_20_28 + n9_20_27 + n9_20_26 + n9_20_25 + n9_20_24 + n9_20_23 + n9_20_22 + n9_20_21 + n9_20_20 + n9_20_19 + n9_20_18 + n9_26_0 + n9_26_1 + n9_26_2 + n9_26_3 + n9_26_4 + n9_26_5 + n9_2_0 + n9_26_6 + n9_2_1 + n9_26_7 + n9_2_2 + n9_26_8 + n9_2_3 + n9_26_9 + 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_20_17 + n9_20_16 + n9_20_15 + n9_20_14 + n9_20_13 + n9_27_0 + n9_27_1 + n9_27_2 + n9_27_3 + n9_27_4 + n9_27_5 + n9_3_0 + n9_27_6 + n9_3_1 + n9_27_7 + n9_3_2 + n9_27_8 + n9_3_3 + n9_27_9 + n9_3_4 + n9_3_5 + n9_3_6 + n9_3_7 + n9_3_8 + n9_3_9 + n9_20_12 + 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_16_23 + n9_16_24 + n9_16_25 + n9_16_26 + n9_16_27 + n9_16_28 + 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_28_10 + n9_28_11 + n9_28_12 + n9_28_13 + n9_28_14 + n9_28_15 + n9_28_16 + n9_28_17 + n9_28_18 + n9_28_19 + n9_28_20 + n9_28_21 + n9_28_22 + n9_28_23 + n9_28_24 + n9_28_25 + n9_28_26 + n9_28_27 + n9_28_28 + 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_23 + n9_4_24 + n9_4_25 + n9_4_26 + n9_4_27 + n9_4_28 + n9_28_0 + n9_28_1 + n9_28_2 + n9_28_3 + n9_28_4 + n9_28_5 + n9_4_0 + n9_28_6 + n9_4_1 + n9_28_7 + n9_4_2 + n9_28_8 + n9_4_3 + n9_28_9 + n9_4_4 + n9_4_5 + n9_4_6 + n9_4_7 + n9_4_8 + n9_4_9 + n9_20_11 + 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_7_28 + n9_7_27 + n9_7_26 + n9_7_25 + n9_7_24 + n9_7_23 + 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_7_12 + n9_7_11 + 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_9_23 + n9_9_24 + n9_9_25 + n9_9_26 + n9_9_27 + n9_9_28 + 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_10_23 + n9_10_24 + n9_10_25 + n9_10_26 + n9_10_27 + n9_10_28 + 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_22_23 + n9_22_24 + n9_22_25 + n9_22_26 + n9_22_27 + n9_22_28 + 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_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_15_23 + n9_15_24 + n9_15_25 + n9_15_26 + n9_15_27 + n9_15_28 + n9_27_10 + n9_27_11 + n9_27_12 + n9_27_13 + n9_27_14 + n9_27_15 + n9_27_16 + n9_27_17 + n9_27_18 + n9_27_19 + n9_27_20 + n9_27_21 + n9_27_22 + n9_27_23 + n9_27_24 + n9_27_25 + n9_27_26 + n9_27_27 + n9_27_28 + 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_3_23 + n9_3_24 + n9_3_25 + n9_3_26 + n9_3_27 + n9_3_28 + 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_8_23 + n9_8_24 + n9_8_25 + n9_8_26 + n9_8_27 + n9_8_28 + 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_21_23 + n9_21_24 + n9_21_25 + n9_21_26 + n9_21_27 + n9_21_28 + 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_14_23 + n9_14_24 + n9_14_25 + n9_14_26 + n9_14_27 + n9_14_28 + n9_26_10 + n9_26_11 + n9_26_12 + n9_26_13 + n9_26_14 + n9_26_15 + n9_26_16 + n9_26_17 + n9_26_18 + n9_26_19 + n9_26_20 + n9_26_21 + n9_26_22 + n9_26_23 + n9_26_24 + n9_26_25 + n9_26_26 + n9_26_27 + n9_26_28 + 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 + n9_2_23 + n9_2_24 + n9_2_25 + n9_2_26 + n9_2_27 + n9_2_28 + 1 <= a5)))) : E (F ((((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 + CstopOK_23 + CstopOK_24 + CstopOK_25 + CstopOK_26 + CstopOK_27 + CstopOK_28 <= c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_28 + c1_27 + c1_26 + c1_25 + c1_24 + c1_23 + 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) AND (2 <= SstopOK_9 + SstopOK_8 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_21 + SstopOK_22 + SstopOK_23 + SstopOK_24 + SstopOK_25 + SstopOK_26 + SstopOK_27 + SstopOK_28 + SstopOK_20 + SstopOK_1 + SstopOK_6 + SstopOK_7)) OR ((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 + CstopOK_23 + CstopOK_24 + CstopOK_25 + CstopOK_26 + CstopOK_27 + CstopOK_28 <= AstopOK) AND (1 <= 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_23 + n4_24 + n4_25 + n4_26 + n4_27 + n4_28 + n4_0 + n4_1 + n4_2 + n4_3 + n4_4 + n4_5 + n4_6 + n4_7 + n4_8 + n4_9)) OR ((s2_9 + s2_8 + s2_7 + s2_6 + s2_5 + s2_4 + s2_3 + s2_2 + s2_1 + s2_0 + s2_28 + s2_27 + s2_26 + s2_25 + s2_24 + s2_23 + 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 + 1 <= a5) AND (malicious_reservoir <= 1))))) : A (G (((1 <= n8_24_0 + n8_14_10 + n8_26_10 + n8_21_0 + n8_11_0 + n8_22_10 + n8_10_10 + n8_5_10 + n8_0_0 + n8_23_10 + n8_25_0 + n8_12_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_1_0 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_28_0 + n8_4_10 + n8_3_0 + n8_27_0 + n8_19_10 + n8_2_0 + n8_13_0 + n8_26_0 + n8_20_10 + n8_20_11 + n8_20_12 + n8_20_13 + n8_20_14 + n8_20_15 + n8_20_16 + n8_20_17 + n8_20_18 + n8_20_19 + n8_20_20 + n8_20_21 + n8_20_22 + n8_20_23 + n8_20_24 + n8_20_25 + n8_20_26 + n8_20_27 + n8_20_28 + n8_19_28 + n8_19_27 + n8_19_26 + n8_19_25 + n8_19_24 + n8_19_23 + n8_19_22 + n8_19_21 + n8_26_1 + n8_26_2 + n8_26_3 + n8_26_4 + n8_26_5 + n8_26_6 + n8_26_7 + n8_26_8 + n8_26_9 + n8_19_20 + 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_19_19 + n8_19_18 + 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_19_17 + n8_19_16 + n8_19_15 + n8_19_14 + n8_19_13 + n8_19_12 + n8_19_11 + n8_27_1 + n8_27_2 + n8_27_3 + n8_27_4 + n8_27_5 + n8_27_6 + n8_27_7 + n8_27_8 + n8_27_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_13_23 + n8_13_24 + n8_13_25 + n8_13_26 + n8_13_27 + n8_13_28 + n8_25_10 + n8_25_11 + n8_25_12 + n8_25_13 + n8_25_14 + n8_25_15 + n8_25_16 + n8_25_17 + n8_25_18 + n8_25_19 + n8_25_20 + n8_25_21 + n8_25_22 + n8_25_23 + n8_25_24 + n8_25_25 + n8_25_26 + n8_25_27 + n8_25_28 + 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_4_23 + n8_4_24 + n8_4_25 + n8_4_26 + n8_4_27 + n8_4_28 + n8_28_1 + n8_28_2 + n8_28_3 + n8_28_4 + n8_28_5 + n8_28_6 + n8_28_7 + n8_28_8 + n8_28_9 + 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_18_23 + n8_18_24 + n8_18_25 + n8_18_26 + n8_18_27 + n8_18_28 + 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_9_23 + n8_9_24 + n8_9_25 + n8_9_26 + n8_9_27 + n8_9_28 + 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_1_9 + n8_1_8 + 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_12_23 + n8_12_24 + n8_12_25 + n8_12_26 + n8_12_27 + n8_12_28 + n8_24_10 + n8_24_11 + n8_24_12 + n8_24_13 + n8_24_14 + n8_24_15 + n8_24_16 + n8_24_17 + n8_24_18 + n8_24_19 + n8_1_7 + n8_1_6 + n8_1_5 + n8_1_4 + n8_1_3 + n8_1_2 + n8_1_1 + 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_24_20 + n8_24_21 + n8_24_22 + n8_24_23 + n8_24_24 + n8_24_25 + n8_24_26 + n8_24_27 + n8_24_28 + n8_12_9 + n8_12_8 + n8_12_7 + n8_12_6 + 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_3_23 + n8_3_24 + n8_3_25 + n8_3_26 + n8_3_27 + n8_3_28 + 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_12_5 + 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_12_4 + n8_12_3 + 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_17_23 + n8_17_24 + n8_17_25 + n8_17_26 + n8_17_27 + n8_17_28 + n8_12_2 + 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_8_23 + n8_8_24 + n8_8_25 + n8_8_26 + n8_8_27 + n8_8_28 + n8_12_1 + n8_25_9 + n8_25_8 + n8_25_7 + n8_25_6 + n8_25_5 + n8_25_4 + n8_25_3 + n8_25_2 + n8_25_1 + 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_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_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_11_23 + n8_11_24 + n8_11_25 + n8_11_26 + n8_11_27 + n8_11_28 + n8_23_11 + n8_23_12 + n8_23_13 + n8_23_14 + n8_23_15 + n8_23_16 + n8_23_17 + n8_23_18 + n8_23_19 + n8_23_20 + n8_23_21 + n8_23_22 + n8_23_23 + n8_23_24 + n8_23_25 + n8_23_26 + n8_23_27 + n8_23_28 + 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_2_23 + n8_2_24 + n8_2_25 + n8_2_26 + n8_2_27 + n8_2_28 + 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_16_23 + n8_16_24 + n8_16_25 + n8_16_26 + n8_16_27 + n8_16_28 + n8_28_10 + n8_28_11 + n8_28_12 + n8_28_13 + n8_28_14 + n8_28_15 + n8_28_16 + n8_28_17 + n8_28_18 + n8_28_19 + n8_28_20 + n8_28_21 + n8_28_22 + n8_28_23 + n8_28_24 + n8_28_25 + n8_28_26 + n8_28_27 + n8_28_28 + n8_0_9 + n8_0_8 + 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_7_23 + n8_7_24 + n8_7_25 + n8_7_26 + n8_7_27 + n8_7_28 + n8_0_7 + n8_0_6 + n8_0_5 + n8_0_4 + n8_0_3 + n8_0_2 + n8_0_1 + n8_5_28 + n8_5_27 + n8_5_26 + n8_5_25 + n8_5_24 + n8_5_23 + n8_5_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_26_28 + n8_26_27 + n8_26_26 + n8_26_25 + n8_26_24 + n8_26_23 + n8_26_22 + n8_26_21 + 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_10_23 + n8_10_24 + n8_10_25 + n8_10_26 + n8_10_27 + n8_10_28 + n8_26_20 + 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_22_23 + n8_22_24 + n8_22_25 + n8_22_26 + n8_22_27 + n8_22_28 + 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_1_23 + n8_1_24 + n8_1_25 + n8_1_26 + n8_1_27 + n8_1_28 + 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_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_26_19 + n8_26_18 + 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_15_23 + n8_15_24 + n8_15_25 + n8_15_26 + n8_15_27 + n8_15_28 + n8_27_10 + n8_27_11 + n8_27_12 + n8_27_13 + n8_27_14 + n8_27_15 + n8_27_16 + n8_27_17 + n8_27_18 + n8_27_19 + n8_26_17 + n8_26_16 + 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_27_20 + n8_27_21 + n8_27_22 + n8_27_23 + n8_27_24 + n8_27_25 + n8_27_26 + n8_27_27 + n8_27_28 + 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_6_23 + n8_6_24 + n8_6_25 + n8_6_26 + n8_6_27 + n8_6_28 + n8_26_15 + n8_26_14 + n8_26_13 + n8_26_12 + n8_26_11 + n8_14_28 + n8_14_27 + n8_14_26 + n8_14_25 + n8_14_24 + n8_14_23 + n8_14_22 + n8_14_21 + n8_14_20 + n8_14_19 + n8_14_18 + n8_14_17 + n8_14_16 + n8_14_15 + n8_14_14 + n8_14_13 + n8_14_12 + n8_14_11 + n8_24_9 + n8_24_8 + n8_24_7 + n8_24_6 + n8_24_5 + n8_24_4 + n8_24_3 + n8_24_2 + 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_24_1 + 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_21_23 + n8_21_24 + n8_21_25 + n8_21_26 + n8_21_27 + n8_21_28 + 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_0_23 + n8_0_24 + n8_0_25 + n8_0_26 + n8_0_27 + n8_0_28 + n8_23_0 + n8_23_1 + n8_23_2 + n8_23_3 + n8_23_4 + n8_23_5 + n8_23_6 + n8_23_7 + n8_23_8 + n8_23_9 + 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) OR (1 <= CstopAbort) OR (s6_28 + s6_27 + s6_26 + s6_25 + s6_24 + s6_23 + s6_22 + s6_21 + s6_20 + s6_19 + s6_18 + s6_17 + s6_16 + s6_15 + s6_14 + s6_13 + s6_12 + s6_11 + s6_10 + s6_9 + s6_8 + s6_7 + s6_6 + s6_5 + s6_4 + s6_3 + s6_2 + s6_1 + s6_0 <= 1) OR (SstopOK_9 + SstopOK_8 + SstopOK_5 + SstopOK_4 + SstopOK_3 + SstopOK_2 + SstopOK_0 + SstopOK_10 + SstopOK_11 + SstopOK_12 + SstopOK_13 + SstopOK_14 + SstopOK_15 + SstopOK_16 + SstopOK_17 + SstopOK_18 + SstopOK_19 + SstopOK_21 + SstopOK_22 + SstopOK_23 + SstopOK_24 + SstopOK_25 + SstopOK_26 + SstopOK_27 + SstopOK_28 + SstopOK_20 + SstopOK_1 + SstopOK_6 + SstopOK_7 <= 0) OR (n6_28 + n6_27 + n6_26 + n6_25 + n6_24 + n6_23 + 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 + n6_0 + n6_1 + n6_2 + n6_3 + n6_4 + n6_5 + n6_6 + n6_7 + n6_8 + n6_9 + 1 <= s2_9 + s2_8 + s2_7 + s2_6 + s2_5 + s2_4 + s2_3 + s2_2 + s2_1 + s2_0 + s2_28 + s2_27 + s2_26 + s2_25 + s2_24 + s2_23 + 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 (G (((n8_24_0 + n8_14_10 + n8_26_10 + n8_21_0 + n8_11_0 + n8_22_10 + n8_10_10 + n8_5_10 + n8_0_0 + n8_23_10 + n8_25_0 + n8_12_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_1_0 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_28_0 + n8_4_10 + n8_3_0 + n8_27_0 + n8_19_10 + n8_2_0 + n8_13_0 + n8_26_0 + n8_20_10 + n8_20_11 + n8_20_12 + n8_20_13 + n8_20_14 + n8_20_15 + n8_20_16 + n8_20_17 + n8_20_18 + n8_20_19 + n8_20_20 + n8_20_21 + n8_20_22 + n8_20_23 + n8_20_24 + n8_20_25 + n8_20_26 + n8_20_27 + n8_20_28 + n8_19_28 + n8_19_27 + n8_19_26 + n8_19_25 + n8_19_24 + n8_19_23 + n8_19_22 + n8_19_21 + n8_26_1 + n8_26_2 + n8_26_3 + n8_26_4 + n8_26_5 + n8_26_6 + n8_26_7 + n8_26_8 + n8_26_9 + n8_19_20 + 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_19_19 + n8_19_18 + 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_19_17 + n8_19_16 + n8_19_15 + n8_19_14 + n8_19_13 + n8_19_12 + n8_19_11 + n8_27_1 + n8_27_2 + n8_27_3 + n8_27_4 + n8_27_5 + n8_27_6 + n8_27_7 + n8_27_8 + n8_27_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_13_23 + n8_13_24 + n8_13_25 + n8_13_26 + n8_13_27 + n8_13_28 + n8_25_10 + n8_25_11 + n8_25_12 + n8_25_13 + n8_25_14 + n8_25_15 + n8_25_16 + n8_25_17 + n8_25_18 + n8_25_19 + n8_25_20 + n8_25_21 + n8_25_22 + n8_25_23 + n8_25_24 + n8_25_25 + n8_25_26 + n8_25_27 + n8_25_28 + 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_4_23 + n8_4_24 + n8_4_25 + n8_4_26 + n8_4_27 + n8_4_28 + n8_28_1 + n8_28_2 + n8_28_3 + n8_28_4 + n8_28_5 + n8_28_6 + n8_28_7 + n8_28_8 + n8_28_9 + 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_18_23 + n8_18_24 + n8_18_25 + n8_18_26 + n8_18_27 + n8_18_28 + 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_9_23 + n8_9_24 + n8_9_25 + n8_9_26 + n8_9_27 + n8_9_28 + 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_1_9 + n8_1_8 + 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_12_23 + n8_12_24 + n8_12_25 + n8_12_26 + n8_12_27 + n8_12_28 + n8_24_10 + n8_24_11 + n8_24_12 + n8_24_13 + n8_24_14 + n8_24_15 + n8_24_16 + n8_24_17 + n8_24_18 + n8_24_19 + n8_1_7 + n8_1_6 + n8_1_5 + n8_1_4 + n8_1_3 + n8_1_2 + n8_1_1 + 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_24_20 + n8_24_21 + n8_24_22 + n8_24_23 + n8_24_24 + n8_24_25 + n8_24_26 + n8_24_27 + n8_24_28 + n8_12_9 + n8_12_8 + n8_12_7 + n8_12_6 + 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_3_23 + n8_3_24 + n8_3_25 + n8_3_26 + n8_3_27 + n8_3_28 + 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_12_5 + 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_12_4 + n8_12_3 + 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_17_23 + n8_17_24 + n8_17_25 + n8_17_26 + n8_17_27 + n8_17_28 + n8_12_2 + 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_8_23 + n8_8_24 + n8_8_25 + n8_8_26 + n8_8_27 + n8_8_28 + n8_12_1 + n8_25_9 + n8_25_8 + n8_25_7 + n8_25_6 + n8_25_5 + n8_25_4 + n8_25_3 + n8_25_2 + n8_25_1 + 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_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_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_11_23 + n8_11_24 + n8_11_25 + n8_11_26 + n8_11_27 + n8_11_28 + n8_23_11 + n8_23_12 + n8_23_13 + n8_23_14 + n8_23_15 + n8_23_16 + n8_23_17 + n8_23_18 + n8_23_19 + n8_23_20 + n8_23_21 + n8_23_22 + n8_23_23 + n8_23_24 + n8_23_25 + n8_23_26 + n8_23_27 + n8_23_28 + 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_2_23 + n8_2_24 + n8_2_25 + n8_2_26 + n8_2_27 + n8_2_28 + 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_16_23 + n8_16_24 + n8_16_25 + n8_16_26 + n8_16_27 + n8_16_28 + n8_28_10 + n8_28_11 + n8_28_12 + n8_28_13 + n8_28_14 + n8_28_15 + n8_28_16 + n8_28_17 + n8_28_18 + n8_28_19 + n8_28_20 + n8_28_21 + n8_28_22 + n8_28_23 + n8_28_24 + n8_28_25 + n8_28_26 + n8_28_27 + n8_28_28 + n8_0_9 + n8_0_8 + 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_7_23 + n8_7_24 + n8_7_25 + n8_7_26 + n8_7_27 + n8_7_28 + n8_0_7 + n8_0_6 + n8_0_5 + n8_0_4 + n8_0_3 + n8_0_2 + n8_0_1 + n8_5_28 + n8_5_27 + n8_5_26 + n8_5_25 + n8_5_24 + n8_5_23 + n8_5_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_26_28 + n8_26_27 + n8_26_26 + n8_26_25 + n8_26_24 + n8_26_23 + n8_26_22 + n8_26_21 + 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_10_23 + n8_10_24 + n8_10_25 + n8_10_26 + n8_10_27 + n8_10_28 + n8_26_20 + 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_22_23 + n8_22_24 + n8_22_25 + n8_22_26 + n8_22_27 + n8_22_28 + 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_1_23 + n8_1_24 + n8_1_25 + n8_1_26 + n8_1_27 + n8_1_28 + 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_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_26_19 + n8_26_18 + 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_15_23 + n8_15_24 + n8_15_25 + n8_15_26 + n8_15_27 + n8_15_28 + n8_27_10 + n8_27_11 + n8_27_12 + n8_27_13 + n8_27_14 + n8_27_15 + n8_27_16 + n8_27_17 + n8_27_18 + n8_27_19 + n8_26_17 + n8_26_16 + 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_27_20 + n8_27_21 + n8_27_22 + n8_27_23 + n8_27_24 + n8_27_25 + n8_27_26 + n8_27_27 + n8_27_28 + 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_6_23 + n8_6_24 + n8_6_25 + n8_6_26 + n8_6_27 + n8_6_28 + n8_26_15 + n8_26_14 + n8_26_13 + n8_26_12 + n8_26_11 + n8_14_28 + n8_14_27 + n8_14_26 + n8_14_25 + n8_14_24 + n8_14_23 + n8_14_22 + n8_14_21 + n8_14_20 + n8_14_19 + n8_14_18 + n8_14_17 + n8_14_16 + n8_14_15 + n8_14_14 + n8_14_13 + n8_14_12 + n8_14_11 + n8_24_9 + n8_24_8 + n8_24_7 + n8_24_6 + n8_24_5 + n8_24_4 + n8_24_3 + n8_24_2 + 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_24_1 + 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_21_23 + n8_21_24 + n8_21_25 + n8_21_26 + n8_21_27 + n8_21_28 + 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_0_23 + n8_0_24 + n8_0_25 + n8_0_26 + n8_0_27 + n8_0_28 + n8_23_0 + n8_23_1 + n8_23_2 + n8_23_3 + n8_23_4 + n8_23_5 + n8_23_6 + n8_23_7 + n8_23_8 + n8_23_9 + 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 <= 2) OR (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 + Sstart_23 + Sstart_24 + Sstart_25 + Sstart_26 + Sstart_27 + Sstart_28 <= 2) OR ((AstopAbort <= 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 + n1_23 + n1_24 + n1_25 + n1_26 + n1_27 + n1_28) AND (n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28 <= s5_28 + s5_27 + s5_26 + s5_25 + s5_24 + s5_23 + 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) AND (a1 <= 2))))) : A (G (((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_23 + Cstart_24 + Cstart_25 + Cstart_26 + Cstart_27 + Cstart_28 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9 + 1 <= n6_28 + n6_27 + n6_26 + n6_25 + n6_24 + n6_23 + 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 + n6_0 + n6_1 + n6_2 + n6_3 + n6_4 + n6_5 + n6_6 + n6_7 + n6_8 + n6_9) OR (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_19_23 + n9_19_24 + n9_19_25 + n9_19_26 + n9_19_27 + n9_19_28 + 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_13_10 + n9_13_11 + n9_13_12 + n9_13_13 + n9_13_14 + n9_13_15 + n9_13_16 + n9_13_17 + n9_13_18 + n9_13_19 + n9_13_20 + n9_13_21 + n9_13_22 + n9_13_23 + n9_13_24 + n9_13_25 + n9_13_26 + n9_13_27 + n9_13_28 + n9_25_10 + n9_25_11 + n9_25_12 + n9_25_13 + n9_25_14 + n9_25_15 + n9_25_16 + n9_25_17 + n9_25_18 + n9_25_19 + n9_25_20 + n9_25_21 + n9_25_22 + n9_25_23 + n9_25_24 + n9_25_25 + n9_25_26 + n9_25_27 + n9_25_28 + 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_1_23 + n9_1_24 + n9_1_25 + n9_1_26 + n9_1_27 + n9_1_28 + 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_18_23 + n9_18_24 + n9_18_25 + n9_18_26 + n9_18_27 + n9_18_28 + 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_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_6_23 + n9_6_24 + n9_6_25 + n9_6_26 + n9_6_27 + n9_6_28 + 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_12_23 + n9_12_24 + n9_12_25 + n9_12_26 + n9_12_27 + n9_12_28 + n9_24_10 + n9_24_11 + n9_24_12 + n9_24_13 + n9_24_14 + n9_24_15 + n9_24_16 + n9_24_17 + n9_24_18 + n9_24_19 + n9_24_20 + n9_24_21 + n9_24_22 + n9_24_23 + n9_24_24 + n9_24_25 + n9_24_26 + n9_24_27 + n9_24_28 + 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_0_23 + n9_0_24 + n9_0_25 + n9_0_26 + n9_0_27 + n9_0_28 + n9_23_0 + n9_23_1 + n9_23_2 + n9_23_3 + n9_23_4 + n9_23_5 + n9_23_6 + n9_23_7 + n9_23_8 + n9_23_9 + 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_17_23 + n9_17_24 + n9_17_25 + n9_17_26 + n9_17_27 + n9_17_28 + n9_24_0 + n9_24_1 + n9_24_2 + n9_24_3 + n9_24_4 + n9_24_5 + n9_0_0 + n9_24_6 + n9_0_1 + n9_24_7 + n9_0_2 + n9_24_8 + n9_0_3 + n9_24_9 + 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_5_23 + n9_5_24 + n9_5_25 + n9_5_26 + n9_5_27 + n9_5_28 + n9_25_0 + n9_25_1 + n9_25_2 + n9_25_3 + n9_25_4 + n9_25_5 + n9_1_0 + n9_25_6 + n9_1_1 + n9_25_7 + n9_1_2 + n9_25_8 + n9_1_3 + n9_25_9 + 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_11_23 + n9_11_24 + n9_11_25 + n9_11_26 + n9_11_27 + n9_11_28 + n9_23_10 + n9_23_11 + n9_23_12 + n9_23_13 + n9_23_14 + n9_23_15 + n9_23_16 + n9_23_17 + n9_23_18 + n9_23_19 + n9_23_20 + n9_23_21 + n9_23_22 + n9_23_23 + n9_23_24 + n9_23_25 + n9_23_26 + n9_23_27 + n9_23_28 + n9_20_28 + n9_20_27 + n9_20_26 + n9_20_25 + n9_20_24 + n9_20_23 + n9_20_22 + n9_20_21 + n9_20_20 + n9_20_19 + n9_20_18 + n9_26_0 + n9_26_1 + n9_26_2 + n9_26_3 + n9_26_4 + n9_26_5 + n9_2_0 + n9_26_6 + n9_2_1 + n9_26_7 + n9_2_2 + n9_26_8 + n9_2_3 + n9_26_9 + 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_20_17 + n9_20_16 + n9_20_15 + n9_20_14 + n9_20_13 + n9_27_0 + n9_27_1 + n9_27_2 + n9_27_3 + n9_27_4 + n9_27_5 + n9_3_0 + n9_27_6 + n9_3_1 + n9_27_7 + n9_3_2 + n9_27_8 + n9_3_3 + n9_27_9 + n9_3_4 + n9_3_5 + n9_3_6 + n9_3_7 + n9_3_8 + n9_3_9 + n9_20_12 + 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_16_23 + n9_16_24 + n9_16_25 + n9_16_26 + n9_16_27 + n9_16_28 + 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_28_10 + n9_28_11 + n9_28_12 + n9_28_13 + n9_28_14 + n9_28_15 + n9_28_16 + n9_28_17 + n9_28_18 + n9_28_19 + n9_28_20 + n9_28_21 + n9_28_22 + n9_28_23 + n9_28_24 + n9_28_25 + n9_28_26 + n9_28_27 + n9_28_28 + 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_23 + n9_4_24 + n9_4_25 + n9_4_26 + n9_4_27 + n9_4_28 + n9_28_0 + n9_28_1 + n9_28_2 + n9_28_3 + n9_28_4 + n9_28_5 + n9_4_0 + n9_28_6 + n9_4_1 + n9_28_7 + n9_4_2 + n9_28_8 + n9_4_3 + n9_28_9 + n9_4_4 + n9_4_5 + n9_4_6 + n9_4_7 + n9_4_8 + n9_4_9 + n9_20_11 + 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_7_28 + n9_7_27 + n9_7_26 + n9_7_25 + n9_7_24 + n9_7_23 + 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_7_12 + n9_7_11 + 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_9_23 + n9_9_24 + n9_9_25 + n9_9_26 + n9_9_27 + n9_9_28 + 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_10_23 + n9_10_24 + n9_10_25 + n9_10_26 + n9_10_27 + n9_10_28 + 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_22_23 + n9_22_24 + n9_22_25 + n9_22_26 + n9_22_27 + n9_22_28 + 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_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_15_23 + n9_15_24 + n9_15_25 + n9_15_26 + n9_15_27 + n9_15_28 + n9_27_10 + n9_27_11 + n9_27_12 + n9_27_13 + n9_27_14 + n9_27_15 + n9_27_16 + n9_27_17 + n9_27_18 + n9_27_19 + n9_27_20 + n9_27_21 + n9_27_22 + n9_27_23 + n9_27_24 + n9_27_25 + n9_27_26 + n9_27_27 + n9_27_28 + 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_3_23 + n9_3_24 + n9_3_25 + n9_3_26 + n9_3_27 + n9_3_28 + 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_8_23 + n9_8_24 + n9_8_25 + n9_8_26 + n9_8_27 + n9_8_28 + 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_21_23 + n9_21_24 + n9_21_25 + n9_21_26 + n9_21_27 + n9_21_28 + 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_14_23 + n9_14_24 + n9_14_25 + n9_14_26 + n9_14_27 + n9_14_28 + n9_26_10 + n9_26_11 + n9_26_12 + n9_26_13 + n9_26_14 + n9_26_15 + n9_26_16 + n9_26_17 + n9_26_18 + n9_26_19 + n9_26_20 + n9_26_21 + n9_26_22 + n9_26_23 + n9_26_24 + n9_26_25 + n9_26_26 + n9_26_27 + n9_26_28 + 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 + n9_2_23 + n9_2_24 + n9_2_25 + n9_2_26 + n9_2_27 + n9_2_28 <= 0) OR (CstopAbort <= 1) OR ((1 <= a4) AND (1 <= s5_28 + s5_27 + s5_26 + s5_25 + s5_24 + s5_23 + 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 (((s4_0 + s4_1 + s4_2 + s4_3 + s4_4 + s4_5 + s4_6 + s4_7 + s4_8 + s4_9 + s4_28 + s4_27 + s4_26 + s4_25 + s4_24 + s4_23 + s4_22 + s4_21 + s4_20 + s4_19 + s4_18 + s4_17 + s4_16 + s4_15 + s4_14 + s4_13 + s4_12 + s4_11 + s4_10 <= 1) OR (SstopAbort + 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 + CstopOK_23 + CstopOK_24 + CstopOK_25 + CstopOK_26 + CstopOK_27 + CstopOK_28) OR ((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 + Sstart_23 + Sstart_24 + Sstart_25 + Sstart_26 + Sstart_27 + Sstart_28 + 1 <= 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_23 + s3_24 + s3_25 + s3_26 + s3_27 + s3_28 + s3_9) AND (n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28 <= 2))))) : A (G ((n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28 <= a1))) : E (F ((3 <= s2_9 + s2_8 + s2_7 + s2_6 + s2_5 + s2_4 + s2_3 + s2_2 + s2_1 + s2_0 + s2_28 + s2_27 + s2_26 + s2_25 + s2_24 + s2_23 + 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))) : E (F (((a4 + 1 <= n5_10 + n5_11 + n5_12 + n5_13 + n5_14 + n5_15 + n5_16 + n5_17 + n5_18 + n5_19 + n5_20 + n5_21 + n5_22 + n5_23 + n5_24 + n5_25 + n5_26 + n5_27 + n5_28 + n5_0 + n5_1 + n5_2 + n5_3 + n5_4 + n5_5 + n5_6 + n5_7 + n5_8 + n5_9) AND (a1 + 1 <= 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_23 + Cstart_24 + Cstart_25 + Cstart_26 + Cstart_27 + Cstart_28 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9) AND (a3 <= CstopAbort))))
lola: computing a collection of formulas
lola: RUNNING
lola: subprocess 0 will run for 221 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: E (F ((((1 <= 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_23 + s3_24 + s3_25 + s3_26 + s3_27 + s3_28 + s3_9) OR (2 <= s5_28 + s5_27 + s5_26 + s5_25 + s5_24 + s5_23 + 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_... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 7 literals and 3 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality.sara
lola: state equation: calling and running sara
lola: SUBRESULT
lola: result: yes
lola: produced by: state space
lola: The predicate is reachable.
lola: ========================================
lola: subprocess 1 will run for 236 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G ((a3 <= a1)))
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 1 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality.sara
lola: SUBRESULT
lola: result: no
lola: produced by: state space
lola: The predicate is not invariant.
lola: ========================================
lola: subprocess 2 will run for 252 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G ((c1_8 + c1_7 + c1_6 + c1_5 + c1_4 + c1_3 + c1_2 + c1_1 + c1_0 + c1_28 + c1_27 + c1_26 + c1_25 + c1_24 + c1_23 + 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 <= AstopOK)))
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 1 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-2.sara
lola: state equation: calling and running sara
lola: SUBRESULT
lola: result: no
lola: produced by: state space
lola: The predicate is not invariant.
lola: ========================================
lola: subprocess 3 will run for 272 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: E (F (((2 <= n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28) AND (CstopAbort <= a5) AND ((3 <= AstopAbort) OR (1 <= a5)) AND (AstopOK <= n9_19_10 + n9_19_11 + n9_19_12 + n9_19_13 + n9_19_14 + n9_19_15 + n9_19_16 + n9_19_17 + n... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 8 literals and 2 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-3.sara
lola: state equation: calling and running sara
sara: try reading problem file QuasiCertifProtocol-COL-28-ReachabilityCardinality-3.sara.
sara: place or transition ordering is non-deterministic

lola: state equation: solution impossible
lola: SUBRESULT
lola: result: no
lola: produced by: state equation
lola: The predicate is unreachable.
lola: ========================================
lola: subprocess 4 will run for 294 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: E (F ((((Astart <= 0) AND (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_21_23 + n7_21_24 + n7_21_25 + n7_21_26 + n7_21_27 + n7_21_28 + n7_3_10 + n7_15_0 + n7_6_0 + n7_4_10 + n7_27_0 + n7_28_10 + n7_1... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 6 literals and 3 conjunctive subformulas
lola: SUBRESULT
lola: result: yes
lola: produced by: state space
lola: The predicate is reachable.
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-4.sara
lola: ========================================
lola: subprocess 5 will run for 321 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: E (F (((n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28 + 1 <= a2) AND (((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_23 + n4_24 + n4_25 + n4_26 + n4_27 + n4_28... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 5 literals and 2 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-5.sara
lola: state equation: calling and running sara
sara: try reading problem file QuasiCertifProtocol-COL-28-ReachabilityCardinality-5.sara.
sara: place or transition ordering is non-deterministic

lola: state equation: solution impossible
lola: SUBRESULT
lola: result: no
lola: produced by: state equation
lola: The predicate is unreachable.
lola: ========================================
lola: subprocess 6 will run for 353 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: E (F ((3 <= a3)))
lola: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 1 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-6.sara
lola: state equation: calling and running sara
sara: try reading problem file QuasiCertifProtocol-COL-28-ReachabilityCardinality-6.sara.
sara: place or transition ordering is non-deterministic

lola: state equation: solution impossible
lola: SUBRESULT
lola: result: no
lola: produced by: state equation
lola: The predicate is unreachable.
lola: subprocess 7 will run for 392 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ========================================
lola: ...considering subproblem: E (F ((((1 <= CstopAbort) OR (1 <= 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_23 + s3_24 + s3_25 + s3_26 + s3_27 + s3_28 + s3_9) OR ((a3 <= n8_24_0 + n8_14_10 + n8_26_10 + n8_21_0 + n8_11_0 + n8_22_10 + n8_10_10 + n8_5_10 + n8_0_0 + n8_23_10 + n8_25_0 + n8_12_0 + n8_8_10... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 6 literals and 3 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-7.sara
lola: state equation: calling and running sara
sara: try reading problem file QuasiCertifProtocol-COL-28-ReachabilityCardinality-7.sara.
sara: place or transition ordering is non-deterministic

lola: state equation: solution produced
lola: SUBRESULT
lola: result: yes
lola: produced by: state equation
lola: The predicate is reachable.
lola: ========================================
lola: subprocess 8 will run for 441 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: E (F ((((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 + CstopOK_23 + CstopOK_24 + CstopOK_25 + CstopOK_26 + CstopOK_27 + CstopOK_28 <= c1_8 + c1_7 + c1_6 + c1... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 6 literals and 3 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-8.sara
lola: SUBRESULT
lola: result: yes
lola: produced by: state space
lola: The predicate is reachable.
lola: ========================================
lola: subprocess 9 will run for 504 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G (((1 <= n8_24_0 + n8_14_10 + n8_26_10 + n8_21_0 + n8_11_0 + n8_22_10 + n8_10_10 + n8_5_10 + n8_0_0 + n8_23_10 + n8_25_0 + n8_12_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_1_0 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_28_0 + n8_4_10 + n8_3_0 + n8_27_0 + n8_19_10 + n8_2_0 + n8_13_0 + n8_26_0 + n8_20_10 + n8_20_11 + n8_20_12 + n8_20_13 + n8_20_14 + n8_20_15 + n8_20_16 + n8_20_17 + n8_20_18... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 5 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-9.sara
lola: state equation: calling and running sara
sara: try reading problem file QuasiCertifProtocol-COL-28-ReachabilityCardinality-9.sara.
sara: place or transition ordering is non-deterministic

lola: state equation: solution produced
lola: SUBRESULT
lola: result: no
lola: produced by: state equation
lola: The predicate is not invariant.
lola: ========================================
lola: subprocess 10 will run for 587 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G (((n8_24_0 + n8_14_10 + n8_26_10 + n8_21_0 + n8_11_0 + n8_22_10 + n8_10_10 + n8_5_10 + n8_0_0 + n8_23_10 + n8_25_0 + n8_12_0 + n8_8_10 + n8_7_0 + n8_6_0 + n8_1_0 + n8_17_0 + n8_16_0 + n8_9_10 + n8_18_10 + n8_15_0 + n8_28_0 + n8_4_10 + n8_3_0 + n8_27_0 + n8_19_10 + n8_2_0 + n8_13_0 + n8_26_0 + n8_20_10 + n8_20_11 + n8_20_12 + n8_20_13 + n8_20_14 + n8_20_15 + n8_20_16 + n8_20_17 + n8_20_18 + n8... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 9 literals and 3 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-10.sara
lola: state equation: calling and running sara
sara: try reading problem file QuasiCertifProtocol-COL-28-ReachabilityCardinality-10.sara.
sara: place or transition ordering is non-deterministic
lola: sara is running 0 secs || 585964 markings, 1280713 edges, 117193 markings/sec, 0 secs
lola: sara is running 5 secs || 1123279 markings, 2516676 edges, 107463 markings/sec, 5 secs
lola: sara is running 10 secs || 1641326 markings, 3729936 edges, 103609 markings/sec, 10 secs
lola: sara is running 15 secs || 2151659 markings, 4940239 edges, 102067 markings/sec, 15 secs
lola: sara is running 20 secs || 2650997 markings, 6135367 edges, 99868 markings/sec, 20 secs
lola: sara is running 25 secs || 3132030 markings, 7326739 edges, 96207 markings/sec, 25 secs
lola: sara is running 30 secs || 3625747 markings, 8527126 edges, 98743 markings/sec, 30 secs
lola: sara is running 35 secs || 4138202 markings, 9737697 edges, 102491 markings/sec, 35 secs
lola: sara is running 40 secs || 4637893 markings, 10932956 edges, 99938 markings/sec, 40 secs
lola: sara is running 45 secs || 5128186 markings, 12147184 edges, 98059 markings/sec, 45 secs
lola: sara is running 50 secs || 5634778 markings, 13409506 edges, 101318 markings/sec, 50 secs
lola: sara is running 55 secs || 6153611 markings, 14674434 edges, 103767 markings/sec, 55 secs
lola: sara is running 60 secs || 6643769 markings, 15929429 edges, 98032 markings/sec, 60 secs
lola: sara is running 65 secs || 7142223 markings, 17182260 edges, 99691 markings/sec, 65 secs
lola: sara is running 70 secs || 7611005 markings, 18406779 edges, 93756 markings/sec, 70 secs
lola: sara is running 75 secs || 8078616 markings, 19659596 edges, 93522 markings/sec, 75 secs
lola: sara is running 80 secs || 8650323 markings, 20970740 edges, 114341 markings/sec, 80 secs
lola: sara is running 85 secs || 9186696 markings, 22254555 edges, 107275 markings/sec, 85 secs
lola: sara is running 90 secs || 9691753 markings, 23505342 edges, 101011 markings/sec, 90 secs
lola: sara is running 95 secs || 10173202 markings, 24711969 edges, 96290 markings/sec, 95 secs
lola: sara is running 100 secs || 10671007 markings, 25916229 edges, 99561 markings/sec, 100 secs
lola: sara is running 105 secs || 11135946 markings, 27092779 edges, 92988 markings/sec, 105 secs
lola: sara is running 110 secs || 11606166 markings, 28271823 edges, 94044 markings/sec, 110 secs
lola: sara is running 115 secs || 12056309 markings, 29433783 edges, 90029 markings/sec, 115 secs
lola: sara is running 120 secs || 12493510 markings, 30593893 edges, 87440 markings/sec, 120 secs
lola: sara is running 125 secs || 12958026 markings, 31767703 edges, 92903 markings/sec, 125 secs
lola: sara is running 130 secs || 13439785 markings, 32946807 edges, 96352 markings/sec, 130 secs
lola: sara is running 135 secs || 13894039 markings, 34118247 edges, 90851 markings/sec, 135 secs
lola: sara is running 140 secs || 14367698 markings, 35295680 edges, 94732 markings/sec, 140 secs
lola: sara is running 145 secs || 14811689 markings, 36448019 edges, 88798 markings/sec, 145 secs
lola: sara is running 150 secs || 15242545 markings, 37607798 edges, 86171 markings/sec, 150 secs
lola: sara is running 155 secs || 15709383 markings, 38790507 edges, 93368 markings/sec, 155 secs
lola: sara is running 160 secs || 16158935 markings, 39953350 edges, 89910 markings/sec, 160 secs
lola: sara is running 165 secs || 16594940 markings, 41109870 edges, 87201 markings/sec, 165 secs
lola: sara is running 170 secs || 17027681 markings, 42257907 edges, 86548 markings/sec, 170 secs
lola: sara is running 175 secs || 17455929 markings, 43407084 edges, 85650 markings/sec, 175 secs
lola: sara is running 180 secs || 17874172 markings, 44546823 edges, 83649 markings/sec, 180 secs
lola: sara is running 185 secs || 18287188 markings, 45709101 edges, 82603 markings/sec, 185 secs
lola: sara is running 190 secs || 18766339 markings, 46899772 edges, 95830 markings/sec, 190 secs
lola: sara is running 195 secs || 19269503 markings, 48101248 edges, 100633 markings/sec, 195 secs
lola: sara is running 200 secs || 19767285 markings, 49291452 edges, 99556 markings/sec, 200 secs
lola: sara is running 205 secs || 20245408 markings, 50476517 edges, 95625 markings/sec, 205 secs
lola: sara is running 210 secs || 20726310 markings, 51662356 edges, 96180 markings/sec, 210 secs
lola: sara is running 215 secs || 21206053 markings, 52836995 edges, 95949 markings/sec, 215 secs
lola: sara is running 220 secs || 21657363 markings, 54001487 edges, 90262 markings/sec, 220 secs
lola: sara is running 225 secs || 22128719 markings, 55172741 edges, 94271 markings/sec, 225 secs
lola: sara is running 230 secs || 22567874 markings, 56312934 edges, 87831 markings/sec, 230 secs
lola: sara is running 235 secs || 22995444 markings, 57461785 edges, 85514 markings/sec, 235 secs
lola: sara is running 240 secs || 23478545 markings, 58645240 edges, 96620 markings/sec, 240 secs
lola: sara is running 245 secs || 23955298 markings, 59825658 edges, 95351 markings/sec, 245 secs
lola: sara is running 250 secs || 24414748 markings, 60993903 edges, 91890 markings/sec, 250 secs
lola: sara is running 255 secs || 24869185 markings, 62150438 edges, 90887 markings/sec, 255 secs
lola: sara is running 260 secs || 25305609 markings, 63292996 edges, 87285 markings/sec, 260 secs
lola: sara is running 265 secs || 25725445 markings, 64437066 edges, 83967 markings/sec, 265 secs
lola: sara is running 270 secs || 26202690 markings, 65619068 edges, 95449 markings/sec, 270 secs
lola: sara is running 275 secs || 26644998 markings, 66762856 edges, 88462 markings/sec, 275 secs
lola: sara is running 280 secs || 27071561 markings, 67910063 edges, 85313 markings/sec, 280 secs
lola: sara is running 285 secs || 27504279 markings, 69050600 edges, 86544 markings/sec, 285 secs
lola: sara is running 290 secs || 27922268 markings, 70182198 edges, 83598 markings/sec, 290 secs
lola: sara is running 295 secs || 28335245 markings, 71307146 edges, 82595 markings/sec, 295 secs
lola: sara is running 300 secs || 28739669 markings, 72452229 edges, 80885 markings/sec, 300 secs
lola: sara is running 305 secs || 29215862 markings, 73633374 edges, 95239 markings/sec, 305 secs
lola: sara is running 310 secs || 29691330 markings, 74810071 edges, 95094 markings/sec, 310 secs
lola: sara is running 315 secs || 30148535 markings, 75974635 edges, 91441 markings/sec, 315 secs
lola: sara is running 320 secs || 30601776 markings, 77124184 edges, 90648 markings/sec, 320 secs
lola: sara is running 325 secs || 31053076 markings, 78307523 edges, 90260 markings/sec, 325 secs
lola: sara is running 330 secs || 31503007 markings, 79517183 edges, 89986 markings/sec, 330 secs
lola: sara is running 335 secs || 31987171 markings, 80725516 edges, 96833 markings/sec, 335 secs
lola: sara is running 340 secs || 32452085 markings, 81935196 edges, 92983 markings/sec, 340 secs
lola: sara is running 345 secs || 32895548 markings, 83138351 edges, 88693 markings/sec, 345 secs
lola: sara is running 350 secs || 33348914 markings, 84321813 edges, 90673 markings/sec, 350 secs
lola: sara is running 355 secs || 33791370 markings, 85524782 edges, 88491 markings/sec, 355 secs
lola: sara is running 360 secs || 34228500 markings, 86726544 edges, 87426 markings/sec, 360 secs
lola: sara is running 365 secs || 34638354 markings, 87883550 edges, 81971 markings/sec, 365 secs
lola: sara is running 370 secs || 35108242 markings, 89059350 edges, 93978 markings/sec, 370 secs
lola: sara is running 375 secs || 35573657 markings, 90271783 edges, 93083 markings/sec, 375 secs
lola: sara is running 380 secs || 36019599 markings, 91484853 edges, 89188 markings/sec, 380 secs
lola: sara is running 385 secs || 36492455 markings, 92715628 edges, 94571 markings/sec, 385 secs
lola: sara is running 390 secs || 36934983 markings, 93919975 edges, 88506 markings/sec, 390 secs
lola: sara is running 395 secs || 37371331 markings, 95123709 edges, 87270 markings/sec, 395 secs
lola: sara is running 400 secs || 37794496 markings, 96310400 edges, 84633 markings/sec, 400 secs
lola: sara is running 405 secs || 38255214 markings, 97528162 edges, 92144 markings/sec, 405 secs
lola: sara is running 410 secs || 38689753 markings, 98713739 edges, 86908 markings/sec, 410 secs
lola: sara is running 415 secs || 39114884 markings, 99899479 edges, 85026 markings/sec, 415 secs
lola: sara is running 420 secs || 39535316 markings, 101077770 edges, 84086 markings/sec, 420 secs
lola: sara is running 425 secs || 39959737 markings, 102258436 edges, 84884 markings/sec, 425 secs
lola: sara is running 430 secs || 40369117 markings, 103429616 edges, 81876 markings/sec, 430 secs
lola: sara is running 435 secs || 40776877 markings, 104615799 edges, 81552 markings/sec, 435 secs
lola: sara is running 440 secs || 41181375 markings, 105782740 edges, 80900 markings/sec, 440 secs
lola: sara is running 445 secs || 41738315 markings, 107067162 edges, 111388 markings/sec, 445 secs
lola: sara is running 450 secs || 42264546 markings, 108327689 edges, 105246 markings/sec, 450 secs
lola: sara is running 455 secs || 42741781 markings, 109505973 edges, 95447 markings/sec, 455 secs
lola: sara is running 460 secs || 43226678 markings, 110728905 edges, 96979 markings/sec, 460 secs
lola: sara is running 465 secs || 43743665 markings, 111977962 edges, 103397 markings/sec, 465 secs
lola: sara is running 470 secs || 44225282 markings, 113197783 edges, 96323 markings/sec, 470 secs
lola: sara is running 475 secs || 44716081 markings, 114426098 edges, 98160 markings/sec, 475 secs
lola: sara is running 480 secs || 45180485 markings, 115627797 edges, 92881 markings/sec, 480 secs
lola: sara is running 485 secs || 45631579 markings, 116833519 edges, 90219 markings/sec, 485 secs
lola: sara is running 490 secs || 46132682 markings, 118074103 edges, 100221 markings/sec, 490 secs
lola: sara is running 495 secs || 46633698 markings, 119313766 edges, 100203 markings/sec, 495 secs
lola: sara is running 500 secs || 47116310 markings, 120537084 edges, 96522 markings/sec, 500 secs
lola: sara is running 505 secs || 47587778 markings, 121750112 edges, 94294 markings/sec, 505 secs
lola: sara is running 510 secs || 48059128 markings, 122973725 edges, 94270 markings/sec, 510 secs
lola: sara is running 515 secs || 48511398 markings, 124177029 edges, 90454 markings/sec, 515 secs
lola: sara is running 520 secs || 48992218 markings, 125395897 edges, 96164 markings/sec, 520 secs
lola: sara is running 525 secs || 49453712 markings, 126602071 edges, 92299 markings/sec, 525 secs
lola: sara is running 530 secs || 49899941 markings, 127807158 edges, 89246 markings/sec, 530 secs
lola: sara is running 535 secs || 50363472 markings, 129018280 edges, 92706 markings/sec, 535 secs
lola: sara is running 540 secs || 50799441 markings, 130206262 edges, 87194 markings/sec, 540 secs
lola: sara is running 545 secs || 51229362 markings, 131399753 edges, 85984 markings/sec, 545 secs
lola: sara is running 550 secs || 51678268 markings, 132603374 edges, 89781 markings/sec, 550 secs
lola: sara is running 555 secs || 52192350 markings, 133851963 edges, 102816 markings/sec, 555 secs
lola: sara is running 560 secs || 52667917 markings, 135076416 edges, 95113 markings/sec, 560 secs
lola: sara is running 565 secs || 53165986 markings, 136315426 edges, 99614 markings/sec, 565 secs
lola: sara is running 570 secs || 53629232 markings, 137516211 edges, 92649 markings/sec, 570 secs
lola: sara is running 575 secs || 54075433 markings, 138720504 edges, 89240 markings/sec, 575 secs
lola: sara is running 580 secs || 54564457 markings, 139952948 edges, 97805 markings/sec, 580 secs
lola: local time limit reached - aborting
lola: Child process aborted or communication problem between parent and child process
lola: subprocess 11 will run for 588 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G (((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_23 + Cstart_24 + Cstart_25 + Cstart_26 + Cstart_27 + Cstart_28 + Cstart_0 + Cstart_1 + Cstart_2 + Cstart_3 + Cstart_4 + Cstart_5 + Cstart_6 + Cstart_7 + Cstart_8 + Cstart_9 + 1 <= n6_28 + n6_27 + n6_26 + n6_25 + n6_24 + n6_23 + n... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 8 literals and 2 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-11.sara
lola: state equation: calling and running sara
lola: SUBRESULT
lola: result: no
lola: produced by: state space
lola: The predicate is not invariant.
lola: ========================================
lola: subprocess 12 will run for 735 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G (((s4_0 + s4_1 + s4_2 + s4_3 + s4_4 + s4_5 + s4_6 + s4_7 + s4_8 + s4_9 + s4_28 + s4_27 + s4_26 + s4_25 + s4_24 + s4_23 + s4_22 + s4_21 + s4_20 + s4_19 + s4_18 + s4_17 + s4_16 + s4_15 + s4_14 + s4_13 + s4_12 + s4_11 + s4_10 <= 1) OR (SstopAbort + 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... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 6 literals and 2 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-12.sara
lola: lola: SUBRESULT
lola: result: no
lola: produced by: state space
lola: The predicate is not invariant.
lola: ========================================
lola: subprocess 13 will run for 980 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: A (G ((n3_9 + n3_8 + n3_7 + n3_6 + n3_5 + n3_4 + n3_3 + n3_2 + n3_1 + n3_0 + n3_10 + n3_11 + n3_12 + n3_13 + n3_14 + n3_15 + n3_16 + n3_17 + n3_18 + n3_19 + n3_20 + n3_21 + n3_22 + n3_23 + n3_24 + n3_25 + n3_26 + n3_27 + n3_28 <= a1)))
lola: ========================================
lola: SUBTASK
lola: checking invariance
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 1 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-13.sara
lola: lola: SUBRESULT
lola: result: no
lola: produced by: state space
lola: The predicate is not invariant.
lola: ========================================
lola: subprocess 14 will run for 1470 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: E (F ((3 <= s2_9 + s2_8 + s2_7 + s2_6 + s2_5 + s2_4 + s2_3 + s2_2 + s2_1 + s2_0 + s2_28 + s2_27 + s2_26 + s2_25 + s2_24 + s2_23 + 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: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 1 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-14.sara
lola: SUBRESULT
lola: result: yes
lola: produced by: state space
lola: The predicate is reachable.
lola: ========================================
lola: subprocess 15 will run for 2940 seconds at most (--localtimelimit=-1)
lola: ========================================
lola: ...considering subproblem: E (F (((a4 + 1 <= n5_10 + n5_11 + n5_12 + n5_13 + n5_14 + n5_15 + n5_16 + n5_17 + n5_18 + n5_19 + n5_20 + n5_21 + n5_22 + n5_23 + n5_24 + n5_25 + n5_26 + n5_27 + n5_28 + n5_0 + n5_1 + n5_2 + n5_3 + n5_4 + n5_5 + n5_6 + n5_7 + n5_8 + n5_9) AND (a1 + 1 <= Cstart_10 + Cstart_11 + Cstart_12 + Cstart_13 + Cstart_14 + Cstart_15 + Cstart_16 + Cstart_17 + Cstart_18 + Cstart_19 + Cstart_20 + Cstart_21 + Cs... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking reachability
lola: Planning: workflow for reachability check: stateequation||search (--findpath=off)
lola: STORE
lola: using a bit-perfect encoder (--encoder=bit)
lola: using 1780 bytes per marking, with 0 unused bits
lola: using a prefix tree store (--store=prefix)
lola: SEARCH (state space)
lola: state space: using reachability graph (--search=depth)
lola: state space: using reachability preserving stubborn set method with insertion algorithm (--stubborn=tarjan)
lola: RUNNING
lola: state equation: Generated DNF with 3 literals and 1 conjunctive subformulas
lola: state equation: write sara problem file to QuasiCertifProtocol-COL-28-ReachabilityCardinality-15.sara
lola: state equation: calling and running sara
sara: try reading problem file QuasiCertifProtocol-COL-28-ReachabilityCardinality-15.sara.
sara: place or transition ordering is non-deterministic

lola: state equation: solution produced
lola: SUBRESULT
lola: result: yes
lola: produced by: state equation
lola: The predicate is reachable.
lola: RESULT
lola:
SUMMARY: yes no no no yes no no yes yes no unknown no no no yes yes
lola: ========================================
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-0 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-1 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-2 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-3 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-4 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-5 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-6 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-7 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-8 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-9 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-10 CANNOT_COMPUTE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-11 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-12 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-13 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-14 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
FORMULA QuasiCertifProtocol-COL-28-ReachabilityCardinality-15 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT STATE_COMPRESSION STUBBORN_SETS TOPOLOGICAL USE_NUPN
----- Kill lola and sara stdout -----
----- Finished stdout -----

BK_STOP 1494782882824

--------------------
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="QuasiCertifProtocol-PT-28"
export BK_EXAMINATION="ReachabilityCardinality"
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/QuasiCertifProtocol-PT-28.tgz
mv QuasiCertifProtocol-PT-28 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 QuasiCertifProtocol-PT-28, examination is ReachabilityCardinality"
echo " Time confinement is $BK_TIME_CONFINEMENT seconds"
echo " Memory confinement is 16384 MBytes"
echo " Number of cores is 4"
echo " Run identifier is r058-smll-149440926300286"
echo "====================================================================="
echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "ReachabilityCardinality" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "ReachabilityCardinality" != "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 "ReachabilityCardinality.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property ReachabilityCardinality.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "ReachabilityCardinality.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 '' ReachabilityCardinality.xml | cut -d '>' -f 2 | cut -d '<' -f 1 | sort -u) ; do
echo "FORMULA_NAME $x"
done
fi
echo
echo "=== Now, execution of the tool begins"
echo
echo -n "BK_START "
date -u +%s%3N
echo
timeout -s 9 $BK_TIME_CONFINEMENT bash -c "/home/mcc/BenchKit/BenchKit_head.sh 2> STDERR ; echo ; echo -n \"BK_STOP \" ; date -u +%s%3N"
if [ $? -eq 137 ] ; then
echo
echo "BK_TIME_CONFINEMENT_REACHED"
fi
echo
echo "--------------------"
echo "content from stderr:"
echo
cat STDERR ;