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Model Checking Contest 2018
8th edition, Bratislava, Slovakia, June 26, 2018
Execution of r256-csrt-152732582800075
Last Updated
June 26, 2018

About the Execution of LoLA for NeoElection-COL-5

Execution Summary
Max Memory
Used (MB)		 Time wait (ms) CPU Usage (ms) I/O Wait (ms) Computed Result Execution
Status
14027.790 3569836.00 3724272.00 554.60 TTF?TFFTT?FFFFFT normal

Execution Chart

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

Trace from the execution

Waiting for the VM to be ready (probing ssh)
................
/home/mcc/execution
total 244K
-rw-r--r-- 1 mcc users 3.4K May 15 18:54 CTLCardinality.txt
-rw-r--r-- 1 mcc users 16K May 15 18:54 CTLCardinality.xml
-rw-r--r-- 1 mcc users 2.7K May 15 18:54 CTLFireability.txt
-rw-r--r-- 1 mcc users 14K May 15 18:54 CTLFireability.xml
-rw-r--r-- 1 mcc users 4.0K May 15 18:50 GenericPropertiesDefinition.xml
-rw-r--r-- 1 mcc users 6.1K May 15 18:50 GenericPropertiesVerdict.xml
-rw-r--r-- 1 mcc users 2.6K May 26 09:26 LTLCardinality.txt
-rw-r--r-- 1 mcc users 11K May 26 09:26 LTLCardinality.xml
-rw-r--r-- 1 mcc users 2.0K May 26 09:26 LTLFireability.txt
-rw-r--r-- 1 mcc users 7.6K May 26 09:26 LTLFireability.xml
-rw-r--r-- 1 mcc users 3.7K May 15 18:54 ReachabilityCardinality.txt
-rw-r--r-- 1 mcc users 17K May 15 18:54 ReachabilityCardinality.xml
-rw-r--r-- 1 mcc users 108 May 15 18:54 ReachabilityDeadlock.txt
-rw-r--r-- 1 mcc users 346 May 15 18:54 ReachabilityDeadlock.xml
-rw-r--r-- 1 mcc users 3.2K May 15 18:54 ReachabilityFireability.txt
-rw-r--r-- 1 mcc users 16K May 15 18:54 ReachabilityFireability.xml
-rw-r--r-- 1 mcc users 1.7K May 15 18:54 UpperBounds.txt
-rw-r--r-- 1 mcc users 3.8K May 15 18:54 UpperBounds.xml
-rw-r--r-- 1 mcc users 5 May 15 18:50 equiv_pt
-rw-r--r-- 1 mcc users 2 May 15 18:50 instance
-rw-r--r-- 1 mcc users 5 May 15 18:50 iscolored
-rw-r--r-- 1 mcc users 89K May 15 18:50 model.pnml
=====================================================================
Generated by BenchKit 2-3637
Executing tool lola
Input is NeoElection-COL-5, examination is LTLCardinality
Time confinement is 3600 seconds
Memory confinement is 16384 MBytes
Number of cores is 4
Run identifier is r256-csrt-152732582800075
=====================================================================

--------------------
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 NeoElection-COL-5-LTLCardinality-00
FORMULA_NAME NeoElection-COL-5-LTLCardinality-01
FORMULA_NAME NeoElection-COL-5-LTLCardinality-02
FORMULA_NAME NeoElection-COL-5-LTLCardinality-03
FORMULA_NAME NeoElection-COL-5-LTLCardinality-04
FORMULA_NAME NeoElection-COL-5-LTLCardinality-05
FORMULA_NAME NeoElection-COL-5-LTLCardinality-06
FORMULA_NAME NeoElection-COL-5-LTLCardinality-07
FORMULA_NAME NeoElection-COL-5-LTLCardinality-08
FORMULA_NAME NeoElection-COL-5-LTLCardinality-09
FORMULA_NAME NeoElection-COL-5-LTLCardinality-10
FORMULA_NAME NeoElection-COL-5-LTLCardinality-11
FORMULA_NAME NeoElection-COL-5-LTLCardinality-12
FORMULA_NAME NeoElection-COL-5-LTLCardinality-13
FORMULA_NAME NeoElection-COL-5-LTLCardinality-14
FORMULA_NAME NeoElection-COL-5-LTLCardinality-15

=== Now, execution of the tool begins

BK_START 1527429967972

info: Time: 3600 - MCC
===========================================================================================
prep: translating NeoElection-COL-5 Petri net model.pnml into LoLA format
===========================================================================================
prep: translating COL Petri net complete
prep: added safe information to the net based on GenericPropertiesVerdict
prep: check for too many tokens
===========================================================================================
prep: translating NeoElection-COL-5 formula LTLCardinality into LoLA format
===========================================================================================
prep: translating COL formula complete
vrfy: Checking LTLCardinality @ NeoElection-COL-5 @ 3568 seconds
lola: LoLA will run for 3568 seconds at most (--timelimit)
lola: NET
lola: reading net from model.pnml.lola
lola: finished parsing
lola: closed net file model.pnml.lola
lola: 7836/65536 symbol table entries, 1634 collisions
lola: preprocessing...
lola: Size of bit vector: 3090
lola: finding significant places
lola: 3090 places, 4746 transitions, 816 significant places
lola: computing forward-conflicting sets
lola: computing back-conflicting sets
lola: 1668 transition conflict sets
lola: TASK
lola: reading formula from NeoElection-COL-5-LTLCardinality.task
lola: place invariant simplifies atomic proposition
lola: before: (p1600 + p1599 + p1598 + p1597 + p1596 + p1595 + p1594 + p1593 + p1592 + p1591 + p1590 + p1588 + p1587 + p1586 + p1585 + p1584 + p1583 + p1582 + p1581 + p1580 + p1579 + p1578 + p1576 + p1575 + p1574 + p1573 + p1572 + p1571 + p1570 + p1569 + p1568 + p1567 + p1566 + p1564 + p1563 + p1562 + p1561 + p1560 + p1559 + p1558 + p1557 + p1556 + p1555 + p1554 + p1552 + p1551 + p1550 + p1549 + p1548 + p1547 + p1546 + p1545 + p1544 + p1543 + p1542 + p1540 + p1539 + p1538 + p1537 + p1536 + p1535 + p1534 + p1533 + p1532 + p1531 + p1530 + p1541 + p1553 + p1565 + p1577 + p1589 + p1601 <= p2910 + p2911 + p2912 + p2913 + p2914 + p2915)
lola: after: (5 <= 0)
lola: always false
lola: place invariant simplifies atomic proposition
lola: before: (p95 + p94 + p93 + p92 + p91 + p59 + p58 + p57 + p56 + p55 + p995 + p994 + p993 + p992 + p991 + p23 + p22 + p21 + p20 + p19 + p959 + p958 + p957 + p956 + p955 + p923 + p922 + p921 + p920 + p919 + p127 + p128 + p129 + p130 + p131 + p163 + p164 + p165 + p166 + p167 + p199 + p887 + p886 + p885 + p884 + p883 + p851 + p850 + p849 + p848 + p847 + p815 + p814 + p813 + p812 + p811 + p779 + p778 + p777 + p200 + p201 + p202 + p203 + p776 + p775 + p743 + p742 + p741 + p740 + p739 + p707 + p706 + p705 + p704 + p703 + p235 + p236 + p237 + p238 + p239 + p271 + p272 + p273 + p274 + p275 + p671 + p670 + p669 + p668 + p667 + p635 + p634 + p633 + p632 + p631 + p1283 + p1282 + p1281 + p1280 + p1279 + p1247 + p1246 + p1245 + p1244 + p1243 + p1211 + p1210 + p1209 + p1208 + p1207 + p599 + p598 + p597 + p596 + p595 + p563 + p562 + p561 + p560 + p559 + p527 + p526 + p525 + p524 + p523 + p1175 + p1174 + p1173 + p1172 + p307 + p308 + p309 + p310 + p311 + p1171 + p1139 + p1138 + p1137 + p1136 + p1135 + p1103 + p1102 + p1101 + p1100 + p343 + p344 + p345 + p346 + p347 + p491 + p490 + p489 + p488 + p487 + p455 + p454 + p453 + p452 + p451 + p419 + p418 + p417 + p416 + p415 + p1099 + p1067 + p1066 + p1065 + p1064 + p379 + p380 + p381 + p382 + p383 + p1063 + p1031 + p1030 + p1029 + p1028 + p1027 + p399 + p1000 + p398 + p1001 + p397 + p1002 + p396 + p1003 + p1004 + p1005 + p1006 + p1007 + p1008 + p1009 + p395 + p1010 + p1011 + p1012 + p1013 + p1014 + p394 + p1015 + p1016 + p1017 + p1018 + p1019 + p1020 + p393 + p1021 + p1022 + p1023 + p1024 + p1025 + p1026 + p392 + p391 + p390 + p1032 + p1033 + p1034 + p1035 + p1036 + p1037 + p1038 + p1039 + p389 + p1040 + p1041 + p1042 + p1043 + p1044 + p388 + p1045 + p1046 + p1047 + p1048 + p1049 + p1050 + p387 + p1051 + p1052 + p1053 + p1054 + p1055 + p1056 + p386 + p1057 + p1058 + p1059 + p1060 + p1061 + p1062 + p385 + p384 + p378 + p377 + p376 + p375 + p1068 + p1069 + p1070 + p1071 + p1072 + p1073 + p1074 + p1075 + p1076 + p1077 + p1078 + p1079 + p1080 + p1081 + p1082 + p1083 + p1084 + p1085 + p1086 + p1087 + p1088 + p1089 + p1090 + p1091 + p1092 + p1093 + p1094 + p1095 + p1096 + p1097 + p1098 + p374 + p400 + p401 + p402 + p403 + p404 + p405 + p406 + p407 + p408 + p409 + p410 + p411 + p412 + p413 + p414 + p373 + p372 + p371 + p370 + p369 + p420 + p421 + p422 + p423 + p424 + p425 + p426 + p427 + p428 + p429 + p430 + p431 + p432 + p433 + p434 + p435 + p436 + p437 + p438 + p439 + p440 + p441 + p442 + p443 + p444 + p445 + p446 + p447 + p448 + p449 + p450 + p368 + p367 + p366 + p365 + p364 + p456 + p457 + p458 + p459 + p460 + p461 + p462 + p463 + p464 + p465 + p466 + p467 + p468 + p469 + p470 + p471 + p472 + p473 + p474 + p475 + p476 + p477 + p478 + p479 + p480 + p481 + p482 + p483 + p484 + p485 + p486 + p363 + p362 + p361 + p360 + p359 + p358 + p357 + p356 + p355 + p354 + p353 + p352 + p492 + p493 + p494 + p495 + p496 + p497 + p498 + p499 + p351 + p350 + p349 + p348 + p342 + p341 + p340 + p339 + p1104 + p338 + p1105 + p337 + p1106 + p336 + p1107 + p335 + p1108 + p1109 + p334 + p333 + p1110 + p332 + p1111 + p1112 + p1113 + p1114 + p1115 + p1116 + p331 + p1117 + p1118 + p1119 + p1120 + p1121 + p1122 + p330 + p1123 + p1124 + p1125 + p1126 + p1127 + p1128 + p1129 + p329 + p1130 + p1131 + p1132 + p1133 + p1134 + p328 + p327 + p326 + p325 + p324 + p323 + p1140 + p322 + p1141 + p321 + p1142 + p320 + p1143 + p319 + p1144 + p318 + p1145 + p317 + p1146 + p316 + p1147 + p1148 + p1149 + p1150 + p1151 + p1152 + p315 + p1153 + p1154 + p1155 + p1156 + p1157 + p1158 + p1159 + p314 + p1160 + p1161 + p1162 + p1163 + p1164 + p313 + p1165 + p1166 + p1167 + p1168 + p1169 + p1170 + p312 + p306 + p305 + p304 + p303 + p1176 + p1177 + p1178 + p1179 + p1180 + p1181 + p1182 + p1183 + p1184 + p1185 + p1186 + p1187 + p1188 + p1189 + p1190 + p1191 + p1192 + p1193 + p1194 + p1195 + p1196 + p1197 + p1198 + p1199 + p500 + p501 + p502 + p503 + p504 + p505 + p506 + p507 + p508 + p509 + p510 + p511 + p512 + p513 + p514 + p515 + p516 + p517 + p518 + p519 + p520 + p521 + p522 + p302 + p301 + p300 + p528 + p529 + p530 + p531 + p532 + p533 + p534 + p535 + p536 + p537 + p538 + p539 + p540 + p541 + p542 + p543 + p544 + p545 + p546 + p547 + p548 + p549 + p550 + p551 + p552 + p553 + p554 + p555 + p556 + p557 + p558 + p564 + p565 + p566 + p567 + p568 + p569 + p570 + p571 + p572 + p573 + p574 + p575 + p576 + p577 + p578 + p579 + p580 + p581 + p582 + p583 + p584 + p585 + p586 + p587 + p588 + p589 + p590 + p591 + p592 + p593 + p594 + p1200 + p1201 + p1202 + p1203 + p1204 + p1205 + p1206 + p1212 + p1213 + p1214 + p1215 + p1216 + p1217 + p1218 + p1219 + p1220 + p1221 + p1222 + p1223 + p1224 + p1225 + p1226 + p1227 + p1228 + p1229 + p1230 + p1231 + p1232 + p1233 + p1234 + p1235 + p1236 + p1237 + p1238 + p1239 + p1240 + p1241 + p1242 + p1248 + p1249 + p1250 + p1251 + p1252 + p1253 + p1254 + p1255 + p1256 + p1257 + p1258 + p1259 + p1260 + p1261 + p1262 + p1263 + p1264 + p1265 + p1266 + p1267 + p1268 + p1269 + p1270 + p1271 + p1272 + p1273 + p1274 + p1275 + p1276 + p1277 + p1278 + p1284 + p1285 + p1286 + p1287 + p1288 + p1289 + p1290 + p1291 + p1292 + p1293 + p1294 + p1295 + p1296 + p1297 + p1298 + p1299 + p600 + p601 + p602 + p603 + p604 + p605 + p606 + p607 + p608 + p609 + p610 + p611 + p612 + p613 + p614 + p615 + p616 + p617 + p618 + p619 + p620 + p621 + p622 + p623 + p624 + p625 + p626 + p627 + p628 + p629 + p630 + p299 + p298 + p297 + p296 + p636 + p637 + p638 + p639 + p640 + p641 + p642 + p643 + p644 + p645 + p646 + p647 + p648 + p649 + p650 + p651 + p652 + p653 + p654 + p655 + p656 + p657 + p658 + p659 + p660 + p661 + p662 + p663 + p664 + p665 + p666 + p295 + p294 + p293 + p292 + p291 + p672 + p673 + p674 + p675 + p676 + p677 + p678 + p679 + p680 + p681 + p682 + p683 + p684 + p685 + p686 + p687 + p688 + p689 + p290 + p690 + p691 + p692 + p693 + p694 + p695 + p696 + p697 + p698 + p699 + p289 + p1300 + p1301 + p1302 + p288 + p1303 + p1304 + p1305 + p1306 + p1307 + p287 + p286 + p285 + p284 + p283 + p282 + p281 + p280 + p279 + p278 + p277 + p276 + p270 + p269 + p268 + p267 + p266 + p265 + p264 + p263 + p262 + p261 + p260 + p259 + p258 + p257 + p256 + p255 + p254 + p253 + p252 + p251 + p250 + p249 + p248 + p247 + p246 + p245 + p244 + p243 + p242 + p241 + p240 + p234 + p233 + p232 + p231 + p230 + p229 + p228 + p227 + p226 + p225 + p224 + p223 + p222 + p221 + p220 + p219 + p218 + p217 + p216 + p700 + p701 + p702 + p215 + p214 + p213 + p212 + p211 + p708 + p709 + p710 + p711 + p712 + p713 + p714 + p715 + p716 + p717 + p718 + p719 + p720 + p721 + p722 + p723 + p724 + p725 + p726 + p727 + p728 + p729 + p730 + p731 + p732 + p733 + p734 + p735 + p736 + p737 + p738 + p210 + p209 + p208 + p207 + p206 + p744 + p745 + p746 + p747 + p748 + p749 + p750 + p751 + p752 + p753 + p754 + p755 + p756 + p757 + p758 + p759 + p760 + p761 + p762 + p763 + p764 + p765 + p766 + p767 + p768 + p769 + p770 + p771 + p772 + p773 + p774 + p205 + p204 + p780 + p781 + p782 + p783 + p784 + p785 + p786 + p787 + p788 + p789 + p790 + p791 + p792 + p793 + p794 + p795 + p796 + p797 + p798 + p799 + p800 + p801 + p802 + p803 + p804 + p805 + p806 + p807 + p808 + p809 + p810 + p816 + p817 + p818 + p819 + p820 + p821 + p822 + p823 + p824 + p825 + p826 + p827 + p828 + p829 + p830 + p831 + p832 + p833 + p834 + p835 + p836 + p837 + p838 + p839 + p840 + p841 + p842 + p843 + p844 + p845 + p846 + p852 + p853 + p854 + p855 + p856 + p857 + p858 + p859 + p860 + p861 + p862 + p863 + p864 + p865 + p866 + p867 + p868 + p869 + p870 + p871 + p872 + p873 + p874 + p875 + p876 + p877 + p878 + p879 + p880 + p881 + p882 + p888 + p889 + p890 + p891 + p892 + p893 + p894 + p895 + p896 + p897 + p898 + p899 + p198 + p197 + p196 + p195 + p194 + p193 + p192 + p191 + p190 + p189 + p188 + p187 + p186 + p185 + p184 + p183 + p182 + p181 + p180 + p179 + p178 + p177 + p176 + p175 + p174 + p173 + p172 + p171 + p170 + p169 + p168 + p162 + p161 + p160 + p159 + p158 + p157 + p156 + p155 + p154 + p153 + p152 + p151 + p150 + p149 + p148 + p147 + p146 + p145 + p144 + p143 + p142 + p141 + p140 + p139 + p138 + p137 + p136 + p135 + p134 + p133 + p132 + p126 + p125 + p124 + p123 + p122 + p121 + p120 + p119 + p118 + p117 + p116 + p900 + p901 + p902 + p903 + p904 + p905 + p906 + p907 + p908 + p909 + p910 + p911 + p912 + p913 + p914 + p915 + p916 + p917 + p918 + p115 + p114 + p113 + p112 + p111 + p924 + p925 + p926 + p927 + p928 + p929 + p930 + p931 + p932 + p933 + p934 + p935 + p936 + p937 + p938 + p939 + p940 + p941 + p942 + p943 + p944 + p945 + p946 + p947 + p948 + p949 + p950 + p951 + p952 + p953 + p954 + p110 + p109 + p108 + p107 + p106 + p105 + p104 + p12 + p13 + p14 + p15 + p16 + p17 + p18 + p103 + p960 + p961 + p962 + p963 + p964 + p965 + p966 + p967 + p968 + p969 + p102 + p101 + p100 + p24 + p25 + p26 + p27 + p28 + p29 + p970 + p971 + p972 + p973 + p974 + p975 + p976 + p977 + p978 + p979 + p30 + p31 + p32 + p33 + p34 + p35 + p36 + p37 + p38 + p39 + p980 + p981 + p982 + p983 + p984 + p985 + p986 + p987 + p988 + p989 + p40 + p41 + p42 + p43 + p44 + p45 + p46 + p47 + p48 + p49 + p990 + p996 + p997 + p998 + p999 + p50 + p51 + p52 + p53 + p54 + p60 + p61 + p62 + p63 + p64 + p65 + p66 + p67 + p68 + p69 + p70 + p71 + p72 + p73 + p74 + p75 + p76 + p77 + p78 + p79 + p80 + p81 + p82 + p83 + p84 + p85 + p86 + p87 + p88 + p89 + p90 + p96 + p97 + p98 + p99 <= p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 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lola: after: (p95 + p94 + p93 + p92 + p91 + p59 + p58 + p57 + p56 + p55 + p995 + p994 + p993 + p992 + p991 + p23 + p22 + p21 + p20 + p19 + p959 + p958 + p957 + p956 + p955 + p923 + p922 + p921 + p920 + p919 + p127 + p128 + p129 + p130 + p131 + p163 + p164 + p165 + p166 + p167 + p199 + p887 + p886 + p885 + p884 + p883 + p851 + p850 + p849 + p848 + p847 + p815 + p814 + p813 + p812 + p811 + p779 + p778 + p777 + p200 + p201 + p202 + p203 + p776 + p775 + p743 + p742 + p741 + p740 + p739 + p707 + p706 + p705 + p704 + p703 + p235 + p236 + p237 + p238 + p239 + p271 + p272 + p273 + p274 + p275 + p671 + p670 + p669 + p668 + p667 + p635 + p634 + p633 + p632 + p631 + p1283 + p1282 + p1281 + p1280 + p1279 + p1247 + p1246 + p1245 + p1244 + p1243 + p1211 + p1210 + p1209 + p1208 + p1207 + p599 + p598 + p597 + p596 + p595 + p563 + p562 + p561 + p560 + p559 + p527 + p526 + p525 + p524 + p523 + p1175 + p1174 + p1173 + p1172 + p307 + p308 + p309 + p310 + p311 + p1171 + p1139 + p1138 + p1137 + p1136 + p1135 + p1103 + p1102 + p1101 + p1100 + p343 + p344 + p345 + p346 + p347 + p491 + p490 + p489 + p488 + p487 + p455 + p454 + p453 + p452 + p451 + p419 + p418 + p417 + p416 + p415 + p1099 + p1067 + p1066 + p1065 + p1064 + p379 + p380 + p381 + p382 + p383 + p1063 + p1031 + p1030 + p1029 + p1028 + p1027 <= p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 + p2765 + p2166 + p2764 + p2763 + p2762 + p2761 + p2760 + p2172 + p2754 + p2748 + p2742 + p2736 + p2730 + p2178 + p2729 + p2728 + p2727 + p2726 + p2725 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2724 + p2718 + p2712 + p2706 + p2700 + p2196 + p2694 + p2693 + p2692 + p2691 + p2690 + p2689 + p2688 + p2682 + p2676 + p2670 + p2664 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p2652 + p2646 + p2640 + p2634 + p2628 + p2622 + p2621 + p2202 + p2620 + p2619 + p2618 + p2617 + p2616 + p2208 + p2610 + p2604 + p2214 + p2598 + p2592 + p2586 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2585 + p2584 + p2583 + p2582 + p2581 + p2232 + p2580 + p2238 + p2574 + p2568 + p2562 + p2556 + p2244 + p2550 + p2549 + p2548 + p2547 + p2546 + p2250 + p2545 + p2544 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2538 + p2532 + p2526 + p2268 + p2520 + p2514 + p2513 + p2512 + p2511 + p2274 + p2510 + p2280 + p2509 + p2508 + p2502 + p2286 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2496 + p2490 + p2484 + p2478 + p2477 + p2476 + p2475 + p2474 + p2473 + p2472 + p2466 + p2460 + p2454 + p2448 + p2442 + p2441 + p2440 + p2439 + p2438 + p2437 + p2436 + p2430 + p2424 + p2418 + p2412 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p2400 + p2394 + p2388 + p2382 + p2376 + p2370 + p2369 + p2368 + p2367 + p2366 + p2304 + p2365 + p2364 + p2358 + p2352 + p2346 + p2340 + p2334 + p2333 + p2332 + p2331 + p2310 + p2330 + p2329 + p2328 + p2322 + p2316)
lola: LP says that atomic proposition is always true: (p95 + p94 + p93 + p92 + p91 + p59 + p58 + p57 + p56 + p55 + p995 + p994 + p993 + p992 + p991 + p23 + p22 + p21 + p20 + p19 + p959 + p958 + p957 + p956 + p955 + p923 + p922 + p921 + p920 + p919 + p127 + p128 + p129 + p130 + p131 + p163 + p164 + p165 + p166 + p167 + p199 + p887 + p886 + p885 + p884 + p883 + p851 + p850 + p849 + p848 + p847 + p815 + p814 + p813 + p812 + p811 + p779 + p778 + p777 + p200 + p201 + p202 + p203 + p776 + p775 + p743 + p742 + p741 + p740 + p739 + p707 + p706 + p705 + p704 + p703 + p235 + p236 + p237 + p238 + p239 + p271 + p272 + p273 + p274 + p275 + p671 + p670 + p669 + p668 + p667 + p635 + p634 + p633 + p632 + p631 + p1283 + p1282 + p1281 + p1280 + p1279 + p1247 + p1246 + p1245 + p1244 + p1243 + p1211 + p1210 + p1209 + p1208 + p1207 + p599 + p598 + p597 + p596 + p595 + p563 + p562 + p561 + p560 + p559 + p527 + p526 + p525 + p524 + p523 + p1175 + p1174 + p1173 + p1172 + p307 + p308 + p309 + p310 + p311 + p1171 + p1139 + p1138 + p1137 + p1136 + p1135 + p1103 + p1102 + p1101 + p1100 + p343 + p344 + p345 + p346 + p347 + p491 + p490 + p489 + p488 + p487 + p455 + p454 + p453 + p452 + p451 + p419 + p418 + p417 + p416 + p415 + p1099 + p1067 + p1066 + p1065 + p1064 + p379 + p380 + p381 + p382 + p383 + p1063 + p1031 + p1030 + p1029 + p1028 + p1027 <= p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 + p2765 + p2166 + p2764 + p2763 + p2762 + p2761 + p2760 + p2172 + p2754 + p2748 + p2742 + p2736 + p2730 + p2178 + p2729 + p2728 + p2727 + p2726 + p2725 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2724 + p2718 + p2712 + p2706 + p2700 + p2196 + p2694 + p2693 + p2692 + p2691 + p2690 + p2689 + p2688 + p2682 + p2676 + p2670 + p2664 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p2652 + p2646 + p2640 + p2634 + p2628 + p2622 + p2621 + p2202 + p2620 + p2619 + p2618 + p2617 + p2616 + p2208 + p2610 + p2604 + p2214 + p2598 + p2592 + p2586 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2585 + p2584 + p2583 + p2582 + p2581 + p2232 + p2580 + p2238 + p2574 + p2568 + p2562 + p2556 + p2244 + p2550 + p2549 + p2548 + p2547 + p2546 + p2250 + p2545 + p2544 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2538 + p2532 + p2526 + p2268 + p2520 + p2514 + p2513 + p2512 + p2511 + p2274 + p2510 + p2280 + p2509 + p2508 + p2502 + p2286 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2496 + p2490 + p2484 + p2478 + p2477 + p2476 + p2475 + p2474 + p2473 + p2472 + p2466 + p2460 + p2454 + p2448 + p2442 + p2441 + p2440 + p2439 + p2438 + p2437 + p2436 + p2430 + p2424 + p2418 + p2412 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p2400 + p2394 + p2388 + p2382 + p2376 + p2370 + p2369 + p2368 + p2367 + p2366 + p2304 + p2365 + p2364 + p2358 + p2352 + p2346 + p2340 + p2334 + p2333 + p2332 + p2331 + p2310 + p2330 + p2329 + p2328 + p2322 + p2316)
lola: place invariant simplifies atomic proposition
lola: before: (3 <= p3000 + p3001 + p3003 + p3004 + p2998 + p3006 + p3007 + p2997 + p3009 + p3010 + p2995 + p3012 + p3013 + p2994 + p3015 + p3016 + p3018 + p3019 + p2992 + p3021 + p3022 + p2991 + p3024 + p3025 + p2989 + p3027 + p3028 + p2988 + p2986 + p2985 + p2983 + p2982 + p2980 + p2979 + p2977 + p2976 + p2974 + p2973 + p2971 + p2970 + p2968 + p2967 + p2965 + p2964 + p2962 + p2961 + p2959 + p2958 + p2956 + p2955 + p2953 + p2952 + p2950 + p2949 + p2947 + p2946 + p2944 + p2943 + p2941 + p2940 + p2938 + p2937 + p2935 + p2934 + p2932 + p2931 + p2929 + p2928 + p2926 + p2925 + p2923 + p2922 + p2924 + p2927 + p2930 + p2933 + p2936 + p2939 + p2942 + p2945 + p2948 + p2951 + p2954 + p2957 + p2960 + p2963 + p2966 + p2969 + p2972 + p2975 + p2978 + p2981 + p2984 + p2987 + p3029 + p3026 + p2990 + p3023 + p3020 + p2993 + p3017 + p3014 + p3011 + p2996 + p3008 + p3005 + p2999 + p3002)
lola: after: (0 <= 22)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (p3000 + p3001 + p3003 + p3004 + p2998 + p3006 + p3007 + p2997 + p3009 + p3010 + p2995 + p3012 + p3013 + p2994 + p3015 + p3016 + p3018 + p3019 + p2992 + p3021 + p3022 + p2991 + p3024 + p3025 + p2989 + p3027 + p3028 + p2988 + p2986 + p2985 + p2983 + p2982 + p2980 + p2979 + p2977 + p2976 + p2974 + p2973 + p2971 + p2970 + p2968 + p2967 + p2965 + p2964 + p2962 + p2961 + p2959 + p2958 + p2956 + p2955 + p2953 + p2952 + p2950 + p2949 + p2947 + p2946 + p2944 + p2943 + p2941 + p2940 + p2938 + p2937 + p2935 + p2934 + p2932 + p2931 + p2929 + p2928 + p2926 + p2925 + p2923 + p2922 + p2924 + p2927 + p2930 + p2933 + p2936 + p2939 + p2942 + p2945 + p2948 + p2951 + p2954 + p2957 + p2960 + p2963 + p2966 + p2969 + p2972 + p2975 + p2978 + p2981 + p2984 + p2987 + p3029 + p3026 + p2990 + p3023 + p3020 + p2993 + p3017 + p3014 + p3011 + p2996 + p3008 + p3005 + p2999 + p3002 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: after: (25 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: LP says that atomic proposition is always false: (25 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: place invariant simplifies atomic proposition
lola: before: (p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 + p2765 + p2166 + p2764 + p2763 + p2762 + p2761 + p2760 + p2172 + p2754 + p2748 + p2742 + p2736 + p2730 + p2178 + p2729 + p2728 + p2727 + p2726 + p2725 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2724 + p2718 + p2712 + p2706 + p2700 + p2196 + p2694 + p2693 + p2692 + p2691 + p2690 + p2689 + p2688 + p2682 + p2676 + p2670 + p2664 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p2652 + p2646 + p2640 + p2634 + p2628 + p2622 + p2621 + p2202 + p2620 + p2619 + p2618 + p2617 + p2616 + p2208 + p2610 + p2604 + p2214 + p2598 + p2592 + p2586 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2585 + p2584 + p2583 + p2582 + p2581 + p2232 + p2580 + p2238 + p2574 + p2568 + p2562 + p2556 + p2244 + p2550 + p2549 + p2548 + p2547 + p2546 + p2250 + p2545 + p2544 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2538 + p2532 + p2526 + p2268 + p2520 + p2514 + p2513 + p2512 + p2511 + p2274 + p2510 + p2280 + p2509 + p2508 + p2502 + p2286 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2496 + p2490 + p2484 + p2478 + p2477 + p2476 + p2475 + p2474 + p2473 + p2472 + p2466 + p2460 + p2454 + p2448 + p2442 + p2441 + p2440 + p2439 + p2438 + p2437 + p2436 + p2430 + p2424 + p2418 + p2412 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p2400 + p2394 + p2388 + p2382 + p2376 + p2370 + p2369 + p2368 + p2367 + p2366 + p2304 + p2365 + p2364 + p2358 + p2352 + p2346 + p2340 + p2334 + p2333 + p2332 + p2331 + p2310 + p2330 + p2329 + p2328 + p2322 + p2316 + p2315 + p2317 + p2318 + p2319 + p2320 + p2321 + p2314 + p2323 + p2324 + p2325 + p2326 + p2327 + p2313 + p2312 + p2311 + p2335 + p2336 + p2337 + p2338 + p2339 + p2341 + p2342 + p2343 + p2344 + p2345 + p2347 + p2348 + p2349 + p2350 + p2351 + p2353 + p2354 + p2355 + p2356 + p2357 + p2359 + p2309 + p2360 + p2361 + p2308 + p2362 + p2307 + p2363 + p2306 + p2305 + p2303 + p2302 + p2301 + p2300 + p2371 + p2372 + p2373 + p2374 + p2375 + p2377 + p2378 + p2379 + p2380 + p2381 + p2383 + p2384 + p2385 + p2386 + p2387 + p2389 + p2390 + p2391 + p2392 + p2393 + p2395 + p2396 + p2397 + p2398 + p2399 + p2407 + p2408 + p2409 + p2410 + p2411 + p2413 + p2414 + p2415 + p2416 + p2417 + p2419 + p2420 + p2421 + p2422 + p2423 + p2425 + p2426 + p2427 + p2428 + p2429 + p2431 + p2432 + p2433 + p2434 + p2435 + p2443 + p2444 + p2445 + p2446 + p2447 + p2449 + p2450 + p2451 + p2452 + p2453 + p2455 + p2456 + p2457 + p2458 + p2459 + p2461 + p2462 + p2463 + p2464 + p2465 + p2467 + p2468 + p2469 + p2470 + p2471 + p2479 + p2480 + p2481 + p2482 + p2483 + p2485 + p2486 + p2487 + p2488 + p2489 + p2491 + p2492 + p2493 + p2494 + p2495 + p2497 + p2498 + p2499 + p2299 + p2291 + p2290 + p2289 + p2288 + p2287 + p2285 + p2500 + p2501 + p2284 + p2503 + p2504 + p2505 + p2506 + p2507 + p2283 + p2282 + p2281 + p2279 + p2278 + p2277 + p2276 + p2275 + p2273 + p2272 + p2271 + p2270 + p2515 + p2516 + p2517 + p2518 + p2519 + p2269 + p2521 + p2522 + p2523 + p2524 + p2525 + p2267 + p2527 + p2528 + p2529 + p2530 + p2531 + p2266 + p2533 + p2534 + p2535 + p2536 + p2537 + p2265 + p2264 + p2539 + p2263 + p2255 + p2540 + p2541 + p2254 + p2542 + p2253 + p2543 + p2252 + p2251 + p2249 + p2248 + p2247 + p2246 + p2245 + p2551 + p2552 + p2553 + p2554 + p2555 + p2243 + p2557 + p2558 + p2559 + p2560 + p2561 + p2242 + p2563 + p2564 + p2565 + p2566 + p2567 + p2241 + p2569 + p2570 + p2571 + p2572 + p2573 + p2240 + p2239 + p2575 + p2237 + p2576 + p2236 + p2577 + p2235 + p2578 + p2234 + p2579 + p2233 + p2231 + p2230 + p2229 + p2228 + p2227 + p2219 + p2587 + p2588 + p2589 + p2590 + p2591 + p2218 + p2593 + p2594 + p2595 + p2596 + p2597 + p2217 + p2599 + p2216 + p2215 + p2213 + p2212 + p2211 + p2210 + p2600 + p2601 + p2602 + p2603 + p2605 + p2606 + p2607 + p2608 + p2609 + p2209 + p2611 + p2612 + p2613 + p2614 + p2615 + p2207 + p2206 + p2205 + p2204 + p2203 + p2201 + p2200 + p2623 + p2624 + p2625 + p2626 + p2627 + p2629 + p2630 + p2631 + p2632 + p2633 + p2635 + p2636 + p2637 + p2638 + p2639 + p2641 + p2642 + p2643 + p2644 + p2645 + p2647 + p2648 + p2649 + p2650 + p2651 + p2659 + p2660 + p2661 + p2662 + p2663 + p2665 + p2666 + p2667 + p2668 + p2669 + p2671 + p2672 + p2673 + p2674 + p2675 + p2677 + p2678 + p2679 + p2680 + p2681 + p2683 + p2684 + p2685 + p2686 + p2687 + p2695 + p2696 + p2697 + p2698 + p2699 + p2199 + p2198 + p2197 + p2195 + p2701 + p2702 + p2703 + p2704 + p2705 + p2194 + p2707 + p2708 + p2709 + p2710 + p2711 + p2193 + p2713 + p2714 + p2715 + p2716 + p2717 + p2192 + p2719 + p2720 + p2721 + p2722 + p2723 + p2191 + p2183 + p2182 + p2181 + p2180 + p2179 + p2177 + p2731 + p2732 + p2733 + p2734 + p2735 + p2176 + p2737 + p2738 + p2739 + p2740 + p2741 + p2175 + p2743 + p2744 + p2745 + p2746 + p2747 + p2174 + p2749 + p2750 + p2751 + p2752 + p2753 + p2173 + p2755 + p2756 + p2757 + p2758 + p2759 + p2171 + p2170 + p2169 + p2168 + p2167 + p2165 + p2164 + p2767 + p2768 + p2769 + p2770 + p2771 + p2163 + p2773 + p2774 + p2775 + p2776 + p2777 + p2162 + p2779 + p2780 + p2781 + p2782 + p2783 + p2161 + p2785 + p2786 + p2787 + p2788 + p2789 + p2159 + p2791 + p2792 + p2793 + p2794 + p2795 + p2158 + p2157 + p2156 + p2155 + p2147 + p2146 + p2145 + p2144 + p2143 + p2141 + p2140 + p2139 + p2138 + p2137 + p2135 + p2134 + p2133 + p2132 + p2131 + p2129 + p2128 + p2127 + p2803 + p2804 + p2805 + p2806 + p2807 + p2126 + p2809 + p2810 + p2811 + p2812 + p2813 + p2125 + p2815 + p2816 + p2817 + p2818 + p2819 + p2123 + p2821 + p2822 + p2823 + p2824 + p2825 + p2122 + p2827 + p2828 + p2829 + p2830 + p2831 + p2121 + p2120 + p2119 + p2111 + p2110 + p2839 + p2840 + p2841 + p2842 + p2843 + p2845 + p2846 + p2847 + p2848 + p2849 + p2851 + p2852 + p2853 + p2854 + p2855 + p2857 + p2858 + p2859 + p2860 + p2861 + p2863 + p2864 + p2109 + p2865 + p2108 + p2866 + p2107 + p2867 + p2105 + p2104 + p2103 + p2102 + p2101 + p2875 + p2876 + p2877 + p2878 + p2879 + p2881 + p2882 + p2883 + p2884 + p2885 + p2887 + p2888 + p2889 + p2890 + p2891 + p2893 + p2894 + p2895 + p2896 + p2897 + p2099 + p2098 + p2097 + p2096 + p2095 + p2093 + p2092 + p2091 + p2090 + p2089 + p2087 + p2086 + p2085 + p2084 + p2083 + p2075 + p2074 + p2073 + p2072 + p2071 + p2069 + p2068 + p1603 + p2067 + p1604 + p1605 + p2066 + p1606 + p2065 + p1607 + p2063 + p2062 + p2061 + p2060 + p2059 + p2057 + p2056 + p2055 + p2054 + p2053 + p2051 + p2050 + p1615 + p2049 + p1616 + p1617 + p2048 + p1618 + p1619 + p2047 + p2039 + p2038 + p2037 + p2036 + p2035 + p2033 + p2032 + p1621 + p2031 + p1622 + p1623 + p2030 + p1624 + p2029 + p1625 + p2027 + p2026 + p1627 + p2025 + p1628 + p1629 + p2024 + p1630 + p2023 + p1631 + p2021 + p2020 + p1633 + p2019 + p1634 + p1635 + p2018 + p1636 + p2017 + p1637 + p2015 + p1639 + p2014 + p2013 + p1640 + p1641 + p2012 + p1642 + p2011 + p1643 + p2003 + p2002 + p2001 + p2000 + p1651 + p1652 + p1653 + p1654 + p1655 + p1657 + p1658 + p1659 + p1660 + p1661 + p1663 + p1664 + p1665 + p1666 + p1667 + p1669 + p1670 + p1671 + p1672 + p1673 + p1999 + p1675 + p1676 + p1677 + p1678 + p1679 + p1997 + p1996 + p1995 + p1994 + p1993 + p1991 + p1990 + p1687 + p1688 + p1689 + p1690 + p1691 + p1989 + p1693 + p1694 + p1695 + p1696 + p1697 + p1988 + p1699 + p1700 + p1701 + p1702 + p1703 + p1987 + p1705 + p1706 + p1707 + p1708 + p1709 + p1985 + p1711 + p1712 + p1713 + p1714 + p1715 + p1984 + p1983 + p1982 + p1981 + p1979 + p1978 + p1977 + p1723 + p1724 + p1725 + p1726 + p1727 + p1976 + p1729 + p1730 + p1731 + p1732 + p1733 + p1975 + p1735 + p1736 + p1737 + p1738 + p1739 + p1967 + p1741 + p1742 + p1743 + p1744 + p1745 + p1966 + p1747 + p1748 + p1749 + p1750 + p1751 + p1965 + p1964 + p1963 + p1961 + p1960 + p1959 + p1958 + p1759 + p1760 + p1761 + p1762 + p1763 + p1957 + p1765 + p1766 + p1767 + p1768 + p1769 + p1955 + p1771 + p1772 + p1773 + p1774 + p1775 + p1954 + p1777 + p1778 + p1779 + p1780 + p1781 + p1953 + p1783 + p1784 + p1785 + p1786 + p1787 + p1952 + p1951 + p1949 + p1948 + p1947 + p1946 + p1945 + p1795 + p1796 + p1797 + p1798 + p1799 + p1943 + p1801 + p1802 + p1803 + p1804 + p1805 + p1942 + p1807 + p1808 + p1809 + p1810 + p1811 + p1941 + p1813 + p1814 + p1815 + p1816 + p1817 + p1940 + p1819 + p1820 + p1821 + p1822 + p1823 + p1939 + p1931 + p1930 + p1929 + p1928 + p1927 + p1925 + p1831 + p1832 + p1833 + p1834 + p1835 + p1924 + p1837 + p1838 + p1839 + p1840 + p1841 + p1923 + p1843 + p1844 + p1845 + p1846 + p1847 + p1922 + p1849 + p1850 + p1851 + p1852 + p1853 + p1921 + p1855 + p1856 + p1857 + p1858 + p1859 + p1919 + p1918 + p1917 + p1916 + p1915 + p1913 + p1912 + p1867 + p1868 + p1869 + p1870 + p1871 + p1911 + p1873 + p1874 + p1875 + p1876 + p1877 + p1910 + p1879 + p1880 + p1881 + p1882 + p1883 + p1909 + p1885 + p1886 + p1887 + p1888 + p1889 + p1907 + p1891 + p1892 + p1893 + p1894 + p1895 + p1906 + p1905 + p1904 + p1903 <= p1600 + p1599 + p1598 + p1597 + p1596 + p1595 + p1594 + p1593 + p1592 + p1591 + p1590 + p1588 + p1587 + p1586 + p1585 + p1584 + p1583 + p1582 + p1581 + p1580 + p1579 + p1578 + p1576 + p1575 + p1574 + p1573 + p1572 + p1571 + p1570 + p1569 + p1568 + p1567 + p1566 + p1564 + p1563 + p1562 + p1561 + p1560 + p1559 + p1558 + p1557 + p1556 + p1555 + p1554 + p1552 + p1551 + p1550 + p1549 + p1548 + p1547 + p1546 + p1545 + p1544 + p1543 + p1542 + p1540 + p1539 + p1538 + p1537 + p1536 + p1535 + p1534 + p1533 + p1532 + p1531 + p1530 + p1541 + p1553 + p1565 + p1577 + p1589 + p1601)
lola: after: (p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 + p2765 + p2166 + p2764 + p2763 + p2762 + p2761 + p2760 + p2172 + p2754 + p2748 + p2742 + p2736 + p2730 + p2178 + p2729 + p2728 + p2727 + p2726 + p2725 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2724 + p2718 + p2712 + p2706 + p2700 + p2196 + p2694 + p2693 + p2692 + p2691 + p2690 + p2689 + p2688 + p2682 + p2676 + p2670 + p2664 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p2652 + p2646 + p2640 + p2634 + p2628 + p2622 + p2621 + p2202 + p2620 + p2619 + p2618 + p2617 + p2616 + p2208 + p2610 + p2604 + p2214 + p2598 + p2592 + p2586 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2585 + p2584 + p2583 + p2582 + p2581 + p2232 + p2580 + p2238 + p2574 + p2568 + p2562 + p2556 + p2244 + p2550 + p2549 + p2548 + p2547 + p2546 + p2250 + p2545 + p2544 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2538 + p2532 + p2526 + p2268 + p2520 + p2514 + p2513 + p2512 + p2511 + p2274 + p2510 + p2280 + p2509 + p2508 + p2502 + p2286 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2496 + p2490 + p2484 + p2478 + p2477 + p2476 + p2475 + p2474 + p2473 + p2472 + p2466 + p2460 + p2454 + p2448 + p2442 + p2441 + p2440 + p2439 + p2438 + p2437 + p2436 + p2430 + p2424 + p2418 + p2412 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p2400 + p2394 + p2388 + p2382 + p2376 + p2370 + p2369 + p2368 + p2367 + p2366 + p2304 + p2365 + p2364 + p2358 + p2352 + p2346 + p2340 + p2334 + p2333 + p2332 + p2331 + p2310 + p2330 + p2329 + p2328 + p2322 + p2316 <= 5)
lola: place invariant simplifies atomic proposition
lola: before: (p3000 + p3001 + p3003 + p3004 + p2998 + p3006 + p3007 + p2997 + p3009 + p3010 + p2995 + p3012 + p3013 + p2994 + p3015 + p3016 + p3018 + p3019 + p2992 + p3021 + p3022 + p2991 + p3024 + p3025 + p2989 + p3027 + p3028 + p2988 + p2986 + p2985 + p2983 + p2982 + p2980 + p2979 + p2977 + p2976 + p2974 + p2973 + p2971 + p2970 + p2968 + p2967 + p2965 + p2964 + p2962 + p2961 + p2959 + p2958 + p2956 + p2955 + p2953 + p2952 + p2950 + p2949 + p2947 + p2946 + p2944 + p2943 + p2941 + p2940 + p2938 + p2937 + p2935 + p2934 + p2932 + p2931 + p2929 + p2928 + p2926 + p2925 + p2923 + p2922 + p2924 + p2927 + p2930 + p2933 + p2936 + p2939 + p2942 + p2945 + p2948 + p2951 + p2954 + p2957 + p2960 + p2963 + p2966 + p2969 + p2972 + p2975 + p2978 + p2981 + p2984 + p2987 + p3029 + p3026 + p2990 + p3023 + p3020 + p2993 + p3017 + p3014 + p3011 + p2996 + p3008 + p3005 + p2999 + p3002 <= p3054 + p3055 + p3056 + p3057 + p3058 + p3059 + p3060 + p3061 + p3062 + p3063 + p3064 + p3065 + p3066 + p3067 + p3068 + p3069 + p3070 + p3071 + p3072 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p3081 + p3082 + p3083)
lola: after: (25 <= p3054 + p3055 + p3056 + p3057 + p3058 + p3059 + p3060 + p3061 + p3062 + p3063 + p3064 + p3065 + p3066 + p3067 + p3068 + p3069 + p3070 + p3071 + p3072 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p3081 + p3082 + p3083)
lola: LP says that atomic proposition is always false: (25 <= p3054 + p3055 + p3056 + p3057 + p3058 + p3059 + p3060 + p3061 + p3062 + p3063 + p3064 + p3065 + p3066 + p3067 + p3068 + p3069 + p3070 + p3071 + p3072 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p3081 + p3082 + p3083)
lola: place invariant simplifies atomic proposition
lola: before: (p3000 + p3001 + p3003 + p3004 + p2998 + p3006 + p3007 + p2997 + p3009 + p3010 + p2995 + p3012 + p3013 + p2994 + p3015 + p3016 + p3018 + p3019 + p2992 + p3021 + p3022 + p2991 + p3024 + p3025 + p2989 + p3027 + p3028 + p2988 + p2986 + p2985 + p2983 + p2982 + p2980 + p2979 + p2977 + p2976 + p2974 + p2973 + p2971 + p2970 + p2968 + p2967 + p2965 + p2964 + p2962 + p2961 + p2959 + p2958 + p2956 + p2955 + p2953 + p2952 + p2950 + p2949 + p2947 + p2946 + p2944 + p2943 + p2941 + p2940 + p2938 + p2937 + p2935 + p2934 + p2932 + p2931 + p2929 + p2928 + p2926 + p2925 + p2923 + p2922 + p2924 + p2927 + p2930 + p2933 + p2936 + p2939 + p2942 + p2945 + p2948 + p2951 + p2954 + p2957 + p2960 + p2963 + p2966 + p2969 + p2972 + p2975 + p2978 + p2981 + p2984 + p2987 + p3029 + p3026 + p2990 + p3023 + p3020 + p2993 + p3017 + p3014 + p3011 + p2996 + p3008 + p3005 + p2999 + p3002 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: after: (25 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: LP says that atomic proposition is always false: (25 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: place invariant simplifies atomic proposition
lola: before: (p3036 + p3037 + p3039 + p3040 + p3042 + p3043 + p3045 + p3046 + p3048 + p3049 + p3051 + p3052 + p3053 + p3050 + p3047 + p3044 + p3041 + p3038 <= p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 + p2765 + p2166 + p2764 + p2763 + p2762 + p2761 + p2760 + p2172 + p2754 + p2748 + p2742 + p2736 + p2730 + p2178 + p2729 + p2728 + p2727 + p2726 + p2725 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2724 + p2718 + p2712 + p2706 + p2700 + p2196 + p2694 + p2693 + p2692 + p2691 + p2690 + p2689 + p2688 + p2682 + p2676 + p2670 + p2664 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p2652 + p2646 + p2640 + p2634 + p2628 + p2622 + p2621 + p2202 + p2620 + p2619 + p2618 + p2617 + p2616 + p2208 + p2610 + p2604 + p2214 + p2598 + p2592 + p2586 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2585 + p2584 + p2583 + p2582 + p2581 + p2232 + p2580 + p2238 + p2574 + p2568 + p2562 + p2556 + p2244 + p2550 + p2549 + p2548 + p2547 + p2546 + p2250 + p2545 + p2544 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2538 + p2532 + p2526 + p2268 + p2520 + p2514 + p2513 + p2512 + p2511 + p2274 + p2510 + p2280 + p2509 + p2508 + p2502 + p2286 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2496 + p2490 + p2484 + p2478 + p2477 + p2476 + p2475 + p2474 + p2473 + p2472 + p2466 + p2460 + p2454 + p2448 + p2442 + p2441 + p2440 + p2439 + p2438 + p2437 + p2436 + p2430 + p2424 + p2418 + p2412 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p2400 + p2394 + p2388 + p2382 + p2376 + p2370 + p2369 + p2368 + p2367 + p2366 + p2304 + p2365 + p2364 + p2358 + p2352 + p2346 + p2340 + p2334 + p2333 + p2332 + p2331 + p2310 + p2330 + p2329 + p2328 + p2322 + p2316 + p2315 + p2317 + p2318 + p2319 + p2320 + p2321 + p2314 + p2323 + p2324 + p2325 + p2326 + p2327 + p2313 + p2312 + p2311 + p2335 + p2336 + p2337 + p2338 + p2339 + p2341 + p2342 + p2343 + p2344 + p2345 + p2347 + p2348 + p2349 + p2350 + p2351 + p2353 + p2354 + p2355 + p2356 + p2357 + p2359 + p2309 + p2360 + p2361 + p2308 + p2362 + p2307 + p2363 + p2306 + p2305 + p2303 + p2302 + p2301 + p2300 + p2371 + p2372 + p2373 + p2374 + p2375 + p2377 + p2378 + p2379 + p2380 + p2381 + p2383 + p2384 + p2385 + p2386 + p2387 + p2389 + p2390 + p2391 + p2392 + p2393 + p2395 + p2396 + p2397 + p2398 + p2399 + p2407 + p2408 + p2409 + p2410 + p2411 + p2413 + p2414 + p2415 + p2416 + p2417 + p2419 + p2420 + p2421 + p2422 + p2423 + p2425 + p2426 + p2427 + p2428 + p2429 + p2431 + p2432 + p2433 + p2434 + p2435 + p2443 + p2444 + p2445 + p2446 + p2447 + p2449 + p2450 + p2451 + p2452 + p2453 + p2455 + p2456 + p2457 + p2458 + p2459 + p2461 + p2462 + p2463 + p2464 + p2465 + p2467 + p2468 + p2469 + p2470 + p2471 + p2479 + p2480 + p2481 + p2482 + p2483 + p2485 + p2486 + p2487 + p2488 + p2489 + p2491 + p2492 + p2493 + p2494 + p2495 + p2497 + p2498 + p2499 + p2299 + p2291 + p2290 + p2289 + p2288 + p2287 + p2285 + p2500 + p2501 + p2284 + p2503 + p2504 + p2505 + p2506 + p2507 + p2283 + p2282 + p2281 + p2279 + p2278 + p2277 + p2276 + p2275 + p2273 + p2272 + p2271 + p2270 + p2515 + p2516 + p2517 + p2518 + p2519 + p2269 + p2521 + p2522 + p2523 + p2524 + p2525 + p2267 + p2527 + p2528 + p2529 + p2530 + p2531 + p2266 + p2533 + p2534 + p2535 + p2536 + p2537 + p2265 + p2264 + p2539 + p2263 + p2255 + p2540 + p2541 + p2254 + p2542 + p2253 + p2543 + p2252 + p2251 + p2249 + p2248 + p2247 + p2246 + p2245 + p2551 + p2552 + p2553 + p2554 + p2555 + p2243 + p2557 + p2558 + p2559 + p2560 + p2561 + p2242 + p2563 + p2564 + p2565 + p2566 + p2567 + p2241 + p2569 + p2570 + p2571 + p2572 + p2573 + p2240 + p2239 + p2575 + p2237 + p2576 + p2236 + p2577 + p2235 + p2578 + p2234 + p2579 + p2233 + p2231 + p2230 + p2229 + p2228 + p2227 + p2219 + p2587 + p2588 + p2589 + p2590 + p2591 + p2218 + p2593 + p2594 + p2595 + p2596 + p2597 + p2217 + p2599 + p2216 + p2215 + p2213 + p2212 + p2211 + p2210 + p2600 + p2601 + p2602 + p2603 + p2605 + p2606 + p2607 + p2608 + p2609 + p2209 + p2611 + p2612 + p2613 + p2614 + p2615 + p2207 + p2206 + p2205 + p2204 + p2203 + p2201 + p2200 + p2623 + p2624 + p2625 + p2626 + p2627 + p2629 + p2630 + p2631 + p2632 + p2633 + p2635 + p2636 + p2637 + p2638 + p2639 + p2641 + p2642 + p2643 + p2644 + p2645 + p2647 + p2648 + p2649 + p2650 + p2651 + p2659 + p2660 + p2661 + p2662 + p2663 + p2665 + p2666 + p2667 + p2668 + p2669 + p2671 + p2672 + p2673 + p2674 + p2675 + p2677 + p2678 + p2679 + p2680 + p2681 + p2683 + p2684 + p2685 + p2686 + p2687 + p2695 + p2696 + p2697 + p2698 + p2699 + p2199 + p2198 + p2197 + p2195 + p2701 + p2702 + p2703 + p2704 + p2705 + p2194 + p2707 + p2708 + p2709 + p2710 + p2711 + p2193 + p2713 + p2714 + p2715 + p2716 + p2717 + p2192 + p2719 + p2720 + p2721 + p2722 + p2723 + p2191 + p2183 + p2182 + p2181 + p2180 + p2179 + p2177 + p2731 + p2732 + p2733 + p2734 + p2735 + p2176 + p2737 + p2738 + p2739 + p2740 + p2741 + p2175 + p2743 + p2744 + p2745 + p2746 + p2747 + p2174 + p2749 + p2750 + p2751 + p2752 + p2753 + p2173 + p2755 + p2756 + p2757 + p2758 + p2759 + p2171 + p2170 + p2169 + p2168 + p2167 + p2165 + p2164 + p2767 + p2768 + p2769 + p2770 + p2771 + p2163 + p2773 + p2774 + p2775 + p2776 + p2777 + p2162 + p2779 + p2780 + p2781 + p2782 + p2783 + p2161 + p2785 + p2786 + p2787 + p2788 + p2789 + p2159 + p2791 + p2792 + p2793 + p2794 + p2795 + p2158 + p2157 + p2156 + p2155 + p2147 + p2146 + p2145 + p2144 + p2143 + p2141 + p2140 + p2139 + p2138 + p2137 + p2135 + p2134 + p2133 + p2132 + p2131 + p2129 + p2128 + p2127 + p2803 + p2804 + p2805 + p2806 + p2807 + p2126 + p2809 + p2810 + p2811 + p2812 + p2813 + p2125 + p2815 + p2816 + p2817 + p2818 + p2819 + p2123 + p2821 + p2822 + p2823 + p2824 + p2825 + p2122 + p2827 + p2828 + p2829 + p2830 + p2831 + p2121 + p2120 + p2119 + p2111 + p2110 + p2839 + p2840 + p2841 + p2842 + p2843 + p2845 + p2846 + p2847 + p2848 + p2849 + p2851 + p2852 + p2853 + p2854 + p2855 + p2857 + p2858 + p2859 + p2860 + p2861 + p2863 + p2864 + p2109 + p2865 + p2108 + p2866 + p2107 + p2867 + p2105 + p2104 + p2103 + p2102 + p2101 + p2875 + p2876 + p2877 + p2878 + p2879 + p2881 + p2882 + p2883 + p2884 + p2885 + p2887 + p2888 + p2889 + p2890 + p2891 + p2893 + p2894 + p2895 + p2896 + p2897 + p2099 + p2098 + p2097 + p2096 + p2095 + p2093 + p2092 + p2091 + p2090 + p2089 + p2087 + p2086 + p2085 + p2084 + p2083 + p2075 + p2074 + p2073 + p2072 + p2071 + p2069 + p2068 + p1603 + p2067 + p1604 + p1605 + p2066 + p1606 + p2065 + p1607 + p2063 + p2062 + p2061 + p2060 + p2059 + p2057 + p2056 + p2055 + p2054 + p2053 + p2051 + p2050 + p1615 + p2049 + p1616 + p1617 + p2048 + p1618 + p1619 + p2047 + p2039 + p2038 + p2037 + p2036 + p2035 + p2033 + p2032 + p1621 + p2031 + p1622 + p1623 + p2030 + p1624 + p2029 + p1625 + p2027 + p2026 + p1627 + p2025 + p1628 + p1629 + p2024 + p1630 + p2023 + p1631 + p2021 + p2020 + p1633 + p2019 + p1634 + p1635 + p2018 + p1636 + p2017 + p1637 + p2015 + p1639 + p2014 + p2013 + p1640 + p1641 + p2012 + p1642 + p2011 + p1643 + p2003 + p2002 + p2001 + p2000 + p1651 + p1652 + p1653 + p1654 + p1655 + p1657 + p1658 + p1659 + p1660 + p1661 + p1663 + p1664 + p1665 + p1666 + p1667 + p1669 + p1670 + p1671 + p1672 + p1673 + p1999 + p1675 + p1676 + p1677 + p1678 + p1679 + p1997 + p1996 + p1995 + p1994 + p1993 + p1991 + p1990 + p1687 + p1688 + p1689 + p1690 + p1691 + p1989 + p1693 + p1694 + p1695 + p1696 + p1697 + p1988 + p1699 + p1700 + p1701 + p1702 + p1703 + p1987 + p1705 + p1706 + p1707 + p1708 + p1709 + p1985 + p1711 + p1712 + p1713 + p1714 + p1715 + p1984 + p1983 + p1982 + p1981 + p1979 + p1978 + p1977 + p1723 + p1724 + p1725 + p1726 + p1727 + p1976 + p1729 + p1730 + p1731 + p1732 + p1733 + p1975 + p1735 + p1736 + p1737 + p1738 + p1739 + p1967 + p1741 + p1742 + p1743 + p1744 + p1745 + p1966 + p1747 + p1748 + p1749 + p1750 + p1751 + p1965 + p1964 + p1963 + p1961 + p1960 + p1959 + p1958 + p1759 + p1760 + p1761 + p1762 + p1763 + p1957 + p1765 + p1766 + p1767 + p1768 + p1769 + p1955 + p1771 + p1772 + p1773 + p1774 + p1775 + p1954 + p1777 + p1778 + p1779 + p1780 + p1781 + p1953 + p1783 + p1784 + p1785 + p1786 + p1787 + p1952 + p1951 + p1949 + p1948 + p1947 + p1946 + p1945 + p1795 + p1796 + p1797 + p1798 + p1799 + p1943 + p1801 + p1802 + p1803 + p1804 + p1805 + p1942 + p1807 + p1808 + p1809 + p1810 + p1811 + p1941 + p1813 + p1814 + p1815 + p1816 + p1817 + p1940 + p1819 + p1820 + p1821 + p1822 + p1823 + p1939 + p1931 + p1930 + p1929 + p1928 + p1927 + p1925 + p1831 + p1832 + p1833 + p1834 + p1835 + p1924 + p1837 + p1838 + p1839 + p1840 + p1841 + p1923 + p1843 + p1844 + p1845 + p1846 + p1847 + p1922 + p1849 + p1850 + p1851 + p1852 + p1853 + p1921 + p1855 + p1856 + p1857 + p1858 + p1859 + p1919 + p1918 + p1917 + p1916 + p1915 + p1913 + p1912 + p1867 + p1868 + p1869 + p1870 + p1871 + p1911 + p1873 + p1874 + p1875 + p1876 + p1877 + p1910 + p1879 + p1880 + p1881 + p1882 + p1883 + p1909 + p1885 + p1886 + p1887 + p1888 + p1889 + p1907 + p1891 + p1892 + p1893 + p1894 + p1895 + p1906 + p1905 + p1904 + p1903)
lola: after: (5 <= p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 + p2765 + p2166 + p2764 + p2763 + p2762 + p2761 + p2760 + p2172 + p2754 + p2748 + p2742 + p2736 + p2730 + p2178 + p2729 + p2728 + p2727 + p2726 + p2725 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2724 + p2718 + p2712 + p2706 + p2700 + p2196 + p2694 + p2693 + p2692 + p2691 + p2690 + p2689 + p2688 + p2682 + p2676 + p2670 + p2664 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p2652 + p2646 + p2640 + p2634 + p2628 + p2622 + p2621 + p2202 + p2620 + p2619 + p2618 + p2617 + p2616 + p2208 + p2610 + p2604 + p2214 + p2598 + p2592 + p2586 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2585 + p2584 + p2583 + p2582 + p2581 + p2232 + p2580 + p2238 + p2574 + p2568 + p2562 + p2556 + p2244 + p2550 + p2549 + p2548 + p2547 + p2546 + p2250 + p2545 + p2544 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2538 + p2532 + p2526 + p2268 + p2520 + p2514 + p2513 + p2512 + p2511 + p2274 + p2510 + p2280 + p2509 + p2508 + p2502 + p2286 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2496 + p2490 + p2484 + p2478 + p2477 + p2476 + p2475 + p2474 + p2473 + p2472 + p2466 + p2460 + p2454 + p2448 + p2442 + p2441 + p2440 + p2439 + p2438 + p2437 + p2436 + p2430 + p2424 + p2418 + p2412 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p2400 + p2394 + p2388 + p2382 + p2376 + p2370 + p2369 + p2368 + p2367 + p2366 + p2304 + p2365 + p2364 + p2358 + p2352 + p2346 + p2340 + p2334 + p2333 + p2332 + p2331 + p2310 + p2330 + p2329 + p2328 + p2322 + p2316)
lola: place invariant simplifies atomic proposition
lola: before: (p2910 + p2911 + p2912 + p2913 + p2914 + p2915 <= p3089 + p3088 + p3087 + p3086 + p3085 + p3084)
lola: after: (0 <= 0)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (2 <= p1600 + p1599 + p1598 + p1597 + p1596 + p1595 + p1594 + p1593 + p1592 + p1591 + p1590 + p1588 + p1587 + p1586 + p1585 + p1584 + p1583 + p1582 + p1581 + p1580 + p1579 + p1578 + p1576 + p1575 + p1574 + p1573 + p1572 + p1571 + p1570 + p1569 + p1568 + p1567 + p1566 + p1564 + p1563 + p1562 + p1561 + p1560 + p1559 + p1558 + p1557 + p1556 + p1555 + p1554 + p1552 + p1551 + p1550 + p1549 + p1548 + p1547 + p1546 + p1545 + p1544 + p1543 + p1542 + p1540 + p1539 + p1538 + p1537 + p1536 + p1535 + p1534 + p1533 + p1532 + p1531 + p1530 + p1541 + p1553 + p1565 + p1577 + p1589 + p1601)
lola: after: (0 <= 3)
lola: always true
lola: LP says that atomic proposition is always false: (2 <= p1319 + p1318 + p1317 + p1316 + p1315 + p1314)
lola: LP says that atomic proposition is always false: (3 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: LP says that atomic proposition is always false: (1 <= p0 + p1 + p2 + p3 + p4 + p5)
lola: place invariant simplifies atomic proposition
lola: before: (p1350 + p1351 + p1352 + p1353 + p1354 + p1355 + p1356 + p1357 + p1358 + p1359 + p1360 + p1361 + p1362 + p1363 + p1364 + p1365 + p1366 + p1367 + p1368 + p1369 + p1370 + p1371 + p1372 + p1373 + p1374 + p1375 + p1376 + p1377 + p1378 + p1379 + p1380 + p1381 + p1382 + p1383 + p1384 + p1385 + p1386 + p1387 + p1388 + p1389 + p1390 + p1391 + p1392 + p1393 + p1394 + p1395 + p1396 + p1397 + p1398 + p1399 + p1400 + p1401 + p1402 + p1403 + p1404 + p1405 + p1406 + p1407 + p1408 + p1409 + p1410 + p1411 + p1412 + p1413 + p1414 + p1415 + p1416 + p1417 + p1418 + p1419 + p1420 + p1421 + p1422 + p1423 + p1424 + p1425 + p1426 + p1427 + p1428 + p1429 + p1430 + p1431 + p1432 + p1433 + p1434 + p1435 + p1436 + p1437 + p1438 + p1439 + p1440 + p1441 + p1442 + p1443 + p1444 + p1445 + p1446 + p1447 + p1448 + p1449 + p1450 + p1451 + p1452 + p1453 + p1454 + p1455 + p1456 + p1457 + p1458 + p1459 + p1460 + p1461 + p1462 + p1463 + p1464 + p1465 + p1466 + p1467 + p1468 + p1469 + p1470 + p1471 + p1472 + p1473 + p1474 + p1475 + p1476 + p1477 + p1478 + p1479 + p1480 + p1481 + p1482 + p1483 + p1484 + p1485 + p1486 + p1487 + p1488 + p1489 + p1490 + p1491 + p1492 + p1493 + p1494 + p1495 + p1496 + p1497 + p1498 + p1499 + p1500 + p1501 + p1502 + p1503 + p1504 + p1505 + p1506 + p1507 + p1508 + p1509 + p1510 + p1511 + p1512 + p1513 + p1514 + p1515 + p1516 + p1517 + p1518 + p1519 + p1520 + p1521 + p1522 + p1523 + p1524 + p1525 + p1526 + p1527 + p1528 + p1529 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: after: (20 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: LP says that atomic proposition is always false: (20 <= p1349 + p1348 + p1347 + p1346 + p1345 + p1344 + p1343 + p1342 + p1341 + p1340 + p1339 + p1338 + p1337 + p1336 + p1335 + p1334 + p1333 + p1332 + p1331 + p1330 + p1329 + p1328 + p1327 + p1326 + p1325 + p1324 + p1323 + p1322 + p1321 + p1320)
lola: place invariant simplifies atomic proposition
lola: before: (2 <= p3036 + p3037 + p3039 + p3040 + p3042 + p3043 + p3045 + p3046 + p3048 + p3049 + p3051 + p3052 + p3053 + p3050 + p3047 + p3044 + p3041 + p3038)
lola: after: (0 <= 3)
lola: always true
lola: place invariant simplifies atomic proposition
lola: before: (3 <= p1350 + p1351 + p1352 + p1353 + p1354 + p1355 + p1356 + p1357 + p1358 + p1359 + p1360 + p1361 + p1362 + p1363 + p1364 + p1365 + p1366 + p1367 + p1368 + p1369 + p1370 + p1371 + p1372 + p1373 + p1374 + p1375 + p1376 + p1377 + p1378 + p1379 + p1380 + p1381 + p1382 + p1383 + p1384 + p1385 + p1386 + p1387 + p1388 + p1389 + p1390 + p1391 + p1392 + p1393 + p1394 + p1395 + p1396 + p1397 + p1398 + p1399 + p1400 + p1401 + p1402 + p1403 + p1404 + p1405 + p1406 + p1407 + p1408 + p1409 + p1410 + p1411 + p1412 + p1413 + p1414 + p1415 + p1416 + p1417 + p1418 + p1419 + p1420 + p1421 + p1422 + p1423 + p1424 + p1425 + p1426 + p1427 + p1428 + p1429 + p1430 + p1431 + p1432 + p1433 + p1434 + p1435 + p1436 + p1437 + p1438 + p1439 + p1440 + p1441 + p1442 + p1443 + p1444 + p1445 + p1446 + p1447 + p1448 + p1449 + p1450 + p1451 + p1452 + p1453 + p1454 + p1455 + p1456 + p1457 + p1458 + p1459 + p1460 + p1461 + p1462 + p1463 + p1464 + p1465 + p1466 + p1467 + p1468 + p1469 + p1470 + p1471 + p1472 + p1473 + p1474 + p1475 + p1476 + p1477 + p1478 + p1479 + p1480 + p1481 + p1482 + p1483 + p1484 + p1485 + p1486 + p1487 + p1488 + p1489 + p1490 + p1491 + p1492 + p1493 + p1494 + p1495 + p1496 + p1497 + p1498 + p1499 + p1500 + p1501 + p1502 + p1503 + p1504 + p1505 + p1506 + p1507 + p1508 + p1509 + p1510 + p1511 + p1512 + p1513 + p1514 + p1515 + p1516 + p1517 + p1518 + p1519 + p1520 + p1521 + p1522 + p1523 + p1524 + p1525 + p1526 + p1527 + p1528 + p1529)
lola: after: (0 <= 17)
lola: always true
lola: A ((FALSE U X (TRUE))) : A (G (G (G (G (TRUE))))) : A (FALSE) : A (F (X (G ((p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 + p2765 + p2166 + p2764 + p2763 + p2762 + p2761 + p2760 + p2172 + p2754 + p2748 + p2742 + p2736 + p2730 + p2178 + p2729 + p2728 + p2727 + p2726 + p2725 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2724 + p2718 + p2712 + p2706 + p2700 + p2196 + p2694 + p2693 + p2692 + p2691 + p2690 + p2689 + p2688 + p2682 + p2676 + p2670 + p2664 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p2652 + p2646 + p2640 + p2634 + p2628 + p2622 + p2621 + p2202 + p2620 + p2619 + p2618 + p2617 + p2616 + p2208 + p2610 + p2604 + p2214 + p2598 + p2592 + p2586 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2585 + p2584 + p2583 + p2582 + p2581 + p2232 + p2580 + p2238 + p2574 + p2568 + p2562 + p2556 + p2244 + p2550 + p2549 + p2548 + p2547 + p2546 + p2250 + p2545 + p2544 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2538 + p2532 + p2526 + p2268 + p2520 + p2514 + p2513 + p2512 + p2511 + p2274 + p2510 + p2280 + p2509 + p2508 + p2502 + p2286 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2496 + p2490 + p2484 + p2478 + p2477 + p2476 + p2475 + p2474 + p2473 + p2472 + p2466 + p2460 + p2454 + p2448 + p2442 + p2441 + p2440 + p2439 + p2438 + p2437 + p2436 + p2430 + p2424 + p2418 + p2412 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p2400 + p2394 + p2388 + p2382 + p2376 + p2370 + p2369 + p2368 + p2367 + p2366 + p2304 + p2365 + p2364 + p2358 + p2352 + p2346 + p2340 + p2334 + p2333 + p2332 + p2331 + p2310 + p2330 + p2329 + p2328 + p2322 + p2316 <= 5))))) : A (F (X (X (F ((3 <= p6 + p7 + p8 + p9 + p11 + p10)))))) : A (G (G (FALSE))) : A (F ((G (FALSE) U X ((3 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903))))) : A (X ((F ((3 <= p1313 + p1312 + p1311 + p1310 + p1309 + p1308)) U F ((5 <= p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 + p1790 + p1950 + p1789 + p1788 + p1782 + p1776 + p1770 + p1956 + p1764 + p1758 + p1757 + p1756 + p1755 + p1962 + p1754 + p1753 + p1752 + p1746 + p1740 + p1968 + p1969 + p1970 + p1971 + p1972 + p1973 + p1974 + p1734 + p1728 + p1722 + p1721 + p1720 + p1980 + p1719 + p1718 + p1717 + p1716 + p1710 + p1986 + p1704 + p1698 + p1692 + p1686 + p1685 + p1992 + p1684 + p1683 + p1682 + p1681 + p1680 + p1998 + p1674 + p1668 + p1662 + p1656 + p1650 + p1649 + p1648 + p1647 + p1646 + p1645 + p1644 + p2004 + p2005 + p2006 + p2007 + p2008 + p2009 + p2010 + p1638 + p2016 + p1632 + p2022 + p1626 + p2028 + p1620 + p2034 + p2040 + p2041 + p2042 + p2043 + p2044 + p2045 + p2046 + p1614 + p2052 + p1613 + p1612 + p1611 + p2058 + p1610 + p1609 + p1608 + p2064 + p1602 + p2070 + p2076 + p2077 + p2078 + p2079 + p2080 + p2081 + p2082 + p2088 + p2094 + p2892 + p2886 + p2880 + p2874 + p2873 + p2872 + p2871 + p2870 + p2100 + p2869 + p2868 + p2106 + p2862 + p2856 + p2850 + p2844 + p2838 + p2837 + p2836 + p2835 + p2112 + p2113 + p2114 + p2115 + p2116 + p2117 + p2118 + p2834 + p2833 + p2832 + p2826 + p2820 + p2124 + p2814 + p2808 + p2802 + p2801 + p2800 + p2130 + p2136 + p2142 + p2148 + p2149 + p2150 + p2151 + p2152 + p2153 + p2154 + p2799 + p2798 + p2797 + p2796 + p2790 + p2160 + p2784 + p2778 + p2772 + p2766 + p2765 + p2166 + p2764 + p2763 + p2762 + p2761 + p2760 + p2172 + p2754 + p2748 + p2742 + p2736 + p2730 + p2178 + p2729 + p2728 + p2727 + p2726 + p2725 + p2184 + p2185 + p2186 + p2187 + p2188 + p2189 + p2190 + p2724 + p2718 + p2712 + p2706 + p2700 + p2196 + p2694 + p2693 + p2692 + p2691 + p2690 + p2689 + p2688 + p2682 + p2676 + p2670 + p2664 + p2658 + p2657 + p2656 + p2655 + p2654 + p2653 + p2652 + p2646 + p2640 + p2634 + p2628 + p2622 + p2621 + p2202 + p2620 + p2619 + p2618 + p2617 + p2616 + p2208 + p2610 + p2604 + p2214 + p2598 + p2592 + p2586 + p2220 + p2221 + p2222 + p2223 + p2224 + p2225 + p2226 + p2585 + p2584 + p2583 + p2582 + p2581 + p2232 + p2580 + p2238 + p2574 + p2568 + p2562 + p2556 + p2244 + p2550 + p2549 + p2548 + p2547 + p2546 + p2250 + p2545 + p2544 + p2256 + p2257 + p2258 + p2259 + p2260 + p2261 + p2262 + p2538 + p2532 + p2526 + p2268 + p2520 + p2514 + p2513 + p2512 + p2511 + p2274 + p2510 + p2280 + p2509 + p2508 + p2502 + p2286 + p2292 + p2293 + p2294 + p2295 + p2296 + p2297 + p2298 + p2496 + p2490 + p2484 + p2478 + p2477 + p2476 + p2475 + p2474 + p2473 + p2472 + p2466 + p2460 + p2454 + p2448 + p2442 + p2441 + p2440 + p2439 + p2438 + p2437 + p2436 + p2430 + p2424 + p2418 + p2412 + p2406 + p2405 + p2404 + p2403 + p2402 + p2401 + p2400 + p2394 + p2388 + p2382 + p2376 + p2370 + p2369 + p2368 + p2367 + p2366 + p2304 + p2365 + p2364 + p2358 + p2352 + p2346 + p2340 + p2334 + p2333 + p2332 + p2331 + p2310 + p2330 + p2329 + p2328 + p2322 + p2316))))) : A (X ((TRUE U F (TRUE)))) : A (F (X (G (X ((p6 + p7 + p8 + p9 + p11 + p10 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903)))))) : A (FALSE) : A (X (X ((p3054 + p3055 + p3056 + p3057 + p3058 + p3059 + p3060 + p3061 + p3062 + p3063 + p3064 + p3065 + p3066 + p3067 + p3068 + p3069 + p3070 + p3071 + p3072 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p3081 + p3082 + p3083 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903)))) : A (X ((X ((2 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903)) U G (FALSE)))) : A (FALSE) : A (FALSE) : A (F ((G (TRUE) U X (TRUE))))
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:380
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:347
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:185
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:422
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:353
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:380
lola: rewrite Frontend/Parser/formula_rewrite.k:380
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:163
lola: rewrite Frontend/Parser/formula_rewrite.k:180
lola: rewrite Frontend/Parser/formula_rewrite.k:145
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:98
lola: rewrite Frontend/Parser/formula_rewrite.k:151
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:160
lola: rewrite Frontend/Parser/formula_rewrite.k:100
lola: rewrite Frontend/Parser/formula_rewrite.k:169
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: rewrite Frontend/Parser/formula_rewrite.k:356
lola: rewrite Frontend/Parser/formula_rewrite.k:154
lola: computing a collection of formulas
lola: RUNNING
lola: subprocess 0 will run for 221 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: TRUE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: TRUE
lola: processed formula length: 4
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: preprocessing
lola: The net satisfies the property already in its initial state.
lola: 0 markings, 0 edges

FORMULA NeoElection-COL-5-LTLCardinality-1 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 1 will run for 236 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges

FORMULA NeoElection-COL-5-LTLCardinality-2 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 2 will run for 253 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-5 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 3 will run for 273 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-10 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 4 will run for 295 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-12 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 5 will run for 322 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-13 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 6 will run for 355 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: FALSE
lola: ========================================
lola: SUBTASK
lola: checking initial satisfaction
lola: processed formula: FALSE
lola: processed formula length: 5
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: processed formula with 0 atomic propositions
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: preprocessing
lola: The net violates the given property already in its initial state.
lola: 0 markings, 0 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-14 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 7 will run for 394 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 6 markings, 5 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-8 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 8 will run for 443 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (X (F ((3 <= p6 + p7 + p8 + p9 + p11 + p10)))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (X (F ((3 <= p6 + p7 + p8 + p9 + p11 + p10)))))
lola: processed formula length: 52
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 21 markings, 30 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-4 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 9 will run for 507 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (X ((p3054 + p3055 + p3056 + p3057 + p3058 + p3059 + p3060 + p3061 + p3062 + p3063 + p3064 + p3065 + p3066 + p3067 + p3068 + p3069 + p3070 + p3071 + p3072 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p3081 + p3082 + p3083 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (X ((p3054 + p3055 + p3056 + p3057 + p3058 + p3059 + p3060 + p3061 + p3062 + p3063 + p3064 + p3065 + p3066 + p3067 + p3068 + p3069 + p3070 + p3071 + p3072 + p3073 + p3074 + p3075 + p3076 + p3077 + p3078 + p3079 + p3080 + p3081 + p3082 + p3083 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903))))
lola: processed formula length: 300
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 4 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 276 markings, 276 edges

FORMULA NeoElection-COL-5-LTLCardinality-11 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 10 will run for 591 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 6 markings, 5 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-0 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 11 will run for 710 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (F ((3 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (F ((3 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903))))
lola: processed formula length: 64
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: no
lola: produced by: LTL model checker
lola: The net does not satisfy the given formula (language of the product automaton is nonempty).
lola: 276 markings, 276 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-6 FALSE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 12 will run for 887 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (F ((5 <= p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (F ((5 <= p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p... (shortened)
lola: processed formula length: 3184
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 2083 markings, 5730 edges

FORMULA NeoElection-COL-5-LTLCardinality-7 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: ========================================
lola: subprocess 13 will run for 1183 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (X (TRUE))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (X (TRUE))
lola: processed formula length: 12
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 3 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: Formula contains X operator; stubborn sets not applicable
lola: SEARCH
lola: RUNNING
lola: SUBRESULT
lola: result: yes
lola: produced by: LTL model checker
lola: The net satisfies the given formula (language of the product automaton is empty).
lola: 6 markings, 5 edges
lola: ========================================

FORMULA NeoElection-COL-5-LTLCardinality-15 TRUE TECHNIQUES COLLATERAL_PROCESSING EXPLICIT TOPOLOGICAL STATE_COMPRESSION STUBBORN_SETS USE_NUPN UNFOLDING_TO_PT
lola: subprocess 14 will run for 1775 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (F (G ((p6 + p7 + p8 + p9 + p11 + p10 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903))))
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (F (G ((p6 + p7 + p8 + p9 + p11 + p10 <= p2898 + p2899 + p2900 + p2901 + p2902 + p2903))))
lola: processed formula length: 92
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
lola: SEARCH
lola: RUNNING
lola: 257380 markings, 608383 edges, 51476 markings/sec, 0 secs
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lola: 71204512 markings, 180441944 edges, 39836 markings/sec, 1500 secs
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lola: 75662133 markings, 192605111 edges, 46028 markings/sec, 1600 secs
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lola: 77743113 markings, 198404370 edges, 46139 markings/sec, 1645 secs
lola: 77976381 markings, 199040634 edges, 46654 markings/sec, 1650 secs
lola: 78209652 markings, 199687570 edges, 46654 markings/sec, 1655 secs
lola: 78443563 markings, 200340734 edges, 46782 markings/sec, 1660 secs
lola: 78672346 markings, 200975941 edges, 45757 markings/sec, 1665 secs
lola: 78900363 markings, 201615305 edges, 45603 markings/sec, 1670 secs
lola: 79126938 markings, 202254127 edges, 45315 markings/sec, 1675 secs
lola: 79371536 markings, 202882632 edges, 48920 markings/sec, 1680 secs
lola: 79627610 markings, 203504875 edges, 51215 markings/sec, 1685 secs
lola: 79884391 markings, 204159236 edges, 51356 markings/sec, 1690 secs
lola: 80137846 markings, 204788330 edges, 50691 markings/sec, 1695 secs
lola: 80397941 markings, 205413649 edges, 52019 markings/sec, 1700 secs
lola: 80656001 markings, 206026731 edges, 51612 markings/sec, 1705 secs
lola: 80915463 markings, 206650780 edges, 51892 markings/sec, 1710 secs
lola: 81167964 markings, 207290133 edges, 50500 markings/sec, 1715 secs
lola: 81409310 markings, 207926652 edges, 48269 markings/sec, 1720 secs
lola: 81649562 markings, 208564263 edges, 48050 markings/sec, 1725 secs
lola: 81894044 markings, 209214503 edges, 48896 markings/sec, 1730 secs
lola: 82132952 markings, 209882835 edges, 47782 markings/sec, 1735 secs
lola: 82372167 markings, 210537880 edges, 47843 markings/sec, 1740 secs
lola: 82608682 markings, 211206406 edges, 47303 markings/sec, 1745 secs
lola: 82832591 markings, 211846852 edges, 44782 markings/sec, 1750 secs
lola: 83074088 markings, 212497117 edges, 48299 markings/sec, 1755 secs
lola: 83306533 markings, 213153121 edges, 46489 markings/sec, 1760 secs
lola: 83534775 markings, 213785263 edges, 45648 markings/sec, 1765 secs
lola: local time limit reached - aborting
lola:
preliminary result: yes yes no unknown yes no no yes yes unknown no no no no no yes
lola: Child process aborted or communication problem between parent and child process
lola: subprocess 15 will run for 1774 seconds at most (--localtimelimit=0)
lola: ========================================
lola: ...considering subproblem: A (F (G ((p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 ... (shortened)
lola: ========================================
lola: SUBTASK
lola: checking LTL
lola: transforming LTL-Formula into a Büchi-Automaton
lola: processed formula: A (F (G ((p1900 + p1901 + p1902 + p1899 + p1898 + p1897 + p1896 + p1890 + p1908 + p1884 + p1878 + p1872 + p1866 + p1865 + p1914 + p1864 + p1863 + p1862 + p1861 + p1860 + p1920 + p1854 + p1848 + p1842 + p1836 + p1830 + p1926 + p1829 + p1828 + p1827 + p1826 + p1825 + p1932 + p1933 + p1934 + p1935 + p1936 + p1937 + p1938 + p1824 + p1818 + p1812 + p1806 + p1800 + p1944 + p1794 + p1793 + p1792 + p1791 ... (shortened)
lola: processed formula length: 3184
lola: 54 rewrites
lola: closed formula file NeoElection-COL-5-LTLCardinality.task
lola: the resulting Büchi automaton has 2 states
lola: STORE
lola: using a simple compression encoder (--encoder=simplecompressed)
lola: using a prefix tree store (--store=prefix)
lola: using ltl preserving stubborn set method (--stubborn)
lola: SEARCH
lola: RUNNING
lola: 249484 markings, 626233 edges, 49897 markings/sec, 0 secs
lola: 488817 markings, 1280940 edges, 47867 markings/sec, 5 secs
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lola: 21056503 markings, 68543066 edges, 41375 markings/sec, 505 secs
lola: 21266149 markings, 69207369 edges, 41929 markings/sec, 510 secs
lola: 21473412 markings, 69888281 edges, 41453 markings/sec, 515 secs
lola: 21671775 markings, 70576838 edges, 39673 markings/sec, 520 secs
lola: 21870925 markings, 71266222 edges, 39830 markings/sec, 525 secs
lola: 22072277 markings, 71954830 edges, 40270 markings/sec, 530 secs
lola: 22268164 markings, 72633819 edges, 39177 markings/sec, 535 secs
lola: 22470390 markings, 73317702 edges, 40445 markings/sec, 540 secs
lola: 22664434 markings, 74013642 edges, 38809 markings/sec, 545 secs
lola: 22863938 markings, 74686663 edges, 39901 markings/sec, 550 secs
lola: 23062891 markings, 75360880 edges, 39791 markings/sec, 555 secs
lola: 23256164 markings, 76025415 edges, 38655 markings/sec, 560 secs
lola: 23450568 markings, 76693636 edges, 38881 markings/sec, 565 secs
lola: 23645183 markings, 77360016 edges, 38923 markings/sec, 570 secs
lola: 23848071 markings, 78034761 edges, 40578 markings/sec, 575 secs
lola: 24043538 markings, 78710959 edges, 39093 markings/sec, 580 secs
lola: 24233521 markings, 79392200 edges, 37997 markings/sec, 585 secs
lola: 24427642 markings, 80076452 edges, 38824 markings/sec, 590 secs
lola: 24628316 markings, 80775093 edges, 40135 markings/sec, 595 secs
lola: 24827740 markings, 81468326 edges, 39885 markings/sec, 600 secs
lola: 25032336 markings, 82151956 edges, 40919 markings/sec, 605 secs
lola: 25238144 markings, 82834293 edges, 41162 markings/sec, 610 secs
lola: 25434591 markings, 83527112 edges, 39289 markings/sec, 615 secs
lola: 25632430 markings, 84218856 edges, 39568 markings/sec, 620 secs
lola: 25830381 markings, 84909486 edges, 39590 markings/sec, 625 secs
lola: 26029399 markings, 85591953 edges, 39804 markings/sec, 630 secs
lola: 26217612 markings, 86238058 edges, 37643 markings/sec, 635 secs
lola: 26426129 markings, 86902779 edges, 41703 markings/sec, 640 secs
lola: 26635436 markings, 87573921 edges, 41861 markings/sec, 645 secs
lola: 26834428 markings, 88232225 edges, 39798 markings/sec, 650 secs
lola: 27029582 markings, 88906168 edges, 39031 markings/sec, 655 secs
lola: 27227992 markings, 89587744 edges, 39682 markings/sec, 660 secs
lola: 27425422 markings, 90264490 edges, 39486 markings/sec, 665 secs
lola: 27623268 markings, 90949664 edges, 39569 markings/sec, 670 secs
lola: 27819662 markings, 91616464 edges, 39279 markings/sec, 675 secs
lola: 28013804 markings, 92311132 edges, 38828 markings/sec, 680 secs
lola: 28210582 markings, 92984324 edges, 39356 markings/sec, 685 secs
lola: 28410219 markings, 93670672 edges, 39927 markings/sec, 690 secs
lola: 28607276 markings, 94352480 edges, 39411 markings/sec, 695 secs
lola: 28799252 markings, 95015125 edges, 38395 markings/sec, 700 secs
lola: 28990048 markings, 95679432 edges, 38159 markings/sec, 705 secs
lola: 29186118 markings, 96339965 edges, 39214 markings/sec, 710 secs
lola: 29377072 markings, 97012981 edges, 38191 markings/sec, 715 secs
lola: 29566877 markings, 97693375 edges, 37961 markings/sec, 720 secs
lola: 29758970 markings, 98383261 edges, 38419 markings/sec, 725 secs
lola: 29955744 markings, 99076070 edges, 39355 markings/sec, 730 secs
lola: 30149485 markings, 99761750 edges, 38748 markings/sec, 735 secs
lola: 30349231 markings, 100443982 edges, 39949 markings/sec, 740 secs
lola: 30551098 markings, 101129717 edges, 40373 markings/sec, 745 secs
lola: 30746609 markings, 101819042 edges, 39102 markings/sec, 750 secs
lola: 30938573 markings, 102493061 edges, 38393 markings/sec, 755 secs
lola: 31127538 markings, 103163657 edges, 37793 markings/sec, 760 secs
lola: 31317200 markings, 103831666 edges, 37932 markings/sec, 765 secs
lola: 31508378 markings, 104490950 edges, 38236 markings/sec, 770 secs
lola: 31724575 markings, 105152037 edges, 43239 markings/sec, 775 secs
lola: 31928280 markings, 105822341 edges, 40741 markings/sec, 780 secs
lola: 32133446 markings, 106496269 edges, 41033 markings/sec, 785 secs
lola: 32328406 markings, 107115147 edges, 38992 markings/sec, 790 secs
lola: 32523392 markings, 107768161 edges, 38997 markings/sec, 795 secs
lola: 32706313 markings, 108385763 edges, 36584 markings/sec, 800 secs
lola: 32881210 markings, 108978924 edges, 34979 markings/sec, 805 secs
lola: 33057257 markings, 109586518 edges, 35209 markings/sec, 810 secs
lola: 33231894 markings, 110192656 edges, 34927 markings/sec, 815 secs
lola: 33406444 markings, 110800731 edges, 34910 markings/sec, 820 secs
lola: 33598273 markings, 111443690 edges, 38366 markings/sec, 825 secs
lola: 33793388 markings, 112121683 edges, 39023 markings/sec, 830 secs
lola: 33981120 markings, 112788269 edges, 37546 markings/sec, 835 secs
lola: 34176091 markings, 113471753 edges, 38994 markings/sec, 840 secs
lola: 34375554 markings, 114169319 edges, 39893 markings/sec, 845 secs
lola: 34583960 markings, 114848913 edges, 41681 markings/sec, 850 secs
lola: 34788459 markings, 115534218 edges, 40900 markings/sec, 855 secs
lola: 34989301 markings, 116218899 edges, 40168 markings/sec, 860 secs
lola: 35180071 markings, 116875983 edges, 38154 markings/sec, 865 secs
lola: 35377028 markings, 117533504 edges, 39391 markings/sec, 870 secs
lola: 35580492 markings, 118226628 edges, 40693 markings/sec, 875 secs
lola: 35778522 markings, 118920823 edges, 39606 markings/sec, 880 secs
lola: 35975408 markings, 119623089 edges, 39377 markings/sec, 885 secs
lola: 36170326 markings, 120318214 edges, 38984 markings/sec, 890 secs
lola: 36357560 markings, 120988368 edges, 37447 markings/sec, 895 secs
lola: 36549778 markings, 121666909 edges, 38444 markings/sec, 900 secs
lola: 36745249 markings, 122335463 edges, 39094 markings/sec, 905 secs
lola: 36941924 markings, 123017059 edges, 39335 markings/sec, 910 secs
lola: 37148480 markings, 123702968 edges, 41311 markings/sec, 915 secs
lola: 37350798 markings, 124385728 edges, 40464 markings/sec, 920 secs
lola: 37549762 markings, 125076484 edges, 39793 markings/sec, 925 secs
lola: 37747274 markings, 125771452 edges, 39502 markings/sec, 930 secs
lola: 37943387 markings, 126452656 edges, 39223 markings/sec, 935 secs
lola: 38135242 markings, 127144335 edges, 38371 markings/sec, 940 secs
lola: 38335601 markings, 127835460 edges, 40072 markings/sec, 945 secs
lola: 38531210 markings, 128512395 edges, 39122 markings/sec, 950 secs
lola: 38730410 markings, 129172770 edges, 39840 markings/sec, 955 secs
lola: 38929407 markings, 129838549 edges, 39799 markings/sec, 960 secs
lola: 39127772 markings, 130499342 edges, 39673 markings/sec, 965 secs
lola: 39321041 markings, 131170461 edges, 38654 markings/sec, 970 secs
lola: 39515005 markings, 131849737 edges, 38793 markings/sec, 975 secs
lola: 39708103 markings, 132511694 edges, 38620 markings/sec, 980 secs
lola: 39893322 markings, 133167779 edges, 37044 markings/sec, 985 secs
lola: 40084909 markings, 133815831 edges, 38317 markings/sec, 990 secs
lola: 40272752 markings, 134456074 edges, 37569 markings/sec, 995 secs
lola: 40463311 markings, 135100568 edges, 38112 markings/sec, 1000 secs
lola: 40653958 markings, 135749143 edges, 38129 markings/sec, 1005 secs
lola: 40837317 markings, 136409274 edges, 36672 markings/sec, 1010 secs
lola: 41023234 markings, 137059994 edges, 37183 markings/sec, 1015 secs
lola: 41212747 markings, 137702653 edges, 37903 markings/sec, 1020 secs
lola: 41404443 markings, 138343622 edges, 38339 markings/sec, 1025 secs
lola: 41594907 markings, 139007213 edges, 38093 markings/sec, 1030 secs
lola: 41784408 markings, 139671999 edges, 37900 markings/sec, 1035 secs
lola: 41977288 markings, 140330262 edges, 38576 markings/sec, 1040 secs
lola: 42178227 markings, 140985859 edges, 40188 markings/sec, 1045 secs
lola: 42376510 markings, 141652840 edges, 39657 markings/sec, 1050 secs
lola: 42574475 markings, 142318071 edges, 39593 markings/sec, 1055 secs
lola: 42773550 markings, 143007050 edges, 39815 markings/sec, 1060 secs
lola: 42969329 markings, 143694400 edges, 39156 markings/sec, 1065 secs
lola: 43167395 markings, 144382836 edges, 39613 markings/sec, 1070 secs
lola: 43360643 markings, 145071026 edges, 38650 markings/sec, 1075 secs
lola: 43558730 markings, 145741661 edges, 39617 markings/sec, 1080 secs
lola: 43755301 markings, 146415175 edges, 39314 markings/sec, 1085 secs
lola: 43953818 markings, 147098989 edges, 39703 markings/sec, 1090 secs
lola: 44147836 markings, 147787681 edges, 38804 markings/sec, 1095 secs
lola: 44337484 markings, 148469106 edges, 37930 markings/sec, 1100 secs
lola: 44527597 markings, 149134925 edges, 38023 markings/sec, 1105 secs
lola: 44722055 markings, 149801761 edges, 38892 markings/sec, 1110 secs
lola: 44915121 markings, 150472207 edges, 38613 markings/sec, 1115 secs
lola: 45106312 markings, 151149082 edges, 38238 markings/sec, 1120 secs
lola: 45295363 markings, 151814319 edges, 37810 markings/sec, 1125 secs
lola: 45505502 markings, 152478056 edges, 42028 markings/sec, 1130 secs
lola: 45718313 markings, 153149956 edges, 42562 markings/sec, 1135 secs
lola: 45923452 markings, 153834541 edges, 41028 markings/sec, 1140 secs
lola: 46133219 markings, 154506032 edges, 41953 markings/sec, 1145 secs
lola: 46336023 markings, 155179168 edges, 40561 markings/sec, 1150 secs
lola: 46529067 markings, 155841537 edges, 38609 markings/sec, 1155 secs
lola: 46723919 markings, 156501506 edges, 38970 markings/sec, 1160 secs
lola: 46916982 markings, 157174015 edges, 38613 markings/sec, 1165 secs
lola: 47107237 markings, 157846894 edges, 38051 markings/sec, 1170 secs
lola: 47302492 markings, 158523406 edges, 39051 markings/sec, 1175 secs
lola: 47505342 markings, 159197279 edges, 40570 markings/sec, 1180 secs
lola: 47697164 markings, 159864516 edges, 38364 markings/sec, 1185 secs
lola: 47888382 markings, 160528522 edges, 38244 markings/sec, 1190 secs
lola: 48082763 markings, 161210326 edges, 38876 markings/sec, 1195 secs
lola: 48280733 markings, 161886193 edges, 39594 markings/sec, 1200 secs
lola: 48480299 markings, 162557581 edges, 39913 markings/sec, 1205 secs
lola: 48675764 markings, 163228930 edges, 39093 markings/sec, 1210 secs
lola: 48863306 markings, 163882678 edges, 37508 markings/sec, 1215 secs
lola: 49033445 markings, 164485460 edges, 34028 markings/sec, 1220 secs
lola: 49212535 markings, 165079673 edges, 35818 markings/sec, 1225 secs
lola: 49389690 markings, 165681047 edges, 35431 markings/sec, 1230 secs
lola: 49564758 markings, 166287187 edges, 35014 markings/sec, 1235 secs
lola: 49733454 markings, 166893280 edges, 33739 markings/sec, 1240 secs
lola: 49900856 markings, 167504737 edges, 33480 markings/sec, 1245 secs
lola: 50092528 markings, 168170275 edges, 38334 markings/sec, 1250 secs
lola: 50277858 markings, 168836955 edges, 37066 markings/sec, 1255 secs
lola: 50469930 markings, 169498337 edges, 38414 markings/sec, 1260 secs
lola: 50655340 markings, 170157968 edges, 37082 markings/sec, 1265 secs
lola: 50848052 markings, 170810777 edges, 38542 markings/sec, 1270 secs
lola: 51041976 markings, 171465934 edges, 38785 markings/sec, 1275 secs
lola: 51233479 markings, 172117263 edges, 38301 markings/sec, 1280 secs
lola: 51421009 markings, 172774344 edges, 37506 markings/sec, 1285 secs
lola: 51605980 markings, 173439053 edges, 36994 markings/sec, 1290 secs
lola: 51797127 markings, 174097855 edges, 38229 markings/sec, 1295 secs
lola: 51983205 markings, 174758634 edges, 37216 markings/sec, 1300 secs
lola: 52178465 markings, 175437192 edges, 39052 markings/sec, 1305 secs
lola: 52367188 markings, 176101828 edges, 37745 markings/sec, 1310 secs
lola: 52562258 markings, 176748770 edges, 39014 markings/sec, 1315 secs
lola: 52757997 markings, 177396202 edges, 39148 markings/sec, 1320 secs
lola: 52952961 markings, 178057329 edges, 38993 markings/sec, 1325 secs
lola: 53146128 markings, 178731861 edges, 38633 markings/sec, 1330 secs
lola: 53337594 markings, 179412160 edges, 38293 markings/sec, 1335 secs
lola: 53537772 markings, 180094200 edges, 40036 markings/sec, 1340 secs
lola: 53730558 markings, 180768401 edges, 38557 markings/sec, 1345 secs
lola: 53927047 markings, 181433631 edges, 39298 markings/sec, 1350 secs
lola: 54114651 markings, 182087500 edges, 37521 markings/sec, 1355 secs
lola: 54308293 markings, 182745130 edges, 38728 markings/sec, 1360 secs
lola: 54497382 markings, 183402527 edges, 37818 markings/sec, 1365 secs
lola: 54683501 markings, 184067360 edges, 37224 markings/sec, 1370 secs
lola: 54874244 markings, 184724948 edges, 38149 markings/sec, 1375 secs
lola: 55063662 markings, 185374062 edges, 37884 markings/sec, 1380 secs
lola: 55255342 markings, 186019913 edges, 38336 markings/sec, 1385 secs
lola: 55439291 markings, 186674597 edges, 36790 markings/sec, 1390 secs
lola: 55628558 markings, 187328102 edges, 37853 markings/sec, 1395 secs
lola: 55816726 markings, 187975008 edges, 37634 markings/sec, 1400 secs
lola: 56021848 markings, 188637059 edges, 41024 markings/sec, 1405 secs
lola: 56220480 markings, 189304691 edges, 39726 markings/sec, 1410 secs
lola: 56416440 markings, 189981767 edges, 39192 markings/sec, 1415 secs
lola: 56608229 markings, 190653294 edges, 38358 markings/sec, 1420 secs
lola: 56801705 markings, 191328240 edges, 38695 markings/sec, 1425 secs
lola: 56994307 markings, 191999975 edges, 38520 markings/sec, 1430 secs
lola: 57184890 markings, 192667601 edges, 38117 markings/sec, 1435 secs
lola: 57373079 markings, 193314897 edges, 37638 markings/sec, 1440 secs
lola: 57555752 markings, 193958680 edges, 36535 markings/sec, 1445 secs
lola: 57746018 markings, 194606268 edges, 38053 markings/sec, 1450 secs
lola: 57928082 markings, 195262861 edges, 36413 markings/sec, 1455 secs
lola: 58114264 markings, 195929175 edges, 37236 markings/sec, 1460 secs
lola: 58302055 markings, 196589825 edges, 37558 markings/sec, 1465 secs
lola: 58495951 markings, 197256727 edges, 38779 markings/sec, 1470 secs
lola: 58687942 markings, 197928652 edges, 38398 markings/sec, 1475 secs
lola: 58877024 markings, 198598652 edges, 37816 markings/sec, 1480 secs
lola: 59066565 markings, 199266839 edges, 37908 markings/sec, 1485 secs
lola: 59274505 markings, 199910097 edges, 41588 markings/sec, 1490 secs
lola: 59485402 markings, 200525637 edges, 42179 markings/sec, 1495 secs
lola: 59688046 markings, 201144485 edges, 40529 markings/sec, 1500 secs
lola: 59886297 markings, 201780254 edges, 39650 markings/sec, 1505 secs
lola: 60087555 markings, 202420112 edges, 40252 markings/sec, 1510 secs
lola: 60292316 markings, 203051013 edges, 40952 markings/sec, 1515 secs
lola: 60492484 markings, 203693928 edges, 40034 markings/sec, 1520 secs
lola: 60689282 markings, 204327709 edges, 39360 markings/sec, 1525 secs
lola: 60884821 markings, 204961464 edges, 39108 markings/sec, 1530 secs
lola: 61078687 markings, 205594163 edges, 38773 markings/sec, 1535 secs
lola: 61275285 markings, 206260564 edges, 39320 markings/sec, 1540 secs
lola: 61468648 markings, 206930464 edges, 38673 markings/sec, 1545 secs
lola: 61658034 markings, 207585437 edges, 37877 markings/sec, 1550 secs
lola: 61846360 markings, 208238210 edges, 37665 markings/sec, 1555 secs
lola: 62032903 markings, 208885915 edges, 37309 markings/sec, 1560 secs
lola: 62223448 markings, 209532260 edges, 38109 markings/sec, 1565 secs
lola: 62420974 markings, 210187021 edges, 39505 markings/sec, 1570 secs
lola: 62616028 markings, 210845880 edges, 39011 markings/sec, 1575 secs
lola: 62807957 markings, 211488974 edges, 38386 markings/sec, 1580 secs
lola: 62991677 markings, 212123949 edges, 36744 markings/sec, 1585 secs
lola: 63177139 markings, 212780602 edges, 37092 markings/sec, 1590 secs
lola: 63364918 markings, 213445389 edges, 37556 markings/sec, 1595 secs
lola: 63553047 markings, 214102440 edges, 37626 markings/sec, 1600 secs
lola: 63745206 markings, 214737820 edges, 38432 markings/sec, 1605 secs
lola: 63937228 markings, 215370775 edges, 38404 markings/sec, 1610 secs
lola: 64128845 markings, 216003378 edges, 38323 markings/sec, 1615 secs
lola: 64319455 markings, 216634508 edges, 38122 markings/sec, 1620 secs
lola: 64507578 markings, 217285367 edges, 37625 markings/sec, 1625 secs
lola: 64697713 markings, 217947323 edges, 38027 markings/sec, 1630 secs
lola: 64887530 markings, 218612818 edges, 37963 markings/sec, 1635 secs
lola: 65075082 markings, 219254112 edges, 37510 markings/sec, 1640 secs
lola: 65275501 markings, 219893869 edges, 40084 markings/sec, 1645 secs
lola: 65468955 markings, 220546737 edges, 38691 markings/sec, 1650 secs
lola: 65661721 markings, 221201709 edges, 38553 markings/sec, 1655 secs
lola: 65850973 markings, 221859388 edges, 37850 markings/sec, 1660 secs
lola: 66035539 markings, 222520569 edges, 36913 markings/sec, 1665 secs
lola: 66218349 markings, 223187025 edges, 36562 markings/sec, 1670 secs
lola: 66403805 markings, 223856088 edges, 37091 markings/sec, 1675 secs
lola: 66590764 markings, 224518828 edges, 37392 markings/sec, 1680 secs
lola: 66778982 markings, 225200471 edges, 37644 markings/sec, 1685 secs
lola: 66968912 markings, 225886834 edges, 37986 markings/sec, 1690 secs
lola: 67161437 markings, 226558464 edges, 38505 markings/sec, 1695 secs
lola: 67346896 markings, 227206196 edges, 37092 markings/sec, 1700 secs
lola: 67533509 markings, 227876710 edges, 37323 markings/sec, 1705 secs
lola: 67735812 markings, 228542972 edges, 40461 markings/sec, 1710 secs
lola: 67939977 markings, 229200429 edges, 40833 markings/sec, 1715 secs
lola: 68139560 markings, 229855048 edges, 39917 markings/sec, 1720 secs
lola: 68337462 markings, 230521553 edges, 39580 markings/sec, 1725 secs
lola: 68533000 markings, 231187703 edges, 39108 markings/sec, 1730 secs
lola: 68716292 markings, 231831316 edges, 36658 markings/sec, 1735 secs
lola: 68890833 markings, 232455004 edges, 34908 markings/sec, 1740 secs
lola: 69079042 markings, 233108233 edges, 37642 markings/sec, 1745 secs
lola: 69251366 markings, 233704266 edges, 34465 markings/sec, 1750 secs
lola: 69430719 markings, 234341652 edges, 35871 markings/sec, 1755 secs
lola: 69600300 markings, 234947366 edges, 33916 markings/sec, 1760 secs
lola: 69773660 markings, 235536056 edges, 34672 markings/sec, 1765 secs
lola: local time limit reached - aborting
lola:
preliminary result: yes yes no unknown yes no no yes yes unknown no no no no no yes
lola: time limit reached - aborting
lola:
preliminary result: yes yes no unknown yes no no yes yes unknown no no no no no yes
lola:
preliminary result: yes yes no unknown yes no no yes yes unknown no no no no no yes
lola: memory consumption: 33152 KB
lola: time consumption: 3568 seconds

BK_STOP 1527433537808

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

Sequence of Actions to be Executed by the VM

This is useful if one wants to reexecute the tool in the VM from the submitted image disk.

set -x
# this is for BenchKit: configuration of major elements for the test
export BK_INPUT="NeoElection-COL-5"
export BK_EXAMINATION="LTLCardinality"
export BK_TOOL="lola"
export BK_RESULT_DIR="/tmp/BK_RESULTS/OUTPUTS"
export BK_TIME_CONFINEMENT="3600"
export BK_MEMORY_CONFINEMENT="16384"

# this is specific to your benchmark or test

export BIN_DIR="$HOME/BenchKit/bin"

# remove the execution directoty if it exists (to avoid increse of .vmdk images)
if [ -d execution ] ; then
rm -rf execution
fi

tar xzf /home/mcc/BenchKit/INPUTS/NeoElection-COL-5.tgz
mv NeoElection-COL-5 execution
cd execution
pwd
ls -lh

# this is for BenchKit: explicit launching of the test
echo "====================================================================="
echo " Generated by BenchKit 2-3637"
echo " Executing tool lola"
echo " Input is NeoElection-COL-5, examination is LTLCardinality"
echo " Time confinement is $BK_TIME_CONFINEMENT seconds"
echo " Memory confinement is 16384 MBytes"
echo " Number of cores is 4"
echo " Run identifier is r256-csrt-152732582800075"
echo "====================================================================="
echo
echo "--------------------"
echo "content from stdout:"
echo
echo "=== Data for post analysis generated by BenchKit (invocation template)"
echo
if [ "LTLCardinality" = "UpperBounds" ] ; then
echo "The expected result is a vector of positive values"
echo NUM_VECTOR
elif [ "LTLCardinality" != "StateSpace" ] ; then
echo "The expected result is a vector of booleans"
echo BOOL_VECTOR
else
echo "no data necessary for post analysis"
fi
echo
if [ -f "LTLCardinality.txt" ] ; then
echo "here is the order used to build the result vector(from text file)"
for x in $(grep Property LTLCardinality.txt | cut -d ' ' -f 2 | sort -u) ; do
echo "FORMULA_NAME $x"
done
elif [ -f "LTLCardinality.xml" ] ; then # for cunf (txt files deleted;-)
echo echo "here is the order used to build the result vector(from xml file)"
for x in $(grep '' LTLCardinality.xml | cut -d '>' -f 2 | cut -d '<' -f 1 | sort -u) ; do
echo "FORMULA_NAME $x"
done
fi
echo
echo "=== Now, execution of the tool begins"
echo
echo -n "BK_START "
date -u +%s%3N
echo
timeout -s 9 $BK_TIME_CONFINEMENT bash -c "/home/mcc/BenchKit/BenchKit_head.sh 2> STDERR ; echo ; echo -n \"BK_STOP \" ; date -u +%s%3N"
if [ $? -eq 137 ] ; then
echo
echo "BK_TIME_CONFINEMENT_REACHED"
fi
echo
echo "--------------------"
echo "content from stderr:"
echo
cat STDERR ;