Execution Chart

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

Trace from the execution

Formatting '/data/fkordon/mcc2024-input.r492-smll-171636266200139.qcow2', fmt=qcow2 size=4294967296 backing_file=/data/fkordon/mcc2024-input.qcow2 backing_fmt=qcow2 cluster_size=65536 lazy_refcounts=off refcount_bits=16
Waiting for the VM to be ready (probing ssh)
........................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................................
=====================================================================
Generated by BenchKit 2-5568
Executing tool ltsminxred
Input is Echo-PT-d05r03, examination is LTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r492-smll-171636266200139
=====================================================================

--------------------
preparation of the directory to be used:
/home/mcc/execution
total 2.7M
-rw-r--r-- 1 mcc users 7.3K May 14 13:22 CTLCardinality.txt
-rw-r--r-- 1 mcc users 80K May 14 13:22 CTLCardinality.xml
-rw-r--r-- 1 mcc users 5.6K May 14 13:22 CTLFireability.txt
-rw-r--r-- 1 mcc users 49K May 14 13:22 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.2K May 18 16:42 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 5.9K May 18 16:42 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 3.7K May 19 07:09 LTLCardinality.txt
-rw-r--r-- 1 mcc users 27K May 19 15:52 LTLCardinality.xml
-rw-r--r-- 1 mcc users 2.0K May 19 07:17 LTLFireability.txt
-rw-r--r-- 1 mcc users 17K May 19 18:18 LTLFireability.xml
-rw-r--r-- 1 mcc users 7.3K Apr 12 04:36 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 67K Apr 12 04:36 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 6.0K Apr 12 04:34 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 46K Apr 12 04:34 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 1.6K Apr 22 14:43 UpperBounds.txt
-rw-r--r-- 1 mcc users 3.6K Apr 22 14:43 UpperBounds.xml
-rw-r--r-- 1 mcc users 6 May 18 16:42 equiv_col
-rw-r--r-- 1 mcc users 7 May 18 16:42 instance
-rw-r--r-- 1 mcc users 6 May 18 16:42 iscolored
-rw-r--r-- 1 mcc users 2.3M May 18 16:42 model.pnml

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

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

The expected result is a vector of booleans
BOOL_VECTOR

here is the order used to build the result vector(from text file)
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-00
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-01
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-02
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-03
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-04
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-05
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-06
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-07
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-08
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-09
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-10
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-11
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-12
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-13
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-14
FORMULA_NAME Echo-PT-d05r03-LTLCardinality-15

=== Now, execution of the tool begins

BK_START 1717216408565

Invoking MCC driver with
BK_TOOL=ltsminxred
BK_EXAMINATION=LTLCardinality
BK_BIN_PATH=/home/mcc/BenchKit/bin/
BK_TIME_CONFINEMENT=3600
BK_INPUT=Echo-PT-d05r03
BK_MEMORY_CONFINEMENT=16384
Applying reductions before tool ltsmin
Invoking reducer
Running Version 202405141337
[2024-06-01 04:33:31] [INFO ] Running its-tools with arguments : [-pnfolder, /home/mcc/execution, -examination, LTLCardinality, -timeout, 360, -rebuildPNML]
[2024-06-01 04:33:31] [INFO ] Parsing pnml file : /home/mcc/execution/model.pnml
[2024-06-01 04:33:32] [INFO ] Load time of PNML (sax parser for PT used): 920 ms
[2024-06-01 04:33:32] [INFO ] Transformed 3717 places.
[2024-06-01 04:33:32] [INFO ] Transformed 3222 transitions.
[2024-06-01 04:33:32] [INFO ] Found NUPN structural information;
[2024-06-01 04:33:32] [INFO ] Parsed PT model containing 3717 places and 3222 transitions and 28404 arcs in 1354 ms.
Parsed 16 properties from file /home/mcc/execution/LTLCardinality.xml in 26 ms.
Working with output stream class java.io.PrintStream
Initial state reduction rules removed 2 formulas.
Initial state reduction rules removed 2 formulas.
FORMULA Echo-PT-d05r03-LTLCardinality-04 TRUE TECHNIQUES TOPOLOGICAL INITIAL_STATE
FORMULA Echo-PT-d05r03-LTLCardinality-05 FALSE TECHNIQUES TOPOLOGICAL INITIAL_STATE
FORMULA Echo-PT-d05r03-LTLCardinality-09 TRUE TECHNIQUES TOPOLOGICAL INITIAL_STATE
FORMULA Echo-PT-d05r03-LTLCardinality-11 FALSE TECHNIQUES TOPOLOGICAL INITIAL_STATE
FORMULA Echo-PT-d05r03-LTLCardinality-12 FALSE TECHNIQUES TOPOLOGICAL INITIAL_STATE
FORMULA Echo-PT-d05r03-LTLCardinality-03 TRUE TECHNIQUES TOPOLOGICAL INITIAL_STATE
Support contains 27 out of 3717 places. Attempting structural reductions.
Starting structural reductions in LTL mode, iteration 0 : 3717/3717 places, 3222/3222 transitions.
Reduce places removed 242 places and 0 transitions.
Iterating post reduction 0 with 242 rules applied. Total rules applied 242 place count 3475 transition count 3222
Applied a total of 242 rules in 765 ms. Remains 3475 /3717 variables (removed 242) and now considering 3222/3222 (removed 0) transitions.
// Phase 1: matrix 3222 rows 3475 cols
[2024-06-01 04:33:48] [INFO ] Invariants computation overflowed in 14997 ms
[2024-06-01 04:33:55] [INFO ] Implicit Places using invariants in 22240 ms returned []
// Phase 1: matrix 3222 rows 3475 cols
[2024-06-01 04:34:09] [INFO ] Invariants computation overflowed in 14147 ms
[2024-06-01 04:36:50] [INFO ] Performed 0/3475 implicitness test of which 0 returned IMPLICIT in 120 seconds.
[2024-06-01 04:36:50] [INFO ] Timeout of Implicit test with SMT after 120 seconds.
[2024-06-01 04:36:50] [INFO ] Implicit Places using invariants and state equation in 174202 ms returned []
Implicit Place search using SMT with State Equation took 196506 ms to find 0 implicit places.
Running 3221 sub problems to find dead transitions.
// Phase 1: matrix 3222 rows 3475 cols
[2024-06-01 04:37:04] [INFO ] Invariants computation overflowed in 14640 ms
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3473/6697 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30196 ms.
Refiners :[Domain max(s): 3473/3475 constraints, State Equation: 0/3475 constraints, PredecessorRefiner: 3221/3221 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3221 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Error getting values : (error "Error writing to Z3 solver: java.io.IOException: Broken pipe")
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3473/6697 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30093 ms.
Refiners :[Domain max(s): 3473/3475 constraints, State Equation: 0/3475 constraints, PredecessorRefiner: 0/3221 constraints, Known Traps: 0/0 constraints]
After SMT, in 79384ms problems are : Problem set: 0 solved, 3221 unsolved
Search for dead transitions found 0 dead transitions in 79486ms
Starting structural reductions in LTL mode, iteration 1 : 3475/3717 places, 3222/3222 transitions.
Finished structural reductions in LTL mode , in 1 iterations and 276829 ms. Remains : 3475/3717 places, 3222/3222 transitions.
Support contains 27 out of 3475 places after structural reductions.
[2024-06-01 04:38:10] [INFO ] Flatten gal took : 774 ms
[2024-06-01 04:38:11] [INFO ] Flatten gal took : 320 ms
[2024-06-01 04:38:11] [INFO ] Input system was already deterministic with 3222 transitions.
RANDOM walk for 34102 steps (69 resets) in 4384 ms. (7 steps per ms) remains 0/18 properties
FORMULA Echo-PT-d05r03-LTLCardinality-02 FALSE TECHNIQUES REACHABILITY_KNOWLEDGE
Computed a total of 3475 stabilizing places and 3222 stable transitions
Complete graph has no SCC; deadlocks are unavoidable. place count 3475 transition count 3222
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge (and all enablings converge to false).
Running Spot : '/home/mcc/BenchKit/itstools/itstools/plugins/fr.lip6.ltl.spot.binaries_1.0.0.202405141337/bin/ltl2tgba-linux64' '--check=stutter' '--hoaf=tv' '-f' '!(X((p0||X(G(p1)))))'
Support contains 2 out of 3475 places. Attempting structural reductions.
Starting structural reductions in LTL mode, iteration 0 : 3475/3475 places, 3222/3222 transitions.
Reduce places removed 1 places and 0 transitions.
Iterating post reduction 0 with 1 rules applied. Total rules applied 1 place count 3474 transition count 3222
Applied a total of 1 rules in 487 ms. Remains 3474 /3475 variables (removed 1) and now considering 3222/3222 (removed 0) transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 04:38:26] [INFO ] Invariants computation overflowed in 12481 ms
[2024-06-01 04:38:32] [INFO ] Implicit Places using invariants in 18105 ms returned []
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 04:38:44] [INFO ] Invariants computation overflowed in 11657 ms
[2024-06-01 04:41:24] [INFO ] Performed 0/3474 implicitness test of which 0 returned IMPLICIT in 117 seconds.
[2024-06-01 04:41:24] [INFO ] Implicit Places using invariants and state equation in 171693 ms returned []
Implicit Place search using SMT with State Equation took 189799 ms to find 0 implicit places.
Running 3221 sub problems to find dead transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 04:41:35] [INFO ] Invariants computation overflowed in 11738 ms
Error getting values : (error "ParserException while parsing response: ((s0 1.0)
(s1 1.0)
(s2 1.0)
(s3 1.0)
(s4 1.0)
(s5 1.0)
(s6 1.0)
(s7 1.0)
(s8 1.0)
(s9 1.0)
(s10 1.0)
(s11 1.0)
(s12 1.0)
(s13 1.0)
(s14 1.0)
(s15 1.0)
(s16 1.0)
(s17 1.0)
(s18 1.0)
(s19 1.0)
(s20 1.0)
(s21 1.0)
(s22 1.0)
(s23 1.0)
(s24 1.0)
(s25 1.0)
(s26 1.0)
(s27 1.0)
(s28 1.0)
(s29 1.0)
(s30 1.0)
(s31 1.0)
(s32 1.0)
(s33 1.0)
(s34 1.0)
(s35 1.0)
(s36 1.0)
(s37 1.0)
(s38 1.0)
(s39 1.0)
(s40 1.0)
(s41 1.0)
(s42 1.0)
(s43 1.0)
(s44 1.0)
(s45 1.0)
(s46 1.0)
(s47 1.0)
(s48 1.0)
(s49 1.0)
(s50 1.0)
(s51 1.0)
(s52 1.0)
(s53 1.0)
(s54 1.0)
(s55 1.0)
(s56 1.0)
(s57 1.0)
(s58 1.0)
(s59 1.0)
(s60 1.0)
(s61 1.0)
(s62 1.0)
(s63 1.0)
(s64 1.0)
(s65 1.0)
(s66 1.0)
(s67 1.0)
(s68 1.0)
(s69 1.0)
(s70 1.0)
(s71 1.0)
(s72 1.0)
(s73 1.0)
(s74 1.0)
(s75 1.0)
(s76 1.0)
(s77 1.0)
(s78 1.0)
(s79 1.0)
(s80 1.0)
(s81 1.0)
(s82 1.0)
(s83 1.0)
(s84 1.0)
(s85 1.0)
(s86 1.0)
(s87 1.0)
(s88 1.0)
(s89 1.0)
(s90 1.0)
(s91 1.0)
(s92 1.0)
(s93 1.0)
(s94 1.0)
(s95 1.0)
(s96 1.0)
(s97 1.0)
(s98 1.0)
(s99 1.0)
(s100 1.0)
(s101 1.0)
(s102 1.0)
(s103 1.0)
(s104 1.0)
(s105 1.0)
(s106 1.0)
(s107 1.0)
(s108 1.0)
(s109 1.0)
(s110 1.0)
(s111 1.0)
(s112 1.0)
(s113 1.0)
(s114 1.0)
(s115 1.0)
(s116 1.0)
(s117 1.0)
(s118 1.0)
(s119 1.0)
(s120 1.0)
(s121 1.0)
(s122 1.0)
(s123 1.0)
(s124 1.0)
(s125 1.0)
(s126 1.0)
(s127 1.0)
(s128 1.0)
(s129 1.0)
(s130 1.0)
(s131 1.0)
(s132 1.0)
(s133 1.0)
(s134 1.0)
(s135 1.0)
(s136 1.0)
(s137 1.0)
(s138 1.0)
(s139 1.0)
(s140 1.0)
(s141 1.0)
(s142 1.0)
(s143 1.0)
(s144 1.0)
(s145 1.0)
(s146 1.0)
(s147 1.0)
(s148 1.0)
(s149 1.0)
(s150 1.0)
(s151 1.0)
(s152 1.0)
(s153 1.0)
(s154 1.0)
(s155 1.0)
(s156 1.0)
(s157 1.0)
(s158 1.0)
(s159 1.0)
(s160 1.0)
(s161 1.0)
(s162 1.0)
(s163 1.0)
(s164 1.0)
(s165 1.0)
(s166 1.0)
(s167 1.0)
(s168 1.0)
(s169 1.0)
(s170 1.0)
(s171 1.0)
(s172 1.0)
(s173 1.0)
(s174 1.0)
(s175 1.0)
(s176 1.0)
(s177 1.0)
(s178 1.0)
(s179 1.0)
(s180 1.0)
(s181 1.0)
(s182 1.0)
(s183 1.0)
(s184 1.0)
(s185 1.0)
(s186 1.0)
(s187 1.0)
(s188 1.0)
(s189 1.0)
(s190 1.0)
(s191 1.0)
(s192 1.0)
(s193 1.0)
(s194 1.0)
(s195 1.0)
(s196 1.0)
(s197 1.0)
(s198 1.0)
(s199 1.0)
(s200 1.0)
(s201 1.0)
(s202 1.0)
(s203 1.0)
(s204 1.0)
(s205 1.0)
(s206 1.0)
(s207 1.0)
(s208 1.0)
(s209 1.0)
(s210 1.0)
(s211 1.0)
(s212 1.0)
(s213 1.0)
(s214 1.0)
(s215 1.0)
(s216 1.0)
(s217 1.0)
(s218 1.0)
(s219 1.0)
(s220 1.0)
(s221 1.0)
(s222 1.0)
(s223 1.0)
(s224 1.0)
(s225 1.0)
(s226 1.0)
(s227 1.0)
(s228 1.0)
(s229 1.0)
(s230 1.0)
(s231 1.0)
(s232 1.0)
(s233 1.0)
(s234 1.0)
(s235 1.0)
(s236 1.0)
(s237 1.0)
(s238 1.0)
(s239 1.0)
(s240 1.0)
(s241 1.0)
(s242 1.0)
(s243 1.0)
(s244 1.0)
(s245 1.0)
(s246 1.0)
(s247 1.0)
(s248 1.0)
(s249 1.0)
(s250 1.0)
(s251 1.0)
(s252 1.0)
(s253 1.0)
(s254 1.0)
(s255 1.0)
(s256 1.0)
(s257 1.0)
(s258 1.0)
(s259 1.0)
(s260 1.0)
(s261 1.0)
(s262 1.0)
(s263 1.0)
(s264 1.0)
(s265 1.0)
(s266 1.0)
(s267 1.0)
(s268 1.0)
(s269 1.0)
(s270 1.0)
(s271 1.0)
(s272 1.0)
(s273 1.0)
(s274 1.0)
(s275 1.0)
(s276 1.0)
(s277 1.0)
(s278 1.0)
(s279 1.0)
(s280 1.0)
(s281 1.0)
(s282 1.0)
(s283 1.0)
(s284 1.0)
(s285 1.0)
(s286 1.0)
(s287 1.0)
(s288 1.0)
(s289 1.0)
(s290 1.0)
(s291 1.0)
(s292 1.0)
(s293 1.0)
(s294 1.0)
(s295 1.0)
(s296 1.0)
(s297 1.0)
(s298 1.0)
(s299 1.0)
(s300 1.0)
(s301 1.0)
(s302 1.0)
(s303 1.0)
(s304 1.0)
(s305 1.0)
(s306 1.0)
(s307 1.0)
(s308 1.0)
(s309 1.0)
(s310 1.0)
(s311 1.0)
(s312 1.0)
(s313 1.0)
(s314 1.0)
(s315 1.0)
(s316 1.0)
(s317 1.0)
(s318 1.0)
(s319 1.0)
(s320 1.0)
(s321 1.0)
(s322 1.0)
(s323 1.0)
(s324 1.0)
(s325 1.0)
(s326 1.0)
(s327 1.0)
(s328 1.0)
(s329 1.0)
(s330 1.0)
(s331 1.0)
(s332 1.0)
(s333 1.0)
(s334 1.0)
(s335 1.0)
(s336 1.0)
(s337 1.0)
(s338 1.0)
(s339 1.0)
(s340 1.0)
(s341 1.0)
(s342 1.0)
(s343 1.0)
(s344 1.0)
(s345 1.0)
(s346 1.0)
(s347 1.0)
(s348 1.0)
(s349 1.0)
(s350 1.0)
(s351 1.0)
(s352 1.0)
(s353 1.0)
(s354 1.0)
(s355 1.0)
(s356 1.0)
(s357 1.0)
(s358 1.0)
(s359 1.0)
(s360 1.0)
(s361 1.0)
(s362 1.0)
(s363 1.0)
(s364 1.0)
(s365 1.0)
(s366 1.0)
(s367 1.0)
(s368 1.0)
(s369 1.0)
(s370 1.0)
(s371 1.0)
(s372 1.0)
(s373 1.0)
(s374 1.0)
(s375 1.0)
(s376 1.0)
(s377 timeout
org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30097 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 3221/3221 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3221 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Error getting values : (error "Error writing to Z3 solver: java.io.IOException: Broken pipe")
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30080 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 0/3221 constraints, Known Traps: 0/0 constraints]
After SMT, in 76067ms problems are : Problem set: 0 solved, 3221 unsolved
Search for dead transitions found 0 dead transitions in 76128ms
Starting structural reductions in LTL mode, iteration 1 : 3474/3475 places, 3222/3222 transitions.
Finished structural reductions in LTL mode , in 1 iterations and 266427 ms. Remains : 3474/3475 places, 3222/3222 transitions.
Stuttering acceptance computed with spot in 442 ms :[true, (AND (NOT p0) (NOT p1)), (AND (NOT p0) (NOT p1)), (NOT p1)]
Running random walk in product with property : Echo-PT-d05r03-LTLCardinality-00
Product exploration explored 100000 steps with 50000 reset in 2110 ms.
Product exploration explored 100000 steps with 50000 reset in 1653 ms.
Computed a total of 3474 stabilizing places and 3222 stable transitions
Complete graph has no SCC; deadlocks are unavoidable. place count 3474 transition count 3222
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge (and all enablings converge to false).
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge : F ( (Ga|G!a) & (Gb|G!b)...)
Knowledge obtained : [(AND p0 p1), (X p0), (X (X p1)), (F (OR (G p0) (G (NOT p0)))), (F (OR (G p1) (G (NOT p1))))]
False Knowledge obtained : []
Property proved to be true thanks to knowledge (Minato strategy)
Knowledge based reduction with 5 factoid took 33 ms. Reduced automaton from 4 states, 5 edges and 2 AP (stutter sensitive) to 1 states, 0 edges and 0 AP (stutter insensitive).
FORMULA Echo-PT-d05r03-LTLCardinality-00 TRUE TECHNIQUES KNOWLEDGE
Treatment of property Echo-PT-d05r03-LTLCardinality-00 finished in 274258 ms.
Running Spot : '/home/mcc/BenchKit/itstools/itstools/plugins/fr.lip6.ltl.spot.binaries_1.0.0.202405141337/bin/ltl2tgba-linux64' '--check=stutter' '--hoaf=tv' '-f' '!(G(F(p0)))'
Support contains 1 out of 3475 places. Attempting structural reductions.
Starting structural reductions in SI_LTL mode, iteration 0 : 3475/3475 places, 3222/3222 transitions.
Graph (complete) has 15825 edges and 3475 vertex of which 3463 are kept as prefixes of interest. Removing 12 places using SCC suffix rule.80 ms
Discarding 12 places :
Also discarding 1 output transitions
Drop transitions (Output transitions of discarded places.) removed 1 transitions
Reduce places removed 1 places and 1 transitions.
Applied a total of 1 rules in 684 ms. Remains 3462 /3475 variables (removed 13) and now considering 3220/3222 (removed 2) transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:43:00] [INFO ] Invariants computation overflowed in 11434 ms
[2024-06-01 04:43:05] [INFO ] Implicit Places using invariants in 17269 ms returned []
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:43:17] [INFO ] Invariants computation overflowed in 11187 ms
[2024-06-01 04:45:09] [INFO ] Performed 1/3462 implicitness test of which 0 returned IMPLICIT in 32 seconds.
[2024-06-01 04:45:42] [INFO ] Performed 3/3462 implicitness test of which 0 returned IMPLICIT in 64 seconds.
[2024-06-01 04:45:57] [INFO ] Implicit Places using invariants and state equation in 171225 ms returned []
Implicit Place search using SMT with State Equation took 188497 ms to find 0 implicit places.
[2024-06-01 04:45:57] [INFO ] Redundant transitions in 239 ms returned []
Running 3210 sub problems to find dead transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:46:09] [INFO ] Invariants computation overflowed in 11711 ms
Error getting values : (error "ParserException while parsing response: ((s0 1.0)
(s1 1.0)
(s2 1.0)
(s3 1.0)
(s4 1.0)
(s5 1.0)
(s6 1.0)
(s7 1.0)
(s8 1.0)
(s9 1.0)
(s10 1.0)
(s11 1.0)
(s12 1.0)
(s13 1.0)
(s14 1.0)
(s15 1.0)
(s16 1.0)
(s17 1.0)
(s18 1.0)
(s19 1.0)
(s20 1.0)
(s21 1.0)
(s22 1.0)
(s23 1.0)
(s24 1.0)
(s25 1.0)
(s26 1.0)
(s27 1.0)
(s28 1.0)
(s29 1.0)
(s30 1.0)
(s31 1.0)
(s32 1.0)
(s33 1.0)
(s34 1.0)
(s35 1.0)
(s36 1.0)
(s37 1.0)
(s38 1.0)
(s39 1.0)
(s40 1.0)
(s41 1.0)
(s42 1.0)
(s43 1.0)
(s44 1.0)
(s45 1.0)
(s46 1.0)
(s47 1.0)
(s48 1.0)
(s49 1.0)
(s50 1.0)
(s51 1.0)
(s52 1.0)
(s53 1.0)
(s54 1.0)
(s55 1.0)
(s56 1.0)
(s57 1.0)
(s58 1.0)
(s59 1.0)
(s60 1.0)
(s61 1.0)
(s62 1.0)
(s63 1.0)
(s64 1.0)
(s65 1.0)
(s66 1.0)
(s67 1.0)
(s68 1.0)
(s69 1.0)
(s70 1.0)
(s71 1.0)
(s72 1.0)
(s73 1.0)
(s74 1.0)
(s75 1.0)
(s76 1.0)
(s77 1.0)
(s78 1.0)
(s79 1.0)
(s80 1.0)
(s81 1.0)
(s82 1.0)
(s83 1.0)
(s84 1.0)
(s85 1.0)
(s86 1.0)
(s87 1.0)
(s88 1.0)
(s89 1.0)
(s90 1.0)
(s91 1.0)
(s92 1.0)
(s93 1.0)
(s94 1.0)
(s95 1.0)
(s96 1.0)
(s97 1.0)
(s98 1.0)
(s99 1.0)
(s100 1.0)
(s101 1.0)
(s102 1.0)
(s103 1.0)
(s104 1.0)
(s105 1.0)
(s106 1.0)
(s107 1.0)
(s108 1.0)
(s109 1.0)
(s110 1.0)
(s111 1.0)
(s112 1.0)
(s113 1.0)
(s114 1.0)
(s115 1.0)
(s116 1.0)
(s117 1.0)
(s118 1.0)
(s119 1.0)
(s120 1.0)
(s121 1.0)
(s122 1.0)
(s123 1.0)
(s124 1.0)
(s125 1.0)
(s126 1.0)
(s127 1.0)
(s128 1.0)
(s129 1.0)
(s130 1.0)
(s131 1.0)
(s132 1.0)
(s133 1.0)
(s134 1.0)
(s135 1.0)
(s136 1.0)
(s137 1.0)
(s138 1.0)
(s139 1.0)
(s140 1.0)
(s141 1.0)
(s142 1.0)
(s143 1.0)
(s144 1.0)
(s145 1.0)
(s146 1.0)
(s147 1.0)
(s148 1.0)
(s149 1.0)
(s150 1.0)
(s151 1.0)
(s152 1.0)
(s153 1.0)
(s154 1.0)
(s155 1.0)
(s156 1.0)
(s157 1.0)
(s158 1.0)
(s159 1.0)
(s160 1.0)
(s161 1.0)
(s162 1.0)
(s163 1.0)
(s164 1.0)
(s165 1.0)
(s166 1.0)
(s167 1.0)
(s168 1.0)
(s169 1.0)
(s170 1.0)
(s171 1.0)
(s172 1.0)
(s173 1.0)
(s174 1.0)
(s175 1.0)
(s176 1.0)
(s177 1.0)
(s178 1.0)
(s179 1.0)
(s180 1.0)
(s181 1.0)
(s182 1.0)
(s183 1.0)
(s184 1.0)
(s185 1.0)
(s186 1.0)
(s187 1.0)
(s188 1.0)
(s189 1.0)
(s190 1.0)
(s191 1.0)
(s192 1.0)
(s193 1.0)
(s194 1.0)
(s195 1.0)
(s196 1.0)
(s197 1.0)
(s198 1.0)
(s199 1.0)
(s200 1.0)
(s201 1.0)
(s202 1.0)
(s203 1.0)
(s204 1.0)
(s205 1.0)
(s206 1.0)
(s207 1.0)
(s208 1.0)
(s209 1.0)
(s210 1.0)
(s211 1.0)
(s212 1.0)
(s213 1.0)
(s214 1.0)
(s215 1.0)
(s216 1.0)
(s217 1.0)
(s218 1.0)
(s219 1.0)
(s220 1.0)
(s221 1.0)
(s222 1.0)
(s223 1.0)
(s224 1.0)
(s225 1.0)
(s226 1.0)
(s227 1.0)
(s228 1.0)
(s229 1.0)
(s230 1.0)
(s231 1.0)
(s232 1.0)
(s233 1.0)
(s234 1.0)
(s235 1.0)
(s236 1.0)
(s237 1.0)
(s238 1.0)
(s239 1.0)
(s240 1.0)
(s241 1.0)
(s242 1.0)
(s243 1.0)
(s244 1.0)
(s245 1.0)
(s246 1.0)
(s247 1.0)
(s248 1.0)
(s249 1.0)
(s250 1.0)
(s251 1.0)
(s252 1.0)
(s253 1.0)
(s254 1.0)
(s255 1.0)
(s256 1.0)
(s257 1.0)
(s258 1.0)
(s259 1.0)
(s260 1.0)
(s261 1.0)
(s262 1.0)
(s263 1.0)
(s264 1.0)
(s265 1.0)
(s266 1.0)
(s267 1.0)
(s268 1.0)
(s269 1.0)
(s270 1.0)
(s271 1.0)
(s272 1.0)
(s273 1.0)
(s274 1.0)
(s275 1.0)
(s276 1.0)
(s277 1.0)
(s278 1.0)
(s279 1.0)
(s280 1.0)
(s281 1.0)
(s282 1.0)
(s283 1.0)
(s284 1.0)
(s285 1.0)
(s286 1.0)
(s287 1.0)
(s288 1.0)
(s289 1.0)
(s290 1.0)
(s291 1.0)
(s292 1.0)
(s293 1.0)
(s294 1.0)
(s295 1.0)
(s296 1.0)
(s297 1.0)
(s298 1.0)
(s299 1.0)
(s300 1.0)
(s301 1.0)
(s302 1.0)
(s303 1.0)
(s304 1.0)
(s305 1.0)
(s306 1.0)
(s307 1.0)
(s308 1.0)
(s309 1.0)
(s310 1.0)
(s311 1.0)
(s312 1.0)
(s313 1.0)
(s314 1.0)
(s315 1.0)
(s316 1.0)
(s317 1.0)
(s318 1.0)
(s319 1.0)
(s320 1.0)
(s321 1.0)
(s322 1.0)
(s323 1.0)
(s324 1.0)
(s325 1.0)
(s326 1.0)
(s327 1.0)
(s328 1.0)
(s329 1.0)
(s330 1.0)
(s331 1.0)
(s332 1.0)
(s333 1.0)
(s334 1.0)
(s335 1.0)
(s336 1.0)
(s337 1.0)
(s338 1.0)
(s339 1.0)
(s340 1.0)
(s341 1.0)
(s342 1.0)
(s343 1.0)
(s344 1.0)
(s345 1.0)
(s346 1.0)
(s347 1.0)
(s348 1.0)
(s349 1.0)
(s350 1.0)
(s351 1.0)
(s352 1.0)
(s353 1.0)
(s354 1.0)
(s355 1.0)
(s356 1.0)
(s357 1.0)
(s358 1.0)
(s359 1.0)
(s360 1.0)
(s361 1.0)
(s362 1.0)
(s363 1.0)
(s364 1.0)
(s365 1.0)
(s366 1.0)
(s367 1.0)
(s368 1.0)
(s369 1.0)
(s370 1.0)
(s371 1.0)
(s372 1.0)
(s373 1.0)
(s374 1.0)
(s375 1.0)
(s376 1.0)
(s377 1.0)
(s378 1.0)
(s379 1.0)
(s380 1.0)
(s381 1.0)
(s382 1.0)
(s383 1.0)
(s384 1.0)
(s385 1.0)
(s386 1.0)
(s387 1.0)
(s388 1.0)
(s389 1.0)
(s390 1.0)
(s391 1.0)
(s392 1.0)
(s393 1.0)
(s394 1.0)
(s395 1.0)
(s396 1.0)
(s397 1.0)
(s398 1.0)
(s399 1.0)
(s400 1.0)
(s401 1.0)
(s402 1.0)
(s403 1.0)
(s404 1.0)
(s405 1.0)
(s406 1.0)
(s407 1.0)
(s408 1.0)
(s409 1.0)
(s410 1.0)
(s411 1.0)
(s412 1.0)
(s413 1.0)
(s414 1.0)
(s415 1.0)
(s416 1.0)
(s417 1.0)
(s418 1.0)
(s419 1.0)
(s420 1.0)
(s421 1.0)
(s422 1.0)
(s423 1.0)
(s424 1.0)
(s425 1.0)
(s426 1.0)
(s427 1.0)
(s428 1.0)
(s429 1.0)
(s430 1.0)
(s431 1.0)
(s432 1.0)
(s433 1.0)
(s434 1.0)
(s435 1.0)
(s436 1.0)
(s437 1.0)
(s438 1.0)
(s439 1.0)
(s440 1.0)
(s441 1.0)
(s442 1.0)
(s443 1.0)
(s444 1.0)
(s445 1.0)
(s446 1.0)
(s447 1.0)
(s448 1.0)
(s449 1.0)
(s450 1.0)
(s451 1.0)
(s452 1.0)
(s453 1.0)
(s454 1.0)
(s455 1.0)
(s456 1.0)
(s457 1.0)
(s458 1.0)
(s459 1.0)
(s460 1.0)
(s461 1.0)
(s462 1.0)
(s463 1.0)
(s464 1.0)
(s465 1.0)
(s466 1.0)
(s467 1.0)
(s468 1.0)
(s469 1.0)
(s470 1.0)
(s471 1.0)
(s472 1.0)
(s473 1.0)
(s474 1.0)
(s475 1.0)
(s476 1.0)
(s477 1.0)
(s478 1.0)
(s479 1.0)
(s480 1.0)
(s481 1.0)
(s482 1.0)
(s483 1.0)
(s484 1.0)
(s485 1.0)
(s486 1.0)
(s487 1.0)
(s488 1.0)
(s489 1.0)
(s490 1.0)
(s491 1.0)
(s492 1.0)
(s493 1.0)
(s494 1.0)
(s495 1.0)
(s496 1.0)
(s497 1.0)
(s498 1.0)
(s499 1.0)
(s500 1.0)
(s501 1.0)
(s502 1.0)
(s503 1.0)
(s504 1.0)
(s505 1.0)
(s506 1.0)
(s507 1.0)
(s508 1.0)
(s509 1.0)
(s510 1.0)
(s511 1.0)
(s512 1.0)
(s513 1.0)
(s514 1.0)
(s515 1.0)
(s516 1.0)
(s517 1.0)
(s518 1.0)
(s519 1.0)
(s520 1.0)
(s521 1.0)
(s522 1.0)
(s523 1.0)
(s524 1.0)
(s525 1.0)
(s526 1.0)
(s527 1.0)
(s528 1.0)
(s529 1.0)
(s530 1.0)
(s531 1.0)
(s532 1.0)
(s533 1.0)
(s534 1.0)
(s535 1.0)
(s536 1.0)
(s537 1.0)
(s538 1.0)
(s539 1.0)
(s540 1.0)
(s541 1.0)
(s542 1.0)
(s543 1.0)
(s544 1.0)
(s545 1.0)
(s546 1.0)
(s547 1.0)
(s548 1.0)
(s549 1.0)
(s550 1.0)
(s551 1.0)
(s552 1.0)
(s553 1.0)
(s554 1.0)
(s555 1.0)
(s556 1.0)
(s557 1.0)
(s558 1.0)
(s559 1.0)
(s560 1.0)
(s561 1.0)
(s562 1.0)
(s563 1.0)
(s564 1.0)
(s565 1.0)
(s566 1.0)
(s567 1.0)
(s568 1.0)
(s569 1.0)
(s570 1.0)
(s571 1.0)
(s572 1.0)
(s573 1.0)
(s574 1.0)
(s575 1.0)
(s576 1.0)
(s577 1.0)
(s578 1.0)
(s579 1.0)
(s580 1.0)
(s581 1.0)
(s582 1.0)
(s583 1.0)
(s584 1.0)
(s585 1.0)
(s586 1.0)
(s587 1.0)
(s588 1.0)
(s589 1.0)
(s590 1.0)
(s591 1.0)
(s592 1.0)
(s593 1.0)
(s594 1.0)
(s595 1.0)
(s596 1.0)
(s597 1.0)
(s598 1.0)
(s599 1.0)
(s600 1.0)
(s601 1.0)
(s602 1.0)
(s603 1.0)
(s604 1.0)
(s605 1.0)
(s606 1.0)
(s607 1.0)
(s608 1.0)
(s609 1.0)
(s610 1.0)
(s611 1.0)
(s612 1.0)
(s613 1.0)
(s614 1.0)
(s615 1.0)
(s616 1.0)
(s617 1.0)
(s618 1.0)
(s619 1.0)
(s620 1.0)
(s621 1.0)
(s622 1.0)
(s623 1.0)
(s624 1.0)
(s625 1.0)
(s626 1.0)
(s627 1.0)
(s628 1.0)
(s629 1.0)
(s630 1.0)
(s631 1.0)
(s632 1.0)
(s633 1.0)
(s634 1.0)
(s635 1.0)
(s636 1.0)
(s637 1.0)
(s638 1.0)
(s639 1.0)
(s640 1.0)
(s641 1.0)
(s642 1.0)
(s643 1.0)
(s644 1.0)
(s645 1.0)
(s646 1.0)
(s647 1.0)
(s648 1.0)
(s649 1.0)
(s650 1.0)
(s651 1.0)
(s652 1.0)
(s653 1.0)
(s654 1.0)
(s655 1.0)
(s656 1.0)
(s657 1.0)
(s658 1.0)
(s659 1.0)
(s660 1.0)
(s661 1.0)
(s662 1.0)
(s663 1.0)
(s664 1.0)
(s665 1.0)
(s666 1.0)
(s667 1.0)
(s668 1.0)
(s669 1.0)
(s670 1.0)
(s671 1.0)
(s672 1.0)
(s673 1.0)
(s674 1.0)
(s675 1.0)
(s676 1.0)
(s677 1.0)
(s678 1.0)
(s679 1.0)
(s680 1.0)
(s681 1.0)
(s682 1.0)
(s683 1.0)
(s684 1.0)
(s685 1.0)
(s686 1.0)
(s687 1.0)
(s688 1.0)
(s689 1.0)
(s690 1.0)
(s691 1.0)
(s692 1.0)
(s693 1.0)
(s694 1.0)
(s695 1.0)
(s696 1.0)
(s697 1.0)
(s698 1.0)
(s699 1.0)
(s700 1.0)
(s701 1.0)
(s702 1.0)
(s703 1.0)
(s704 1.0)
(s705 1.0)
(s706 1.0)
(s707 1.0)
(s708 1.0)
(s709 1.0)
(s710 1.0)
(s711 1.0)
(s712 1.0)
(s713 1.0)
(s714 1.0)
(s715 1.0)
(s716 1.0)
(s717 1.0)
(s718 1.0)
(s719 1.0)
(s720 1.0)
(s721 1.0)
(s722 1.0)
(s723 1.0)
(s724 1.0)
(s725 1.0)
(s726 1.0)
(s727 1.0)
(s728 1.0)
(s729 1.0)
(s730 1.0)
(s731 1.0)
(s732 1.0)
(s733 1.0)
(s734 1.0)
(s735 1.0)
(s736 1.0)
(s737 1.0)
(s738 1.0)
(s739 1.0)
(s740 1.0)
(s741 1.0)
(s742 1.0)
(s743 1.0)
(s744 1.0)
(s745 1.0)
(s746 1.0)
(s747 1.0)
(s748 1.0)
(s749 1.0)
(s750 1.0)
(s751 1.0)
(s752 1.0)
(s753 1.0)
(s754 1.0)
(s755 1.0)
(s756 1.0)
(s757 1.0)
(s758 1.0)
(s759 1.0)
(s760 1.0)
(s761 1.0)
(s762 1.0)
(s763 1.0)
(s764 1.0)
(s765 1.0)
(s766 1.0)
(s767 1.0)
(s768 1.0)
(s769 1.0)
(s770 1.0)
(s771 1.0)
(s772 1.0)
(s773 1.0)
(s774 1.0)
(s775 1.0)
(s776 1.0)
(s777 1.0)
(s778 1.0)
(s779 1.0)
(s780 1.0)
(s781 1.0)
(s782 1.0)
(s783 1.0)
(s784 1.0)
(s785 1.0)
(s786 1.0)
(s787 1.0)
(s788 1.0)
(s789 1.0)
(s790 1.0)
(s791 1.0)
(s792 1.0)
(s793 1.0)
(s794 1.0)
(s795 1.0)
(s796 1.0)
(s797 1.0)
(s798 1.0)
(s799 1.0)
(s800 1.0)
(s801 1.0)
(s802 1.0)
(s803 1.0)
(s804 1.0)
(s805 1.0)
(s806 1.0)
(s807 1.0)
(s808 1.0)
(s809 1.0)
(s810 1.0)
(s811 1.0)
(s812 1.0)
(s813 1.0)
(s814 1.0)
(s815 1.0)
(s816 1.0)
(s817 1.0)
(s818 1.0)
(s819 1.0)
(s820 1.0)
(s821 1.0)
(s822 1.0)
(s823 1.0)
(s824 1.0)
(s825 1.0)
(s826 1.0)
(s827 1.0)
(s828 1.0)
(s829 1.0)
(s830 1.0)
(s831 1.0)
(s832 1.0)
(s833 1.0)
(s834 1.0)
(s835 1.0)
(s836 1.0)
(s837 1.0)
(s838 1.0)
(s839 1.0)
(s840 1.0)
(s841 1.0)
(s842 1.0)
(s843 1.0)
(s844 1.0)
(s845 1.0)
(s846 1.0)
(s847 1.0)
(s848 1.0)
(s849 1.0)
(s850 1.0)
(s851 1.0)
(s852 1.0)
(s853 1.0)
(s854 1.0)
(s855 1.0)
(s856 1.0)
(s857 1.0)
(s858 1.0)
(s859 1.0)
(s860 1.0)
(s861 1.0)
(s862 1.0)
(s863 1.0)
(s864 1.0)
(s865 1.0)
(s866 1.0)
(s867 1.0)
(s868 1.0)
(s869 1.0)
(s870 1.0)
(s871 1.0)
(s872 1.0)
(s873 1.0)
(s874 1.0)
(s875 1.0)
(s876 1.0)
(s877 1.0)
(s878 1.0)
(s879 1.0)
(s880 1.0)
(s881 1.0)
(s882 1.0)
(s883 1.0)
(s884 1.0)
(s885 1.0)
(s886 1.0)
(s887 1.0)
(s888 1.0)
(s889 1.0)
(s890 1.0)
(s891 1.0)
(s892 1.0)
(s893 1.0)
(s894 1.0)
(s895 1.0)
(s896 1.0)
(s897 1.0)
(s898 1.0)
(s899 1.0)
(s900 1.0)
(s901 1.0)
(s902 1.0)
(s903 1.0)
(s904 1.0)
(s905 1.0)
(s906 1.0)
(s907 1.0)
(s908 1.0)
(s909 1.0)
(s910 1.0)
(s911 1.0)
(s912 1.0)
(s913 1.0)
(s914 1.0)
(s915 1.0)
(s916 1.0)
(s917 1.0)
(s918 1.0)
(s919 1.0)
(s920 1.0)
(s921 1.0)
(s922 1.0)
(s923 1.0)
(s924 1.0)
(s925 1.0)
(s926 1.0)
(s927 1.0)
(s928 1.0)
(s929 1.0)
(s930 1.0)
(s931 1.0)
(s932 1.0)
(s933 1.0)
(s934 1.0)
(s935 1.0)
(s936 1.0)
(s937 1.0)
(s938 1.0)
(s939 1.0)
(s940 1.0)
(s941 1.0)
(s942 1.0)
(s943 1.0)
(s944 1.0)
(s945 1.0)
(s946 1.0)
(s947 1.0)
(s948 1.0)
(s949 1.0)
(s950 1.0)
(s951 1.0)
(s952 1.0)
(s953 1.0)
(s954 1.0)
(s955 1.0)
(s956 1.0)
(s957 1.0)
(s958 1.0)
(s959 1.0)
(s960 1.0)
(s961 1.0)
(s962 1.0)
(s963 1.0)
(s964 1.0)
(s965 1.0)
(s966 1.0)
(s967 1.0)
(s968 1.0)
(s969 1.0)
(s970 1.0)
(s971 1.0)
(s972 1.0)
(s973 1.0)
(s974 1.0)
(s975 1.0)
(s976 1.0)
(s977 1.0)
(s978 1.0)
(s979 1.0)
(s980 1.0)
(s981 1.0)
(s982 1.0)
(s983 1.0)
(s984 1.0)
(s985 1.0)
(s986 1.0)
(s987 1.0)
(s988 1.0)
(s989 1.0)
(s990 1.0)
(s991 1.0)
(s992 1.0)
(s993 1.0)
(s994 1.0)
(s995 1.0)
(s996 1.0)
(s997 1.0)
(s998 1.0)
(s999 1.0)
(s1000 1.0)
(s1001 1.0)
(s1002 1.0)
(s1003 1.0)
(s1004 1.0)
(s1005 1.0)
(s1006 1.0)
(s1007 1.0)
(s1008 1.0)
(s1009 1.0)
(s1010 1.0)
(s1011 1.0)
(s1012 1.0)
(s1013 1.0)
(s1014 1.0)
(s1015 1.0)
(s1016 1.0)
(s1017 1.0)
(s1018 1.0)
(s1019 1.0)
(s1020 1.0)
(s1021 1.0)
(s1022 1.0)
(s1023 1.0)
(s1024 1.0)
(s1025 1.0)
(s1026 1.0)
(s1027 1.0)
(s1028 1.0)
(s1029 1.0)
(s1030 1.0)
(s1031 1.0)
(s1032 1.0)
(s1033 1.0)
(s1034 1.0)
(s1035 1.0)
(s1036 1.0)
(s1037 1.0)
(s1038 1.0)
(s1039 1.0)
(s1040 1.0)
(s1041 1.0)
(s1042 1.0)
(s1043 1.0)
(s1044 1.0)
(s1045 1.0)
(s1046 1.0)
(s1047 1.0)
(s1048 1.0)
(s1049 1.0)
(s1050 1.0)
(s1051 1.0)
(s1052 1.0)
(s1053 1.0)
(s1054 1.0)
(s1055 1.0)
(s1056 1.0)
(s1057 1.0)
(s1058 1.0)
(s1059 1.0)
(s1060 1.0)
(s1061 1.0)
(s1062 1.0)
(s1063 1.0)
(s1064 1.0)
(s1065 timeout
org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30059 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 3210/3210 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3210 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Error getting values : (error "ParserException while parsing response: ((s0 1)
(s1 1)
(s2 1)
(s3 1)
(s4 1)
(s5 1)
(s6 1)
(s7 1)
(s8 1)
(s9 1)
(s10 1)
(s11 1)
(s12 1)
(s13 1)
(s14 1)
(s15 1)
(s16 1)
(s17 1)
(s18 1)
(s19 1)
(s20 1)
(s21 1)
(s22 1)
(s23 1)
(s24 1)
(s25 1)
(s26 1)
(s27 1)
(s28 1)
(s29 1)
(s30 1)
(s31 1)
(s32 1)
(s33 1)
(s34 1)
(s35 1)
(s36 1)
(s37 1)
(s38 1)
(s39 1)
(s40 1)
(s41 1)
(s42 1)
(s43 1)
(s44 1)
(s45 1)
(s46 1)
(s47 1)
(s48 1)
(s49 1)
(s50 1)
(s51 1)
(s52 1)
(s53 1)
(s54 1)
(s55 1)
(s56 1)
(s57 1)
(s58 1)
(s59 1)
(s60 1)
(s61 1)
(s62 1)
(s63 1)
(s64 1)
(s65 1)
(s66 1)
(s67 1)
(s68 1)
(s69 1)
(s70 1)
(s71 1)
(s72 1)
(s73 1)
(s74 1)
(s75 1)
(s76 1)
(s77 1)
(s78 1)
(s79 1)
(s80 1)
(s81 1)
(s82 1)
(s83 1)
(s84 1)
(s85 1)
(s86 1)
(s87 1)
(s88 1)
(s89 1)
(s90 1)
(s91 1)
(s92 1)
(s93 1)
(s94 1)
(s95 1)
(s96 1)
(s97 1)
(s98 1)
(s99 1)
(s100 1)
(s101 1)
(s102 1)
(s103 1)
(s104 1)
(s105 1)
(s106 1)
(s107 1)
(s108 1)
(s109 1)
(s110 1)
(s111 1)
(s112 1)
(s113 1)
(s114 1)
(s115 1)
(s116 1)
(s117 1)
(s118 1)
(s119 1)
(s120 1)
(s121 1)
(s122 1)
(s123 1)
(s124 1)
(s125 1)
(s126 1)
(s127 1)
(s128 1)
(s129 1)
(s130 1)
(s131 1)
(s132 1)
(s133 1)
(s134 1)
(s135 1)
(s136 1)
(s137 1)
(s138 1)
(s139 1)
(s140 1)
(s141 1)
(s142 1)
(s143 1)
(s144 1)
(s145 1)
(s146 1)
(s147 1)
(s148 1)
(s149 1)
(s150 1)
(s151 1)
(s152 1)
(s153 1)
(s154 1)
(s155 1)
(s156 1)
(s157 1)
(s158 1)
(s159 1)
(s160 1)
(s161 1)
(s162 1)
(s163 1)
(s164 1)
(s165 1)
(s166 1)
(s167 1)
(s168 1)
(s169 1)
(s170 1)
(s171 1)
(s172 1)
(s173 1)
(s174 1)
(s175 1)
(s176 1)
(s177 1)
(s178 1)
(s179 1)
(s180 1)
(s181 1)
(s182 1)
(s183 1)
(s184 1)
(s185 1)
(s186 1)
(s187 1)
(s188 1)
(s189 1)
(s190 1)
(s191 1)
(s192 1)
(s193 1)
(s194 1)
(s195 1)
(s196 1)
(s197 1)
(s198 1)
(s199 1)
(s200 1)
(s201 1)
(s202 1)
(s203 1)
(s204 1)
(s205 1)
(s206 1)
(s207 1)
(s208 1)
(s209 1)
(s210 1)
(s211 1)
(s212 1)
(s213 1)
(s214 1)
(s215 1)
(s216 1)
(s217 1)
(s218 1)
(s219 1)
(s220 1)
(s221 1)
(s222 1)
(s223 1)
(s224 1)
(s225 1)
(s226 1)
(s227 1)
(s228 1)
(s229 1)
(s230 1)
(s231 1)
(s232 1)
(s233 1)
(s234 1)
(s235 1)
(s236 1)
(s237 1)
(s238 1)
(s239 1)
(s240 1)
(s241 1)
(s242 1)
(s243 1)
(s244 1)
(s245 1)
(s246 1)
(s247 1)
(s248 1)
(s249 1)
(s250 1)
(s251 1)
(s252 1)
(s253 1)
(s254 1)
(s255 1)
(s256 1)
(s257 1)
(s258 1)
(s259 1)
(s260 1)
(s261 1)
(s262 1)
(s263 1)
(s264 1)
(s265 1)
(s266 1)
(s267 1)
(s268 1)
(s269 1)
(s270 1)
(s271 1)
(s272 1)
(s273 1)
(s274 1)
(s275 1)
(s276 1)
(s277 1)
(s278 1)
(s279 1)
(s280 1)
(s281 1)
(s282 1)
(s283 1)
(s284 1)
(s285 1)
(s286 1)
(s287 1)
(s288 1)
(s289 1)
(s290 1)
(s291 1)
(s292 1)
(s293 1)
(s294 1)
(s295 1)
(s296 1)
(s297 1)
(s298 1)
(s299 1)
(s300 1)
(s301 1)
(s302 1)
(s303 1)
(s304 1)
(s305 1)
(s306 1)
(s307 1)
(s308 1)
(s309 1)
(s310 1)
(s311 1)
(s312 1)
(s313 1)
(s314 1)
(s315 1)
(s316 1)
(s317 1)
(s318 1)
(s319 1)
(s320 1)
(s321 1)
(s322 1)
(s323 1)
(s324 1)
(s325 1)
(s326 1)
(s327 1)
(s328 1)
(s329 1)
(s330 1)
(s331 1)
(s332 1)
(s333 1)
(s334 1)
(s335 1)
(s336 1)
(s337 1)
(s338 1)
(s339 1)
(s340 1)
(s341 1)
(s342 1)
(s343 1)
(s344 1)
(s345 1)
(s346 1)
(s347 1)
(s348 1)
(s349 1)
(s350 1)
(s351 1)
(s352 1)
(s353 1)
(s354 1)
(s355 1)
(s356 1)
(s357 1)
(s358 1)
(s359 1)
(s360 1)
(s361 1)
(s362 1)
(s363 1)
(s364 1)
(s365 1)
(s366 1)
(s367 1)
(s368 1)
(s369 1)
(s370 1)
(s371 1)
(s372 1)
(s373 1)
(s374 1)
(s375 1)
(s376 1)
(s377 1)
(s378 1)
(s379 1)
(s380 1)
(s381 1)
(s382 1)
(s383 1)
(s384 1)
(s385 1)
(s386 1)
(s387 1)
(s388 1)
(s389 1)
(s390 1)
(s391 1)
(s392 1)
(s393 1)
(s394 1)
(s395 1)
(s396 1)
(s397 1)
(s398 1)
(s399 1)
(s400 1)
(s401 1)
(s402 1)
(s403 1)
(s404 1)
(s405 1)
(s406 1)
(s407 1)
(s408 1)
(s409 1)
(s410 1)
(s411 1)
(s412 1)
(s413 1)
(s414 1)
(s415 1)
(s416 1)
(s417 1)
(s418 1)
(s419 1)
(s420 1)
(s421 1)
(s422 1)
(s423 1)
(s424 1)
(s425 1)
(s426 1)
(s427 1)
(s428 1)
(s429 1)
(s430 1)
(s431 1)
(s432 1)
(s433 1)
(s434 1)
(s435 1)
(s436 1)
(s437 1)
(s438 1)
(s439 1)
(s440 1)
(s441 1)
(s442 1)
(s443 1)
(s444 1)
(s445 1)
(s446 1)
(s447 1)
(s448 1)
(s449 1)
(s450 1)
(s451 1)
(s452 1)
(s453 1)
(s454 1)
(s455 1)
(s456 1)
(s457 1)
(s458 1)
(s459 1)
(s460 1)
(s461 1)
(s462 1)
(s463 1)
(s464 1)
(s465 1)
(s466 1)
(s467 1)
(s468 1)
(s469 1)
(s470 1)
(s471 1)
(s472 1)
(s473 1)
(s474 1)
(s475 1)
(s476 1)
(s477 1)
(s478 1)
(s479 1)
(s480 1)
(s481 1)
(s482 1)
(s483 1)
(s484 1)
(s485 1)
(s486 1)
(s487 1)
(s488 1)
(s489 1)
(s490 1)
(s491 1)
(s492 1)
(s493 1)
(s494 1)
(s495 1)
(s496 1)
(s497 1)
(s498 1)
(s499 1)
(s500 1)
(s501 1)
(s502 1)
(s503 1)
(s504 1)
(s505 1)
(s506 1)
(s507 1)
(s508 1)
(s509 1)
(s510 1)
(s511 1)
(s512 1)
(s513 1)
(s514 1)
(s515 1)
(s516 1)
(s517 1)
(s518 1)
(s519 1)
(s520 1)
(s521 1)
(s522 1)
(s523 1)
(s524 1)
(s525 1)
(s526 1)
(s527 1)
(s528 1)
(s529 1)
(s530 1)
(s531 1)
(s532 1)
(s533 1)
(s534 1)
(s535 1)
(s536 1)
(s537 1)
(s538 1)
(s539 1)
(s540 1)
(s541 1)
(s542 1)
(s543 1)
(s544 1)
(s545 1)
(s546 1)
(s547 1)
(s548 1)
(s549 1)
(s550 1)
(s551 1)
(s552 1)
(s553 1)
(s554 1)
(s555 1)
(s556 1)
(s557 1)
(s558 1)
(s559 1)
(s560 1)
(s561 1)
(s562 1)
(s563 1)
(s564 1)
(s565 1)
(s566 1)
(s567 1)
(s568 1)
(s569 1)
(s570 1)
(s571 1)
(s572 1)
(s573 1)
(s574 1)
(s575 1)
(s576 1)
(s577 1)
(s578 1)
(s579 1)
(s580 1)
(s581 1)
(s582 1)
(s583 1)
(s584 1)
(s585 1)
(s586 1)
(s587 1)
(s588 1)
(s589 1)
(s590 1)
(s591 1)
(s592 1)
(s593 1)
(s594 1)
(s595 1)
(s596 1)
(s597 1)
(s598 1)
(s599 1)
(s600 1)
(s601 1)
(s602 1)
(s603 1)
(s604 1)
(s605 1)
(s606 1)
(s607 1)
(s608 1)
(s609 1)
(s610 1)
(s611 1)
(s612 1)
(s613 1)
(s614 1)
(s615 1)
(s616 1)
(s617 1)
(s618 1)
(s619 1)
(s620 1)
(s621 1)
(s622 1)
(s623 1)
(s624 1)
(s625 1)
(s626 1)
(s627 1)
(s628 1)
(s629 1)
(s630 1)
(s631 1)
(s632 1)
(s633 1)
(s634 1)
(s635 1)
(s636 1)
(s637 1)
(s638 1)
(s639 1)
(s640 1)
(s641 1)
(s642 1)
(s643 1)
(s644 1)
(s645 1)
(s646 1)
(s647 1)
(s648 1)
(s649 1)
(s650 1)
(s651 1)
(s652 1)
(s653 1)
(s654 1)
(s655 1)
(s656 1)
(s657 1)
(s658 1)
(s659 1)
(s660 1)
(s661 1)
(s662 1)
(s663 1)
(s664 1)
(s665 1)
(s666 1)
(s667 1)
(s668 1)
(s669 1)
(s670 1)
(s671 1)
(s672 1)
(s673 1)
(s674 1)
(s675 1)
(s676 1)
(s677 1)
(s678 1)
(s679 1)
(s680 1)
(s681 1)
(s682 1)
(s683 1)
(s684 1)
(s685 1)
(s686 1)
(s687 1)
(s688 1)
(s689 1)
(s690 1)
(s691 1)
(s692 1)
(s693 1)
(s694 1)
(s695 1)
(s696 1)
(s697 1)
(s698 1)
(s699 1)
(s700 1)
(s701 1)
(s702 1)
(s703 1)
(s704 1)
(s705 1)
(s706 1)
(s707 1)
(s708 1)
(s709 1)
(s710 1)
(s711 1)
(s712 1)
(s713 1)
(s714 1)
(s715 1)
(s716 1)
(s717 1)
(s718 1)
(s719 1)
(s720 1)
(s721 1)
(s722 1)
(s723 1)
(s724 1)
(s725 1)
(s726 1)
(s727 1)
(s728 1)
(s729 1)
(s730 1)
(s731 1)
(s732 1)
(s733 1)
(s734 1)
(s735 1)
(s736 1)
(s737 1)
(s738 1)
(s739 1)
(s740 1)
(s741 1)
(s742 1)
(s743 1)
(s744 1)
(s745 1)
(s746 1)
(s747 1)
(s748 1)
(s749 1)
(s750 1)
(s751 1)
(s752 1)
(s753 1)
(s754 1)
(s755 1)
(s756 1)
(s757 1)
(s758 1)
(s759 1)
(s760 1)
(s761 1)
(s762 1)
(s763 1)
(s764 1)
(s765 1)
(s766 1)
(s767 1)
(s768 1)
(s769 1)
(s770 1)
(s771 1)
(s772 1)
(s773 1)
(s774 1)
(s775 1)
(s776 1)
(s777 1)
(s778 1)
(s779 1)
(s780 1)
(s781 1)
(s782 1)
(s783 1)
(s784 1)
(s785 1)
(s786 1)
(s787 1)
(s788 1)
(s789 1)
(s790 1)
(s791 1)
(s792 1)
(s793 1)
(s794 1)
(s795 1)
(s796 1)
(s797 1)
(s798 1)
(s799 1)
(s800 1)
(s801 1)
(s802 1)
(s803 1)
(s804 1)
(s805 1)
(s806 1)
(s807 1)
(s808 1)
(s809 1)
(s810 1)
(s811 1)
(s812 1)
(s813 1)
(s814 1)
(s815 1)
(s816 1)
(s817 1)
(s818 1)
(s819 1)
(s820 1)
(s821 1)
(s822 1)
(s823 1)
(s824 1)
(s825 1)
(s826 1)
(s827 1)
(s828 1)
(s829 1)
(s830 1)
(s831 1)
(s832 1)
(s833 1)
(s834 1)
(s835 1)
(s836 1)
(s837 1)
(s838 1)
(s839 1)
(s840 1)
(s841 1)
(s842 1)
(s843 1)
(s844 1)
(s845 1)
(s846 1)
(s847 1)
(s848 1)
(s849 1)
(s850 1)
(s851 1)
(s852 1)
(s853 1)
(s854 1)
(s855 1)
(s856 1)
(s857 1)
(s858 1)
(s859 1)
(s860 1)
(s861 1)
(s862 1)
(s863 1)
(s864 1)
(s865 1)
(s866 1)
(s867 1)
(s868 1)
(s869 1)
(s870 1)
(s871 1)
(s872 1)
(s873 1)
(s874 1)
(s875 1)
(s876 1)
(s877 1)
(s878 1)
(s879 1)
(s880 1)
(s881 1)
(s882 1)
(s883 1)
(s884 1)
(s885 1)
(s886 1)
(s887 1)
(s888 1)
(s889 1)
(s890 1)
(s891 1)
(s892 1)
(s893 1)
(s894 1)
(s895 1)
(s896 1)
(s897 1)
(s898 1)
(s899 1)
(s900 1)
(s901 1)
(s902 1)
(s903 1)
(s904 1)
(s905 1)
(s906 1)
(s907 1)
(s908 1)
(s909 1)
(s910 1)
(s911 1)
(s912 1)
(s913 1)
(s914 1)
(s915 1)
(s916 1)
(s917 1)
(s918 1)
(s919 1)
(s920 1)
(s921 1)
(s922 1)
(s923 1)
(s924 1)
(s925 1)
(s926 1)
(s927 1)
(s928 1)
(s929 1)
(s930 1)
(s931 1)
(s932 1)
(s933 1)
(s934 1)
(s935 1)
(s936 1)
(s937 1)
(s938 1)
(s939 1)
(s940 1)
(s941 1)
(s942 1)
(s943 1)
(s944 1)
(s945 1)
(s946 1)
(s947 1)
(s948 1)
(s949 1)
(s950 1)
(s951 1)
(s952 1)
(s953 1)
(s954 1)
(s955 1)
(s956 1)
(s957 1)
(s958 1)
(s959 1)
(s960 1)
(s961 1)
(s962 1)
(s963 1)
(s964 1)
(s965 1)
(s966 1)
(s967 1)
(s968 1)
(s969 1)
(s970 1)
(s971 1)
(s972 1)
(s973 1)
(s974 1)
(s975 1)
(s976 1)
(s977 1)
(s978 1)
(s979 1)
(s980 1)
(s981 1)
(s982 1)
(s983 1)
(s984 1)
(s985 1)
(s986 1)
(s987 1)
(s988 1)
(s989 1)
(s990 1)
(s991 1)
(s992 1)
(s993 1)
(s994 1)
(s995 1)
(s996 1)
(s997 1)
(s998 1)
(s999 1)
(s1000 1)
(s1001 1)
(s1002 1)
(s1003 1)
(s1004 1)
(s1005 1)
(s1006 1)
(s1007 1)
(s1008 1)
(s1009 1)
(s1010 1)
(s1011 1)
(s1012 1)
(s1013 1)
(s1014 1)
(s1015 1)
(s1016 1)
(s1017 1)
(s1018 1)
(s1019 1)
(s1020 1)
(s1021 1)
(s1022 1)
(s1023 1)
(s1024 1)
(s1025 1)
(s1026 1)
(s1027 1)
(s1028 1)
(s1029 1)
(s1030 1)
(s1031 1)
(s1032 1)
(s1033 1)
(s1034 1)
(s1035 1)
(s1036 1)
(s1037 1)
(s1038 1)
(s1039 1)
(s1040 1)
(s1041 1)
(s1042 1)
(s1043 1)
(s1044 1)
(s1045 1)
(s1046 1)
(s1047 1)
(s1048 1)
(s1049 1)
(s1050 1)
(s1051 1)
(s1052 1)
(s1053 1)
(s1054 1)
(s1055 1)
(s1056 1)
(s1057 1)
(s1058 1)
(s1059 1)
(s1060 1)
(s1061 1)
(s1062 1)
(s1063 1)
(s1064 1)
(s1065 1)
(s1066 1)
(s1067 1)
(s1068 1)
(s1069 1)
(s1070 1)
(s1071 1)
(s1072 1)
(s1073 1)
(s1074 1)
(s1075 1)
(s1076 1)
(s1077 1)
(s1078 1)
(s1079 1)
(s1080 1)
(s1081 1)
(s1082 1)
(s1083 1)
(s1084 1)
(s1085 1)
(s1086 1)
(s1087 1)
(s1088 1)
(s1089 1)
(s1090 1)
(s1091 1)
(s1092 1)
(s1093 1)
(s1094 1)
(s1095 1)
(s1096 1)
(s1097 1)
(s1098 1)
(s1099 1)
(s1100 1)
(s1101 1)
(s1102 1)
(s1103 1)
(s1104 1)
(s1105 1)
(s1106 1)
(s1107 1)
(s1108 1)
(s1109 1)
(s1110 1)
(s1111 1)
(s1112 1)
(s1113 1)
(s1114 1)
(s1115 1)
(s1116 1)
(s1117 1)
(s1118 1)
(s1119 1)
(s1120 1)
(s1121 1)
(s1122 1)
(s1123 1)
(s1124 1)
(s1125 1)
(s1126 1)
(s1127 1)
(s1128 1)
(s1129 1)
(s1130 1)
(s1131 1)
(s1132 1)
(s1133 1)
(s1134 1)
(s1135 1)
(s1136 1)
(s1137 1)
(s1138 1)
(s1139 1)
(s1140 1)
(s1141 1)
(s1142 1)
(s1143 1)
(s1144 1)
(s1145 1)
(s1146 1)
(s1147 1)
(s1148 1)
(s1149 1)
(s1150 1)
(s1151 1)
(s1152 1)
(s1153 1)
(s1154 1)
(s1155 1)
(s1156 1)
(s1157 1)
(s1158 1)
(s1159 1)
(s1160 1)
(s1161 1)
(s1162 1)
(s1163 1)
(s1164 1)
(s1165 1)
(s1166 1)
(s1167 1)
(s1168 1)
(s1169 1)
(s1170 1)
(s1171 1)
(s1172 1)
(s1173 1)
(s1174 1)
(s1175 1)
(s1176 1)
(s1177 1)
(s1178 1)
(s1179 1)
(s1180 1)
(s1181 1)
(s1182 1)
(s1183 1)
(s1184 1)
(s1185 1)
(s1186 1)
(s1187 1)
(s1188 1)
(s1189 1)
(s1190 1)
(s1191 1)
(s1192 1)
(s1193 1)
(s1194 1)
(s1195 1)
(s1196 1)
(s1197 1)
(s1198 1)
(s1199 1)
(s1200 1)
(s1201 1)
(s1202 1)
(s1203 1)
(s1204 1)
(s1205 1)
(s1206 1)
(s1207 1)
(s1208 1)
(s1209 1)
(s1210 1)
(s1211 1)
(s1212 1)
(s1213 1)
(s1214 1)
(s1215 1)
(s1216 1)
(s1217 1)
(s1218 1)
(s1219 1)
(s1220 1)
(s1221 1)
(s1222 1)
(s1223 1)
(s1224 1)
(s1225 1)
(s1226 1)
(s1227 1)
(s1228 1)
(s1229 1)
(s1230 1)
(s1231 1)
(s1232 1)
(s1233 1)
(s1234 1)
(s1235 1)
(s1236 1)
(s1237 1)
(s1238 1)
(s1239 1)
(s1240 1)
(s1241 1)
(s1242 1)
(s1243 1)
(s1244 1)
(s1245 1)
(s1246 1)
(s1247 1)
(s1248 1)
(s1249 1)
(s1250 1)
(s1251 1)
(s1252 1)
(s1253 1)
(s1254 1)
(s1255 1)
(s1256 1)
(s1257 1)
(s1258 1)
(s1259 1)
(s1260 1)
(s1261 1)
(s1262 1)
(s1263 1)
(s1264 1)
(s1265 1)
(s1266 1)
(s1267 1)
(s1268 1)
(s1269 1)
(s1270 1)
(s1271 1)
(s1272 1)
(s1273 1)
(s1274 1)
(s1275 1)
(s1276 1)
(s1277 1)
(s1278 1)
(s1279 1)
(s1280 1)
(s1281 1)
(s1282 1)
(s1283 1)
(s1284 1)
(s1285 1)
(s1286 1)
(s1287 1)
(s1288 1)
(s1289 1)
(s1290 1)
(s1291 1)
(s1292 1)
(s1293 1)
(s1294 1)
(s1295 1)
(s1296 1)
(s1297 1)
(s1298 1)
(s1299 1)
(s1300 1)
(s1301 1)
(s1302 1)
(s1303 1)
(s1304 1)
(s1305 1)
(s1306 1)
(s1307 1)
(s1308 1)
(s1309 1)
(s1310 1)
(s1311 1)
(s1312 1)
(s1313 1)
(s1314 1)
(s1315 1)
(s1316 1)
(s1317 1)
(s1318 1)
(s1319 1)
(s1320 1)
(s1321 1)
(s1322 1)
(s1323 1)
(s1324 1)
(s1325 1)
(s1326 1)
(s1327 1)
(s1328 1)
(s1329 1)
(s1330 1)
(s1331 1)
(s1332 1)
(s1333 1)
(s1334 1)
(s1335 1)
(s1336 1)
(s1337 1)
(s1338 1)
(s1339 1)
(s1340 1)
(s1341 1)
(s1342 1)
(s1343 1)
(s1344 1)
(s1345 1)
(s1346 1)
(s1347 1)
(s1348 1)
(s1349 1)
(s1350 1)
(s1351 1)
(s1352 1)
(s1353 1)
(s1354 1)
(s1355 1)
(s1356 1)
(s1357 1)
(s1358 1)
(s1359 1)
(s1360 1)
(s1361 1)
(s1362 1)
(s1363 1)
(s1364 1)
(s1365 1)
(s1366 1)
(s1367 1)
(s1368 1)
(s1369 1)
(s1370 1)
(s1371 1)
(s1372 1)
(s1373 1)
(s1374 1)
(s1375 1)
(s1376 1)
(s1377 1)
(s1378 1)
(s1379 1)
(s1380 1)
(s1381 1)
(s1382 1)
(s1383 1)
(s1384 1)
(s1385 1)
(s1386 1)
(s1387 1)
(s1388 1)
(s1389 1)
(s1390 1)
(s1391 1)
(s1392 1)
(s1393 1)
(s1394 1)
(s1395 1)
(s1396 1)
(s1397 1)
(s1398 1)
(s1399 1)
(s1400 1)
(s1401 1)
(s1402 1)
(s1403 1)
(s1404 1)
(s1405 1)
(s1406 1)
(s1407 1)
(s1408 1)
(s1409 1)
(s1410 1)
(s1411 1)
(s1412 1)
(s1413 1)
(s1414 1)
(s1415 1)
(s1416 1)
(s1417 1)
(s1418 1)
(s1419 1)
(s1420 1)
(s1421 1)
(s1422 1)
(s1423 1)
(s1424 1)
(s1425 1)
(s1426 1)
(s1427 1)
(s1428 1)
(s1429 1)
(s1430 1)
(s1431 1)
(s1432 1)
(s1433 1)
(s1434 1)
(s1435 1)
(s1436 1)
(s1437 1)
(s1438 1)
(s1439 1)
(s1440 1)
(s1441 1)
(s1442 1)
(s1443 1)
(s1444 1)
(s1445 1)
(s1446 1)
(s1447 1)
(s1448 1)
(s1449 1)
(s1450 1)
(s1451 1)
(s1452 1)
(s1453 1)
(s1454 1)
(s1455 1)
(s1456 1)
(s1457 1)
(s1458 1)
(s1459 1)
(s1460 1)
(s1461 1)
(s1462 1)
(s1463 1)
(s1464 1)
(s1465 1)
(s1466 1)
(s1467 1)
(s1468 1)
(s1469 1)
(s1470 1)
(s1471 1)
(s1472 1)
(s1473 1)
(s1474 1)
(s1475 1)
(s1476 1)
(s1477 1)
(s1478 1)
(s1479 1)
(s1480 1)
(s1481 1)
(s1482 1)
(s1483 1)
(s1484 1)
(s1485 1)
(s1486 1)
(s1487 1)
(s1488 1)
(s1489 1)
(s1490 1)
(s1491 1)
(s1492 1)
(s1493 1)
(s1494 1)
(s1495 1)
(s1496 1)
(s1497 1)
(s1498 1)
(s1499 1)
(s1500 1)
(s1501 1)
(s1502 1)
(s1503 1)
(s1504 1)
(s1505 1)
(s1506 1)
(s1507 1)
(s1508 1)
(s1509 1)
(s1510 1)
(s1511 1)
(s1512 1)
(s1513 1)
(s1514 1)
(s1515 1)
(s1516 1)
(s1517 1)
(s1518 1)
(s1519 1)
(s1520 1)
(s1521 1)
(s1522 1)
(s1523 1)
(s1524 1)
(s1525 1)
(s1526 1)
(s1527 1)
(s1528 1)
(s1529 1)
(s1530 1)
(s1531 1)
(s1532 1)
(s1533 1)
(s1534 1)
(s1535 1)
(s1536 1)
(s1537 1)
(s1538 1)
(s1539 1)
(s1540 1)
(s1541 1)
(s1542 1)
(s1543 1)
(s1544 1)
(s1545 1)
(s1546 1)
(s1547 1)
(s1548 1)
(s1549 1)
(s1550 1)
(s1551 1)
(s1552 1)
(s1553 1)
(s1554 1)
(s1555 1)
(s1556 1)
(s1557 1)
(s1558 1)
(s1559 1)
(s1560 1)
(s1561 1)
(s1562 1)
(s1563 1)
(s1564 1)
(s1565 1)
(s1566 1)
(s1567 1)
(s1568 1)
(s1569 1)
(s1570 1)
(s1571 1)
(s1572 1)
(s1573 1)
(s1574 1)
(s1575 1)
(s1576 1)
(s1577 1)
(s1578 1)
(s1579 1)
(s1580 1)
(s1581 1)
(s1582 1)
(s1583 1)
(s1584 1)
(s1585 1)
(s1586 1)
(s1587 1)
(s1588 1)
(s1589 1)
(s1590 1)
(s1591 1)
(s1592 1)
(s1593 1)
(s1594 1)
(s1595 1)
(s1596 1)
(s1597 1)
(s1598 1)
(s1599 1)
(s1600 1)
(s1601 1)
(s1602 1)
(s1603 1)
(s1604 1)
(s1605 1)
(s1606 1)
(s1607 1)
(s1608 1)
(s1609 1)
(s1610 1)
(s1611 1)
(s1612 1)
(s1613 1)
(s1614 1)
(s1615 1)
(s1616 1)
(s1617 1)
(s1618 1)
(s1619 1)
(s1620 1)
(s1621 1)
(s1622 1)
(s1623 1)
(s1624 1)
(s1625 1)
(s1626 1)
(s1627 1)
(s1628 1)
(s1629 1)
(s1630 1)
(s1631 1)
(s1632 1)
(s1633 1)
(s1634 1)
(s1635 1)
(s1636 1)
(s1637 1)
(s1638 1)
(s1639 1)
(s1640 1)
(s1641 1)
(s1642 1)
(s1643 1)
(s1644 1)
(s1645 1)
(s1646 1)
(s1647 1)
(s1648 1)
(s1649 1)
(s1650 1)
(s1651 1)
(s1652 1)
(s1653 1)
(s1654 1)
(s1655 1)
(s1656 1)
(s1657 1)
(s1658 1)
(s1659 1)
(s1660 1)
(s1661 1)
(s1662 1)
(s1663 1)
(s1664 1)
(s1665 1)
(s1666 1)
(s1667 1)
(s1668 1)
(s1669 1)
(s1670 1)
(s1671 1)
(s1672 1)
(s1673 1)
(s1674 1)
(s1675 1)
(s1676 1)
(s1677 1)
(s1678 1)
(s1679 1)
(s1680 1)
(s1681 1)
(s1682 1)
(s1683 1)
(s1684 1)
(s1685 1)
(s1686 1)
(s1687 1)
(s1688 1)
(s1689 1)
(s1690 1)
(s1691 1)
(s1692 1)
(s1693 1)
(s1694 1)
(s1695 1)
(s1696 1)
(s1697 1)
(s1698 1)
(s1699 1)
(s1700 1)
(s1701 1)
(s1702 1)
(s1703 1)
(s1704 1)
(s1705 1)
(s1706 1)
(s1707 1)
(s1708 1)
(s1709 1)
(s1710 1)
(s1711 1)
(s1712 1)
(s1713 1)
(s1714 1)
(s1715 1)
(s1716 1)
(s1717 1)
(s1718 1)
(s1719 1)
(s1720 1)
(s1721 1)
(s1722 1)
(s1723 1)
(s1724 1)
(s1725 1)
(s1726 1)
(s1727 1)
(s1728 1)
(s1729 1)
(s1730 1)
(s1731 1)
(s1732 1)
(s1733 1)
(s1734 1)
(s1735 1)
(s1736 1)
(s1737 1)
(s1738 1)
(s1739 1)
(s1740 1)
(s1741 1)
(s1742 1)
(s1743 1)
(s1744 1)
(s1745 1)
(s1746 1)
(s1747 1)
(s1748 1)
(s1749 1)
(s1750 1)
(s1751 1)
(s1752 1)
(s1753 1)
(s1754 1)
(s1755 1)
(s1756 1)
(s1757 1)
(s1758 1)
(s1759 1)
(s1760 1)
(s1761 1)
(s1762 1)
(s1763 1)
(s1764 1)
(s1765 1)
(s1766 1)
(s1767 1)
(s1768 1)
(s1769 1)
(s1770 1)
(s1771 1)
(s1772 1)
(s1773 1)
(s1774 1)
(s1775 1)
(s1776 1)
(s1777 1)
(s1778 1)
(s1779 1)
(s1780 1)
(s1781 1)
(s1782 1)
(s1783 1)
(s1784 1)
(s1785 1)
(s1786 1)
(s1787 1)
(s1788 1)
(s1789 1)
(s1790 1)
(s1791 1)
(s1792 1)
(s1793 1)
(s1794 1)
(s1795 1)
(s1796 1)
(s1797 1)
(s1798 1)
(s1799 1)
(s1800 1)
(s1801 1)
(s1802 1)
(s1803 1)
(s1804 1)
(s1805 1)
(s1806 1)
(s1807 1)
(s1808 1)
(s1809 1)
(s1810 1)
(s1811 1)
(s1812 1)
(s1813 1)
(s1814 1)
(s1815 1)
(s1816 1)
(s1817 1)
(s1818 1)
(s1819 1)
(s1820 1)
(s1821 1)
(s1822 1)
(s1823 1)
(s1824 1)
(s1825 1)
(s1826 1)
(s1827 1)
(s1828 1)
(s1829 1)
(s1830 1)
(s1831 1)
(s1832 1)
(s1833 1)
(s1834 1)
(s1835 1)
(s1836 1)
(s1837 1)
(s1838 1)
(s1839 1)
(s1840 1)
(s1841 1)
(s1842 1)
(s1843 1)
(s1844 1)
(s1845 1)
(s1846 1)
(s1847 1)
(s1848 1)
(s1849 1)
(s1850 1)
(s1851 1)
(s1852 1)
(s1853 1)
(s1854 1)
(s1855 1)
(s1856 1)
(s1857 1)
(s1858 1)
(s1859 1)
(s1860 1)
(s1861 1)
(s1862 1)
(s1863 1)
(s1864 1)
(s1865 1)
(s1866 1)
(s1867 1)
(s1868 1)
(s1869 1)
(s1870 1)
(s1871 1)
(s1872 1)
(s1873 1)
(s1874 1)
(s1875 1)
(s1876 1)
(s1877 1)
(s1878 1)
(s1879 1)
(s1880 1)
(s1881 1)
(s1882 1)
(s1883 1)
(s1884 1)
(s1885 1)
(s1886 1)
(s1887 1)
(s1888 1)
(s1889 1)
(s1890 1)
(s1891 1)
(s1892 1)
(s1893 1)
(s1894 1)
(s1895 1)
(s1896 1)
(s1897 1)
(s1898 1)
(s1899 1)
(s1900 1)
(s1901 1)
(s1902 1)
(s1903 1)
(s1904 1)
(s1905 1)
(s1906 1)
(s1907 1)
(s1908 1)
(s1909 1)
(s1910 1)
(s1911 1)
(s1912 1)
(s1913 1)
(s1914 1)
(s1915 1)
(s1916 1)
(s1917 1)
(s1918 1)
(s1919 1)
(s1920 1)
(s1921 1)
(s1922 1)
(s1923 1)
(s1924 1)
(s1925 1)
(s1926 1)
(s1927 1)
(s1928 1)
(s1929 1)
(s1930 1)
(s1931 1)
(s1932 1)
(s1933 1)
(s1934 1)
(s1935 1)
(s1936 1)
(s1937 1)
(s1938 1)
(s1939 1)
(s1940 1)
(s1941 1)
(s1942 1)
(s1943 1)
(s1944 1)
(s1945 1)
(s1946 1)
(s1947 1)
(s1948 1)
(s1949 1)
(s1950 1)
(s1951 1)
(s1952 1)
(s1953 1)
(s1954 1)
(s1955 1)
(s1956 1)
(s1957 1)
(s1958 1)
(s1959 1)
(s1960 1)
(s1961 1)
(s1962 1)
(s1963 1)
(s1964 1)
(s1965 1)
(s1966 1)
(s1967 1)
(s1968 1)
(s1969 1)
(s1970 1)
(s1971 1)
(s1972 1)
(s1973 1)
(s1974 1)
(s1975 1)
(s1976 1)
(s1977 1)
(s1978 1)
(s1979 1)
(s1980 1)
(s1981 1)
(s1982 1)
(s1983 1)
(s1984 1)
(s1985 1)
(s1986 1)
(s1987 1)
(s1988 1)
(s1989 1)
(s1990 1)
(s1991 1)
(s1992 1)
(s1993 1)
(s1994 1)
(s1995 1)
(s1996 1)
(s1997 1)
(s1998 1)
(s1999 1)
(s2000 1)
(s2001 1)
(s2002 1)
(s2003 1)
(s2004 1)
(s2005 1)
(s2006 1)
(s2007 1)
(s2008 1)
(s2009 1)
(s2010 1)
(s2011 1)
(s2012 1)
(s2013 1)
(s2014 1)
(s2015 1)
(s2016 1)
(s2017 1)
(s2018 1)
(s2019 1)
(s2020 1)
(s2021 1)
(s2022 1)
(s2023 1)
(s2024 1)
(s2025 1)
(s2026 1)
(s2027 1)
(s2028 1)
(s2029 1)
(s2030 1)
(s2031 1)
(s2032 1)
(s2033 1)
(s2034 1)
(s2035 1)
(s2036 1)
(s2037 1)
(s2038 1)
(s2039 1)
(s2040 1)
(s2041 1)
(s2042 1)
(s2043 1)
(s2044 1)
(s2045 1)
(s2046 1)
(s2047 1)
(s2048 1)
(s2049 1)
(s2050 1)
(s2051 1)
(s2052 1)
(s2053 1)
(s2054 1)
(s2055 1)
(s2056 1)
(s2057 1)
(s2058 1)
(s2059 1)
(s2060 1)
(s2061 1)
(s2062 1)
(s2063 1)
(s2064 1)
(s2065 1)
(s2066 1)
(s2067 1)
(s2068 1)
(s2069 1)
(s2070 1)
(s2071 1)
(s2072 1)
(s2073 1)
(s2074 1)
(s2075 1)
(s2076 1)
(s2077 1)
(s2078 1)
(s2079 1)
(s2080 1)
(s2081 1)
(s2082 1)
(s2083 1)
(s2084 1)
(s2085 1)
(s2086 1)
(s2087 1)
(s2088 1)
(s2089 1)
(s2090 1)
(s2091 1)
(s2092 1)
(s2093 1)
(s2094 1)
(s2095 1)
(s2096 1)
(s2097 1)
(s2098 1)
(s2099 1)
(s2100 1)
(s2101 1)
(s2102 1)
(s2103 1)
(s2104 1)
(s2105 1)
(s2106 1)
(s2107 1)
(s2108 1)
(s2109 1)
(s2110 1)
(s2111 1)
(s2112 1)
(s2113 1)
(s2114 1)
(s2115 1)
(s2116 1)
(s2117 1)
(s2118 1)
(s2119 1)
(s2120 1)
(s2121 1)
(s2122 1)
(s2123 1)
(s2124 1)
(s2125 1)
(s2126 1)
(s2127 1)
(s2128 1)
(s2129 1)
(s2130 1)
(s2131 1)
(s2132 1)
(s2133 1)
(s2134 1)
(s2135 1)
(s2136 1)
(s2137 1)
(s2138 1)
(s2139 1)
(s2140 1)
(s2141 1)
(s2142 1)
(s2143 1)
(s2144 1)
(s2145 1)
(s2146 1)
(s2147 1)
(s2148 1)
(s2149 1)
(s2150 1)
(s2151 1)
(s2152 1)
(s2153 1)
(s2154 1)
(s2155 1)
(s2156 1)
(s2157 1)
(s2158 1)
(s2159 1)
(s2160 1)
(s2161 1)
(s2162 1)
(s2163 1)
(s2164 1)
(s2165 1)
(s2166 1)
(s2167 1)
(s2168 1)
(s2169 1)
(s2170 1)
(s2171 1)
(s2172 1)
(s2173 1)
(s2174 1)
(s2175 1)
(s2176 1)
(s2177 1)
(s2178 1)
(s2179 1)
(s2180 1)
(s2181 1)
(s2182 1)
(s2183 1)
(s2184 1)
(s2185 1)
(s2186 1)
(s2187 1)
(s2188 1)
(s2189 1)
(s2190 1)
(s2191 1)
(s2192 1)
(s2193 1)
(s2194 1)
(s2195 1)
(s2196 1)
(s2197 1)
(s2198 1)
(s2199 1)
(s2200 1)
(s2201 1)
(s2202 1)
(s2203 1)
(s2204 1)
(s2205 1)
(s2206 1)
(s2207 1)
(s2208 1)
(s2209 1)
(s2210 1)
(s2211 1)
(s2212 1)
(s2213 1)
(s2214 1)
(s2215 1)
(s2216 1)
(s2217 1)
(s2218 1)
(s2219 1)
(s2220 1)
(s2221 1)
(s2222 1)
(s2223 1)
(s2224 1)
(s2225 1)
(s2226 1)
(s2227 1)
(s2228 1)
(s2229 1)
(s2230 1)
(s2231 1)
(s2232 1)
(s2233 1)
(s2234 1)
(s2235 1)
(s2236 1)
(s2237 1)
(s2238 1)
(s2239 1)
(s2240 1)
(s2241 1)
(s2242 1)
(s2243 1)
(s2244 1)
(s2245 1)
(s2246 1)
(s2247 1)
(s2248 1)
(s2249 1)
(s2250 1)
(s2251 1)
(s2252 1)
(s2253 1)
(s2254 1)
(s2255 1)
(s2256 1)
(s2257 1)
(s2258 1)
(s2259 1)
(s2260 1)
(s2261 1)
(s2262 1)
(s2263 1)
(s2264 1)
(s2265 1)
(s2266 1)
(s2267 1)
(s2268 1)
(s2269 1)
(s2270 1)
(s2271 1)
(s2272 1)
(s2273 1)
(s2274 1)
(s2275 1)
(s2276 1)
(s2277 1)
(s2278 1)
(s2279 1)
(s2280 1)
(s2281 1)
(s2282 1)
(s2283 1)
(s2284 1)
(s2285 1)
(s2286 1)
(s2287 1)
(s2288 1)
(s2289 1)
(s2290 1)
(s2291 1)
(s2292 1)
(s2293 1)
(s2294 1)
(s2295 1)
(s2296 1)
(s2297 1)
(s2298 1)
(s2299 1)
(s2300 1)
(s2301 1)
(s2302 1)
(s2303 1)
(s2304 1)
(s2305 1)
(s2306 1)
(s2307 1)
(s2308 1)
(s2309 1)
(s2310 1)
(s2311 1)
(s2312 1)
(s2313 1)
(s2314 1)
(s2315 1)
(s2316 1)
(s2317 1)
(s2318 1)
(s2319 1)
(s2320 1)
(s2321 1)
(s2322 1)
(s2323 1)
(s2324 1)
(s2325 1)
(s2326 1)
(s2327 1)
(s2328 1)
(s2329 1)
(s2330 1)
(s2331 1)
(s2332 1)
(s2333 1)
(s2334 1)
(s2335 1)
(s2336 1)
(s2337 1)
(s2338 1)
(s2339 1)
(s2340 1)
(s2341 1)
(s2342 1)
(s2343 1)
(s2344 1)
(s2345 1)
(s2346 1)
(s2347 1)
(s2348 1)
(s2349 1)
(s2350 1)
(s2351 1)
(s2352 1)
(s2353 1)
(s2354 1)
(s2355 1)
(s2356 1)
(s2357 1)
(s2358 1)
(s2359 1)
(s2360 1)
(s2361 1)
(s2362 1)
(s2363 1)
(s2364 1)
(s2365 1)
(s2366 1)
(s2367 1)
(s2368 1)
(s2369 1)
(s2370 1)
(s2371 1)
(s2372 1)
(s2373 1)
(s2374 1)
(s2375 1)
(s2376 1)
(s2377 1)
(s2378 1)
(s2379 1)
(s2380 1)
(s2381 1)
(s2382 1)
(s2383 1)
(s2384 1)
(s2385 1)
(s2386 1)
(s2387 1)
(s2388 1)
(s2389 1)
(s2390 1)
(s2391 1)
(s2392 1)
(s2393 1)
(s2394 1)
(s2395 1)
(s2396 1)
(s2397 1)
(s2398 1)
(s2399 1)
(s2400 1)
(s2401 1)
(s2402 1)
(s2403 1)
(s2404 1)
(s2405 1)
(s2406 1)
(s2407 1)
(s2408 1)
(s2409 1)
(s2410 1)
(s2411 1)
(s2412 1)
(s2413 1)
(s2414 1)
(s2415 1)
(s2416 1)
(s2417 1)
(s2418 1)
(s2419 1)
(s2420 1)
(s2421 1)
(s2422 1)
(s2423 1)
(s2424 1)
(s2425 1)
(s2426 1)
(s2427 1)
(s2428 1)
(s2429 1)
(s2430 1)
(s2431 1)
(s2432 1)
(s2433 1)
(s2434 1)
(s2435 1)
(s2436 1)
(s2437 1)
(s2438 1)
(s2439 1)
(s2440 1)
(s2441 1)
(s2442 1)
(s2443 1)
(s2444 1)
(s2445 1)
(s2446 1)
(s2447 1)
(s2448 1)
(s2449 1)
(s2450 1)
(s2451 1)
(s2452 1)
(s2453 1)
(s2454 1)
(s2455 1)
(s2456 1)
(s2457 1)
(s2458 1)
(s2459 1)
(s2460 1)
(s2461 1)
(s2462 1)
(s2463 1)
(s2464 1)
(s2465 1)
(s2466 1)
(s2467 1)
(s2468 1)
(s2469 1)
(s2470 1)
(s2471 1)
(s2472 1)
(s2473 1)
(s2474 1)
(s2475 1)
(s2476 1)
(s2477 1)
(s2478 1)
(s2479 1)
(s2480 1)
(s2481 1)
(s2482 1)
(s2483 1)
(s2484 1)
(s2485 1)
(s2486 1)
(s2487 1)
(s2488 1)
(s2489 1)
(s2490 1)
(s2491 1)
(s2492 1)
(s2493 1)
(s2494 1)
(s2495 1)
(s2496 1)
(s2497 1)
(s2498 1)
(s2499 1)
(s2500 1)
(s2501 1)
(s2502 1)
(s2503 1)
(s2504 1)
(s2505 1)
(s2506 1)
(s2507 1)
(s2508 1)
(s2509 1)
(s2510 1)
(s2511 1)
(s2512 1)
(s2513 1)
(s2514 1)
(s2515 1)
(s2516 1)
(s2517 1)
(s2518 1)
(s2519 1)
(s2520 1)
(s2521 1)
(s2522 1)
(s2523 1)
(s2524 1)
(s2525 1)
(s2526 1)
(s2527 1)
(s2528 1)
(s2529 1)
(s2530 1)
(s2531 1)
(s2532 1)
(s2533 1)
(s2534 1)
(s2535 1)
(s2536 1)
(s2537 1)
(s2538 1)
(s2539 1)
(s2540 1)
(s2541 1)
(s2542 1)
(s2543 1)
(s2544 1)
(s2545 1)
(s2546 1)
(s2547 1)
(s2548 1)
(s2549 1)
(s2550 1)
(s2551 1)
(s2552 1)
(s2553 1)
(s2554 1)
(s2555 1)
(s2556 1)
(s2557 1)
(s2558 1)
(s2559 1)
(s2560 1)
(s2561 1)
(s2562 1)
(s2563 1)
(s2564 1)
(s2565 1)
(s2566 1)
(s2567 1)
(s2568 1)
(s2569 1)
(s2570 1)
(s2571 1)
(s2572 1)
(s2573 1)
(s2574 1)
(s2575 1)
(s2576 1)
(s2577 1)
(s2578 1)
(s2579 1)
(s2580 1)
(s2581 1)
(s2582 1)
(s2583 1)
(s2584 1)
(s2585 1)
(s2586 1)
(s2587 1)
(s2588 1)
(s2589 1)
(s2590 1)
(s2591 1)
(s2592 1)
(s2593 1)
(s2594 1)
(s2595 1)
(s2596 1)
(s2597 1)
(s2598 1)
(s2599 1)
(s2600 1)
(s2601 1)
(s2602 1)
(s2603 1)
(s2604 1)
(s2605 1)
(s2606 1)
(s2607 1)
(s2608 1)
(s2609 1)
(s2610 1)
(s2611 1)
(s2612 1)
(s2613 1)
(s2614 1)
(s2615 1)
(s2616 1)
(s2617 1)
(s2618 1)
(s2619 1)
(s2620 1)
(s2621 1)
(s2622 1)
(s2623 1)
(s2624 1)
(s2625 1)
(s2626 1)
(s2627 1)
(s2628 1)
(s2629 1)
(s2630 1)
(s2631 1)
(s2632 1)
(s2633 1)
(s2634 1)
(s2635 1)
(s2636 1)
(s2637 1)
(s2638 1)
(s2639 1)
(s2640 1)
(s2641 1)
(s2642 1)
(s2643 1)
(s2644 1)
(s2645 1)
(s2646 1)
(s2647 1)
(s2648 1)
(s2649 1)
(s2650 1)
(s2651 1)
(s2652 1)
(s2653 1)
(s2654 1)
(s2655 1)
(s2656 1)
(s2657 1)
(s2658 1)
(s2659 1)
(s2660 1)
(s2661 1)
(s2662 1)
(s2663 1)
(s2664 1)
(s2665 1)
(s2666 1)
(s2667 1)
(s2668 1)
(s2669 1)
(s2670 1)
(s2671 1)
(s2672 1)
(s2673 1)
(s2674 1)
(s2675 1)
(s2676 1)
(s2677 1)
(s2678 1)
(s2679 1)
(s2680 1)
(s2681 1)
(s2682 1)
(s2683 1)
(s2684 1)
(s2685 1)
(s2686 1)
(s2687 1)
(s2688 1)
(s2689 1)
(s2690 1)
(s2691 1)
(s2692 1)
(s2693 1)
(s2694 1)
(s2695 1)
(s2696 1)
(s2697 1)
(s2698 1)
(s2699 1)
(s2700 1)
(s2701 1)
(s2702 1)
(s2703 1)
(s2704 1)
(s2705 1)
(s2706 1)
(s2707 1)
(s2708 1)
(s2709 1)
(s2710 1)
(s2711 1)
(s2712 1)
(s2713 1)
(s2714 1)
(s2715 1)
(s2716 1)
(s2717 1)
(s2718 1)
(s2719 1)
(s2720 1)
(s2721 1)
(s2722 1)
(s2723 1)
(s2724 1)
(s2725 1)
(s2726 1)
(s2727 1)
(s2728 1)
(s2729 1)
(s2730 1)
(s2731 1)
(s2732 1)
(s2733 1)
(s2734 1)
(s2735 1)
(s2736 1)
(s2737 1)
(s2738 1)
(s2739 1)
(s2740 1)
(s2741 1)
(s2742 1)
(s2743 1)
(s2744 1)
(s2745 1)
(s2746 1)
(s2747 1)
(s2748 1)
(s2749 1)
(s2750 1)
(s2751 1)
(s2752 1)
(s2753 1)
(s2754 1)
(s2755 1)
(s2756 1)
(s2757 1)
(s2758 1)
(s2759 1)
(s2760 1)
(s2761 1)
(s2762 1)
(s2763 1)
(s2764 1)
(s2765 1)
(s2766 1)
(s2767 1)
(s2768 1)
(s2769 1)
(s2770 1)
(s2771 1)
(s2772 1)
(s2773 1)
(s2774 1)
(s2775 1)
(s2776 1)
(s2777 1)
(s2778 1)
(s2779 1)
(s2780 1)
(s2781 1)
(s2782 1)
(s2783 1)
(s2784 1)
(s2785 1)
(s2786 1)
(s2787 1)
(s2788 1)
(s2789 1)
(s2790 1)
(s2791 1)
(s2792 1)
(s2793 1)
(s2794 1)
(s2795 1)
(s2796 1)
(s2797 1)
(s2798 1)
(s2799 1)
(s2800 1)
(s2801 1)
(s2802 1)
(s2803 1)
(s2804 1)
(s2805 1)
(s2806 1)
(s2807 1)
(s2808 1)
(s2809 1)
(s2810 1)
(s2811 1)
(s2812 1)
(s2813 1)
(s2814 1)
(s2815 1)
(s2816 1)
(s2817 1)
(s2818 1)
(s2819 1)
(s2820 1)
(s2821 1)
(s2822 1)
(s2823 1)
(s2824 1)
(s2825 1)
(s2826 1)
(s2827 1)
(s2828 1)
(s2829 1)
(s2830 1)
(s2831 1)
(s2832 1)
(s2833 1)
(s2834 1)
(s2835 1)
(s2836 1)
(s2837 1)
(s2838 1)
(s2839 1)
(s2840 1)
(s2841 1)
(s2842 1)
(s2843 1)
(s2844 1)
(s2845 1)
(s2846 1)
(s2847 1)
(s2848 1)
(s2849 1)
(s2850 1)
(s2851 1)
(s2852 1)
(s2853 1)
(s2854 1)
(s2855 1)
(s2856 1)
(s2857 1)
(s2858 1)
(s2859 1)
(s2860 1)
(s2861 1)
(s2862 1)
(s2863 1)
(s2864 1)
(s2865 1)
(s2866 1)
(s2867 1)
(s2868 1)
(s2869 1)
(s2870 1)
(s2871 1)
(s2872 1)
(s2873 1)
(s2874 1)
(s2875 1)
(s2876 1)
(s2877 1)
(s2878 1)
(s2879 1)
(s2880 1)
(s2881 1)
(s2882 1)
(s2883 1)
(s2884 1)
(s2885 1)
(s2886 1)
(s2887 1)
(s2888 1)
(s2889 1)
(s2890 1)
(s2891 1)
(s2892 1)
(s2893 1)
(s2894 1)
(s2895 1)
(s2896 1)
(s2897 1)
(s2898 1)
(s2899 1)
(s2900 1)
(s2901 1)
(s2902 1)
(s2903 1)
(s2904 1)
(s2905 1)
(s2906 1)
(s2907 1)
(s2908 1)
(s2909 1)
(s2910 1)
(s2911 1)
(s2912 1)
(s2913 1)
(s2914 1)
(s2915 1)
(s2916 1)
(s2917 1)
(s2918 1)
(s2919 1)
(s2920 1)
(s2921 1)
(s2922 1)
(s2923 1)
(s2924 1)
(s2925 1)
(s2926 1)
(s2927 1)
(s2928 1)
(s2929 1)
(s2930 1)
(s2931 1)
(s2932 1)
(s2933 1)
(s2934 1)
(s2935 1)
(s2936 1)
(s2937 1)
(s2938 1)
(s2939 1)
(s2940 1)
(s2941 1)
(s2942 1)
(s2943 1)
(s2944 1)
(s2945 1)
(s2946 1)
(s2947 1)
(s2948 1)
(s2949 1)
(s2950 1)
(s2951 1)
(s2952 1)
(s2953 1)
(s2954 1)
(s2955 1)
(s2956 1)
(s2957 1)
(s2958 1)
(s2959 1)
(s2960 1)
(s2961 1)
(s2962 1)
(s2963 1)
(s2964 1)
(s2965 1)
(s2966 1)
(s2967 1)
(s2968 1)
(s2969 1)
(s2970 1)
(s2971 1)
(s2972 1)
(s2973 1)
(s2974 1)
(s2975 1)
(s2976 1)
(s2977 1)
(s2978 1)
(s2979 1)
(s2980 1)
(s2981 1)
(s2982 1)
(s2983 1)
(s2984 1)
(s2985 1)
(s2986 1)
(s2987 1)
(s2988 1)
(s2989 1)
(s2990 1)
(s2991 1)
(s2992 1)
(s2993 1)
(s2994 1)
(s2995 1)
(s2996 1)
(s2997 1)
(s2998 1)
(s2999 1)
(s3000 1)
(s3001 1)
(s3002 1)
(s3003 1)
(s3004 1)
(s3005 1)
(s3006 1)
(s3007 1)
(s3008 1)
(s3009 1)
(s3010 1)
(s3011 1)
(s3012 1)
(s3013 1)
(s3014 1)
(s3015 1)
(s3016 1)
(s3017 1)
(s3018 1)
(s3019 1)
(s3020 1)
(s3021 1)
(s3022 1)
(s3023 1)
(s3024 1)
(s3025 1)
(s3026 1)
(s3027 1)
(s3028 1)
(s3029 1)
(s3030 1)
(s3031 1)
(s3032 1)
(s3033 1)
(s3034 1)
(s3035 1)
(s3036 1)
(s3037 1)
(s3038 1)
(s3039 1)
(s3040 1)
(s3041 1)
(s3042 1)
(s3043 1)
(s3044 1)
(s3045 1)
(s3046 1)
(s3047 1)
(s3048 1)
(s3049 1)
(s3050 1)
(s3051 1)
(s3052 1)
(s3053 1)
(s3054 1)
(s3055 1)
(s3056 1)
(s3057 1)
(s3058 1)
(s3059 1)
(s3060 1)
(s3061 1)
(s3062 1)
(s3063 1)
(s3064 1)
(s3065 1)
(s3066 1)
(s3067 1)
(s3068 1)
(s3069 1)
(s3070 1)
(s3071 1)
(s3072 1)
(s3073 1)
(s3074 1)
(s3075 1)
(s3076 1)
(s3077 1)
(s3078 1)
(s3079 1)
(s3080 1)
(s3081 1)
(s3082 1)
(s3083 1)
(s3084 1)
(s3085 1)
(s3086 1)
(s3087 1)
(s3088 1)
(s3089 1)
(s3090 1)
(s3091 1)
(s3092 1)
(s3093 1)
(s3094 1)
(s3095 1)
(s3096 1)
(s3097 1)
(s3098 1)
(s3099 1)
(s3100 1)
(s3101 1)
(s3102 1)
(s3103 1)
(s3104 1)
(s3105 1)
(s3106 1)
(s3107 1)
(s3108 1)
(s3109 1)
(s3110 1)
(s3111 1)
(s3112 1)
(s3113 1)
(s3114 1)
(s3115 1)
(s3116 1)
(s3117 1)
(s3118 1)
(s3119 1)
(s3120 1)
(s3121 1)
(s3122 1)
(s3123 1)
(s3124 1)
(s3125 1)
(s3126 1)
(s3127 1)
(s3128 1)
(s3129 1)
(s3130 1)
(s3131 1)
(s3132 1)
(s3133 1)
(s3134 1)
(s3135 1)
(s3136 1)
(s3137 1)
(s3138 1)
(s3139 1)
(s3140 1)
(s3141 1)
(s3142 1)
(s3143 1)
(s3144 1)
(s3145 1)
(s3146 1)
(s3147 1)
(s3148 1)
(s3149 1)
(s3150 1)
(s3151 1)
(s3152 1)
(s3153 1)
(s3154 1)
(s3155 1)
(s3156 1)
(s3157 1)
(s3158 1)
(s3159 1)
(s3160 1)
(s3161 1)
(s3162 1)
(s3163 1)
(s3164 1)
(s3165 1)
(s3166 1)
(s3167 1)
(s3168 1)
(s3169 1)
(s3170 1)
(s3171 1)
(s3172 1)
(s3173 1)
(s3174 1)
(s3175 1)
(s3176 1)
(s3177 1)
(s3178 1)
(s3179 1)
(s3180 1)
(s3181 1)
(s3182 1)
(s3183 1)
(s3184 1)
(s3185 1)
(s3186 1)
(s3187 1)
(s3188 1)
(s3189 1)
(s3190 1)
(s3191 1)
(s3192 1)
(s3193 1)
(s3194 1)
(s3195 1)
(s3196 1)
(s3197 1)
(s3198 1)
(s3199 1)
(s3200 1)
(s3201 1)
(s3202 1)
(s3203 1)
(s3204 1)
(s3205 1)
(s3206 1)
(s3207 1)
(s3208 1)
(s3209 1)
(s3210 1)
(s3211 1)
(s3212 1)
(s3213 1)
(s3214 1)
(s3215 1)
(s3216 1)
(s3217 1)
(s3218 1)
(s3219 1)
(s3220 1)
(s3221 1)
(s3222 1)
(s3223 1)
(s3224 1)
(s3225 1)
(s3226 1)
(s3227 1)
(s3228 1)
(s3229 1)
(s3230 1)
(s3231 1)
(s3232 1)
(s3233 1)
(s3234 1)
(s3235 1)
(s3236 1)
(s3237 1)
(s3238 1)
(s3239 1)
(s3240 1)
(s3241 1)
(s3242 1)
(s3243 1)
(s3244 1)
(s3245 1)
(s3246 1)
(s3247 1)
(s3248 1)
(s3249 1)
(s3250 1)
(s3251 1)
(s3252 1)
(s3253 1)
(s3254 1)
(s3255 1)
(s3256 1)
(s3257 1)
(s3258 1)
(s3259 1)
(s3260 1)
(s3261 1)
(s3262 1)
(s3263 1)
(s3264 1)
(s3265 1)
(s3266 1)
(s3267 1)
(s3268 1)
(s3269 1)
(s3270 1)
(s3271 1)
(s3272 1)
(s3273 1)
(s3274 1)
(s3275 1)
(s3276 1)
(s3277 1)
(s3278 1)
(s3279 1)
(s3280 1)
(s3281 1)
(s3282 1)
(s3283 1)
(s3284 1)
(s3285 1)
(s3286 1)
(s3287 1)
(s3288 1)
(s3289 1)
(s3290 1)
(s3291 1)
(s3292 1)
(s3293 1)
(s3294 1)
(s3295 1)
(s3296 1)
(s3297 1)
(s3298 1)
(s3299 1)
(s3300 1)
(s3301 timeout
org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30095 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 0/3210 constraints, Known Traps: 0/0 constraints]
After SMT, in 75905ms problems are : Problem set: 0 solved, 3210 unsolved
Search for dead transitions found 0 dead transitions in 75951ms
Starting structural reductions in SI_LTL mode, iteration 1 : 3462/3475 places, 3220/3222 transitions.
Finished structural reductions in SI_LTL mode , in 1 iterations and 265394 ms. Remains : 3462/3475 places, 3220/3222 transitions.
Stuttering acceptance computed with spot in 115 ms :[(NOT p0), (NOT p0)]
Running random walk in product with property : Echo-PT-d05r03-LTLCardinality-01
Product exploration explored 100000 steps with 245 reset in 5111 ms.
Product exploration explored 100000 steps with 240 reset in 5406 ms.
Computed a total of 3462 stabilizing places and 3220 stable transitions
Complete graph has no SCC; deadlocks are unavoidable. place count 3462 transition count 3220
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge (and all enablings converge to false).
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge : F ( (Ga|G!a) & (Gb|G!b)...)
Knowledge obtained : [p0, (X p0), (F (OR (G p0) (G (NOT p0))))]
False Knowledge obtained : [(X (X (NOT p0))), (X (X p0))]
Knowledge based reduction with 3 factoid took 133 ms. Reduced automaton from 2 states, 3 edges and 1 AP (stutter insensitive) to 2 states, 3 edges and 1 AP (stutter insensitive).
Stuttering acceptance computed with spot in 71 ms :[(NOT p0), (NOT p0)]
RANDOM walk for 559 steps (0 resets) in 39 ms. (13 steps per ms) remains 0/1 properties
Knowledge obtained : [p0, (X p0), (F (OR (G p0) (G (NOT p0))))]
False Knowledge obtained : [(X (X (NOT p0))), (X (X p0)), (F (NOT p0))]
Knowledge based reduction with 3 factoid took 158 ms. Reduced automaton from 2 states, 3 edges and 1 AP (stutter insensitive) to 2 states, 3 edges and 1 AP (stutter insensitive).
Stuttering acceptance computed with spot in 84 ms :[(NOT p0), (NOT p0)]
Stuttering acceptance computed with spot in 99 ms :[(NOT p0), (NOT p0)]
Support contains 1 out of 3462 places. Attempting structural reductions.
Starting structural reductions in SI_LTL mode, iteration 0 : 3462/3462 places, 3220/3220 transitions.
Applied a total of 0 rules in 450 ms. Remains 3462 /3462 variables (removed 0) and now considering 3220/3220 (removed 0) transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:47:40] [INFO ] Invariants computation overflowed in 11861 ms
[2024-06-01 04:47:46] [INFO ] Implicit Places using invariants in 18097 ms returned []
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:47:57] [INFO ] Invariants computation overflowed in 11431 ms
[2024-06-01 04:49:50] [INFO ] Performed 1/3462 implicitness test of which 0 returned IMPLICIT in 32 seconds.
[2024-06-01 04:50:22] [INFO ] Performed 3/3462 implicitness test of which 0 returned IMPLICIT in 64 seconds.
[2024-06-01 04:50:37] [INFO ] Implicit Places using invariants and state equation in 171474 ms returned []
Implicit Place search using SMT with State Equation took 189573 ms to find 0 implicit places.
[2024-06-01 04:50:38] [INFO ] Redundant transitions in 239 ms returned []
Running 3210 sub problems to find dead transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:50:49] [INFO ] Invariants computation overflowed in 11365 ms
Error getting values : (error "ParserException while parsing response: ((s0 1.0)
(s1 1.0)
(s2 1.0)
(s3 1.0)
(s4 1.0)
(s5 1.0)
(s6 1.0)
(s7 1.0)
(s8 1.0)
(s9 1.0)
(s10 1.0)
(s11 1.0)
(s12 1.0)
(s13 1.0)
(s14 1.0)
(s15 1.0)
(s16 1.0)
(s17 1.0)
(s18 1.0)
(s19 1.0)
(s20 1.0)
(s21 1.0)
(s22 1.0)
(s23 1.0)
(s24 1.0)
(s25 1.0)
(s26 1.0)
(s27 1.0)
(s28 1.0)
(s29 1.0)
(s30 1.0)
(s31 1.0)
(s32 1.0)
(s33 1.0)
(s34 1.0)
(s35 1.0)
(s36 1.0)
(s37 1.0)
(s38 1.0)
(s39 1.0)
(s40 1.0)
(s41 1.0)
(s42 1.0)
(s43 1.0)
(s44 1.0)
(s45 1.0)
(s46 1.0)
(s47 1.0)
(s48 1.0)
(s49 1.0)
(s50 1.0)
(s51 1.0)
(s52 1.0)
(s53 1.0)
(s54 1.0)
(s55 1.0)
(s56 1.0)
(s57 1.0)
(s58 1.0)
(s59 1.0)
(s60 1.0)
(s61 1.0)
(s62 1.0)
(s63 1.0)
(s64 1.0)
(s65 1.0)
(s66 1.0)
(s67 1.0)
(s68 1.0)
(s69 1.0)
(s70 1.0)
(s71 1.0)
(s72 1.0)
(s73 1.0)
(s74 1.0)
(s75 1.0)
(s76 1.0)
(s77 1.0)
(s78 1.0)
(s79 1.0)
(s80 1.0)
(s81 1.0)
(s82 1.0)
(s83 1.0)
(s84 1.0)
(s85 1.0)
(s86 1.0)
(s87 1.0)
(s88 1.0)
(s89 1.0)
(s90 1.0)
(s91 1.0)
(s92 1.0)
(s93 1.0)
(s94 1.0)
(s95 1.0)
(s96 1.0)
(s97 1.0)
(s98 1.0)
(s99 1.0)
(s100 1.0)
(s101 1.0)
(s102 1.0)
(s103 1.0)
(s104 1.0)
(s105 1.0)
(s106 1.0)
(s107 1.0)
(s108 1.0)
(s109 1.0)
(s110 1.0)
(s111 1.0)
(s112 1.0)
(s113 1.0)
(s114 1.0)
(s115 1.0)
(s116 1.0)
(s117 1.0)
(s118 1.0)
(s119 1.0)
(s120 1.0)
(s121 1.0)
(s122 1.0)
(s123 1.0)
(s124 1.0)
(s125 1.0)
(s126 1.0)
(s127 1.0)
(s128 1.0)
(s129 1.0)
(s130 1.0)
(s131 1.0)
(s132 1.0)
(s133 1.0)
(s134 1.0)
(s135 1.0)
(s136 1.0)
(s137 1.0)
(s138 1.0)
(s139 1.0)
(s140 1.0)
(s141 1.0)
(s142 1.0)
(s143 1.0)
(s144 1.0)
(s145 1.0)
(s146 1.0)
(s147 1.0)
(s148 1.0)
(s149 1.0)
(s150 1.0)
(s151 1.0)
(s152 1.0)
(s153 1.0)
(s154 1.0)
(s155 1.0)
(s156 1.0)
(s157 1.0)
(s158 1.0)
(s159 1.0)
(s160 1.0)
(s161 1.0)
(s162 1.0)
(s163 1.0)
(s164 1.0)
(s165 1.0)
(s166 1.0)
(s167 1.0)
(s168 1.0)
(s169 1.0)
(s170 1.0)
(s171 1.0)
(s172 1.0)
(s173 1.0)
(s174 1.0)
(s175 1.0)
(s176 1.0)
(s177 1.0)
(s178 1.0)
(s179 1.0)
(s180 1.0)
(s181 1.0)
(s182 1.0)
(s183 1.0)
(s184 1.0)
(s185 1.0)
(s186 1.0)
(s187 1.0)
(s188 1.0)
(s189 1.0)
(s190 1.0)
(s191 1.0)
(s192 1.0)
(s193 1.0)
(s194 1.0)
(s195 1.0)
(s196 1.0)
(s197 1.0)
(s198 1.0)
(s199 1.0)
(s200 1.0)
(s201 1.0)
(s202 1.0)
(s203 1.0)
(s204 1.0)
(s205 1.0)
(s206 1.0)
(s207 1.0)
(s208 1.0)
(s209 1.0)
(s210 1.0)
(s211 1.0)
(s212 1.0)
(s213 1.0)
(s214 1.0)
(s215 1.0)
(s216 1.0)
(s217 1.0)
(s218 1.0)
(s219 1.0)
(s220 1.0)
(s221 1.0)
(s222 1.0)
(s223 1.0)
(s224 1.0)
(s225 1.0)
(s226 1.0)
(s227 1.0)
(s228 1.0)
(s229 1.0)
(s230 1.0)
(s231 1.0)
(s232 1.0)
(s233 1.0)
(s234 1.0)
(s235 1.0)
(s236 1.0)
(s237 1.0)
(s238 1.0)
(s239 1.0)
(s240 1.0)
(s241 1.0)
(s242 1.0)
(s243 1.0)
(s244 1.0)
(s245 1.0)
(s246 1.0)
(s247 1.0)
(s248 1.0)
(s249 1.0)
(s250 1.0)
(s251 1.0)
(s252 1.0)
(s253 1.0)
(s254 1.0)
(s255 1.0)
(s256 1.0)
(s257 1.0)
(s258 1.0)
(s259 1.0)
(s260 1.0)
(s261 1.0)
(s262 1.0)
(s263 1.0)
(s264 1.0)
(s265 1.0)
(s266 1.0)
(s267 1.0)
(s268 1.0)
(s269 1.0)
(s270 1.0)
(s271 1.0)
(s272 1.0)
(s273 1.0)
(s274 1.0)
(s275 1.0)
(s276 1.0)
(s277 1.0)
(s278 1.0)
(s279 1.0)
(s280 1.0)
(s281 1.0)
(s282 1.0)
(s283 1.0)
(s284 1.0)
(s285 1.0)
(s286 1.0)
(s287 1.0)
(s288 1.0)
(s289 1.0)
(s290 1.0)
(s291 1.0)
(s292 1.0)
(s293 1.0)
(s294 1.0)
(s295 1.0)
(s296 1.0)
(s297 1.0)
(s298 1.0)
(s299 1.0)
(s300 1.0)
(s301 1.0)
(s302 1.0)
(s303 1.0)
(s304 1.0)
(s305 1.0)
(s306 1.0)
(s307 1.0)
(s308 1.0)
(s309 1.0)
(s310 1.0)
(s311 1.0)
(s312 1.0)
(s313 1.0)
(s314 1.0)
(s315 1.0)
(s316 1.0)
(s317 1.0)
(s318 1.0)
(s319 1.0)
(s320 1.0)
(s321 1.0)
(s322 1.0)
(s323 1.0)
(s324 1.0)
(s325 1.0)
(s326 1.0)
(s327 1.0)
(s328 1.0)
(s329 1.0)
(s330 1.0)
(s331 1.0)
(s332 1.0)
(s333 1.0)
(s334 1.0)
(s335 1.0)
(s336 1.0)
(s337 1.0)
(s338 1.0)
(s339 1.0)
(s340 1.0)
(s341 1.0)
(s342 1.0)
(s343 1.0)
(s344 1.0)
(s345 1.0)
(s346 1.0)
(s347 1.0)
(s348 1.0)
(s349 1.0)
(s350 1.0)
(s351 1.0)
(s352 1.0)
(s353 1.0)
(s354 1.0)
(s355 1.0)
(s356 1.0)
(s357 1.0)
(s358 1.0)
(s359 1.0)
(s360 1.0)
(s361 1.0)
(s362 1.0)
(s363 1.0)
(s364 1.0)
(s365 1.0)
(s366 1.0)
(s367 1.0)
(s368 1.0)
(s369 1.0)
(s370 1.0)
(s371 1.0)
(s372 1.0)
(s373 1.0)
(s374 1.0)
(s375 1.0)
(s376 1.0)
(s377 1.0)
(s378 1.0)
(s379 1.0)
(s380 1.0)
(s381 1.0)
(s382 1.0)
(s383 1.0)
(s384 1.0)
(s385 1.0)
(s386 1.0)
(s387 1.0)
(s388 1.0)
(s389 1.0)
(s390 1.0)
(s391 1.0)
(s392 1.0)
(s393 1.0)
(s394 1.0)
(s395 1.0)
(s396 1.0)
(s397 1.0)
(s398 1.0)
(s399 1.0)
(s400 1.0)
(s401 1.0)
(s402 1.0)
(s403 1.0)
(s404 1.0)
(s405 1.0)
(s406 1.0)
(s407 1.0)
(s408 1.0)
(s409 1.0)
(s410 1.0)
(s411 1.0)
(s412 1.0)
(s413 1.0)
(s414 1.0)
(s415 1.0)
(s416 1.0)
(s417 1.0)
(s418 1.0)
(s419 1.0)
(s420 1.0)
(s421 1.0)
(s422 1.0)
(s423 1.0)
(s424 1.0)
(s425 1.0)
(s426 1.0)
(s427 1.0)
(s428 1.0)
(s429 1.0)
(s430 1.0)
(s431 1.0)
(s432 1.0)
(s433 1.0)
(s434 1.0)
(s435 1.0)
(s436 1.0)
(s437 1.0)
(s438 1.0)
(s439 1.0)
(s440 1.0)
(s441 1.0)
(s442 1.0)
(s443 1.0)
(s444 1.0)
(s445 1.0)
(s446 1.0)
(s447 1.0)
(s448 1.0)
(s449 1.0)
(s450 1.0)
(s451 1.0)
(s452 1.0)
(s453 1.0)
(s454 1.0)
(s455 1.0)
(s456 1.0)
(s457 1.0)
(s458 1.0)
(s459 1.0)
(s460 1.0)
(s461 1.0)
(s462 1.0)
(s463 1.0)
(s464 1.0)
(s465 1.0)
(s466 1.0)
(s467 1.0)
(s468 1.0)
(s469 1.0)
(s470 1.0)
(s471 1.0)
(s472 1.0)
(s473 1.0)
(s474 1.0)
(s475 1.0)
(s476 1.0)
(s477 1.0)
(s478 1.0)
(s479 1.0)
(s480 1.0)
(s481 1.0)
(s482 1.0)
(s483 1.0)
(s484 1.0)
(s485 1.0)
(s486 1.0)
(s487 1.0)
(s488 1.0)
(s489 1.0)
(s490 1.0)
(s491 1.0)
(s492 1.0)
(s493 1.0)
(s494 1.0)
(s495 1.0)
(s496 1.0)
(s497 1.0)
(s498 1.0)
(s499 1.0)
(s500 1.0)
(s501 1.0)
(s502 1.0)
(s503 1.0)
(s504 1.0)
(s505 1.0)
(s506 1.0)
(s507 1.0)
(s508 1.0)
(s509 1.0)
(s510 1.0)
(s511 1.0)
(s512 1.0)
(s513 1.0)
(s514 1.0)
(s515 1.0)
(s516 1.0)
(s517 1.0)
(s518 1.0)
(s519 1.0)
(s520 1.0)
(s521 1.0)
(s522 1.0)
(s523 1.0)
(s524 1.0)
(s525 1.0)
(s526 1.0)
(s527 1.0)
(s528 1.0)
(s529 1.0)
(s530 1.0)
(s531 1.0)
(s532 1.0)
(s533 1.0)
(s534 1.0)
(s535 1.0)
(s536 1.0)
(s537 1.0)
(s538 1.0)
(s539 1.0)
(s540 1.0)
(s541 1.0)
(s542 1.0)
(s543 1.0)
(s544 1.0)
(s545 1.0)
(s546 1.0)
(s547 1.0)
(s548 1.0)
(s549 1.0)
(s550 1.0)
(s551 1.0)
(s552 1.0)
(s553 1.0)
(s554 1.0)
(s555 1.0)
(s556 1.0)
(s557 1.0)
(s558 1.0)
(s559 1.0)
(s560 1.0)
(s561 1.0)
(s562 1.0)
(s563 1.0)
(s564 1.0)
(s565 1.0)
(s566 1.0)
(s567 1.0)
(s568 1.0)
(s569 1.0)
(s570 1.0)
(s571 1.0)
(s572 1.0)
(s573 1.0)
(s574 1.0)
(s575 1.0)
(s576 1.0)
(s577 1.0)
(s578 1.0)
(s579 1.0)
(s580 1.0)
(s581 1.0)
(s582 1.0)
(s583 1.0)
(s584 1.0)
(s585 1.0)
(s586 1.0)
(s587 1.0)
(s588 1.0)
(s589 1.0)
(s590 1.0)
(s591 1.0)
(s592 1.0)
(s593 1.0)
(s594 1.0)
(s595 1.0)
(s596 1.0)
(s597 1.0)
(s598 1.0)
(s599 1.0)
(s600 1.0)
(s601 1.0)
(s602 1.0)
(s603 1.0)
(s604 1.0)
(s605 1.0)
(s606 1.0)
(s607 1.0)
(s608 1.0)
(s609 1.0)
(s610 1.0)
(s611 1.0)
(s612 1.0)
(s613 1.0)
(s614 1.0)
(s615 1.0)
(s616 1.0)
(s617 1.0)
(s618 1.0)
(s619 1.0)
(s620 1.0)
(s621 1.0)
(s622 1.0)
(s623 1.0)
(s624 1.0)
(s625 1.0)
(s626 1.0)
(s627 1.0)
(s628 1.0)
(s629 1.0)
(s630 1.0)
(s631 1.0)
(s632 1.0)
(s633 1.0)
(s634 1.0)
(s635 1.0)
(s636 1.0)
(s637 1.0)
(s638 1.0)
(s639 1.0)
(s640 1.0)
(s641 1.0)
(s642 1.0)
(s643 1.0)
(s644 1.0)
(s645 1.0)
(s646 1.0)
(s647 1.0)
(s648 1.0)
(s649 1.0)
(s650 1.0)
(s651 1.0)
(s652 1.0)
(s653 1.0)
(s654 1.0)
(s655 1.0)
(s656 1.0)
(s657 1.0)
(s658 1.0)
(s659 1.0)
(s660 1.0)
(s661 1.0)
(s662 1.0)
(s663 1.0)
(s664 1.0)
(s665 1.0)
(s666 1.0)
(s667 1.0)
(s668 1.0)
(s669 1.0)
(s670 1.0)
(s671 1.0)
(s672 1.0)
(s673 1.0)
(s674 1.0)
(s675 1.0)
(s676 1.0)
(s677 1.0)
(s678 1.0)
(s679 1.0)
(s680 1.0)
(s681 1.0)
(s682 1.0)
(s683 1.0)
(s684 1.0)
(s685 1.0)
(s686 1.0)
(s687 1.0)
(s688 1.0)
(s689 1.0)
(s690 1.0)
(s691 1.0)
(s692 1.0)
(s693 1.0)
(s694 1.0)
(s695 1.0)
(s696 1.0)
(s697 1.0)
(s698 1.0)
(s699 1.0)
(s700 1.0)
(s701 1.0)
(s702 1.0)
(s703 1.0)
(s704 1.0)
(s705 1.0)
(s706 1.0)
(s707 1.0)
(s708 1.0)
(s709 1.0)
(s710 1.0)
(s711 1.0)
(s712 1.0)
(s713 1.0)
(s714 1.0)
(s715 1.0)
(s716 1.0)
(s717 1.0)
(s718 1.0)
(s719 1.0)
(s720 1.0)
(s721 1.0)
(s722 1.0)
(s723 1.0)
(s724 1.0)
(s725 1.0)
(s726 1.0)
(s727 1.0)
(s728 1.0)
(s729 1.0)
(s730 1.0)
(s731 1.0)
(s732 1.0)
(s733 1.0)
(s734 1.0)
(s735 1.0)
(s736 1.0)
(s737 1.0)
(s738 1.0)
(s739 1.0)
(s740 1.0)
(s741 1.0)
(s742 1.0)
(s743 1.0)
(s744 1.0)
(s745 1.0)
(s746 1.0)
(s747 1.0)
(s748 1.0)
(s749 1.0)
(s750 1.0)
(s751 1.0)
(s752 1.0)
(s753 1.0)
(s754 1.0)
(s755 1.0)
(s756 1.0)
(s757 1.0)
(s758 1.0)
(s759 1.0)
(s760 1.0)
(s761 1.0)
(s762 1.0)
(s763 1.0)
(s764 1.0)
(s765 1.0)
(s766 1.0)
(s767 1.0)
(s768 1.0)
(s769 1.0)
(s770 1.0)
(s771 1.0)
(s772 1.0)
(s773 1.0)
(s774 1.0)
(s775 1.0)
(s776 1.0)
(s777 1.0)
(s778 1.0)
(s779 1.0)
(s780 1.0)
(s781 1.0)
(s782 1.0)
(s783 1.0)
(s784 1.0)
(s785 1.0)
(s786 1.0)
(s787 1.0)
(s788 1.0)
(s789 1.0)
(s790 1.0)
(s791 1.0)
(s792 1.0)
(s793 1.0)
(s794 1.0)
(s795 1.0)
(s796 1.0)
(s797 1.0)
(s798 1.0)
(s799 1.0)
(s800 1.0)
(s801 1.0)
(s802 1.0)
(s803 1.0)
(s804 1.0)
(s805 1.0)
(s806 1.0)
(s807 1.0)
(s808 1.0)
(s809 1.0)
(s810 1.0)
(s811 1.0)
(s812 1.0)
(s813 1.0)
(s814 1.0)
(s815 1.0)
(s816 1.0)
(s817 1.0)
(s818 1.0)
(s819 1.0)
(s820 1.0)
(s821 1.0)
(s822 1.0)
(s823 1.0)
(s824 1.0)
(s825 1.0)
(s826 1.0)
(s827 1.0)
(s828 1.0)
(s829 1.0)
(s830 1.0)
(s831 1.0)
(s832 1.0)
(s833 1.0)
(s834 1.0)
(s835 1.0)
(s836 1.0)
(s837 1.0)
(s838 1.0)
(s839 1.0)
(s840 1.0)
(s841 1.0)
(s842 1.0)
(s843 1.0)
(s844 1.0)
(s845 1.0)
(s846 1.0)
(s847 1.0)
(s848 1.0)
(s849 1.0)
(s850 1.0)
(s851 1.0)
(s852 1.0)
(s853 1.0)
(s854 1.0)
(s855 1.0)
(s856 1.0)
(s857 1.0)
(s858 1.0)
(s859 1.0)
(s860 1.0)
(s861 1.0)
(s862 1.0)
(s863 1.0)
(s864 1.0)
(s865 1.0)
(s866 1.0)
(s867 1.0)
(s868 1.0)
(s869 1.0)
(s870 1.0)
(s871 1.0)
(s872 1.0)
(s873 1.0)
(s874 1.0)
(s875 1.0)
(s876 1.0)
(s877 1.0)
(s878 1.0)
(s879 1.0)
(s880 1.0)
(s881 1.0)
(s882 1.0)
(s883 1.0)
(s884 1.0)
(s885 1.0)
(s886 1.0)
(s887 1.0)
(s888 1.0)
(s889 1.0)
(s890 1.0)
(s891 1.0)
(s892 1.0)
(s893 1.0)
(s894 1.0)
(s895 1.0)
(s896 1.0)
(s897 1.0)
(s898 1.0)
(s899 1.0)
(s900 1.0)
(s901 1.0)
(s902 1.0)
(s903 1.0)
(s904 1.0)
(s905 1.0)
(s906 1.0)
(s907 1.0)
(s908 1.0)
(s909 1.0)
(s910 1.0)
(s911 1.0)
(s912 1.0)
(s913 1.0)
(s914 1.0)
(s915 1.0)
(s916 1.0)
(s917 1.0)
(s918 1.0)
(s919 1.0)
(s920 1.0)
(s921 1.0)
(s922 1.0)
(s923 1.0)
(s924 1.0)
(s925 1.0)
(s926 1.0)
(s927 1.0)
(s928 1.0)
(s929 1.0)
(s930 1.0)
(s931 1.0)
(s932 1.0)
(s933 1.0)
(s934 1.0)
(s935 1.0)
(s936 1.0)
(s937 1.0)
(s938 1.0)
(s939 1.0)
(s940 1.0)
(s941 1.0)
(s942 1.0)
(s943 1.0)
(s944 1.0)
(s945 1.0)
(s946 1.0)
(s947 1.0)
(s948 1.0)
(s949 1.0)
(s950 1.0)
(s951 1.0)
(s952 1.0)
(s953 1.0)
(s954 1.0)
(s955 1.0)
(s956 1.0)
(s957 1.0)
(s958 1.0)
(s959 1.0)
(s960 1.0)
(s961 1.0)
(s962 1.0)
(s963 1.0)
(s964 1.0)
(s965 1.0)
(s966 1.0)
(s967 1.0)
(s968 1.0)
(s969 1.0)
(s970 1.0)
(s971 1.0)
(s972 1.0)
(s973 1.0)
(s974 1.0)
(s975 1.0)
(s976 1.0)
(s977 1.0)
(s978 1.0)
(s979 1.0)
(s980 1.0)
(s981 1.0)
(s982 1.0)
(s983 1.0)
(s984 1.0)
(s985 1.0)
(s986 1.0)
(s987 1.0)
(s988 1.0)
(s989 1.0)
(s990 1.0)
(s991 1.0)
(s992 1.0)
(s993 1.0)
(s994 1.0)
(s995 1.0)
(s996 1.0)
(s997 1.0)
(s998 1.0)
(s999 1.0)
(s1000 1.0)
(s1001 1.0)
(s1002 1.0)
(s1003 1.0)
(s1004 1.0)
(s1005 1.0)
(s1006 1.0)
(s1007 1.0)
(s1008 1.0)
(s1009 1.0)
(s1010 1.0)
(s1011 1.0)
(s1012 1.0)
(s1013 1.0)
(s1014 1.0)
(s1015 1.0)
(s1016 1.0)
(s1017 1.0)
(s1018 1.0)
(s1019 1.0)
(s1020 1.0)
(s1021 1.0)
(s1022 1.0)
(s1023 1.0)
(s1024 1.0)
(s1025 1.0)
(s1026 1.0)
(s1027 1.0)
(s1028 1.0)
(s1029 1.0)
(s1030 1.0)
(s1031 1.0)
(s1032 1.0)
(s1033 1.0)
(s1034 1.0)
(s1035 1.0)
(s1036 1.0)
(s1037 1.0)
(s1038 1.0)
(s1039 1.0)
(s1040 1.0)
(s1041 1.0)
(s1042 1.0)
(s1043 1.0)
(s1044 1.0)
(s1045 1.0)
(s1046 1.0)
(s1047 1.0)
(s1048 1.0)
(s1049 1.0)
(s1050 1.0)
(s1051 1.0)
(s1052 1.0)
(s1053 1.0)
(s1054 1.0)
(s1055 1.0)
(s1056 1.0)
(s1057 1.0)
(s1058 1.0)
(s1059 1.0)
(s1060 1.0)
(s1061 1.0)
(s1062 1.0)
(s1063 1.0)
(s1064 1.0)
(s1065 1.0)
(s1066 1.0)
(s1067 1.0)
(s1068 1.0)
(s1069 1.0)
(s1070 1.0)
(s1071 1.0)
(s1072 1.0)
(s1073 1.0)
(s1074 1.0)
(s1075 1.0)
(s1076 1.0)
(s1077 1.0)
(s1078 1.0)
(s1079 1.0)
(s1080 1.0)
(s1081 1.0)
(s1082 1.0)
(s1083 1.0)
(s1084 1.0)
(s1085 1.0)
(s1086 1.0)
(s1087 1.0)
(s1088 1.0)
(s1089 1.0)
(s1090 1.0)
(s1091 1.0)
(s1092 1.0)
(s1093 1.0)
(s1094 1.0)
(s1095 1.0)
(s1096 1.0)
(s1097 1.0)
(s1098 1.0)
(s1099 1.0)
(s1100 1.0)
(s1101 1.0)
(s1102 1.0)
(s1103 1.0)
(s1104 1.0)
(s1105 1.0)
(s1106 1.0)
(s1107 1.0)
(s1108 1.0)
(s1109 1.0)
(s1110 1.0)
(s1111 1.0)
(s1112 1.0)
(s1113 1.0)
(s1114 1.0)
(s1115 1.0)
(s1116 1.0)
(s1117 1.0)
(s1118 1.0)
(s1119 1.0)
(s1120 1.0)
(s1121 1.0)
(s1122 1.0)
(s1123 1.0)
(s1124 1.0)
(s1125 1.0)
(s1126 1.0)
(s1127 1.0)
(s1128 1.0)
(s1129 1.0)
(s1130 1.0)
(s1131 1.0)
(s1132 1.0)
(s1133 1.0)
(s1134 1.0)
(s1135 1.0)
(s1136 1.0)
(s1137 1.0)
(s1138 1.0)
(s1139 1.0)
(s1140 1.0)
(s1141 1.0)
(s1142 1.0)
(s1143 1.0)
(s1144 1.0)
(s1145 1.0)
(s1146 1.0)
(s1147 1.0)
(s1148 1.0)
(s1149 1.0)
(s1150 1.0)
(s1151 1.0)
(s1152 1.0)
(s1153 1.0)
(s1154 1.0)
(s1155 1.0)
(s1156 1.0)
(s1157 1.0)
(s1158 1.0)
(s1159 1.0)
(s1160 1.0)
(s1161 1.0)
(s1162 1.0)
(s1163 1.0)
(s1164 1.0)
(s1165 1.0)
(s1166 1.0)
(s1167 1.0)
(s1168 1.0)
(s1169 1.0)
(s1170 1.0)
(s1171 1.0)
(s1172 1.0)
(s1173 1.0)
(s1174 1.0)
(s1175 1.0)
(s1176 1.0)
(s1177 1.0)
(s1178 1.0)
(s1179 1.0)
(s1180 1.0)
(s1181 1.0)
(s1182 1.0)
(s1183 1.0)
(s1184 1.0)
(s1185 1.0)
(s1186 1.0)
(s1187 1.0)
(s1188 1.0)
(s1189 1.0)
(s1190 1.0)
(s1191 1.0)
(s1192 1.0)
(s1193 1.0)
(s1194 1.0)
(s1195 1.0)
(s1196 1.0)
(s1197 1.0)
(s1198 1.0)
(s1199 1.0)
(s1200 1.0)
(s1201 1.0)
(s1202 1.0)
(s1203 1.0)
(s1204 1.0)
(s1205 1.0)
(s1206 1.0)
(s1207 1.0)
(s1208 1.0)
(s1209 1.0)
(s1210 1.0)
(s1211 1.0)
(s1212 1.0)
(s1213 1.0)
(s1214 1.0)
(s1215 1.0)
(s1216 1.0)
(s1217 1.0)
(s1218 1.0)
(s1219 1.0)
(s1220 1.0)
(s1221 1.0)
(s1222 1.0)
(s1223 1.0)
(s1224 1.0)
(s1225 1.0)
(s1226 1.0)
(s1227 1.0)
(s1228 1.0)
(s1229 1.0)
(s1230 1.0)
(s1231 1.0)
(s1232 1.0)
(s1233 1.0)
(s1234 1.0)
(s1235 1.0)
(s1236 1.0)
(s1237 1.0)
(s1238 1.0)
(s1239 1.0)
(s1240 1.0)
(s1241 1.0)
(s1242 1.0)
(s1243 1.0)
(s1244 1.0)
(s1245 1.0)
(s1246 1.0)
(s1247 1.0)
(s1248 1.0)
(s1249 1.0)
(s1250 1.0)
(s1251 1.0)
(s1252 1.0)
(s1253 1.0)
(s1254 1.0)
(s1255 1.0)
(s1256 1.0)
(s1257 1.0)
(s1258 1.0)
(s1259 1.0)
(s1260 1.0)
(s1261 1.0)
(s1262 1.0)
(s1263 1.0)
(s1264 1.0)
(s1265 1.0)
(s1266 1.0)
(s1267 1.0)
(s1268 1.0)
(s1269 1.0)
(s1270 1.0)
(s1271 1.0)
(s1272 1.0)
(s1273 1.0)
(s1274 1.0)
(s1275 1.0)
(s1276 1.0)
(s1277 1.0)
(s1278 1.0)
(s1279 1.0)
(s1280 1.0)
(s1281 1.0)
(s1282 1.0)
(s1283 1.0)
(s1284 1.0)
(s1285 1.0)
(s1286 1.0)
(s1287 1.0)
(s1288 1.0)
(s1289 1.0)
(s1290 1.0)
(s1291 1.0)
(s1292 1.0)
(s1293 1.0)
(s1294 1.0)
(s1295 1.0)
(s1296 1.0)
(s1297 1.0)
(s1298 1.0)
(s1299 1.0)
(s1300 1.0)
(s1301 1.0)
(s1302 1.0)
(s1303 1.0)
(s1304 1.0)
(s1305 1.0)
(s1306 1.0)
(s1307 1.0)
(s1308 1.0)
(s1309 1.0)
(s1310 1.0)
(s1311 1.0)
(s1312 1.0)
(s1313 1.0)
(s1314 1.0)
(s1315 1.0)
(s1316 1.0)
(s1317 1.0)
(s1318 1.0)
(s1319 1.0)
(s1320 1.0)
(s1321 1.0)
(s1322 1.0)
(s1323 1.0)
(s1324 1.0)
(s1325 1.0)
(s1326 1.0)
(s1327 1.0)
(s1328 1.0)
(s1329 1.0)
(s1330 1.0)
(s1331 1.0)
(s1332 1.0)
(s1333 1.0)
(s1334 1.0)
(s1335 1.0)
(s1336 1.0)
(s1337 1.0)
(s1338 1.0)
(s1339 1.0)
(s1340 1.0)
(s1341 1.0)
(s1342 1.0)
(s1343 1.0)
(s1344 1.0)
(s1345 1.0)
(s1346 1.0)
(s1347 1.0)
(s1348 1.0)
(s1349 1.0)
(s1350 1.0)
(s1351 1.0)
(s1352 1.0)
(s1353 1.0)
(s1354 1.0)
(s1355 1.0)
(s1356 1.0)
(s1357 1.0)
(s1358 1.0)
(s1359 1.0)
(s1360 1.0)
(s1361 1.0)
(s1362 1.0)
(s1363 1.0)
(s1364 1.0)
(s1365 1.0)
(s1366 1.0)
(s1367 1.0)
(s1368 1.0)
(s1369 1.0)
(s1370 1.0)
(s1371 1.0)
(s1372 1.0)
(s1373 1.0)
(s1374 1.0)
(s1375 1.0)
(s1376 1.0)
(s1377 1.0)
(s1378 1.0)
(s1379 1.0)
(s1380 1.0)
(s1381 1.0)
(s1382 1.0)
(s1383 1.0)
(s1384 1.0)
(s1385 1.0)
(s1386 1.0)
(s1387 1.0)
(s1388 1.0)
(s1389 1.0)
(s1390 1.0)
(s1391 1.0)
(s1392 1.0)
(s1393 1.0)
(s1394 1.0)
(s1395 1.0)
(s1396 1.0)
(s1397 1.0)
(s1398 1.0)
(s1399 1.0)
(s1400 1.0)
(s1401 1.0)
(s1402 1.0)
(s1403 1.0)
(s1404 1.0)
(s1405 1.0)
(s1406 1.0)
(s1407 1.0)
(s1408 1.0)
(s1409 1.0)
(s1410 1.0)
(s1411 1.0)
(s1412 1.0)
(s1413 1.0)
(s1414 1.0)
(s1415 1.0)
(s1416 1.0)
(s1417 1.0)
(s1418 1.0)
(s1419 1.0)
(s1420 1.0)
(s1421 1.0)
(s1422 1.0)
(s1423 1.0)
(s1424 1.0)
(s1425 1.0)
(s1426 1.0)
(s1427 1.0)
(s1428 1.0)
(s1429 1.0)
(s1430 1.0)
(s1431 1.0)
(s1432 1.0)
(s1433 1.0)
(s1434 1.0)
(s1435 1.0)
(s1436 1.0)
(s1437 1.0)
(s1438 1.0)
(s1439 1.0)
(s1440 1.0)
(s1441 1.0)
(s1442 1.0)
(s1443 1.0)
(s1444 1.0)
(s1445 1.0)
(s1446 1.0)
(s1447 1.0)
(s1448 1.0)
(s1449 1.0)
(s1450 1.0)
(s1451 1.0)
(s1452 1.0)
(s1453 1.0)
(s1454 1.0)
(s1455 1.0)
(s1456 1.0)
(s1457 1.0)
(s1458 1.0)
(s1459 1.0)
(s1460 1.0)
(s1461 1.0)
(s1462 1.0)
(s1463 1.0)
(s1464 1.0)
(s1465 1.0)
(s1466 1.0)
(s1467 1.0)
(s1468 1.0)
(s1469 1.0)
(s1470 1.0)
(s1471 1.0)
(s1472 1.0)
(s1473 1.0)
(s1474 1.0)
(s1475 1.0)
(s1476 1.0)
(s1477 1.0)
(s1478 1.0)
(s1479 1.0)
(s1480 1.0)
(s1481 1.0)
(s1482 1.0)
(s1483 1.0)
(s1484 1.0)
(s1485 1.0)
(s1486 1.0)
(s1487 1.0)
(s1488 1.0)
(s1489 1.0)
(s1490 1.0)
(s1491 1.0)
(s1492 1.0)
(s1493 1.0)
(s1494 1.0)
(s1495 1.0)
(s1496 1.0)
(s1497 1.0)
(s1498 1.0)
(s1499 1.0)
(s1500 1.0)
(s1501 1.0)
(s1502 1.0)
(s1503 1.0)
(s1504 1.0)
(s1505 1.0)
(s1506 1.0)
(s1507 1.0)
(s1508 1.0)
(s1509 1.0)
(s1510 1.0)
(s1511 1.0)
(s1512 1.0)
(s1513 1.0)
(s1514 1.0)
(s1515 1.0)
(s1516 1.0)
(s1517 1.0)
(s1518 1.0)
(s1519 1.0)
(s1520 1.0)
(s1521 1.0)
(s1522 1.0)
(s1523 1.0)
(s1524 1.0)
(s1525 1.0)
(s1526 1.0)
(s1527 1.0)
(s1528 1.0)
(s1529 1.0)
(s1530 1.0)
(s1531 1.0)
(s1532 1.0)
(s1533 1.0)
(s1534 1.0)
(s1535 1.0)
(s1536 1.0)
(s1537 1.0)
(s1538 1.0)
(s1539 1.0)
(s1540 1.0)
(s1541 1.0)
(s1542 1.0)
(s1543 1.0)
(s1544 1.0)
(s1545 1.0)
(s1546 1.0)
(s1547 1.0)
(s1548 1.0)
(s1549 1.0)
(s1550 1.0)
(s1551 1.0)
(s1552 1.0)
(s1553 1.0)
(s1554 1.0)
(s1555 1.0)
(s1556 1.0)
(s1557 1.0)
(s1558 1.0)
(s1559 1.0)
(s1560 1.0)
(s1561 1.0)
(s1562 1.0)
(s1563 1.0)
(s1564 1.0)
(s1565 1.0)
(s1566 1.0)
(s1567 1.0)
(s1568 1.0)
(s1569 1.0)
(s1570 1.0)
(s1571 1.0)
(s1572 1.0)
(s1573 1.0)
(s1574 1.0)
(s1575 1.0)
(s1576 1.0)
(s1577 1.0)
(s1578 1.0)
(s1579 1.0)
(s1580 1.0)
(s1581 1.0)
(s1582 1.0)
(s1583 1.0)
(s1584 1.0)
(s1585 1.0)
(s1586 1.0)
(s1587 1.0)
(s1588 1.0)
(s1589 1.0)
(s1590 1.0)
(s1591 1.0)
(s1592 1.0)
(s1593 timeout
1.0 org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30088 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 3210/3210 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3210 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
(s3080 1timeout
^^^^^^^^
(error "Invalid token: 1timeout")
Error getting values : (error "ParserException while parsing response: ((s0 1)
(s1 1)
(s2 1)
(s3 1)
(s4 1)
(s5 1)
(s6 1)
(s7 1)
(s8 1)
(s9 1)
(s10 1)
(s11 1)
(s12 1)
(s13 1)
(s14 1)
(s15 1)
(s16 1)
(s17 1)
(s18 1)
(s19 1)
(s20 1)
(s21 1)
(s22 1)
(s23 1)
(s24 1)
(s25 1)
(s26 1)
(s27 1)
(s28 1)
(s29 1)
(s30 1)
(s31 1)
(s32 1)
(s33 1)
(s34 1)
(s35 1)
(s36 1)
(s37 1)
(s38 1)
(s39 1)
(s40 1)
(s41 1)
(s42 1)
(s43 1)
(s44 1)
(s45 1)
(s46 1)
(s47 1)
(s48 1)
(s49 1)
(s50 1)
(s51 1)
(s52 1)
(s53 1)
(s54 1)
(s55 1)
(s56 1)
(s57 1)
(s58 1)
(s59 1)
(s60 1)
(s61 1)
(s62 1)
(s63 1)
(s64 1)
(s65 1)
(s66 1)
(s67 1)
(s68 1)
(s69 1)
(s70 1)
(s71 1)
(s72 1)
(s73 1)
(s74 1)
(s75 1)
(s76 1)
(s77 1)
(s78 1)
(s79 1)
(s80 1)
(s81 1)
(s82 1)
(s83 1)
(s84 1)
(s85 1)
(s86 1)
(s87 1)
(s88 1)
(s89 1)
(s90 1)
(s91 1)
(s92 1)
(s93 1)
(s94 1)
(s95 1)
(s96 1)
(s97 1)
(s98 1)
(s99 1)
(s100 1)
(s101 1)
(s102 1)
(s103 1)
(s104 1)
(s105 1)
(s106 1)
(s107 1)
(s108 1)
(s109 1)
(s110 1)
(s111 1)
(s112 1)
(s113 1)
(s114 1)
(s115 1)
(s116 1)
(s117 1)
(s118 1)
(s119 1)
(s120 1)
(s121 1)
(s122 1)
(s123 1)
(s124 1)
(s125 1)
(s126 1)
(s127 1)
(s128 1)
(s129 1)
(s130 1)
(s131 1)
(s132 1)
(s133 1)
(s134 1)
(s135 1)
(s136 1)
(s137 1)
(s138 1)
(s139 1)
(s140 1)
(s141 1)
(s142 1)
(s143 1)
(s144 1)
(s145 1)
(s146 1)
(s147 1)
(s148 1)
(s149 1)
(s150 1)
(s151 1)
(s152 1)
(s153 1)
(s154 1)
(s155 1)
(s156 1)
(s157 1)
(s158 1)
(s159 1)
(s160 1)
(s161 1)
(s162 1)
(s163 1)
(s164 1)
(s165 1)
(s166 1)
(s167 1)
(s168 1)
(s169 1)
(s170 1)
(s171 1)
(s172 1)
(s173 1)
(s174 1)
(s175 1)
(s176 1)
(s177 1)
(s178 1)
(s179 1)
(s180 1)
(s181 1)
(s182 1)
(s183 1)
(s184 1)
(s185 1)
(s186 1)
(s187 1)
(s188 1)
(s189 1)
(s190 1)
(s191 1)
(s192 1)
(s193 1)
(s194 1)
(s195 1)
(s196 1)
(s197 1)
(s198 1)
(s199 1)
(s200 1)
(s201 1)
(s202 1)
(s203 1)
(s204 1)
(s205 1)
(s206 1)
(s207 1)
(s208 1)
(s209 1)
(s210 1)
(s211 1)
(s212 1)
(s213 1)
(s214 1)
(s215 1)
(s216 1)
(s217 1)
(s218 1)
(s219 1)
(s220 1)
(s221 1)
(s222 1)
(s223 1)
(s224 1)
(s225 1)
(s226 1)
(s227 1)
(s228 1)
(s229 1)
(s230 1)
(s231 1)
(s232 1)
(s233 1)
(s234 1)
(s235 1)
(s236 1)
(s237 1)
(s238 1)
(s239 1)
(s240 1)
(s241 1)
(s242 1)
(s243 1)
(s244 1)
(s245 1)
(s246 1)
(s247 1)
(s248 1)
(s249 1)
(s250 1)
(s251 1)
(s252 1)
(s253 1)
(s254 1)
(s255 1)
(s256 1)
(s257 1)
(s258 1)
(s259 1)
(s260 1)
(s261 1)
(s262 1)
(s263 1)
(s264 1)
(s265 1)
(s266 1)
(s267 1)
(s268 1)
(s269 1)
(s270 1)
(s271 1)
(s272 1)
(s273 1)
(s274 1)
(s275 1)
(s276 1)
(s277 1)
(s278 1)
(s279 1)
(s280 1)
(s281 1)
(s282 1)
(s283 1)
(s284 1)
(s285 1)
(s286 1)
(s287 1)
(s288 1)
(s289 1)
(s290 1)
(s291 1)
(s292 1)
(s293 1)
(s294 1)
(s295 1)
(s296 1)
(s297 1)
(s298 1)
(s299 1)
(s300 1)
(s301 1)
(s302 1)
(s303 1)
(s304 1)
(s305 1)
(s306 1)
(s307 1)
(s308 1)
(s309 1)
(s310 1)
(s311 1)
(s312 1)
(s313 1)
(s314 1)
(s315 1)
(s316 1)
(s317 1)
(s318 1)
(s319 1)
(s320 1)
(s321 1)
(s322 1)
(s323 1)
(s324 1)
(s325 1)
(s326 1)
(s327 1)
(s328 1)
(s329 1)
(s330 1)
(s331 1)
(s332 1)
(s333 1)
(s334 1)
(s335 1)
(s336 1)
(s337 1)
(s338 1)
(s339 1)
(s340 1)
(s341 1)
(s342 1)
(s343 1)
(s344 1)
(s345 1)
(s346 1)
(s347 1)
(s348 1)
(s349 1)
(s350 1)
(s351 1)
(s352 1)
(s353 1)
(s354 1)
(s355 1)
(s356 1)
(s357 1)
(s358 1)
(s359 1)
(s360 1)
(s361 1)
(s362 1)
(s363 1)
(s364 1)
(s365 1)
(s366 1)
(s367 1)
(s368 1)
(s369 1)
(s370 1)
(s371 1)
(s372 1)
(s373 1)
(s374 1)
(s375 1)
(s376 1)
(s377 1)
(s378 1)
(s379 1)
(s380 1)
(s381 1)
(s382 1)
(s383 1)
(s384 1)
(s385 1)
(s386 1)
(s387 1)
(s388 1)
(s389 1)
(s390 1)
(s391 1)
(s392 1)
(s393 1)
(s394 1)
(s395 1)
(s396 1)
(s397 1)
(s398 1)
(s399 1)
(s400 1)
(s401 1)
(s402 1)
(s403 1)
(s404 1)
(s405 1)
(s406 1)
(s407 1)
(s408 1)
(s409 1)
(s410 1)
(s411 1)
(s412 1)
(s413 1)
(s414 1)
(s415 1)
(s416 1)
(s417 1)
(s418 1)
(s419 1)
(s420 1)
(s421 1)
(s422 1)
(s423 1)
(s424 1)
(s425 1)
(s426 1)
(s427 1)
(s428 1)
(s429 1)
(s430 1)
(s431 1)
(s432 1)
(s433 1)
(s434 1)
(s435 1)
(s436 1)
(s437 1)
(s438 1)
(s439 1)
(s440 1)
(s441 1)
(s442 1)
(s443 1)
(s444 1)
(s445 1)
(s446 1)
(s447 1)
(s448 1)
(s449 1)
(s450 1)
(s451 1)
(s452 1)
(s453 1)
(s454 1)
(s455 1)
(s456 1)
(s457 1)
(s458 1)
(s459 1)
(s460 1)
(s461 1)
(s462 1)
(s463 1)
(s464 1)
(s465 1)
(s466 1)
(s467 1)
(s468 1)
(s469 1)
(s470 1)
(s471 1)
(s472 1)
(s473 1)
(s474 1)
(s475 1)
(s476 1)
(s477 1)
(s478 1)
(s479 1)
(s480 1)
(s481 1)
(s482 1)
(s483 1)
(s484 1)
(s485 1)
(s486 1)
(s487 1)
(s488 1)
(s489 1)
(s490 1)
(s491 1)
(s492 1)
(s493 1)
(s494 1)
(s495 1)
(s496 1)
(s497 1)
(s498 1)
(s499 1)
(s500 1)
(s501 1)
(s502 1)
(s503 1)
(s504 1)
(s505 1)
(s506 1)
(s507 1)
(s508 1)
(s509 1)
(s510 1)
(s511 1)
(s512 1)
(s513 1)
(s514 1)
(s515 1)
(s516 1)
(s517 1)
(s518 1)
(s519 1)
(s520 1)
(s521 1)
(s522 1)
(s523 1)
(s524 1)
(s525 1)
(s526 1)
(s527 1)
(s528 1)
(s529 1)
(s530 1)
(s531 1)
(s532 1)
(s533 1)
(s534 1)
(s535 1)
(s536 1)
(s537 1)
(s538 1)
(s539 1)
(s540 1)
(s541 1)
(s542 1)
(s543 1)
(s544 1)
(s545 1)
(s546 1)
(s547 1)
(s548 1)
(s549 1)
(s550 1)
(s551 1)
(s552 1)
(s553 1)
(s554 1)
(s555 1)
(s556 1)
(s557 1)
(s558 1)
(s559 1)
(s560 1)
(s561 1)
(s562 1)
(s563 1)
(s564 1)
(s565 1)
(s566 1)
(s567 1)
(s568 1)
(s569 1)
(s570 1)
(s571 1)
(s572 1)
(s573 1)
(s574 1)
(s575 1)
(s576 1)
(s577 1)
(s578 1)
(s579 1)
(s580 1)
(s581 1)
(s582 1)
(s583 1)
(s584 1)
(s585 1)
(s586 1)
(s587 1)
(s588 1)
(s589 1)
(s590 1)
(s591 1)
(s592 1)
(s593 1)
(s594 1)
(s595 1)
(s596 1)
(s597 1)
(s598 1)
(s599 1)
(s600 1)
(s601 1)
(s602 1)
(s603 1)
(s604 1)
(s605 1)
(s606 1)
(s607 1)
(s608 1)
(s609 1)
(s610 1)
(s611 1)
(s612 1)
(s613 1)
(s614 1)
(s615 1)
(s616 1)
(s617 1)
(s618 1)
(s619 1)
(s620 1)
(s621 1)
(s622 1)
(s623 1)
(s624 1)
(s625 1)
(s626 1)
(s627 1)
(s628 1)
(s629 1)
(s630 1)
(s631 1)
(s632 1)
(s633 1)
(s634 1)
(s635 1)
(s636 1)
(s637 1)
(s638 1)
(s639 1)
(s640 1)
(s641 1)
(s642 1)
(s643 1)
(s644 1)
(s645 1)
(s646 1)
(s647 1)
(s648 1)
(s649 1)
(s650 1)
(s651 1)
(s652 1)
(s653 1)
(s654 1)
(s655 1)
(s656 1)
(s657 1)
(s658 1)
(s659 1)
(s660 1)
(s661 1)
(s662 1)
(s663 1)
(s664 1)
(s665 1)
(s666 1)
(s667 1)
(s668 1)
(s669 1)
(s670 1)
(s671 1)
(s672 1)
(s673 1)
(s674 1)
(s675 1)
(s676 1)
(s677 1)
(s678 1)
(s679 1)
(s680 1)
(s681 1)
(s682 1)
(s683 1)
(s684 1)
(s685 1)
(s686 1)
(s687 1)
(s688 1)
(s689 1)
(s690 1)
(s691 1)
(s692 1)
(s693 1)
(s694 1)
(s695 1)
(s696 1)
(s697 1)
(s698 1)
(s699 1)
(s700 1)
(s701 1)
(s702 1)
(s703 1)
(s704 1)
(s705 1)
(s706 1)
(s707 1)
(s708 1)
(s709 1)
(s710 1)
(s711 1)
(s712 1)
(s713 1)
(s714 1)
(s715 1)
(s716 1)
(s717 1)
(s718 1)
(s719 1)
(s720 1)
(s721 1)
(s722 1)
(s723 1)
(s724 1)
(s725 1)
(s726 1)
(s727 1)
(s728 1)
(s729 1)
(s730 1)
(s731 1)
(s732 1)
(s733 1)
(s734 1)
(s735 1)
(s736 1)
(s737 1)
(s738 1)
(s739 1)
(s740 1)
(s741 1)
(s742 1)
(s743 1)
(s744 1)
(s745 1)
(s746 1)
(s747 1)
(s748 1)
(s749 1)
(s750 1)
(s751 1)
(s752 1)
(s753 1)
(s754 1)
(s755 1)
(s756 1)
(s757 1)
(s758 1)
(s759 1)
(s760 1)
(s761 1)
(s762 1)
(s763 1)
(s764 1)
(s765 1)
(s766 1)
(s767 1)
(s768 1)
(s769 1)
(s770 1)
(s771 1)
(s772 1)
(s773 1)
(s774 1)
(s775 1)
(s776 1)
(s777 1)
(s778 1)
(s779 1)
(s780 1)
(s781 1)
(s782 1)
(s783 1)
(s784 1)
(s785 1)
(s786 1)
(s787 1)
(s788 1)
(s789 1)
(s790 1)
(s791 1)
(s792 1)
(s793 1)
(s794 1)
(s795 1)
(s796 1)
(s797 1)
(s798 1)
(s799 1)
(s800 1)
(s801 1)
(s802 1)
(s803 1)
(s804 1)
(s805 1)
(s806 1)
(s807 1)
(s808 1)
(s809 1)
(s810 1)
(s811 1)
(s812 1)
(s813 1)
(s814 1)
(s815 1)
(s816 1)
(s817 1)
(s818 1)
(s819 1)
(s820 1)
(s821 1)
(s822 1)
(s823 1)
(s824 1)
(s825 1)
(s826 1)
(s827 1)
(s828 1)
(s829 1)
(s830 1)
(s831 1)
(s832 1)
(s833 1)
(s834 1)
(s835 1)
(s836 1)
(s837 1)
(s838 1)
(s839 1)
(s840 1)
(s841 1)
(s842 1)
(s843 1)
(s844 1)
(s845 1)
(s846 1)
(s847 1)
(s848 1)
(s849 1)
(s850 1)
(s851 1)
(s852 1)
(s853 1)
(s854 1)
(s855 1)
(s856 1)
(s857 1)
(s858 1)
(s859 1)
(s860 1)
(s861 1)
(s862 1)
(s863 1)
(s864 1)
(s865 1)
(s866 1)
(s867 1)
(s868 1)
(s869 1)
(s870 1)
(s871 1)
(s872 1)
(s873 1)
(s874 1)
(s875 1)
(s876 1)
(s877 1)
(s878 1)
(s879 1)
(s880 1)
(s881 1)
(s882 1)
(s883 1)
(s884 1)
(s885 1)
(s886 1)
(s887 1)
(s888 1)
(s889 1)
(s890 1)
(s891 1)
(s892 1)
(s893 1)
(s894 1)
(s895 1)
(s896 1)
(s897 1)
(s898 1)
(s899 1)
(s900 1)
(s901 1)
(s902 1)
(s903 1)
(s904 1)
(s905 1)
(s906 1)
(s907 1)
(s908 1)
(s909 1)
(s910 1)
(s911 1)
(s912 1)
(s913 1)
(s914 1)
(s915 1)
(s916 1)
(s917 1)
(s918 1)
(s919 1)
(s920 1)
(s921 1)
(s922 1)
(s923 1)
(s924 1)
(s925 1)
(s926 1)
(s927 1)
(s928 1)
(s929 1)
(s930 1)
(s931 1)
(s932 1)
(s933 1)
(s934 1)
(s935 1)
(s936 1)
(s937 1)
(s938 1)
(s939 1)
(s940 1)
(s941 1)
(s942 1)
(s943 1)
(s944 1)
(s945 1)
(s946 1)
(s947 1)
(s948 1)
(s949 1)
(s950 1)
(s951 1)
(s952 1)
(s953 1)
(s954 1)
(s955 1)
(s956 1)
(s957 1)
(s958 1)
(s959 1)
(s960 1)
(s961 1)
(s962 1)
(s963 1)
(s964 1)
(s965 1)
(s966 1)
(s967 1)
(s968 1)
(s969 1)
(s970 1)
(s971 1)
(s972 1)
(s973 1)
(s974 1)
(s975 1)
(s976 1)
(s977 1)
(s978 1)
(s979 1)
(s980 1)
(s981 1)
(s982 1)
(s983 1)
(s984 1)
(s985 1)
(s986 1)
(s987 1)
(s988 1)
(s989 1)
(s990 1)
(s991 1)
(s992 1)
(s993 1)
(s994 1)
(s995 1)
(s996 1)
(s997 1)
(s998 1)
(s999 1)
(s1000 1)
(s1001 1)
(s1002 1)
(s1003 1)
(s1004 1)
(s1005 1)
(s1006 1)
(s1007 1)
(s1008 1)
(s1009 1)
(s1010 1)
(s1011 1)
(s1012 1)
(s1013 1)
(s1014 1)
(s1015 1)
(s1016 1)
(s1017 1)
(s1018 1)
(s1019 1)
(s1020 1)
(s1021 1)
(s1022 1)
(s1023 1)
(s1024 1)
(s1025 1)
(s1026 1)
(s1027 1)
(s1028 1)
(s1029 1)
(s1030 1)
(s1031 1)
(s1032 1)
(s1033 1)
(s1034 1)
(s1035 1)
(s1036 1)
(s1037 1)
(s1038 1)
(s1039 1)
(s1040 1)
(s1041 1)
(s1042 1)
(s1043 1)
(s1044 1)
(s1045 1)
(s1046 1)
(s1047 1)
(s1048 1)
(s1049 1)
(s1050 1)
(s1051 1)
(s1052 1)
(s1053 1)
(s1054 1)
(s1055 1)
(s1056 1)
(s1057 1)
(s1058 1)
(s1059 1)
(s1060 1)
(s1061 1)
(s1062 1)
(s1063 1)
(s1064 1)
(s1065 1)
(s1066 1)
(s1067 1)
(s1068 1)
(s1069 1)
(s1070 1)
(s1071 1)
(s1072 1)
(s1073 1)
(s1074 1)
(s1075 1)
(s1076 1)
(s1077 1)
(s1078 1)
(s1079 1)
(s1080 1)
(s1081 1)
(s1082 1)
(s1083 1)
(s1084 1)
(s1085 1)
(s1086 1)
(s1087 1)
(s1088 1)
(s1089 1)
(s1090 1)
(s1091 1)
(s1092 1)
(s1093 1)
(s1094 1)
(s1095 1)
(s1096 1)
(s1097 1)
(s1098 1)
(s1099 1)
(s1100 1)
(s1101 1)
(s1102 1)
(s1103 1)
(s1104 1)
(s1105 1)
(s1106 1)
(s1107 1)
(s1108 1)
(s1109 1)
(s1110 1)
(s1111 1)
(s1112 1)
(s1113 1)
(s1114 1)
(s1115 1)
(s1116 1)
(s1117 1)
(s1118 1)
(s1119 1)
(s1120 1)
(s1121 1)
(s1122 1)
(s1123 1)
(s1124 1)
(s1125 1)
(s1126 1)
(s1127 1)
(s1128 1)
(s1129 1)
(s1130 1)
(s1131 1)
(s1132 1)
(s1133 1)
(s1134 1)
(s1135 1)
(s1136 1)
(s1137 1)
(s1138 1)
(s1139 1)
(s1140 1)
(s1141 1)
(s1142 1)
(s1143 1)
(s1144 1)
(s1145 1)
(s1146 1)
(s1147 1)
(s1148 1)
(s1149 1)
(s1150 1)
(s1151 1)
(s1152 1)
(s1153 1)
(s1154 1)
(s1155 1)
(s1156 1)
(s1157 1)
(s1158 1)
(s1159 1)
(s1160 1)
(s1161 1)
(s1162 1)
(s1163 1)
(s1164 1)
(s1165 1)
(s1166 1)
(s1167 1)
(s1168 1)
(s1169 1)
(s1170 1)
(s1171 1)
(s1172 1)
(s1173 1)
(s1174 1)
(s1175 1)
(s1176 1)
(s1177 1)
(s1178 1)
(s1179 1)
(s1180 1)
(s1181 1)
(s1182 1)
(s1183 1)
(s1184 1)
(s1185 1)
(s1186 1)
(s1187 1)
(s1188 1)
(s1189 1)
(s1190 1)
(s1191 1)
(s1192 1)
(s1193 1)
(s1194 1)
(s1195 1)
(s1196 1)
(s1197 1)
(s1198 1)
(s1199 1)
(s1200 1)
(s1201 1)
(s1202 1)
(s1203 1)
(s1204 1)
(s1205 1)
(s1206 1)
(s1207 1)
(s1208 1)
(s1209 1)
(s1210 1)
(s1211 1)
(s1212 1)
(s1213 1)
(s1214 1)
(s1215 1)
(s1216 1)
(s1217 1)
(s1218 1)
(s1219 1)
(s1220 1)
(s1221 1)
(s1222 1)
(s1223 1)
(s1224 1)
(s1225 1)
(s1226 1)
(s1227 1)
(s1228 1)
(s1229 1)
(s1230 1)
(s1231 1)
(s1232 1)
(s1233 1)
(s1234 1)
(s1235 1)
(s1236 1)
(s1237 1)
(s1238 1)
(s1239 1)
(s1240 1)
(s1241 1)
(s1242 1)
(s1243 1)
(s1244 1)
(s1245 1)
(s1246 1)
(s1247 1)
(s1248 1)
(s1249 1)
(s1250 1)
(s1251 1)
(s1252 1)
(s1253 1)
(s1254 1)
(s1255 1)
(s1256 1)
(s1257 1)
(s1258 1)
(s1259 1)
(s1260 1)
(s1261 1)
(s1262 1)
(s1263 1)
(s1264 1)
(s1265 1)
(s1266 1)
(s1267 1)
(s1268 1)
(s1269 1)
(s1270 1)
(s1271 1)
(s1272 1)
(s1273 1)
(s1274 1)
(s1275 1)
(s1276 1)
(s1277 1)
(s1278 1)
(s1279 1)
(s1280 1)
(s1281 1)
(s1282 1)
(s1283 1)
(s1284 1)
(s1285 1)
(s1286 1)
(s1287 1)
(s1288 1)
(s1289 1)
(s1290 1)
(s1291 1)
(s1292 1)
(s1293 1)
(s1294 1)
(s1295 1)
(s1296 1)
(s1297 1)
(s1298 1)
(s1299 1)
(s1300 1)
(s1301 1)
(s1302 1)
(s1303 1)
(s1304 1)
(s1305 1)
(s1306 1)
(s1307 1)
(s1308 1)
(s1309 1)
(s1310 1)
(s1311 1)
(s1312 1)
(s1313 1)
(s1314 1)
(s1315 1)
(s1316 1)
(s1317 1)
(s1318 1)
(s1319 1)
(s1320 1)
(s1321 1)
(s1322 1)
(s1323 1)
(s1324 1)
(s1325 1)
(s1326 1)
(s1327 1)
(s1328 1)
(s1329 1)
(s1330 1)
(s1331 1)
(s1332 1)
(s1333 1)
(s1334 1)
(s1335 1)
(s1336 1)
(s1337 1)
(s1338 1)
(s1339 1)
(s1340 1)
(s1341 1)
(s1342 1)
(s1343 1)
(s1344 1)
(s1345 1)
(s1346 1)
(s1347 1)
(s1348 1)
(s1349 1)
(s1350 1)
(s1351 1)
(s1352 1)
(s1353 1)
(s1354 1)
(s1355 1)
(s1356 1)
(s1357 1)
(s1358 1)
(s1359 1)
(s1360 1)
(s1361 1)
(s1362 1)
(s1363 1)
(s1364 1)
(s1365 1)
(s1366 1)
(s1367 1)
(s1368 1)
(s1369 1)
(s1370 1)
(s1371 1)
(s1372 1)
(s1373 1)
(s1374 1)
(s1375 1)
(s1376 1)
(s1377 1)
(s1378 1)
(s1379 1)
(s1380 1)
(s1381 1)
(s1382 1)
(s1383 1)
(s1384 1)
(s1385 1)
(s1386 1)
(s1387 1)
(s1388 1)
(s1389 1)
(s1390 1)
(s1391 1)
(s1392 1)
(s1393 1)
(s1394 1)
(s1395 1)
(s1396 1)
(s1397 1)
(s1398 1)
(s1399 1)
(s1400 1)
(s1401 1)
(s1402 1)
(s1403 1)
(s1404 1)
(s1405 1)
(s1406 1)
(s1407 1)
(s1408 1)
(s1409 1)
(s1410 1)
(s1411 1)
(s1412 1)
(s1413 1)
(s1414 1)
(s1415 1)
(s1416 1)
(s1417 1)
(s1418 1)
(s1419 1)
(s1420 1)
(s1421 1)
(s1422 1)
(s1423 1)
(s1424 1)
(s1425 1)
(s1426 1)
(s1427 1)
(s1428 1)
(s1429 1)
(s1430 1)
(s1431 1)
(s1432 1)
(s1433 1)
(s1434 1)
(s1435 1)
(s1436 1)
(s1437 1)
(s1438 1)
(s1439 1)
(s1440 1)
(s1441 1)
(s1442 1)
(s1443 1)
(s1444 1)
(s1445 1)
(s1446 1)
(s1447 1)
(s1448 1)
(s1449 1)
(s1450 1)
(s1451 1)
(s1452 1)
(s1453 1)
(s1454 1)
(s1455 1)
(s1456 1)
(s1457 1)
(s1458 1)
(s1459 1)
(s1460 1)
(s1461 1)
(s1462 1)
(s1463 1)
(s1464 1)
(s1465 1)
(s1466 1)
(s1467 1)
(s1468 1)
(s1469 1)
(s1470 1)
(s1471 1)
(s1472 1)
(s1473 1)
(s1474 1)
(s1475 1)
(s1476 1)
(s1477 1)
(s1478 1)
(s1479 1)
(s1480 1)
(s1481 1)
(s1482 1)
(s1483 1)
(s1484 1)
(s1485 1)
(s1486 1)
(s1487 1)
(s1488 1)
(s1489 1)
(s1490 1)
(s1491 1)
(s1492 1)
(s1493 1)
(s1494 1)
(s1495 1)
(s1496 1)
(s1497 1)
(s1498 1)
(s1499 1)
(s1500 1)
(s1501 1)
(s1502 1)
(s1503 1)
(s1504 1)
(s1505 1)
(s1506 1)
(s1507 1)
(s1508 1)
(s1509 1)
(s1510 1)
(s1511 1)
(s1512 1)
(s1513 1)
(s1514 1)
(s1515 1)
(s1516 1)
(s1517 1)
(s1518 1)
(s1519 1)
(s1520 1)
(s1521 1)
(s1522 1)
(s1523 1)
(s1524 1)
(s1525 1)
(s1526 1)
(s1527 1)
(s1528 1)
(s1529 1)
(s1530 1)
(s1531 1)
(s1532 1)
(s1533 1)
(s1534 1)
(s1535 1)
(s1536 1)
(s1537 1)
(s1538 1)
(s1539 1)
(s1540 1)
(s1541 1)
(s1542 1)
(s1543 1)
(s1544 1)
(s1545 1)
(s1546 1)
(s1547 1)
(s1548 1)
(s1549 1)
(s1550 1)
(s1551 1)
(s1552 1)
(s1553 1)
(s1554 1)
(s1555 1)
(s1556 1)
(s1557 1)
(s1558 1)
(s1559 1)
(s1560 1)
(s1561 1)
(s1562 1)
(s1563 1)
(s1564 1)
(s1565 1)
(s1566 1)
(s1567 1)
(s1568 1)
(s1569 1)
(s1570 1)
(s1571 1)
(s1572 1)
(s1573 1)
(s1574 1)
(s1575 1)
(s1576 1)
(s1577 1)
(s1578 1)
(s1579 1)
(s1580 1)
(s1581 1)
(s1582 1)
(s1583 1)
(s1584 1)
(s1585 1)
(s1586 1)
(s1587 1)
(s1588 1)
(s1589 1)
(s1590 1)
(s1591 1)
(s1592 1)
(s1593 1)
(s1594 1)
(s1595 1)
(s1596 1)
(s1597 1)
(s1598 1)
(s1599 1)
(s1600 1)
(s1601 1)
(s1602 1)
(s1603 1)
(s1604 1)
(s1605 1)
(s1606 1)
(s1607 1)
(s1608 1)
(s1609 1)
(s1610 1)
(s1611 1)
(s1612 1)
(s1613 1)
(s1614 1)
(s1615 1)
(s1616 1)
(s1617 1)
(s1618 1)
(s1619 1)
(s1620 1)
(s1621 1)
(s1622 1)
(s1623 1)
(s1624 1)
(s1625 1)
(s1626 1)
(s1627 1)
(s1628 1)
(s1629 1)
(s1630 1)
(s1631 1)
(s1632 1)
(s1633 1)
(s1634 1)
(s1635 1)
(s1636 1)
(s1637 1)
(s1638 1)
(s1639 1)
(s1640 1)
(s1641 1)
(s1642 1)
(s1643 1)
(s1644 1)
(s1645 1)
(s1646 1)
(s1647 1)
(s1648 1)
(s1649 1)
(s1650 1)
(s1651 1)
(s1652 1)
(s1653 1)
(s1654 1)
(s1655 1)
(s1656 1)
(s1657 1)
(s1658 1)
(s1659 1)
(s1660 1)
(s1661 1)
(s1662 1)
(s1663 1)
(s1664 1)
(s1665 1)
(s1666 1)
(s1667 1)
(s1668 1)
(s1669 1)
(s1670 1)
(s1671 1)
(s1672 1)
(s1673 1)
(s1674 1)
(s1675 1)
(s1676 1)
(s1677 1)
(s1678 1)
(s1679 1)
(s1680 1)
(s1681 1)
(s1682 1)
(s1683 1)
(s1684 1)
(s1685 1)
(s1686 1)
(s1687 1)
(s1688 1)
(s1689 1)
(s1690 1)
(s1691 1)
(s1692 1)
(s1693 1)
(s1694 1)
(s1695 1)
(s1696 1)
(s1697 1)
(s1698 1)
(s1699 1)
(s1700 1)
(s1701 1)
(s1702 1)
(s1703 1)
(s1704 1)
(s1705 1)
(s1706 1)
(s1707 1)
(s1708 1)
(s1709 1)
(s1710 1)
(s1711 1)
(s1712 1)
(s1713 1)
(s1714 1)
(s1715 1)
(s1716 1)
(s1717 1)
(s1718 1)
(s1719 1)
(s1720 1)
(s1721 1)
(s1722 1)
(s1723 1)
(s1724 1)
(s1725 1)
(s1726 1)
(s1727 1)
(s1728 1)
(s1729 1)
(s1730 1)
(s1731 1)
(s1732 1)
(s1733 1)
(s1734 1)
(s1735 1)
(s1736 1)
(s1737 1)
(s1738 1)
(s1739 1)
(s1740 1)
(s1741 1)
(s1742 1)
(s1743 1)
(s1744 1)
(s1745 1)
(s1746 1)
(s1747 1)
(s1748 1)
(s1749 1)
(s1750 1)
(s1751 1)
(s1752 1)
(s1753 1)
(s1754 1)
(s1755 1)
(s1756 1)
(s1757 1)
(s1758 1)
(s1759 1)
(s1760 1)
(s1761 1)
(s1762 1)
(s1763 1)
(s1764 1)
(s1765 1)
(s1766 1)
(s1767 1)
(s1768 1)
(s1769 1)
(s1770 1)
(s1771 1)
(s1772 1)
(s1773 1)
(s1774 1)
(s1775 1)
(s1776 1)
(s1777 1)
(s1778 1)
(s1779 1)
(s1780 1)
(s1781 1)
(s1782 1)
(s1783 1)
(s1784 1)
(s1785 1)
(s1786 1)
(s1787 1)
(s1788 1)
(s1789 1)
(s1790 1)
(s1791 1)
(s1792 1)
(s1793 1)
(s1794 1)
(s1795 1)
(s1796 1)
(s1797 1)
(s1798 1)
(s1799 1)
(s1800 1)
(s1801 1)
(s1802 1)
(s1803 1)
(s1804 1)
(s1805 1)
(s1806 1)
(s1807 1)
(s1808 1)
(s1809 1)
(s1810 1)
(s1811 1)
(s1812 1)
(s1813 1)
(s1814 1)
(s1815 1)
(s1816 1)
(s1817 1)
(s1818 1)
(s1819 1)
(s1820 1)
(s1821 1)
(s1822 1)
(s1823 1)
(s1824 1)
(s1825 1)
(s1826 1)
(s1827 1)
(s1828 1)
(s1829 1)
(s1830 1)
(s1831 1)
(s1832 1)
(s1833 1)
(s1834 1)
(s1835 1)
(s1836 1)
(s1837 1)
(s1838 1)
(s1839 1)
(s1840 1)
(s1841 1)
(s1842 1)
(s1843 1)
(s1844 1)
(s1845 1)
(s1846 1)
(s1847 1)
(s1848 1)
(s1849 1)
(s1850 1)
(s1851 1)
(s1852 1)
(s1853 1)
(s1854 1)
(s1855 1)
(s1856 1)
(s1857 1)
(s1858 1)
(s1859 1)
(s1860 1)
(s1861 1)
(s1862 1)
(s1863 1)
(s1864 1)
(s1865 1)
(s1866 1)
(s1867 1)
(s1868 1)
(s1869 1)
(s1870 1)
(s1871 1)
(s1872 1)
(s1873 1)
(s1874 1)
(s1875 1)
(s1876 1)
(s1877 1)
(s1878 1)
(s1879 1)
(s1880 1)
(s1881 1)
(s1882 1)
(s1883 1)
(s1884 1)
(s1885 1)
(s1886 1)
(s1887 1)
(s1888 1)
(s1889 1)
(s1890 1)
(s1891 1)
(s1892 1)
(s1893 1)
(s1894 1)
(s1895 1)
(s1896 1)
(s1897 1)
(s1898 1)
(s1899 1)
(s1900 1)
(s1901 1)
(s1902 1)
(s1903 1)
(s1904 1)
(s1905 1)
(s1906 1)
(s1907 1)
(s1908 1)
(s1909 1)
(s1910 1)
(s1911 1)
(s1912 1)
(s1913 1)
(s1914 1)
(s1915 1)
(s1916 1)
(s1917 1)
(s1918 1)
(s1919 1)
(s1920 1)
(s1921 1)
(s1922 1)
(s1923 1)
(s1924 1)
(s1925 1)
(s1926 1)
(s1927 1)
(s1928 1)
(s1929 1)
(s1930 1)
(s1931 1)
(s1932 1)
(s1933 1)
(s1934 1)
(s1935 1)
(s1936 1)
(s1937 1)
(s1938 1)
(s1939 1)
(s1940 1)
(s1941 1)
(s1942 1)
(s1943 1)
(s1944 1)
(s1945 1)
(s1946 1)
(s1947 1)
(s1948 1)
(s1949 1)
(s1950 1)
(s1951 1)
(s1952 1)
(s1953 1)
(s1954 1)
(s1955 1)
(s1956 1)
(s1957 1)
(s1958 1)
(s1959 1)
(s1960 1)
(s1961 1)
(s1962 1)
(s1963 1)
(s1964 1)
(s1965 1)
(s1966 1)
(s1967 1)
(s1968 1)
(s1969 1)
(s1970 1)
(s1971 1)
(s1972 1)
(s1973 1)
(s1974 1)
(s1975 1)
(s1976 1)
(s1977 1)
(s1978 1)
(s1979 1)
(s1980 1)
(s1981 1)
(s1982 1)
(s1983 1)
(s1984 1)
(s1985 1)
(s1986 1)
(s1987 1)
(s1988 1)
(s1989 1)
(s1990 1)
(s1991 1)
(s1992 1)
(s1993 1)
(s1994 1)
(s1995 1)
(s1996 1)
(s1997 1)
(s1998 1)
(s1999 1)
(s2000 1)
(s2001 1)
(s2002 1)
(s2003 1)
(s2004 1)
(s2005 1)
(s2006 1)
(s2007 1)
(s2008 1)
(s2009 1)
(s2010 1)
(s2011 1)
(s2012 1)
(s2013 1)
(s2014 1)
(s2015 1)
(s2016 1)
(s2017 1)
(s2018 1)
(s2019 1)
(s2020 1)
(s2021 1)
(s2022 1)
(s2023 1)
(s2024 1)
(s2025 1)
(s2026 1)
(s2027 1)
(s2028 1)
(s2029 1)
(s2030 1)
(s2031 1)
(s2032 1)
(s2033 1)
(s2034 1)
(s2035 1)
(s2036 1)
(s2037 1)
(s2038 1)
(s2039 1)
(s2040 1)
(s2041 1)
(s2042 1)
(s2043 1)
(s2044 1)
(s2045 1)
(s2046 1)
(s2047 1)
(s2048 1)
(s2049 1)
(s2050 1)
(s2051 1)
(s2052 1)
(s2053 1)
(s2054 1)
(s2055 1)
(s2056 1)
(s2057 1)
(s2058 1)
(s2059 1)
(s2060 1)
(s2061 1)
(s2062 1)
(s2063 1)
(s2064 1)
(s2065 1)
(s2066 1)
(s2067 1)
(s2068 1)
(s2069 1)
(s2070 1)
(s2071 1)
(s2072 1)
(s2073 1)
(s2074 1)
(s2075 1)
(s2076 1)
(s2077 1)
(s2078 1)
(s2079 1)
(s2080 1)
(s2081 1)
(s2082 1)
(s2083 1)
(s2084 1)
(s2085 1)
(s2086 1)
(s2087 1)
(s2088 1)
(s2089 1)
(s2090 1)
(s2091 1)
(s2092 1)
(s2093 1)
(s2094 1)
(s2095 1)
(s2096 1)
(s2097 1)
(s2098 1)
(s2099 1)
(s2100 1)
(s2101 1)
(s2102 1)
(s2103 1)
(s2104 1)
(s2105 1)
(s2106 1)
(s2107 1)
(s2108 1)
(s2109 1)
(s2110 1)
(s2111 1)
(s2112 1)
(s2113 1)
(s2114 1)
(s2115 1)
(s2116 1)
(s2117 1)
(s2118 1)
(s2119 1)
(s2120 1)
(s2121 1)
(s2122 1)
(s2123 1)
(s2124 1)
(s2125 1)
(s2126 1)
(s2127 1)
(s2128 1)
(s2129 1)
(s2130 1)
(s2131 1)
(s2132 1)
(s2133 1)
(s2134 1)
(s2135 1)
(s2136 1)
(s2137 1)
(s2138 1)
(s2139 1)
(s2140 1)
(s2141 1)
(s2142 1)
(s2143 1)
(s2144 1)
(s2145 1)
(s2146 1)
(s2147 1)
(s2148 1)
(s2149 1)
(s2150 1)
(s2151 1)
(s2152 1)
(s2153 1)
(s2154 1)
(s2155 1)
(s2156 1)
(s2157 1)
(s2158 1)
(s2159 1)
(s2160 1)
(s2161 1)
(s2162 1)
(s2163 1)
(s2164 1)
(s2165 1)
(s2166 1)
(s2167 1)
(s2168 1)
(s2169 1)
(s2170 1)
(s2171 1)
(s2172 1)
(s2173 1)
(s2174 1)
(s2175 1)
(s2176 1)
(s2177 1)
(s2178 1)
(s2179 1)
(s2180 1)
(s2181 1)
(s2182 1)
(s2183 1)
(s2184 1)
(s2185 1)
(s2186 1)
(s2187 1)
(s2188 1)
(s2189 1)
(s2190 1)
(s2191 1)
(s2192 1)
(s2193 1)
(s2194 1)
(s2195 1)
(s2196 1)
(s2197 1)
(s2198 1)
(s2199 1)
(s2200 1)
(s2201 1)
(s2202 1)
(s2203 1)
(s2204 1)
(s2205 1)
(s2206 1)
(s2207 1)
(s2208 1)
(s2209 1)
(s2210 1)
(s2211 1)
(s2212 1)
(s2213 1)
(s2214 1)
(s2215 1)
(s2216 1)
(s2217 1)
(s2218 1)
(s2219 1)
(s2220 1)
(s2221 1)
(s2222 1)
(s2223 1)
(s2224 1)
(s2225 1)
(s2226 1)
(s2227 1)
(s2228 1)
(s2229 1)
(s2230 1)
(s2231 1)
(s2232 1)
(s2233 1)
(s2234 1)
(s2235 1)
(s2236 1)
(s2237 1)
(s2238 1)
(s2239 1)
(s2240 1)
(s2241 1)
(s2242 1)
(s2243 1)
(s2244 1)
(s2245 1)
(s2246 1)
(s2247 1)
(s2248 1)
(s2249 1)
(s2250 1)
(s2251 1)
(s2252 1)
(s2253 1)
(s2254 1)
(s2255 1)
(s2256 1)
(s2257 1)
(s2258 1)
(s2259 1)
(s2260 1)
(s2261 1)
(s2262 1)
(s2263 1)
(s2264 1)
(s2265 1)
(s2266 1)
(s2267 1)
(s2268 1)
(s2269 1)
(s2270 1)
(s2271 1)
(s2272 1)
(s2273 1)
(s2274 1)
(s2275 1)
(s2276 1)
(s2277 1)
(s2278 1)
(s2279 1)
(s2280 1)
(s2281 1)
(s2282 1)
(s2283 1)
(s2284 1)
(s2285 1)
(s2286 1)
(s2287 1)
(s2288 1)
(s2289 1)
(s2290 1)
(s2291 1)
(s2292 1)
(s2293 1)
(s2294 1)
(s2295 1)
(s2296 1)
(s2297 1)
(s2298 1)
(s2299 1)
(s2300 1)
(s2301 1)
(s2302 1)
(s2303 1)
(s2304 1)
(s2305 1)
(s2306 1)
(s2307 1)
(s2308 1)
(s2309 1)
(s2310 1)
(s2311 1)
(s2312 1)
(s2313 1)
(s2314 1)
(s2315 1)
(s2316 1)
(s2317 1)
(s2318 1)
(s2319 1)
(s2320 1)
(s2321 1)
(s2322 1)
(s2323 1)
(s2324 1)
(s2325 1)
(s2326 1)
(s2327 1)
(s2328 1)
(s2329 1)
(s2330 1)
(s2331 1)
(s2332 1)
(s2333 1)
(s2334 1)
(s2335 1)
(s2336 1)
(s2337 1)
(s2338 1)
(s2339 1)
(s2340 1)
(s2341 1)
(s2342 1)
(s2343 1)
(s2344 1)
(s2345 1)
(s2346 1)
(s2347 1)
(s2348 1)
(s2349 1)
(s2350 1)
(s2351 1)
(s2352 1)
(s2353 1)
(s2354 1)
(s2355 1)
(s2356 1)
(s2357 1)
(s2358 1)
(s2359 1)
(s2360 1)
(s2361 1)
(s2362 1)
(s2363 1)
(s2364 1)
(s2365 1)
(s2366 1)
(s2367 1)
(s2368 1)
(s2369 1)
(s2370 1)
(s2371 1)
(s2372 1)
(s2373 1)
(s2374 1)
(s2375 1)
(s2376 1)
(s2377 1)
(s2378 1)
(s2379 1)
(s2380 1)
(s2381 1)
(s2382 1)
(s2383 1)
(s2384 1)
(s2385 1)
(s2386 1)
(s2387 1)
(s2388 1)
(s2389 1)
(s2390 1)
(s2391 1)
(s2392 1)
(s2393 1)
(s2394 1)
(s2395 1)
(s2396 1)
(s2397 1)
(s2398 1)
(s2399 1)
(s2400 1)
(s2401 1)
(s2402 1)
(s2403 1)
(s2404 1)
(s2405 1)
(s2406 1)
(s2407 1)
(s2408 1)
(s2409 1)
(s2410 1)
(s2411 1)
(s2412 1)
(s2413 1)
(s2414 1)
(s2415 1)
(s2416 1)
(s2417 1)
(s2418 1)
(s2419 1)
(s2420 1)
(s2421 1)
(s2422 1)
(s2423 1)
(s2424 1)
(s2425 1)
(s2426 1)
(s2427 1)
(s2428 1)
(s2429 1)
(s2430 1)
(s2431 1)
(s2432 1)
(s2433 1)
(s2434 1)
(s2435 1)
(s2436 1)
(s2437 1)
(s2438 1)
(s2439 1)
(s2440 1)
(s2441 1)
(s2442 1)
(s2443 1)
(s2444 1)
(s2445 1)
(s2446 1)
(s2447 1)
(s2448 1)
(s2449 1)
(s2450 1)
(s2451 1)
(s2452 1)
(s2453 1)
(s2454 1)
(s2455 1)
(s2456 1)
(s2457 1)
(s2458 1)
(s2459 1)
(s2460 1)
(s2461 1)
(s2462 1)
(s2463 1)
(s2464 1)
(s2465 1)
(s2466 1)
(s2467 1)
(s2468 1)
(s2469 1)
(s2470 1)
(s2471 1)
(s2472 1)
(s2473 1)
(s2474 1)
(s2475 1)
(s2476 1)
(s2477 1)
(s2478 1)
(s2479 1)
(s2480 1)
(s2481 1)
(s2482 1)
(s2483 1)
(s2484 1)
(s2485 1)
(s2486 1)
(s2487 1)
(s2488 1)
(s2489 1)
(s2490 1)
(s2491 1)
(s2492 1)
(s2493 1)
(s2494 1)
(s2495 1)
(s2496 1)
(s2497 1)
(s2498 1)
(s2499 1)
(s2500 1)
(s2501 1)
(s2502 1)
(s2503 1)
(s2504 1)
(s2505 1)
(s2506 1)
(s2507 1)
(s2508 1)
(s2509 1)
(s2510 1)
(s2511 1)
(s2512 1)
(s2513 1)
(s2514 1)
(s2515 1)
(s2516 1)
(s2517 1)
(s2518 1)
(s2519 1)
(s2520 1)
(s2521 1)
(s2522 1)
(s2523 1)
(s2524 1)
(s2525 1)
(s2526 1)
(s2527 1)
(s2528 1)
(s2529 1)
(s2530 1)
(s2531 1)
(s2532 1)
(s2533 1)
(s2534 1)
(s2535 1)
(s2536 1)
(s2537 1)
(s2538 1)
(s2539 1)
(s2540 1)
(s2541 1)
(s2542 1)
(s2543 1)
(s2544 1)
(s2545 1)
(s2546 1)
(s2547 1)
(s2548 1)
(s2549 1)
(s2550 1)
(s2551 1)
(s2552 1)
(s2553 1)
(s2554 1)
(s2555 1)
(s2556 1)
(s2557 1)
(s2558 1)
(s2559 1)
(s2560 1)
(s2561 1)
(s2562 1)
(s2563 1)
(s2564 1)
(s2565 1)
(s2566 1)
(s2567 1)
(s2568 1)
(s2569 1)
(s2570 1)
(s2571 1)
(s2572 1)
(s2573 1)
(s2574 1)
(s2575 1)
(s2576 1)
(s2577 1)
(s2578 1)
(s2579 1)
(s2580 1)
(s2581 1)
(s2582 1)
(s2583 1)
(s2584 1)
(s2585 1)
(s2586 1)
(s2587 1)
(s2588 1)
(s2589 1)
(s2590 1)
(s2591 1)
(s2592 1)
(s2593 1)
(s2594 1)
(s2595 1)
(s2596 1)
(s2597 1)
(s2598 1)
(s2599 1)
(s2600 1)
(s2601 1)
(s2602 1)
(s2603 1)
(s2604 1)
(s2605 1)
(s2606 1)
(s2607 1)
(s2608 1)
(s2609 1)
(s2610 1)
(s2611 1)
(s2612 1)
(s2613 1)
(s2614 1)
(s2615 1)
(s2616 1)
(s2617 1)
(s2618 1)
(s2619 1)
(s2620 1)
(s2621 1)
(s2622 1)
(s2623 1)
(s2624 1)
(s2625 1)
(s2626 1)
(s2627 1)
(s2628 1)
(s2629 1)
(s2630 1)
(s2631 1)
(s2632 1)
(s2633 1)
(s2634 1)
(s2635 1)
(s2636 1)
(s2637 1)
(s2638 1)
(s2639 1)
(s2640 1)
(s2641 1)
(s2642 1)
(s2643 1)
(s2644 1)
(s2645 1)
(s2646 1)
(s2647 1)
(s2648 1)
(s2649 1)
(s2650 1)
(s2651 1)
(s2652 1)
(s2653 1)
(s2654 1)
(s2655 1)
(s2656 1)
(s2657 1)
(s2658 1)
(s2659 1)
(s2660 1)
(s2661 1)
(s2662 1)
(s2663 1)
(s2664 1)
(s2665 1)
(s2666 1)
(s2667 1)
(s2668 1)
(s2669 1)
(s2670 1)
(s2671 1)
(s2672 1)
(s2673 1)
(s2674 1)
(s2675 1)
(s2676 1)
(s2677 1)
(s2678 1)
(s2679 1)
(s2680 1)
(s2681 1)
(s2682 1)
(s2683 1)
(s2684 1)
(s2685 1)
(s2686 1)
(s2687 1)
(s2688 1)
(s2689 1)
(s2690 1)
(s2691 1)
(s2692 1)
(s2693 1)
(s2694 1)
(s2695 1)
(s2696 1)
(s2697 1)
(s2698 1)
(s2699 1)
(s2700 1)
(s2701 1)
(s2702 1)
(s2703 1)
(s2704 1)
(s2705 1)
(s2706 1)
(s2707 1)
(s2708 1)
(s2709 1)
(s2710 1)
(s2711 1)
(s2712 1)
(s2713 1)
(s2714 1)
(s2715 1)
(s2716 1)
(s2717 1)
(s2718 1)
(s2719 1)
(s2720 1)
(s2721 1)
(s2722 1)
(s2723 1)
(s2724 1)
(s2725 1)
(s2726 1)
(s2727 1)
(s2728 1)
(s2729 1)
(s2730 1)
(s2731 1)
(s2732 1)
(s2733 1)
(s2734 1)
(s2735 1)
(s2736 1)
(s2737 1)
(s2738 1)
(s2739 1)
(s2740 1)
(s2741 1)
(s2742 1)
(s2743 1)
(s2744 1)
(s2745 1)
(s2746 1)
(s2747 1)
(s2748 1)
(s2749 1)
(s2750 1)
(s2751 1)
(s2752 1)
(s2753 1)
(s2754 1)
(s2755 1)
(s2756 1)
(s2757 1)
(s2758 1)
(s2759 1)
(s2760 1)
(s2761 1)
(s2762 1)
(s2763 1)
(s2764 1)
(s2765 1)
(s2766 1)
(s2767 1)
(s2768 1)
(s2769 1)
(s2770 1)
(s2771 1)
(s2772 1)
(s2773 1)
(s2774 1)
(s2775 1)
(s2776 1)
(s2777 1)
(s2778 1)
(s2779 1)
(s2780 1)
(s2781 1)
(s2782 1)
(s2783 1)
(s2784 1)
(s2785 1)
(s2786 1)
(s2787 1)
(s2788 1)
(s2789 1)
(s2790 1)
(s2791 1)
(s2792 1)
(s2793 1)
(s2794 1)
(s2795 1)
(s2796 1)
(s2797 1)
(s2798 1)
(s2799 1)
(s2800 1)
(s2801 1)
(s2802 1)
(s2803 1)
(s2804 1)
(s2805 1)
(s2806 1)
(s2807 1)
(s2808 1)
(s2809 1)
(s2810 1)
(s2811 1)
(s2812 1)
(s2813 1)
(s2814 1)
(s2815 1)
(s2816 1)
(s2817 1)
(s2818 1)
(s2819 1)
(s2820 1)
(s2821 1)
(s2822 1)
(s2823 1)
(s2824 1)
(s2825 1)
(s2826 1)
(s2827 1)
(s2828 1)
(s2829 1)
(s2830 1)
(s2831 1)
(s2832 1)
(s2833 1)
(s2834 1)
(s2835 1)
(s2836 1)
(s2837 1)
(s2838 1)
(s2839 1)
(s2840 1)
(s2841 1)
(s2842 1)
(s2843 1)
(s2844 1)
(s2845 1)
(s2846 1)
(s2847 1)
(s2848 1)
(s2849 1)
(s2850 1)
(s2851 1)
(s2852 1)
(s2853 1)
(s2854 1)
(s2855 1)
(s2856 1)
(s2857 1)
(s2858 1)
(s2859 1)
(s2860 1)
(s2861 1)
(s2862 1)
(s2863 1)
(s2864 1)
(s2865 1)
(s2866 1)
(s2867 1)
(s2868 1)
(s2869 1)
(s2870 1)
(s2871 1)
(s2872 1)
(s2873 1)
(s2874 1)
(s2875 1)
(s2876 1)
(s2877 1)
(s2878 1)
(s2879 1)
(s2880 1)
(s2881 1)
(s2882 1)
(s2883 1)
(s2884 1)
(s2885 1)
(s2886 1)
(s2887 1)
(s2888 1)
(s2889 1)
(s2890 1)
(s2891 1)
(s2892 1)
(s2893 1)
(s2894 1)
(s2895 1)
(s2896 1)
(s2897 1)
(s2898 1)
(s2899 1)
(s2900 1)
(s2901 1)
(s2902 1)
(s2903 1)
(s2904 1)
(s2905 1)
(s2906 1)
(s2907 1)
(s2908 1)
(s2909 1)
(s2910 1)
(s2911 1)
(s2912 1)
(s2913 1)
(s2914 1)
(s2915 1)
(s2916 1)
(s2917 1)
(s2918 1)
(s2919 1)
(s2920 1)
(s2921 1)
(s2922 1)
(s2923 1)
(s2924 1)
(s2925 1)
(s2926 1)
(s2927 1)
(s2928 1)
(s2929 1)
(s2930 1)
(s2931 1)
(s2932 1)
(s2933 1)
(s2934 1)
(s2935 1)
(s2936 1)
(s2937 1)
(s2938 1)
(s2939 1)
(s2940 1)
(s2941 1)
(s2942 1)
(s2943 1)
(s2944 1)
(s2945 1)
(s2946 1)
(s2947 1)
(s2948 1)
(s2949 1)
(s2950 1)
(s2951 1)
(s2952 1)
(s2953 1)
(s2954 1)
(s2955 1)
(s2956 1)
(s2957 1)
(s2958 1)
(s2959 1)
(s2960 1)
(s2961 1)
(s2962 1)
(s2963 1)
(s2964 1)
(s2965 1)
(s2966 1)
(s2967 1)
(s2968 1)
(s2969 1)
(s2970 1)
(s2971 1)
(s2972 1)
(s2973 1)
(s2974 1)
(s2975 1)
(s2976 1)
(s2977 1)
(s2978 1)
(s2979 1)
(s2980 1)
(s2981 1)
(s2982 1)
(s2983 1)
(s2984 1)
(s2985 1)
(s2986 1)
(s2987 1)
(s2988 1)
(s2989 1)
(s2990 1)
(s2991 1)
(s2992 1)
(s2993 1)
(s2994 1)
(s2995 1)
(s2996 1)
(s2997 1)
(s2998 1)
(s2999 1)
(s3000 1)
(s3001 1)
(s3002 1)
(s3003 1)
(s3004 1)
(s3005 1)
(s3006 1)
(s3007 1)
(s3008 1)
(s3009 1)
(s3010 1)
(s3011 1)
(s3012 1)
(s3013 1)
(s3014 1)
(s3015 1)
(s3016 1)
(s3017 1)
(s3018 1)
(s3019 1)
(s3020 1)
(s3021 1)
(s3022 1)
(s3023 1)
(s3024 1)
(s3025 1)
(s3026 1)
(s3027 1)
(s3028 1)
(s3029 1)
(s3030 1)
(s3031 1)
(s3032 1)
(s3033 1)
(s3034 1)
(s3035 1)
(s3036 1)
(s3037 1)
(s3038 1)
(s3039 1)
(s3040 1)
(s3041 1)
(s3042 1)
(s3043 1)
(s3044 1)
(s3045 1)
(s3046 1)
(s3047 1)
(s3048 1)
(s3049 1)
(s3050 1)
(s3051 1)
(s3052 1)
(s3053 1)
(s3054 1)
(s3055 1)
(s3056 1)
(s3057 1)
(s3058 1)
(s3059 1)
(s3060 1)
(s3061 1)
(s3062 1)
(s3063 1)
(s3064 1)
(s3065 1)
(s3066 1)
(s3067 1)
(s3068 1)
(s3069 1)
(s3070 1)
(s3071 1)
(s3072 1)
(s3073 1)
(s3074 1)
(s3075 1)
(s3076 1)
(s3077 1)
(s3078 1)
(s3079 1)
(s3080 1timeout
) org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30060 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 0/3210 constraints, Known Traps: 0/0 constraints]
After SMT, in 75208ms problems are : Problem set: 0 solved, 3210 unsolved
Search for dead transitions found 0 dead transitions in 75244ms
Finished structural reductions in SI_LTL mode , in 1 iterations and 265522 ms. Remains : 3462/3462 places, 3220/3220 transitions.
Computed a total of 3462 stabilizing places and 3220 stable transitions
Complete graph has no SCC; deadlocks are unavoidable. place count 3462 transition count 3220
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge (and all enablings converge to false).
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge : F ( (Ga|G!a) & (Gb|G!b)...)
Knowledge obtained : [p0, (X p0), (F (OR (G p0) (G (NOT p0))))]
False Knowledge obtained : [(X (X (NOT p0))), (X (X p0))]
Knowledge based reduction with 3 factoid took 177 ms. Reduced automaton from 2 states, 3 edges and 1 AP (stutter insensitive) to 2 states, 3 edges and 1 AP (stutter insensitive).
Stuttering acceptance computed with spot in 71 ms :[(NOT p0), (NOT p0)]
RANDOM walk for 357 steps (0 resets) in 25 ms. (13 steps per ms) remains 0/1 properties
Knowledge obtained : [p0, (X p0), (F (OR (G p0) (G (NOT p0))))]
False Knowledge obtained : [(X (X (NOT p0))), (X (X p0)), (F (NOT p0))]
Knowledge based reduction with 3 factoid took 160 ms. Reduced automaton from 2 states, 3 edges and 1 AP (stutter insensitive) to 2 states, 3 edges and 1 AP (stutter insensitive).
Stuttering acceptance computed with spot in 76 ms :[(NOT p0), (NOT p0)]
Stuttering acceptance computed with spot in 76 ms :[(NOT p0), (NOT p0)]
Stuttering acceptance computed with spot in 178 ms :[(NOT p0), (NOT p0)]
Product exploration explored 100000 steps with 248 reset in 4597 ms.
Product exploration explored 100000 steps with 253 reset in 5125 ms.
Support contains 1 out of 3462 places. Attempting structural reductions.
Starting structural reductions in SI_LTL mode, iteration 0 : 3462/3462 places, 3220/3220 transitions.
Applied a total of 0 rules in 269 ms. Remains 3462 /3462 variables (removed 0) and now considering 3220/3220 (removed 0) transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:52:18] [INFO ] Invariants computation overflowed in 11528 ms
[2024-06-01 04:52:24] [INFO ] Implicit Places using invariants in 17553 ms returned []
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:52:35] [INFO ] Invariants computation overflowed in 11249 ms
[2024-06-01 04:54:28] [INFO ] Performed 1/3462 implicitness test of which 0 returned IMPLICIT in 32 seconds.
[2024-06-01 04:55:01] [INFO ] Performed 3/3462 implicitness test of which 0 returned IMPLICIT in 64 seconds.
[2024-06-01 04:55:15] [INFO ] Implicit Places with SMT raised an exceptionSMT solver raised an error when submitting script. Raised (error "Failed to assert expression: java.io.IOException: Broken pipe ... after 171295 ms
Implicit Place search using SMT with State Equation took 188850 ms to find 0 implicit places.
[2024-06-01 04:55:15] [INFO ] Redundant transitions in 129 ms returned []
Running 3210 sub problems to find dead transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:55:27] [INFO ] Invariants computation overflowed in 11238 ms
Error getting values : (error "Error writing to Z3 solver: java.io.IOException: Broken pipe")
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30076 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 3210/3210 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3210 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30083 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 0/3210 constraints, Known Traps: 0/0 constraints]
After SMT, in 75219ms problems are : Problem set: 0 solved, 3210 unsolved
Search for dead transitions found 0 dead transitions in 75257ms
Finished structural reductions in SI_LTL mode , in 1 iterations and 264522 ms. Remains : 3462/3462 places, 3220/3220 transitions.
Treatment of property Echo-PT-d05r03-LTLCardinality-01 finished in 823828 ms.
Running Spot : '/home/mcc/BenchKit/itstools/itstools/plugins/fr.lip6.ltl.spot.binaries_1.0.0.202405141337/bin/ltl2tgba-linux64' '--check=stutter' '--hoaf=tv' '-f' '!((G(p0)||G(p1)))'
Support contains 2 out of 3475 places. Attempting structural reductions.
Starting structural reductions in SI_LTL mode, iteration 0 : 3475/3475 places, 3222/3222 transitions.
Graph (complete) has 15825 edges and 3475 vertex of which 3463 are kept as prefixes of interest. Removing 12 places using SCC suffix rule.11 ms
Discarding 12 places :
Also discarding 1 output transitions
Drop transitions (Output transitions of discarded places.) removed 1 transitions
Reduce places removed 1 places and 1 transitions.
Applied a total of 1 rules in 295 ms. Remains 3462 /3475 variables (removed 13) and now considering 3220/3222 (removed 2) transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:56:43] [INFO ] Invariants computation overflowed in 11568 ms
[2024-06-01 04:56:49] [INFO ] Implicit Places using invariants in 17408 ms returned []
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:57:00] [INFO ] Invariants computation overflowed in 11267 ms
[2024-06-01 04:58:52] [INFO ] Performed 1/3462 implicitness test of which 0 returned IMPLICIT in 32 seconds.
[2024-06-01 04:59:24] [INFO ] Performed 3/3462 implicitness test of which 0 returned IMPLICIT in 64 seconds.
[2024-06-01 04:59:40] [INFO ] Implicit Places using invariants and state equation in 171308 ms returned []
Implicit Place search using SMT with State Equation took 188718 ms to find 0 implicit places.
[2024-06-01 04:59:41] [INFO ] Redundant transitions in 126 ms returned []
Running 3210 sub problems to find dead transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 04:59:52] [INFO ] Invariants computation overflowed in 11665 ms
Error getting values : (error "ParserException while parsing response: (timeout
org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30071 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 3210/3210 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3210 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Error getting values : (error "ParserException while parsing response: (timeout
org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30073 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 0/3210 constraints, Known Traps: 0/0 constraints]
After SMT, in 76128ms problems are : Problem set: 0 solved, 3210 unsolved
Search for dead transitions found 0 dead transitions in 76165ms
Starting structural reductions in SI_LTL mode, iteration 1 : 3462/3475 places, 3220/3222 transitions.
Finished structural reductions in SI_LTL mode , in 1 iterations and 265319 ms. Remains : 3462/3475 places, 3220/3222 transitions.
Stuttering acceptance computed with spot in 172 ms :[true, (NOT p1), (AND (NOT p1) (NOT p0)), (NOT p0)]
Running random walk in product with property : Echo-PT-d05r03-LTLCardinality-06
Entered a terminal (fully accepting) state of product in 2444 steps with 5 reset in 177 ms.
FORMULA Echo-PT-d05r03-LTLCardinality-06 FALSE TECHNIQUES STUTTER_TEST
Treatment of property Echo-PT-d05r03-LTLCardinality-06 finished in 265702 ms.
Running Spot : '/home/mcc/BenchKit/itstools/itstools/plugins/fr.lip6.ltl.spot.binaries_1.0.0.202405141337/bin/ltl2tgba-linux64' '--check=stutter' '--hoaf=tv' '-f' '!(X((G(F(p0))&&F(p1))))'
Support contains 2 out of 3475 places. Attempting structural reductions.
Starting structural reductions in LTL mode, iteration 0 : 3475/3475 places, 3222/3222 transitions.
Reduce places removed 1 places and 0 transitions.
Iterating post reduction 0 with 1 rules applied. Total rules applied 1 place count 3474 transition count 3222
Applied a total of 1 rules in 278 ms. Remains 3474 /3475 variables (removed 1) and now considering 3222/3222 (removed 0) transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:01:09] [INFO ] Invariants computation overflowed in 11592 ms
[2024-06-01 05:01:14] [INFO ] Implicit Places using invariants in 16876 ms returned []
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:01:26] [INFO ] Invariants computation overflowed in 11496 ms
[2024-06-01 05:04:06] [INFO ] Performed 0/3474 implicitness test of which 0 returned IMPLICIT in 118 seconds.
[2024-06-01 05:04:06] [INFO ] Implicit Places using invariants and state equation in 171533 ms returned []
Implicit Place search using SMT with State Equation took 188411 ms to find 0 implicit places.
Running 3221 sub problems to find dead transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:04:17] [INFO ] Invariants computation overflowed in 11260 ms
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30079 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 3221/3221 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3221 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Error getting values : (error "ParserException while parsing response: ((s0 1)
(s1 1)
(s2 1)
(s3 1)
(s4 1)
(s5 1)
(s6 1)
(s7 1)
(s8 1)
(s9 1)
(s10 1)
(s11 1)
(s12 1)
(s13 1)
(s14 1)
(s15 1)
(s16 1)
(s17 1)
(s18 1)
(s19 1)
(s20 1)
(s21 1)
(s22 1)
(s23 1)
(s24 1)
(s25 1)
(s26 1)
(s27 1)
(s28 1)
(s29 1)
(s30 1)
(s31 1)
(s32 1)
(s33 1)
(s34 1)
(s35 1)
(s36 1)
(s37 1)
(s38 1)
(s39 1)
(s40 1)
(s41 1)
(s42 1)
(s43 1)
(s44 1)
(s45 1)
(s46 1)
(s47 1)
(s48 1)
(s49 1)
(s50 1)
(s51 1)
(s52 1)
(s53 1)
(s54 1)
(s55 1)
(s56 1)
(s57 1)
(s58 1)
(s59 1)
(s60 1)
(s61 1)
(s62 1)
(s63 1)
(s64 1)
(s65 1)
(s66 1)
(s67 1)
(s68 1)
(s69 1)
(s70 1)
(s71 1)
(s72 1)
(s73 1)
(s74 1)
(s75 1)
(s76 1)
(s77 1)
(s78 1)
(s79 1)
(s80 1)
(s81 1)
(s82 1)
(s83 1)
(s84 1)
(s85 1)
(s86 1)
(s87 1)
(s88 1)
(s89 1)
(s90 1)
(s91 1)
(s92 1)
(s93 1)
(s94 1)
(s95 1)
(s96 1)
(s97 1)
(s98 1)
(s99 1)
(s100 1)
(s101 1)
(s102 1)
(s103 1)
(s104 1)
(s105 1)
(s106 1)
(s107 1)
(s108 1)
(s109 1)
(s110 1)
(s111 1)
(s112 1)
(s113 1)
(s114 1)
(s115 1)
(s116 1)
(s117 1)
(s118 1)
(s119 1)
(s120 1)
(s121 1)
(s122 1)
(s123 1)
(s124 1)
(s125 1)
(s126 1)
(s127 1)
(s128 1)
(s129 1)
(s130 1)
(s131 1)
(s132 1)
(s133 1)
(s134 1)
(s135 1)
(s136 1)
(s137 1)
(s138 1)
(s139 1)
(s140 1)
(s141 1)
(s142 1)
(s143 1)
(s144 1)
(s145 1)
(s146 1)
(s147 1)
(s148 1)
(s149 1)
(s150 1)
(s151 1)
(s152 1)
(s153 1)
(s154 1)
(s155 1)
(s156 1)
(s157 1)
(s158 1)
(s159 1)
(s160 1)
(s161 1)
(s162 1)
(s163 1)
(s164 1)
(s165 1)
(s166 1)
(s167 1)
(s168 1)
(s169 1)
(s170 1)
(s171 1)
(s172 1)
(s173 1)
(s174 1)
(s175 1)
(s176 1)
(s177 1)
(s178 1)
(s179 1)
(s180 1)
(s181 1)
(s182 1)
(s183 1)
(s184 1)
(s185 1)
(s186 1)
(s187 1)
(s188 1)
(s189 1)
(s190 1)
(s191 1)
(s192 1)
(s193 1)
(s194 1)
(s195 1)
(s196 1)
(s197 1)
(s198 1)
(s199 1)
(s200 1)
(s201 1)
(s202 1)
(s203 1)
(s204 1)
(s205 1)
(s206 1)
(s207 1)
(s208 1)
(s209 1)
(s210 1)
(s211 1)
(s212 1)
(s213 1)
(s214 1)
(s215 1)
(s216 1)
(s217 1)
(s218 1)
(s219 1)
(s220 1)
(s221 1)
(s222 1)
(s223 1)
(s224 1)
(s225 1)
(s226 1)
(s227 1)
(s228 1)
(s229 1)
(s230 1)
(s231 1)
(s232 1)
(s233 1)
(s234 1)
(s235 1)
(s236 1)
(s237 1)
(s238 1)
(s239 1)
(s240 1)
(s241 1)
(s242 1)
(s243 1)
(s244 1)
(s245 1)
(s246 1)
(s247 1)
(s248 1)
(s249 1)
(s250 1)
(s251 1)
(s252 1)
(s253 1)
(s254 1)
(s255 1)
(s256 1)
(s257 1)
(s258 1)
(s259 1)
(s260 1)
(s261 1)
(s262 1)
(s263 1)
(s264 1)
(s265 1)
(s266 1)
(s267 1)
(s268 1)
(s269 1)
(s270 1)
(s271 1)
(s272 1)
(s273 1)
(s274 1)
(s275 1)
(s276 1)
(s277 1)
(s278 1)
(s279 1)
(s280 1)
(s281 1)
(s282 1)
(s283 1)
(s284 1)
(s285 1)
(s286 1)
(s287 1)
(s288 1)
(s289 1)
(s290 1)
(s291 1)
(s292 1)
(s293 1)
(s294 1)
(s295 1)
(s296 1)
(s297 1)
(s298 1)
(s299 1)
(s300 1)
(s301 1)
(s302 1)
(s303 1)
(s304 1)
(s305 1)
(s306 1)
(s307 1)
(s308 1)
(s309 1)
(s310 1)
(s311 1)
(s312 1)
(s313 1)
(s314 1)
(s315 1)
(s316 1)
(s317 1)
(s318 1)
(s319 1)
(s320 1)
(s321 1)
(s322 1)
(s323 1)
(s324 1)
(s325 1)
(s326 1)
(s327 1)
(s328 1)
(s329 1)
(s330 1)
(s331 1)
(s332 1)
(s333 1)
(s334 1)
(s335 1)
(s336 1)
(s337 1)
(s338 1)
(s339 1)
(s340 1)
(s341 1)
(s342 1)
(s343 1)
(s344 1)
(s345 1)
(s346 1)
(s347 1)
(s348 1)
(s349 1)
(s350 1)
(s351 1)
(s352 1)
(s353 1)
(s354 1)
(s355 1)
(s356 1)
(s357 1)
(s358 1)
(s359 1)
(s360 1)
(s361 1)
(s362 1)
(s363 1)
(s364 1)
(s365 1)
(s366 1)
(s367 1)
(s368 1)
(s369 1)
(s370 1)
(s371 1)
(s372 1)
(s373 1)
(s374 1)
(s375 1)
(s376 1)
(s377 1)
(s378 1)
(s379 1)
(s380 1)
(s381 1)
(s382 1)
(s383 1)
(s384 1)
(s385 1)
(s386 1)
(s387 1)
(s388 1)
(s389 1)
(s390 1)
(s391 1)
(s392 1)
(s393 1)
(s394 1)
(s395 1)
(s396 1)
(s397 1)
(s398 1)
(s399 1)
(s400 1)
(s401 1)
(s402 1)
(s403 1)
(s404 1)
(s405 1)
(s406 1)
(s407 1)
(s408 1)
(s409 1)
(s410 1)
(s411 1)
(s412 1)
(s413 1)
(s414 1)
(s415 1)
(s416 1)
(s417 1)
(s418 1)
(s419 1)
(s420 1)
(s421 1)
(s422 1)
(s423 1)
(s424 1)
(s425 1)
(s426 1)
(s427 1)
(s428 1)
(s429 1)
(s430 1)
(s431 1)
(s432 1)
(s433 1)
(s434 1)
(s435 1)
(s436 1)
(s437 1)
(s438 1)
(s439 1)
(s440 1)
(s441 1)
(s442 1)
(s443 1)
(s444 1)
(s445 1)
(s446 1)
(s447 1)
(s448 1)
(s449 1)
(s450 timeout
1 org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30077 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 0/3221 constraints, Known Traps: 0/0 constraints]
After SMT, in 75555ms problems are : Problem set: 0 solved, 3221 unsolved
Search for dead transitions found 0 dead transitions in 75592ms
Starting structural reductions in LTL mode, iteration 1 : 3474/3475 places, 3222/3222 transitions.
Finished structural reductions in LTL mode , in 1 iterations and 264298 ms. Remains : 3474/3475 places, 3222/3222 transitions.
Stuttering acceptance computed with spot in 312 ms :[(OR (NOT p0) (NOT p1)), (OR (NOT p0) (NOT p1)), (NOT p0), (NOT p0), (NOT p1)]
Running random walk in product with property : Echo-PT-d05r03-LTLCardinality-07
Product exploration explored 100000 steps with 542 reset in 5569 ms.
Product exploration explored 100000 steps with 574 reset in 5828 ms.
Computed a total of 3474 stabilizing places and 3222 stable transitions
Complete graph has no SCC; deadlocks are unavoidable. place count 3474 transition count 3222
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge (and all enablings converge to false).
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge : F ( (Ga|G!a) & (Gb|G!b)...)
Knowledge obtained : [(AND (NOT p0) p1), (X p1), (X (NOT p0)), (X (X p1)), (X (X (NOT p0))), (F (OR (G p0) (G (NOT p0)))), (F (OR (G p1) (G (NOT p1))))]
False Knowledge obtained : []
Knowledge sufficient to adopt a stutter insensitive property.
Knowledge based reduction with 7 factoid took 163 ms. Reduced automaton from 5 states, 8 edges and 2 AP (stutter sensitive) to 2 states, 3 edges and 1 AP (stutter insensitive).
Stuttering acceptance computed with spot in 74 ms :[(NOT p0), (NOT p0)]
RANDOM walk for 531 steps (0 resets) in 53 ms. (9 steps per ms) remains 0/1 properties
Knowledge obtained : [(AND (NOT p0) p1), (X p1), (X (NOT p0)), (X (X p1)), (X (X (NOT p0))), (F (OR (G p0) (G (NOT p0)))), (F (OR (G p1) (G (NOT p1))))]
False Knowledge obtained : [(F p0)]
Knowledge based reduction with 7 factoid took 312 ms. Reduced automaton from 2 states, 3 edges and 1 AP (stutter insensitive) to 2 states, 3 edges and 1 AP (stutter insensitive).
Stuttering acceptance computed with spot in 98 ms :[(NOT p0), (NOT p0)]
Stuttering acceptance computed with spot in 97 ms :[(NOT p0), (NOT p0)]
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:05:49] [INFO ] Invariants computation overflowed in 12324 ms
[2024-06-01 05:06:04] [INFO ] [Real]Absence check using state equation in 3498 ms returned unknown
Could not prove EG (NOT p0)
Support contains 1 out of 3474 places. Attempting structural reductions.
Property had overlarge support with respect to TGBA, discarding it for now.
Starting structural reductions in SI_LTL mode, iteration 0 : 3474/3474 places, 3222/3222 transitions.
Graph (complete) has 15811 edges and 3474 vertex of which 3463 are kept as prefixes of interest. Removing 11 places using SCC suffix rule.8 ms
Discarding 11 places :
Also discarding 1 output transitions
Drop transitions (Output transitions of discarded places.) removed 1 transitions
Reduce places removed 1 places and 1 transitions.
Applied a total of 1 rules in 215 ms. Remains 3462 /3474 variables (removed 12) and now considering 3220/3222 (removed 2) transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 05:06:16] [INFO ] Invariants computation overflowed in 11478 ms
[2024-06-01 05:06:22] [INFO ] Implicit Places using invariants in 17468 ms returned []
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 05:06:33] [INFO ] Invariants computation overflowed in 11617 ms
[2024-06-01 05:08:25] [INFO ] Performed 1/3462 implicitness test of which 0 returned IMPLICIT in 32 seconds.
[2024-06-01 05:08:57] [INFO ] Performed 3/3462 implicitness test of which 0 returned IMPLICIT in 64 seconds.
[2024-06-01 05:09:14] [INFO ] Implicit Places using invariants and state equation in 171660 ms returned []
Implicit Place search using SMT with State Equation took 189131 ms to find 0 implicit places.
[2024-06-01 05:09:14] [INFO ] Redundant transitions in 127 ms returned []
Running 3210 sub problems to find dead transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 05:09:25] [INFO ] Invariants computation overflowed in 11692 ms
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30076 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 3210/3210 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3210 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Error getting values : (error "Error writing to Z3 solver: java.io.IOException: Broken pipe")
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30076 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 0/3210 constraints, Known Traps: 0/0 constraints]
After SMT, in 76108ms problems are : Problem set: 0 solved, 3210 unsolved
Search for dead transitions found 0 dead transitions in 76175ms
Starting structural reductions in SI_LTL mode, iteration 1 : 3462/3474 places, 3220/3222 transitions.
Finished structural reductions in SI_LTL mode , in 1 iterations and 265667 ms. Remains : 3462/3474 places, 3220/3222 transitions.
Computed a total of 3462 stabilizing places and 3220 stable transitions
Complete graph has no SCC; deadlocks are unavoidable. place count 3462 transition count 3220
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge (and all enablings converge to false).
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge : F ( (Ga|G!a) & (Gb|G!b)...)
Knowledge obtained : [(NOT p0), (X (NOT p0)), (X (X (NOT p0))), (F (OR (G p0) (G (NOT p0))))]
False Knowledge obtained : []
Knowledge based reduction with 4 factoid took 108 ms. Reduced automaton from 2 states, 3 edges and 1 AP (stutter insensitive) to 2 states, 3 edges and 1 AP (stutter insensitive).
Stuttering acceptance computed with spot in 105 ms :[(NOT p0), (NOT p0)]
RANDOM walk for 481 steps (0 resets) in 48 ms. (9 steps per ms) remains 0/1 properties
Knowledge obtained : [(NOT p0), (X (NOT p0)), (X (X (NOT p0))), (F (OR (G p0) (G (NOT p0))))]
False Knowledge obtained : [(F p0)]
Knowledge based reduction with 4 factoid took 169 ms. Reduced automaton from 2 states, 3 edges and 1 AP (stutter insensitive) to 2 states, 3 edges and 1 AP (stutter insensitive).
Stuttering acceptance computed with spot in 101 ms :[(NOT p0), (NOT p0)]
Stuttering acceptance computed with spot in 97 ms :[(NOT p0), (NOT p0)]
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 05:10:46] [INFO ] Invariants computation overflowed in 11975 ms
[2024-06-01 05:11:01] [INFO ] [Real]Absence check using state equation in 2469 ms returned unknown
Could not prove EG (NOT p0)
Stuttering acceptance computed with spot in 73 ms :[(NOT p0), (NOT p0)]
Product exploration explored 100000 steps with 562 reset in 5482 ms.
Product exploration explored 100000 steps with 550 reset in 6411 ms.
Support contains 1 out of 3462 places. Attempting structural reductions.
Starting structural reductions in SI_LTL mode, iteration 0 : 3462/3462 places, 3220/3220 transitions.
Applied a total of 0 rules in 207 ms. Remains 3462 /3462 variables (removed 0) and now considering 3220/3220 (removed 0) transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 05:11:26] [INFO ] Invariants computation overflowed in 13065 ms
[2024-06-01 05:11:32] [INFO ] Implicit Places using invariants in 19293 ms returned []
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 05:11:45] [INFO ] Invariants computation overflowed in 12338 ms
[2024-06-01 05:13:39] [INFO ] Performed 1/3462 implicitness test of which 0 returned IMPLICIT in 32 seconds.
[2024-06-01 05:14:12] [INFO ] Performed 3/3462 implicitness test of which 0 returned IMPLICIT in 65 seconds.
[2024-06-01 05:14:25] [INFO ] Implicit Places using invariants and state equation in 172382 ms returned []
Implicit Place search using SMT with State Equation took 191684 ms to find 0 implicit places.
[2024-06-01 05:14:25] [INFO ] Redundant transitions in 135 ms returned []
Running 3210 sub problems to find dead transitions.
// Phase 1: matrix 3220 rows 3462 cols
[2024-06-01 05:14:37] [INFO ] Invariants computation overflowed in 12056 ms
Error getting values : (error "ParserException while parsing response: (timeout
org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30076 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 3210/3210 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3210 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3462 variables, 3462/3462 constraints. Problems are: Problem set: 0 solved, 3210 unsolved
Error getting values : (error "ParserException while parsing response: ((s0 1)
(s1 1)
(s2 1)
(s3 1)
(s4 1)
(s5 1)
(s6 1)
(s7 1)
(s8 1)
(s9 1)
(s10 1)
(s11 1)
(s12 1)
(s13 1)
(s14 1)
(s15 1)
(s16 1)
(s17 1)
(s18 1)
(s19 1)
(s20 1)
(s21 1)
(s22 1)
(s23 1)
(s24 1)
(s25 1)
(s26 1)
(s27 1)
(s28 1)
(s29 1)
(s30 1)
(s31 1)
(s32 1)
(s33 1)
(s34 1)
(s35 1)
(s36 1)
(s37 1)
(s38 1)
(s39 1)
(s40 1)
(s41 1)
(s42 1)
(s43 1)
(s44 1)
(s45 1)
(s46 1)
(s47 1)
(s48 1)
(s49 1)
(s50 1)
(s51 1)
(s52 1)
(s53 1)
(s54 1)
(s55 1)
(s56 1)
(s57 1)
(s58 1)
(s59 1)
(s60 1)
(s61 1)
(s62 1)
(s63 1)
(s64 1)
(s65 1)
(s66 1)
(s67 1)
(s68 1)
(s69 1)
(s70 1)
(s71 1)
(s72 1)
(s73 1)
(s74 1)
(s75 1)
(s76 1)
(s77 1)
(s78 1)
(s79 1)
(s80 1)
(s81 1)
(s82 1)
(s83 1)
(s84 1)
(s85 1)
(s86 1)
(s87 1)
(s88 1)
(s89 1)
(s90 1)
(s91 1)
(s92 1)
(s93 1)
(s94 1)
(s95 1)
(s96 1)
(s97 1)
(s98 1)
(s99 1)
(s100 1)
(s101 1)
(s102 1)
(s103 1)
(s104 1)
(s105 1)
(s106 1)
(s107 1)
(s108 1)
(s109 1)
(s110 1)
(s111 1)
(s112 1)
(s113 1)
(s114 1)
(s115 1)
(s116 1)
(s117 1)
(s118 1)
(s119 1)
(s120 1)
(s121 1)
(s122 1)
(s123 1)
(s124 1)
(s125 1)
(s126 1)
(s127 1)
(s128 1)
(s129 1)
(s130 1)
(s131 1)
(s132 1)
(s133 1)
(s134 1)
(s135 1)
(s136 1)
(s137 1)
(s138 1)
(s139 1)
(s140 1)
(s141 1)
(s142 1)
(s143 1)
(s144 1)
(s145 1)
(s146 1)
(s147 1)
(s148 1)
(s149 1)
(s150 1)
(s151 1)
(s152 1)
(s153 1)
(s154 1)
(s155 1)
(s156 1)
(s157 1)
(s158 1)
(s159 1)
(s160 1)
(s161 1)
(s162 1)
(s163 1)
(s164 1)
(s165 1)
(s166 1)
(s167 1)
(s168 1)
(s169 1)
(s170 1)
(s171 1)
(s172 1)
(s173 1)
(s174 1)
(s175 1)
(s176 1)
(s177 1)
(s178 1)
(s179 1)
(s180 1)
(s181 1)
(s182 1)
(s183 1)
(s184 1)
(s185 1)
(s186 1)
(s187 1)
(s188 1)
(s189 1)
(s190 1)
(s191 1)
(s192 1)
(s193 1)
(s194 1)
(s195 1)
(s196 1)
(s197 1)
(s198 1)
(s199 1)
(s200 1)
(s201 1)
(s202 1)
(s203 1)
(s204 1)
(s205 1)
(s206 1)
(s207 1)
(s208 1)
(s209 1)
(s210 1)
(s211 1)
(s212 1)
(s213 1)
(s214 1)
(s215 1)
(s216 1)
(s217 1)
(s218 1)
(s219 1)
(s220 1)
(s221 1)
(s222 1)
(s223 1)
(s224 1)
(s225 1)
(s226 1)
(s227 1)
(s228 1)
(s229 1)
(s230 1)
(s231 1)
(s232 1)
(s233 1)
(s234 1)
(s235 1)
(s236 1)
(s237 1)
(s238 1)
(s239 1)
(s240 1)
(s241 1)
(s242 1)
(s243 1)
(s244 1)
(s245 1)
(s246 1)
(s247 1)
(s248 1)
(s249 1)
(s250 1)
(s251 1)
(s252 1)
(s253 1)
(s254 1)
(s255 1)
(s256 1)
(s257 1)
(s258 1)
(s259 1)
(s260 1)
(s261 1)
(s262 1)
(s263 1)
(s264 1)
(s265 1)
(s266 1)
(s267 1)
(s268 1)
(s269 1)
(s270 1)
(s271 1)
(s272 1)
(s273 1)
(s274 1)
(s275 1)
(s276 1)
(s277 1)
(s278 1)
(s279 1)
(s280 1)
(s281 1)
(s282 1)
(s283 1)
(s284 1)
(s285 1)
(s286 1)
(s287 1)
(s288 1)
(s289 1)
(s290 1)
(s291 1)
(s292 1)
(s293 1)
(s294 1)
(s295 1)
(s296 1)
(s297 1)
(s298 1)
(s299 1)
(s300 1)
(s301 1)
(s302 1)
(s303 1)
(s304 1)
(s305 1)
(s306 1)
(s307 1)
(s308 1)
(s309 1)
(s310 1)
(s311 1)
(s312 1)
(s313 1)
(s314 1)
(s315 1)
(s316 1)
(s317 1)
(s318 1)
(s319 1)
(s320 1)
(s321 1)
(s322 1)
(s323 1)
(s324 1)
(s325 1)
(s326 1)
(s327 1)
(s328 1)
(s329 1)
(s330 1)
(s331 1)
(s332 1)
(s333 1)
(s334 1)
(s335 1)
(s336 1)
(s337 1)
(s338 1)
(s339 1)
(s340 1)
(s341 1)
(s342 1)
(s343 1)
(s344 1)
(s345 1)
(s346 1)
(s347 1)
(s348 1)
(s349 1)
(s350 1)
(s351 1)
(s352 1)
(s353 1)
(s354 1)
(s355 1)
(s356 1)
(s357 1)
(s358 1)
(s359 1)
(s360 1)
(s361 1)
(s362 1)
(s363 1)
(s364 1)
(s365 1)
(s366 1)
(s367 1)
(s368 1)
(s369 1)
(s370 1)
(s371 1)
(s372 1)
(s373 1)
(s374 1)
(s375 1)
(s376 1)
(s377 1)
(s378 1)
(s379 1)
(s380 1)
(s381 1)
(s382 1)
(s383 1)
(s384 1)
(s385 1)
(s386 1)
(s387 1)
(s388 1)
(s389 1)
(s390 1)
(s391 1)
(s392 1)
(s393 1)
(s394 1)
(s395 1)
(s396 1)
(s397 1)
(s398 1)
(s399 1)
(s400 1)
(s401 1)
(s402 1)
(s403 1)
(s404 1)
(s405 1)
(s406 1)
(s407 1)
(s408 1)
(s409 1)
(s410 1)
(s411 1)
(s412 1)
(s413 1)
(s414 1)
(s415 1)
(s416 1)
(s417 1)
(s418 1)
(s419 1)
(s420 1)
(s421 1)
(s422 1)
(s423 1)
(s424 1)
(s425 1)
(s426 1)
(s427 1)
(s428 1)
(s429 1)
(s430 1)
(s431 1)
(s432 1)
(s433 1)
(s434 1)
(s435 1)
(s436 1)
(s437 1)
(s438 1)
(s439 1)
(s440 1)
(s441 1)
(s442 1)
(s443 1)
(s444 1)
(s445 1)
(s446 1)
(s447 1)
(s448 1)
(s449 1)
(s450 1)
(s451 1)
(s452 1)
(s453 1)
(s454 1)
(s455 1)
(s456 1)
(s457 1)
(s458 1)
(s459 1)
(s460 1)
(s461 1)
(s462 1)
(s463 1)
(s464 1)
(s465 1)
(s466 1)
(s467 1)
(s468 1)
(s469 1)
(s470 1)
(s471 1)
(s472 1)
(s473 1)
(s474 1)
(s475 1)
(s476 1)
(s477 1)
(s478 1)
(s479 1)
(s480 1)
(s481 1)
(s482 1)
(s483 1)
(s484 1)
(s485 1)
(s486 1)
(s487 1)
(s488 1)
(s489 1)
(s490 1)
(s491 1)
(s492 1)
(s493 1)
(s494 1)
(s495 1)
(s496 1)
(s497 1)
(s498 1)
(s499 1)
(s500 1)
(s501 1)
(s502 1)
(s503 1)
(s504 1)
(s505 1)
(s506 1)
(s507 1)
(s508 1)
(s509 1)
(s510 1)
(s511 1)
(s512 1)
(s513 1)
(s514 1)
(s515 1)
(s516 1)
(s517 1)
(s518 1)
(s519 1)
(s520 1)
(s521 1)
(s522 1)
(s523 1)
(s524 1)
(s525 1)
(s526 1)
(s527 1)
(s528 1)
(s529 1)
(s530 1)
(s531 1)
(s532 1)
(s533 1)
(s534 1)
(s535 1)
(s536 1)
(s537 1)
(s538 1)
(s539 1)
(s540 1)
(s541 1)
(s542 1)
(s543 1)
(s544 1)
(s545 1)
(s546 1)
(s547 1)
(s548 1)
(s549 1)
(s550 1)
(s551 1)
(s552 1)
(s553 1)
(s554 1)
(s555 1)
(s556 1)
(s557 1)
(s558 1)
(s559 1)
(s560 1)
(s561 1)
(s562 1)
(s563 1)
(s564 1)
(s565 1)
(s566 1)
(s567 1)
(s568 1)
(s569 1)
(s570 1)
(s571 1)
(s572 1)
(s573 1)
(s574 1)
(s575 1)
(s576 1)
(s577 1)
(s578 1)
(s579 1)
(s580 1)
(s581 1)
(s582 1)
(s583 1)
(s584 1)
(s585 1)
(s586 1)
(s587 1)
(s588 1)
(s589 1)
(s590 1)
(s591 1)
(s592 1)
(s593 1)
(s594 1)
(s595 1)
(s596 1)
(s597 1)
(s598 1)
(s599 1)
(s600 1)
(s601 1)
(s602 1)
(s603 1)
(s604 1)
(s605 1)
(s606 1)
(s607 1)
(s608 1)
(s609 1)
(s610 1)
(s611 1)
(s612 1)
(s613 1)
(s614 1)
(s615 1)
(s616 1)
(s617 1)
(s618 1)
(s619 1)
(s620 1)
(s621 1)
(s622 1)
(s623 1)
(s624 1)
(s625 1)
(s626 1)
(s627 1)
(s628 1)
(s629 1)
(s630 1)
(s631 1)
(s632 1)
(s633 1)
(s634 1)
(s635 1)
(s636 1)
(s637 1)
(s638 1)
(s639 1)
(s640 1)
(s641 1)
(s642 1)
(s643 1)
(s644 1)
(s645 1)
(s646 1)
(s647 1)
(s648 1)
(s649 1)
(s650 1)
(s651 1)
(s652 1)
(s653 1)
(s654 1)
(s655 1)
(s656 1)
(s657 1)
(s658 1)
(s659 1)
(s660 1)
(s661 1)
(s662 1)
(s663 1)
(s664 1)
(s665 1)
(s666 1)
(s667 1)
(s668 1)
(s669 1)
(s670 1)
(s671 1)
(s672 1)
(s673 1)
(s674 1)
(s675 1)
(s676 1)
(s677 1)
(s678 1)
(s679 1)
(s680 1)
(s681 1)
(s682 1)
(s683 1)
(s684 1)
(s685 1)
(s686 1)
(s687 1)
(s688 1)
(s689 1)
(s690 1)
(s691 1)
(s692 1)
(s693 1)
(s694 1)
(s695 1)
(s696 1)
(s697 1)
(s698 1)
(s699 1)
(s700 1)
(s701 1)
(s702 1)
(s703 1)
(s704 1)
(s705 1)
(s706 1)
(s707 1)
(s708 1)
(s709 1)
(s710 1)
(s711 1)
(s712 1)
(s713 1)
(s714 1)
(s715 1)
(s716 1)
(s717 1)
(s718 1)
(s719 1)
(s720 1)
(s721 1)
(s722 1)
(s723 1)
(s724 1)
(s725 1)
(s726 1)
(s727 1)
(s728 1)
(s729 1)
(s730 1)
(s731 1)
(s732 1)
(s733 1)
(s734 1)
(s735 1)
(s736 1)
(s737 1)
(s738 1)
(s739 1)
(s740 1)
(s741 1)
(s742 1)
(s743 1)
(s744 1)
(s745 1)
(s746 1)
(s747 1)
(s748 1)
(s749 1)
(s750 1)
(s751 1)
(s752 1)
(s753 1)
(s754 1)
(s755 1)
(s756 1)
(s757 1)
(s758 1)
(s759 1)
(s760 1)
(s761 1)
(s762 1)
(s763 1)
(s764 1)
(s765 1)
(s766 1)
(s767 1)
(s768 1)
(s769 1)
(s770 1)
(s771 1)
(s772 1)
(s773 1)
(s774 1)
(s775 1)
(s776 1)
(s777 1)
(s778 1)
(s779 1)
(s780 1)
(s781 1)
(s782 1)
(s783 1)
(s784 1)
(s785 1)
(s786 1)
(s787 1)
(s788 1)
(s789 1)
(s790 1)
(s791 1)
(s792 1)
(s793 1)
(s794 1)
(s795 1)
(s796 1)
(s797 1)
(s798 1)
(s799 1)
(s800 1)
(s801 1)
(s802 1)
(s803 1)
(s804 1)
(s805 1)
(s806 1)
(s807 1)
(s808 1)
(s809 1)
(s810 1)
(s811 1)
(s812 1)
(s813 1)
(s814 1)
(s815 1)
(s816 1)
(s817 1)
(s818 1)
(s819 1)
(s820 1)
(s821 1)
(s822 1)
(s823 1)
(s824 1)
(s825 1)
(s826 1)
(s827 1)
(s828 1)
(s829 1)
(s830 1)
(s831 1)
(s832 1)
(s833 1)
(s834 1)
(s835 1)
(s836 1)
(s837 1)
(s838 1)
(s839 1)
(s840 1)
(s841 1)
(s842 1)
(s843 1)
(s844 1)
(s845 1)
(s846 1)
(s847 1)
(s848 1)
(s849 1)
(s850 1)
(s851 1)
(s852 1)
(s853 1)
(s854 1)
(s855 1)
(s856 1)
(s857 1)
(s858 1)
(s859 1)
(s860 1)
(s861 1)
(s862 1)
(s863 1)
(s864 1)
(s865 1)
(s866 1)
(s867 1)
(s868 1)
(s869 1)
(s870 1)
(s871 1)
(s872 1)
(s873 1)
(s874 1)
(s875 1)
(s876 1)
(s877 1)
(s878 1)
(s879 1)
(s880 1)
(s881 1)
(s882 1)
(s883 1)
(s884 1)
(s885 1)
(s886 1)
(s887 1)
(s888 1)
(s889 1)
(s890 1)
(s891 1)
(s892 1)
(s893 1)
(s894 1)
(s895 1)
(s896 1)
(s897 1)
(s898 1)
(s899 1)
(s900 1)
(s901 1)
(s902 1)
(s903 1)
(s904 1)
(s905 1)
(s906 1)
(s907 1)
(s908 1)
(s909 1)
(s910 1)
(s911 1)
(s912 1)
(s913 1)
(s914 1)
(s915 1)
(s916 1)
(s917 1)
(s918 1)
(s919 1)
(s920 1)
(s921 1)
(s922 1)
(s923 1)
(s924 1)
(s925 1)
(s926 1)
(s927 1)
(s928 1)
(s929 1)
(s930 1)
(s931 1)
(s932 1)
(s933 1)
(s934 1)
(s935 1)
(s936 1)
(s937 1)
(s938 1)
(s939 1)
(s940 1)
(s941 1)
(s942 1)
(s943 1)
(s944 1)
(s945 1)
(s946 1)
(s947 1)
(s948 1)
(s949 1)
(s950 1)
(s951 1)
(s952 1)
(s953 1)
(s954 1)
(s955 1)
(s956 1)
(s957 1)
(s958 1)
(s959 1)
(s960 1)
(s961 1)
(s962 1)
(s963 1)
(s964 1)
(s965 1)
(s966 1)
(s967 1)
(s968 1)
(s969 1)
(s970 1)
(s971 1)
(s972 1)
(s973 1)
(s974 1)
(s975 1)
(s976 1)
(s977 1)
(s978 1)
(s979 1)
(s980 1)
(s981 1)
(s982 1)
(s983 1)
(s984 1)
(s985 1)
(s986 1)
(s987 1)
(s988 1)
(s989 1)
(s990 1)
(s991 1)
(s992 1)
(s993 1)
(s994 1)
(s995 1)
(s996 1)
(s997 1)
(s998 1)
(s999 1)
(s1000 1)
(s1001 1)
(s1002 1)
(s1003 1)
(s1004 1)
(s1005 1)
(s1006 1)
(s1007 1)
(s1008 1)
(s1009 1)
(s1010 1)
(s1011 1)
(s1012 1)
(s1013 1)
(s1014 1)
(s1015 1)
(s1016 1)
(s1017 1)
(s1018 1)
(s1019 1)
(s1020 1)
(s1021 1)
(s1022 1)
(s1023 1)
(s1024 1)
(s1025 1)
(s1026 1)
(s1027 1)
(s1028 1)
(s1029 1)
(s1030 1)
(s1031 1)
(s1032 1)
(s1033 1)
(s1034 1)
(s1035 1)
(s1036 1)
(s1037 1)
(s1038 1)
(s1039 1)
(s1040 1)
(s1041 1)
(s1042 1)
(s1043 1)
(s1044 1)
(s1045 1)
(s1046 1)
(s1047 1)
(s1048 1)
(s1049 1)
(s1050 1)
(s1051 1)
(s1052 1)
(s1053 1)
(s1054 1)
(s1055 1)
(s1056 1)
(s1057 1)
(s1058 1)
(s1059 1)
(s1060 1)
(s1061 1)
(s1062 1)
(s1063 1)
(s1064 1)
(s1065 1)
(s1066 1)
(s1067 1)
(s1068 1)
(s1069 1)
(s1070 1)
(s1071 1)
(s1072 1)
(s1073 1)
(s1074 1)
(s1075 1)
(s1076 1)
(s1077 1)
(s1078 1)
(s1079 1)
(s1080 1)
(s1081 1)
(s1082 1)
(s1083 1)
(s1084 1)
(s1085 1)
(s1086 1)
(s1087 1)
(s1088 1)
(s1089 1)
(s1090 1)
(s1091 1)
(s1092 1)
(s1093 1)
(s1094 1)
(s1095 1)
(s1096 1)
(s1097 1)
(s1098 1)
(s1099 1)
(s1100 1)
(s1101 1)
(s1102 1)
(s1103 1)
(s1104 1)
(s1105 1)
(s1106 1)
(s1107 1)
(s1108 1)
(s1109 1)
(s1110 1)
(s1111 1)
(s1112 1)
(s1113 1)
(s1114 1)
(s1115 1)
(s1116 1)
(s1117 1)
(s1118 1)
(s1119 1)
(s1120 1)
(s1121 1)
(s1122 1)
(s1123 1)
(s1124 1)
(s1125 1)
(s1126 1)
(s1127 1)
(s1128 1)
(s1129 1)
(s1130 1)
(s1131 1)
(s1132 1)
(s1133 1)
(s1134 1)
(s1135 1)
(s1136 1)
(s1137 1)
(s1138 1)
(s1139 1)
(s1140 1)
(s1141 1)
(s1142 1)
(s1143 1)
(s1144 1)
(s1145 1)
(s1146 1)
(s1147 1)
(s1148 1)
(s1149 1)
(s1150 1)
(s1151 1)
(s1152 1)
(s1153 1)
(s1154 1)
(s1155 1)
(s1156 1)
(s1157 1)
(s1158 1)
(s1159 1)
(s1160 1)
(s1161 1)
(s1162 1)
(s1163 1)
(s1164 1)
(s1165 1)
(s1166 1)
(s1167 1)
(s1168 1)
(s1169 1)
(s1170 1)
(s1171 1)
(s1172 1)
(s1173 1)
(s1174 1)
(s1175 1)
(s1176 1)
(s1177 1)
(s1178 1)
(s1179 1)
(s1180 1)
(s1181 1)
(s1182 1)
(s1183 1)
(s1184 1)
(s1185 1)
(s1186 1)
(s1187 1)
(s1188 1)
(s1189 1)
(s1190 1)
(s1191 1)
(s1192 1)
(s1193 1)
(s1194 1)
(s1195 1)
(s1196 1)
(s1197 1)
(s1198 1)
(s1199 1)
(s1200 1)
(s1201 1)
(s1202 1)
(s1203 1)
(s1204 1)
(s1205 1)
(s1206 1)
(s1207 1)
(s1208 1)
(s1209 1)
(s1210 1)
(s1211 1)
(s1212 1)
(s1213 1)
(s1214 1)
(s1215 1)
(s1216 1)
(s1217 1)
(s1218 1)
(s1219 1)
(s1220 1)
(s1221 1)
(s1222 1)
(s1223 1)
(s1224 1)
(s1225 1)
(s1226 1)
(s1227 1)
(s1228 1)
(s1229 1)
(s1230 1)
(s1231 1)
(s1232 1)
(s1233 1)
(s1234 1)
(s1235 1)
(s1236 1)
(s1237 1)
(s1238 1)
(s1239 1)
(s1240 1)
(s1241 1)
(s1242 1)
(s1243 1)
(s1244 1)
(s1245 1)
(s1246 1)
(s1247 1)
(s1248 1)
(s1249 1)
(s1250 1)
(s1251 1)
(s1252 1)
(s1253 1)
(s1254 1)
(s1255 1)
(s1256 1)
(s1257 1)
(s1258 1)
(s1259 1)
(s1260 1)
(s1261 1)
(s1262 1)
(s1263 1)
(s1264 1)
(s1265 1)
(s1266 1)
(s1267 1)
(s1268 1)
(s1269 1)
(s1270 1)
(s1271 1)
(s1272 1)
(s1273 1)
(s1274 1)
(s1275 1)
(s1276 1)
(s1277 1)
(s1278 1)
(s1279 1)
(s1280 1)
(s1281 1)
(s1282 1)
(s1283 1)
(s1284 1)
(s1285 1)
(s1286 1)
(s1287 1)
(s1288 1)
(s1289 1)
(s1290 1)
(s1291 1)
(s1292 1)
(s1293 1)
(s1294 1)
(s1295 1)
(s1296 1)
(s1297 1)
(s1298 1)
(s1299 1)
(s1300 1)
(s1301 1)
(s1302 1)
(s1303 1)
(s1304 1)
(s1305 1)
(s1306 1)
(s1307 1)
(s1308 1)
(s1309 1)
(s1310 1)
(s1311 1)
(s1312 1)
(s1313 1)
(s1314 1)
(s1315 1)
(s1316 1)
(s1317 1)
(s1318 1)
(s1319 1)
(s1320 1)
(s1321 1)
(s1322 1)
(s1323 1)
(s1324 1)
(s1325 1)
(s1326 1)
(s1327 1)
(s1328 1)
(s1329 1)
(s1330 1)
(s1331 1)
(s1332 1)
(s1333 1)
(s1334 1)
(s1335 1)
(s1336 1)
(s1337 1)
(s1338 1)
(s1339 1)
(s1340 1)
(s1341 1)
(s1342 1)
(s1343 1)
(s1344 1)
(s1345 1)
(s1346 1)
(s1347 1)
(s1348 1)
(s1349 1)
(s1350 1)
(s1351 1)
(s1352 1)
(s1353 1)
(s1354 1)
(s1355 1)
(s1356 1)
(s1357 1)
(s1358 1)
(s1359 1)
(s1360 1)
(s1361 1)
(s1362 1)
(s1363 1)
(s1364 1)
(s1365 1)
(s1366 1)
(s1367 1)
(s1368 1)
(s1369 1)
(s1370 1)
(s1371 1)
(s1372 1)
(s1373 1)
(s1374 1)
(s1375 1)
(s1376 1)
(s1377 1)
(s1378 1)
(s1379 1)
(s1380 1)
(s1381 1)
(s1382 1)
(s1383 1)
(s1384 1)
(s1385 1)
(s1386 1)
(s1387 1)
(s1388 1)
(s1389 1)
(s1390 1)
(s1391 1)
(s1392 1)
(s1393 1)
(s1394 1)
(s1395 1)
(s1396 1)
(s1397 1)
(s1398 1)
(s1399 1)
(s1400 1)
(s1401 1)
(s1402 1)
(s1403 1)
(s1404 1)
(s1405 1)
(s1406 1)
(s1407 1)
(s1408 1)
(s1409 1)
(s1410 1)
(s1411 1)
(s1412 1)
(s1413 1)
(s1414 1)
(s1415 1)
(s1416 1)
(s1417 1)
(s1418 1)
(s1419 1)
(s1420 1)
(s1421 1)
(s1422 1)
(s1423 1)
(s1424 1)
(s1425 1)
(s1426 1)
(s1427 1)
(s1428 1)
(s1429 1)
(s1430 1)
(s1431 1)
(s1432 1)
(s1433 1)
(s1434 1)
(s1435 1)
(s1436 1)
(s1437 1)
(s1438 1)
(s1439 1)
(s1440 1)
(s1441 1)
(s1442 1)
(s1443 1)
(s1444 1)
(s1445 1)
(s1446 1)
(s1447 1)
(s1448 1)
(s1449 1)
(s1450 1)
(s1451 1)
(s1452 1)
(s1453 1)
(s1454 1)
(s1455 1)
(s1456 1)
(s1457 1)
(s1458 1)
(s1459 1)
(s1460 1)
(s1461 1)
(s1462 1)
(s1463 1)
(s1464 1)
(s1465 1)
(s1466 1)
(s1467 1)
(s1468 1)
(s1469 1)
(s1470 1)
(s1471 1)
(s1472 1)
(s1473 1)
(s1474 1)
(s1475 1)
(s1476 1)
(s1477 1)
(s1478 1)
(s1479 1)
(s1480 1)
(s1481 1)
(s1482 1)
(s1483 1)
(s1484 1)
(s1485 1)
(s1486 1)
(s1487 1)
(s1488 1)
(s1489 1)
(s1490 1)
(s1491 1)
(s1492 1)
(s1493 1)
(s1494 1)
(s1495 1)
(s1496 1)
(s1497 1)
(s1498 1)
(s1499 1)
(s1500 1)
(s1501 1)
(s1502 1)
(s1503 1)
(s1504 1)
(s1505 1)
(s1506 1)
(s1507 1)
(s1508 1)
(s1509 1)
(s1510 1)
(s1511 1)
(s1512 1)
(s1513 1)
(s1514 1)
(s1515 1)
(s1516 1)
(s1517 1)
(s1518 1)
(s1519 1)
(s1520 1)
(s1521 1)
(s1522 1)
(s1523 1)
(s1524 1)
(s1525 1)
(s1526 1)
(s1527 1)
(s1528 1)
(s1529 1)
(s1530 1)
(s1531 1)
(s1532 1)
(s1533 1)
(s1534 1)
(s1535 1)
(s1536 1)
(s1537 1)
(s1538 1)
(s1539 1)
(s1540 1)
(s1541 1)
(s1542 1)
(s1543 1)
(s1544 1)
(s1545 1)
(s1546 1)
(s1547 1)
(s1548 1)
(s1549 1)
(s1550 1)
(s1551 1)
(s1552 1)
(s1553 1)
(s1554 1)
(s1555 1)
(s1556 1)
(s1557 1)
(s1558 1)
(s1559 1)
(s1560 1)
(s1561 1)
(s1562 1)
(s1563 1)
(s1564 1)
(s1565 1)
(s1566 1)
(s1567 1)
(s1568 1)
(s1569 1)
(s1570 1)
(s1571 1)
(s1572 1)
(s1573 1)
(s1574 1)
(s1575 1)
(s1576 1)
(s1577 1)
(s1578 1)
(s1579 1)
(s1580 1)
(s1581 1)
(s1582 1)
(s1583 1)
(s1584 1)
(s1585 1)
(s1586 1)
(s1587 1)
(s1588 1)
(s1589 1)
(s1590 1)
(s1591 1)
(s1592 1)
(s1593 1)
(s1594 1)
(s1595 1)
(s1596 1)
(s1597 1)
(s1598 1)
(s1599 1)
(s1600 1)
(s1601 1)
(s1602 1)
(s1603 1)
(s1604 1)
(s1605 1)
(s1606 1)
(s1607 1)
(s1608 1)
(s1609 1)
(s1610 1)
(s1611 1)
(s1612 1)
(s1613 1)
(s1614 1)
(s1615 1)
(s1616 1)
(s1617 1)
(s1618 1)
(s1619 1)
(s1620 1)
(s1621 1)
(s1622 1)
(s1623 1)
(s1624 1)
(s1625 1)
(s1626 1)
(s1627 1)
(s1628 1)
(s1629 1)
(s1630 1)
(s1631 1)
(s1632 1)
(s1633 1)
(s1634 1)
(s1635 1)
(s1636 1)
(s1637 1)
(s1638 1)
(s1639 1)
(s1640 1)
(s1641 1)
(s1642 1)
(s1643 1)
(s1644 1)
(s1645 1)
(s1646 1)
(s1647 1)
(s1648 1)
(s1649 1)
(s1650 1)
(s1651 1)
(s1652 1)
(s1653 1)
(s1654 1)
(s1655 1)
(s1656 1)
(s1657 1)
(s1658 1)
(s1659 1)
(s1660 1)
(s1661 1)
(s1662 1)
(s1663 1)
(s1664 1)
(s1665 1)
(s1666 1)
(s1667 1)
(s1668 1)
(s1669 1)
(s1670 1)
(s1671 1)
(s1672 1)
(s1673 1)
(s1674 1)
(s1675 1)
(s1676 1)
(s1677 1)
(s1678 1)
(s1679 1)
(s1680 1)
(s1681 1)
(s1682 1)
(s1683 1)
(s1684 1)
(s1685 1)
(s1686 1)
(s1687 1)
(s1688 1)
(s1689 1)
(s1690 1)
(s1691 1)
(s1692 1)
(s1693 1)
(s1694 1)
(s1695 1)
(s1696 1)
(s1697 1)
(s1698 1)
(s1699 1)
(s1700 1)
(s1701 1)
(s1702 1)
(s1703 1)
(s1704 1)
(s1705 1)
(s1706 1)
(s1707 1)
(s1708 1)
(s1709 1)
(s1710 1)
(s1711 1)
(s1712 1)
(s1713 1)
(s1714 1)
(s1715 1)
(s1716 1)
(s1717 1)
(s1718 1)
(s1719 1)
(s1720 1)
(s1721 1)
(s1722 1)
(s1723 1)
(s1724 1)
(s1725 1)
(s1726 1)
(s1727 1)
(s1728 1)
(s1729 1)
(s1730 1)
(s1731 1)
(s1732 1)
(s1733 1)
(s1734 1)
(s1735 1)
(s1736 1)
(s1737 1)
(s1738 1)
(s1739 1)
(s1740 1)
(s1741 1)
(s1742 1)
(s1743 1)
(s1744 1)
(s1745 1)
(s1746 1)
(s1747 1)
(s1748 1)
(s1749 1)
(s1750 1)
(s1751 1)
(s1752 1)
(s1753 1)
(s1754 1)
(s1755 1)
(s1756 1)
(s1757 1)
(s1758 1)
(s1759 1)
(s1760 1)
(s1761 1)
(s1762 1)
(s1763 1)
(s1764 1)
(s1765 1)
(s1766 1)
(s1767 1)
(s1768 1)
(s1769 1)
(s1770 1)
(s1771 1)
(s1772 1)
(s1773 1)
(s1774 1)
(s1775 1)
(s1776 1)
(s1777 1)
(s1778 1)
(s1779 1)
(s1780 1)
(s1781 1)
(s1782 1)
(s1783 1)
(s1784 1)
(s1785 1)
(s1786 1)
(s1787 1)
(s1788 1)
(s1789 1)
(s1790 1)
(s1791 1)
(s1792 1)
(s1793 1)
(s1794 1)
(s1795 1)
(s1796 1)
(s1797 1)
(s1798 1)
(s1799 1)
(s1800 1)
(s1801 1)
(s1802 1)
(s1803 1)
(s1804 1)
(s1805 1)
(s1806 1)
(s1807 1)
(s1808 1)
(s1809 1)
(s1810 1)
(s1811 1)
(s1812 1)
(s1813 1)
(s1814 1)
(s1815 1)
(s1816 1)
(s1817 1)
(s1818 1)
(s1819 1)
(s1820 1)
(s1821 1)
(s1822 1)
(s1823 1)
(s1824 1)
(s1825 1)
(s1826 1)
(s1827 1)
(s1828 1)
(s1829 1)
(s1830 1)
(s1831 1)
(s1832 1)
(s1833 1)
(s1834 1)
(s1835 1)
(s1836 1)
(s1837 1)
(s1838 1)
(s1839 1)
(s1840 1)
(s1841 1)
(s1842 1)
(s1843 1)
(s1844 1)
(s1845 1)
(s1846 1)
(s1847 1)
(s1848 1)
(s1849 1)
(s1850 1)
(s1851 1)
(s1852 1)
(s1853 1)
(s1854 1)
(s1855 1)
(s1856 1)
(s1857 1)
(s1858 1)
(s1859 1)
(s1860 1)
(s1861 1)
(s1862 1)
(s1863 1)
(s1864 1)
(s1865 1)
(s1866 1)
(s1867 1)
(s1868 1)
(s1869 1)
(s1870 1)
(s1871 1)
(s1872 1)
(s1873 1)
(s1874 1)
(s1875 1)
(s1876 1)
(s1877 1)
(s1878 1)
(s1879 1)
(s1880 1)
(s1881 1)
(s1882 1)
(s1883 1)
(s1884 1)
(s1885 1)
(s1886 1)
(s1887 1)
(s1888 1)
(s1889 1)
(s1890 1)
(s1891 1)
(s1892 1)
(s1893 1)
(s1894 1)
(s1895 1)
(s1896 1)
(s1897 1)
(s1898 1)
(s1899 1)
(s1900 1)
(s1901 1)
(s1902 1)
(s1903 1)
(s1904 1)
(s1905 1)
(s1906 1)
(s1907 1)
(s1908 1)
(s1909 1)
(s1910 1)
(s1911 1)
(s1912 1)
(s1913 1)
(s1914 1)
(s1915 1)
(s1916 1)
(s1917 1)
(s1918 1)
(s1919 1)
(s1920 1)
(s1921 1)
(s1922 1)
(s1923 1)
(s1924 1)
(s1925 1)
(s1926 1)
(s1927 1)
(s1928 1)
(s1929 1)
(s1930 1)
(s1931 1)
(s1932 1)
(s1933 1)
(s1934 1)
(s1935 1)
(s1936 1)
(s1937 1)
(s1938 1)
(s1939 1)
(s1940 1)
(s1941 1)
(s1942 1)
(s1943 1)
(s1944 1)
(s1945 1)
(s1946 1)
(s1947 1)
(s1948 1)
(s1949 1)
(s1950 1)
(s1951 1)
(s1952 1)
(s1953 1)
(s1954 1)
(s1955 1)
(s1956 1)
(s1957 1)
(s1958 1)
(s1959 1)
(s1960 1)
(s1961 1)
(s1962 1)
(s1963 1)
(s1964 1)
(s1965 1)
(s1966 1)
(s1967 1)
(s1968 1)
(s1969 1)
(s1970 1)
(s1971 1)
(s1972 1)
(s1973 1)
(s1974 1)
(s1975 1)
(s1976 1)
(s1977 1)
(s1978 1)
(s1979 1)
(s1980 1)
(s1981 1)
(s1982 1)
(s1983 1)
(s1984 1)
(s1985 1)
(s1986 1)
(s1987 1)
(s1988 1)
(s1989 1)
(s1990 1)
(s1991 1)
(s1992 1)
(s1993 1)
(s1994 1)
(s1995 1)
(s1996 1)
(s1997 1)
(s1998 1)
(s1999 1)
(s2000 1)
(s2001 1)
(s2002 1)
(s2003 1)
(s2004 1)
(s2005 1)
(s2006 1)
(s2007 1)
(s2008 1)
(s2009 1)
(s2010 1)
(s2011 1)
(s2012 1)
(s2013 1)
(s2014 1)
(s2015 1)
(s2016 1)
(s2017 1)
(s2018 1)
(s2019 1)
(s2020 1)
(s2021 1)
(s2022 1)
(s2023 1)
(s2024 1)
(s2025 1)
(s2026 1)
(s2027 1)
(s2028 1)
(s2029 1)
(s2030 1)
(s2031 1)
(s2032 1)
(s2033 1)
(s2034 1)
(s2035 1)
(s2036 1)
(s2037 1)
(s2038 1)
(s2039 1)
(s2040 1)
(s2041 1)
(s2042 1)
(s2043 1)
(s2044 1)
(s2045 1)
(s2046 1)
(s2047 1)
(s2048 1)
(s2049 1)
(s2050 1)
(s2051 1)
(s2052 1)
(s2053 1)
(s2054 1)
(s2055 1)
(s2056 1)
(s2057 1)
(s2058 1)
(s2059 1)
(s2060 1)
(s2061 1)
(s2062 1)
(s2063 1)
(s2064 1)
(s2065 1)
(s2066 1)
(s2067 1)
(s2068 1)
(s2069 1)
(s2070 1)
(s2071 1)
(s2072 1)
(s2073 1)
(s2074 1)
(s2075 1)
(s2076 1)
(s2077 1)
(s2078 1)
(s2079 1)
(s2080 1)
(s2081 1)
(s2082 1)
(s2083 1)
(s2084 1)
(s2085 1)
(s2086 1)
(s2087 1)
(s2088 1)
(s2089 1)
(s2090 1)
(s2091 1)
(s2092 1)
(s2093 1)
(s2094 1)
(s2095 timeout
1 org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3462/6682 variables, and 3462 constraints, problems are : Problem set: 0 solved, 3210 unsolved in 30085 ms.
Refiners :[Domain max(s): 3462/3462 constraints, State Equation: 0/3462 constraints, PredecessorRefiner: 0/3210 constraints, Known Traps: 0/0 constraints]
After SMT, in 76935ms problems are : Problem set: 0 solved, 3210 unsolved
Search for dead transitions found 0 dead transitions in 76974ms
Finished structural reductions in SI_LTL mode , in 1 iterations and 269014 ms. Remains : 3462/3462 places, 3220/3220 transitions.
Treatment of property Echo-PT-d05r03-LTLCardinality-07 finished in 885039 ms.
Running Spot : '/home/mcc/BenchKit/itstools/itstools/plugins/fr.lip6.ltl.spot.binaries_1.0.0.202405141337/bin/ltl2tgba-linux64' '--check=stutter' '--hoaf=tv' '-f' '!(X(F(p0)))'
Support contains 2 out of 3475 places. Attempting structural reductions.
Starting structural reductions in LTL mode, iteration 0 : 3475/3475 places, 3222/3222 transitions.
Reduce places removed 1 places and 0 transitions.
Iterating post reduction 0 with 1 rules applied. Total rules applied 1 place count 3474 transition count 3222
Applied a total of 1 rules in 277 ms. Remains 3474 /3475 variables (removed 1) and now considering 3222/3222 (removed 0) transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:15:54] [INFO ] Invariants computation overflowed in 11850 ms
[2024-06-01 05:16:01] [INFO ] Implicit Places using invariants in 19072 ms returned []
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:16:13] [INFO ] Invariants computation overflowed in 11732 ms
[2024-06-01 05:18:53] [INFO ] Performed 0/3474 implicitness test of which 0 returned IMPLICIT in 117 seconds.
[2024-06-01 05:18:53] [INFO ] Implicit Places using invariants and state equation in 171774 ms returned []
Implicit Place search using SMT with State Equation took 190850 ms to find 0 implicit places.
Running 3221 sub problems to find dead transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:19:05] [INFO ] Invariants computation overflowed in 11888 ms
Error getting values : (error "ParserException while parsing response: (timeout
org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30077 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 3221/3221 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3221 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30085 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 0/3221 constraints, Known Traps: 0/0 constraints]
After SMT, in 76462ms problems are : Problem set: 0 solved, 3221 unsolved
Search for dead transitions found 0 dead transitions in 76499ms
Starting structural reductions in LTL mode, iteration 1 : 3474/3475 places, 3222/3222 transitions.
Finished structural reductions in LTL mode , in 1 iterations and 267634 ms. Remains : 3474/3475 places, 3222/3222 transitions.
Stuttering acceptance computed with spot in 108 ms :[(NOT p0), (NOT p0)]
Running random walk in product with property : Echo-PT-d05r03-LTLCardinality-08
Stuttering criterion allowed to conclude after 870 steps with 2 reset in 70 ms.
FORMULA Echo-PT-d05r03-LTLCardinality-08 FALSE TECHNIQUES STUTTER_TEST
Treatment of property Echo-PT-d05r03-LTLCardinality-08 finished in 267845 ms.
Running Spot : '/home/mcc/BenchKit/itstools/itstools/plugins/fr.lip6.ltl.spot.binaries_1.0.0.202405141337/bin/ltl2tgba-linux64' '--check=stutter' '--hoaf=tv' '-f' '!(G((p0||(p1&&X(G(p2))))))'
Support contains 4 out of 3475 places. Attempting structural reductions.
Starting structural reductions in LTL mode, iteration 0 : 3475/3475 places, 3222/3222 transitions.
Reduce places removed 1 places and 0 transitions.
Iterating post reduction 0 with 1 rules applied. Total rules applied 1 place count 3474 transition count 3222
Applied a total of 1 rules in 268 ms. Remains 3474 /3475 variables (removed 1) and now considering 3222/3222 (removed 0) transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:20:22] [INFO ] Invariants computation overflowed in 11912 ms
[2024-06-01 05:20:28] [INFO ] Implicit Places using invariants in 18094 ms returned []
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:20:40] [INFO ] Invariants computation overflowed in 11434 ms
[2024-06-01 05:23:20] [INFO ] Performed 0/3474 implicitness test of which 0 returned IMPLICIT in 117 seconds.
[2024-06-01 05:23:20] [INFO ] Implicit Places using invariants and state equation in 171471 ms returned []
Implicit Place search using SMT with State Equation took 189568 ms to find 0 implicit places.
Running 3221 sub problems to find dead transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:23:32] [INFO ] Invariants computation overflowed in 11745 ms
Error getting values : (error "ParserException while parsing response: (timeout
org.smtlib.IParser$ParserException: Unbalanced parentheses at end of input")
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30072 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 3221/3221 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3221 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30088 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 0/3221 constraints, Known Traps: 0/0 constraints]
After SMT, in 75704ms problems are : Problem set: 0 solved, 3221 unsolved
Search for dead transitions found 0 dead transitions in 75740ms
Starting structural reductions in LTL mode, iteration 1 : 3474/3475 places, 3222/3222 transitions.
Finished structural reductions in LTL mode , in 1 iterations and 265583 ms. Remains : 3474/3475 places, 3222/3222 transitions.
Stuttering acceptance computed with spot in 152 ms :[true, (OR (AND (NOT p0) (NOT p1)) (AND (NOT p0) (NOT p2))), (OR (NOT p2) (AND (NOT p0) (NOT p1)))]
Running random walk in product with property : Echo-PT-d05r03-LTLCardinality-10
Entered a terminal (fully accepting) state of product in 2209 steps with 4 reset in 177 ms.
FORMULA Echo-PT-d05r03-LTLCardinality-10 FALSE TECHNIQUES STUTTER_TEST
Treatment of property Echo-PT-d05r03-LTLCardinality-10 finished in 265945 ms.
Running Spot : '/home/mcc/BenchKit/itstools/itstools/plugins/fr.lip6.ltl.spot.binaries_1.0.0.202405141337/bin/ltl2tgba-linux64' '--check=stutter' '--hoaf=tv' '-f' '!(X(X((F(G(p1))||p0))))'
Support contains 5 out of 3475 places. Attempting structural reductions.
Starting structural reductions in LTL mode, iteration 0 : 3475/3475 places, 3222/3222 transitions.
Reduce places removed 1 places and 0 transitions.
Iterating post reduction 0 with 1 rules applied. Total rules applied 1 place count 3474 transition count 3222
Applied a total of 1 rules in 270 ms. Remains 3474 /3475 variables (removed 1) and now considering 3222/3222 (removed 0) transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:24:48] [INFO ] Invariants computation overflowed in 12111 ms
[2024-06-01 05:24:54] [INFO ] Implicit Places using invariants in 17838 ms returned []
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:25:06] [INFO ] Invariants computation overflowed in 12210 ms
[2024-06-01 05:27:46] [INFO ] Performed 0/3474 implicitness test of which 0 returned IMPLICIT in 116 seconds.
[2024-06-01 05:27:46] [INFO ] Implicit Places using invariants and state equation in 172254 ms returned []
Implicit Place search using SMT with State Equation took 190096 ms to find 0 implicit places.
Running 3221 sub problems to find dead transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:27:58] [INFO ] Invariants computation overflowed in 11852 ms
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30082 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 3221/3221 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3221 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Int declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30054 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 0/3221 constraints, Known Traps: 0/0 constraints]
After SMT, in 76641ms problems are : Problem set: 0 solved, 3221 unsolved
Search for dead transitions found 0 dead transitions in 76678ms
Starting structural reductions in LTL mode, iteration 1 : 3474/3475 places, 3222/3222 transitions.
Finished structural reductions in LTL mode , in 1 iterations and 267061 ms. Remains : 3474/3475 places, 3222/3222 transitions.
Stuttering acceptance computed with spot in 157 ms :[(AND (NOT p0) (NOT p1)), (NOT p1), (AND (NOT p0) (NOT p1)), (AND (NOT p0) (NOT p1))]
Running random walk in product with property : Echo-PT-d05r03-LTLCardinality-13
Product exploration explored 100000 steps with 223 reset in 4746 ms.
Product exploration explored 100000 steps with 222 reset in 4661 ms.
Computed a total of 3474 stabilizing places and 3222 stable transitions
Complete graph has no SCC; deadlocks are unavoidable. place count 3474 transition count 3222
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge (and all enablings converge to false).
Detected that all paths lead to deadlock. Applying this knowledge to assert that all AP eventually converge : F ( (Ga|G!a) & (Gb|G!b)...)
Knowledge obtained : [(AND p0 p1), (F (OR (G p0) (G (NOT p0)))), (F (OR (G p1) (G (NOT p1))))]
False Knowledge obtained : [(X (X (NOT p0))), (X (X p0))]
Knowledge based reduction with 3 factoid took 277 ms. Reduced automaton from 4 states, 5 edges and 2 AP (stutter sensitive) to 4 states, 5 edges and 2 AP (stutter sensitive).
Stuttering acceptance computed with spot in 205 ms :[(AND (NOT p0) (NOT p1)), (NOT p1), (AND (NOT p0) (NOT p1)), (AND (NOT p0) (NOT p1))]
RANDOM walk for 10063 steps (19 resets) in 784 ms. (12 steps per ms) remains 0/2 properties
Knowledge obtained : [(AND p0 p1), (F (OR (G p0) (G (NOT p0)))), (F (OR (G p1) (G (NOT p1))))]
False Knowledge obtained : [(X (X (NOT p0))), (X (X p0)), (F (NOT p0)), (F (NOT p1))]
Knowledge based reduction with 3 factoid took 335 ms. Reduced automaton from 4 states, 5 edges and 2 AP (stutter sensitive) to 4 states, 5 edges and 2 AP (stutter sensitive).
Stuttering acceptance computed with spot in 194 ms :[(AND (NOT p0) (NOT p1)), (NOT p1), (AND (NOT p0) (NOT p1)), (AND (NOT p0) (NOT p1))]
Stuttering acceptance computed with spot in 199 ms :[(AND (NOT p0) (NOT p1)), (NOT p1), (AND (NOT p0) (NOT p1)), (AND (NOT p0) (NOT p1))]
Support contains 5 out of 3474 places. Attempting structural reductions.
Starting structural reductions in LTL mode, iteration 0 : 3474/3474 places, 3222/3222 transitions.
Applied a total of 0 rules in 261 ms. Remains 3474 /3474 variables (removed 0) and now considering 3222/3222 (removed 0) transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:29:29] [INFO ] Invariants computation overflowed in 11444 ms
[2024-06-01 05:29:35] [INFO ] Implicit Places using invariants in 17337 ms returned []
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:29:47] [INFO ] Invariants computation overflowed in 11865 ms
[2024-06-01 05:32:27] [INFO ] Performed 0/3474 implicitness test of which 0 returned IMPLICIT in 117 seconds.
[2024-06-01 05:32:27] [INFO ] Implicit Places using invariants and state equation in 171899 ms returned []
Implicit Place search using SMT with State Equation took 189237 ms to find 0 implicit places.
Running 3221 sub problems to find dead transitions.
// Phase 1: matrix 3222 rows 3474 cols
[2024-06-01 05:32:38] [INFO ] Invariants computation overflowed in 11468 ms
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved
Solver is answering 'unknown', stopping.
After SMT solving in domain Real declared 3473/6696 variables, and 3473 constraints, problems are : Problem set: 0 solved, 3221 unsolved in 30085 ms.
Refiners :[Domain max(s): 3473/3474 constraints, State Equation: 0/3474 constraints, PredecessorRefiner: 3221/3221 constraints, Known Traps: 0/0 constraints]
Escalating to Integer solving :Problem set: 0 solved, 3221 unsolved
At refinement iteration 0 (INCLUDED_ONLY) 0/3473 variables, 3473/3473 constraints. Problems are: Problem set: 0 solved, 3221 unsolved

BK_TIME_CONFINEMENT_REACHED

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

+ ulimit -s 65536
+ [[ -z '' ]]
+ export LTSMIN_MEM_SIZE=8589934592
+ LTSMIN_MEM_SIZE=8589934592
+ export PYTHONPATH=/home/mcc/BenchKit/itstools/pylibs
+ PYTHONPATH=/home/mcc/BenchKit/itstools/pylibs
+ export LD_LIBRARY_PATH=/home/mcc/BenchKit/itstools/pylibs:
+ LD_LIBRARY_PATH=/home/mcc/BenchKit/itstools/pylibs:
++ sed s/.jar//
++ perl -pe 's/.*\.//g'
++ ls /home/mcc/BenchKit/bin//../reducer/bin//../../itstools//itstools/plugins/fr.lip6.move.gal.application.pnmcc_1.0.0.202405141337.jar
+ VERSION=202405141337
+ echo 'Running Version 202405141337'
+ /home/mcc/BenchKit/bin//../reducer/bin//../../itstools//itstools/its-tools -pnfolder /home/mcc/execution -examination LTLCardinality -timeout 360 -rebuildPNML