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Integer_Transition_Systems 2019-03-29 01.54 pair #432273261
details
property
value
status
complete
benchmark
PartitionList.jar-obl-16.smt2
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n138.star.cs.uiowa.edu
space
From_AProVE_2014
run statistics
property
value
solver
Ctrl
configuration
Transition
runtime (wallclock)
77.3941 seconds
cpu usage
78.3676
user time
44.9759
system time
33.3917
max virtual memory
769704.0
max residence set size
47204.0
stage attributes
key
value
starexec-result
YES
output
78.24/77.37 YES 78.24/77.37 78.24/77.37 DP problem for innermost termination. 78.24/77.37 P = 78.24/77.37 init#(x1, x2, x3, x4, x5, x6) -> f1#(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) 78.24/77.37 f34#(I239, I240, I241, I242, I243, I244) -> f33#(I245, I246, I247, I248, I249, I250) [0 <= I240 - 1 /\ I247 <= I241 - 1 /\ I245 + 2 <= I239 /\ 2 <= I239 - 1 /\ 0 <= I245 - 1 /\ I241 + 2 <= I239 /\ I247 + 4 <= I239 /\ I247 - 2 * I251 <= 1 /\ 0 <= I247 - 2 * I251 /\ I247 - 2 * I251 = I246] 78.24/77.37 f34#(I252, I253, I254, I255, I256, I257) -> f33#(I258, I259, I260, I261, I262, I263) [I253 <= -1 /\ I260 <= I254 - 1 /\ I258 + 2 <= I252 /\ 2 <= I252 - 1 /\ 0 <= I258 - 1 /\ I254 + 2 <= I252 /\ I260 + 4 <= I252 /\ I260 - 2 * I264 <= 1 /\ 0 <= I260 - 2 * I264 /\ I260 - 2 * I264 = I259] 78.24/77.37 f34#(I265, I266, I267, I268, I269, I270) -> f33#(I271, I272, I273, I274, I275, I276) [0 <= I266 - 1 /\ I267 <= I273 - 1 /\ I271 + 2 <= I265 /\ 2 <= I265 - 1 /\ 0 <= I271 - 1 /\ I267 + 2 <= I265 /\ I273 + 4 <= I265 /\ I273 - 2 * I277 <= 1 /\ 0 <= I273 - 2 * I277 /\ I273 - 2 * I277 = I272] 78.24/77.37 f34#(I278, I279, I280, I281, I282, I283) -> f33#(I284, I285, I286, I287, I288, I289) [I279 <= -1 /\ I280 <= I286 - 1 /\ I284 + 2 <= I278 /\ 2 <= I278 - 1 /\ 0 <= I284 - 1 /\ I280 + 2 <= I278 /\ I286 + 4 <= I278 /\ I286 - 2 * I290 <= 1 /\ 0 <= I286 - 2 * I290 /\ I286 - 2 * I290 = I285] 78.24/77.37 f33#(I291, I292, I293, I294, I295, I296) -> f34#(I291, I292, I293, I297, I298, I299) [0 <= I292 - 1 /\ I300 <= I293 - 1 /\ y2 + 2 <= I291 /\ 2 <= I291 - 1 /\ 0 <= y2 - 1 /\ I293 + 2 <= I291 /\ I300 + 4 <= I291] 78.24/77.37 f33#(I301, I302, I303, I304, I305, I306) -> f34#(I301, I302, I303, I307, I308, I309) [I302 <= -1 /\ I310 <= I303 - 1 /\ I311 + 2 <= I301 /\ 2 <= I301 - 1 /\ 0 <= I311 - 1 /\ I303 + 2 <= I301 /\ I310 + 4 <= I301] 78.24/77.37 f33#(I312, I313, I314, I315, I316, I317) -> f34#(I312, I313, I314, I318, I319, I320) [0 <= I313 - 1 /\ I314 <= I321 - 1 /\ I322 + 2 <= I312 /\ 2 <= I312 - 1 /\ 0 <= I322 - 1 /\ I314 + 2 <= I312 /\ I321 + 4 <= I312] 78.24/77.37 f33#(I323, I324, I325, I326, I327, I328) -> f34#(I323, I324, I325, I329, I330, I331) [I324 <= -1 /\ I325 <= I332 - 1 /\ I333 + 2 <= I323 /\ 2 <= I323 - 1 /\ 0 <= I333 - 1 /\ I325 + 2 <= I323 /\ I332 + 4 <= I323] 78.24/77.37 f32#(I334, I335, I336, I337, I338, I339) -> f33#(I340, I341, I342, I343, I344, I345) [I340 + 2 <= I334 /\ I340 <= I335 /\ 2 <= I334 - 1 /\ 0 <= I335 - 1 /\ 0 <= I340 - 1 /\ I342 + 4 <= I334 /\ I342 + 2 <= I335 /\ I342 - 2 * I346 <= 1 /\ 0 <= I342 - 2 * I346 /\ I342 - 2 * I346 = I341] 78.24/77.37 f29#(I347, I348, I349, I350, I351, I352) -> f32#(I347, I348, I353, I354, I355, I356) [I357 + 2 <= I347 /\ I357 <= I348 /\ 2 <= I347 - 1 /\ 0 <= I348 - 1 /\ 0 <= I357 - 1 /\ I358 + 4 <= I347 /\ I358 + 2 <= I348] 78.24/77.37 f31#(I359, I360, I361, I362, I363, I364) -> f29#(I365, I366, I367, I368, I369, I370) [1 = I360 /\ I362 + 6 <= I359 /\ I361 + 4 <= I359 /\ -1 <= I366 - 1 /\ 0 <= I365 - 1 /\ 4 <= I359 - 1 /\ I366 + 4 <= I359 /\ I365 + 2 <= I359] 78.24/77.37 f31#(I371, I372, I373, I374, I375, I376) -> f30#(I377, I378, I373, I379, I380, I381) [0 = I372 /\ I374 + 6 <= I371 /\ I373 + 4 <= I371 /\ -1 <= I378 - 1 /\ 4 <= I377 - 1 /\ 4 <= I371 - 1 /\ I378 + 2 <= I371 /\ I377 <= I371] 78.24/77.37 f29#(I382, I383, I384, I385, I386, I387) -> f31#(I388, 0, I389, I390, I391, I392) [I390 + 4 <= I383 /\ I389 + 2 <= I383 /\ I390 + 6 <= I382 /\ I389 + 4 <= I382 /\ 4 <= I388 - 1 /\ 2 <= I383 - 1 /\ 4 <= I382 - 1 /\ I388 <= I382] 78.24/77.37 f29#(I393, I394, I395, I396, I397, I398) -> f31#(I399, 0, I400, I401, I402, I403) [I400 = I401 /\ I400 + 4 <= I394 /\ I400 + 6 <= I393 /\ 4 <= I399 - 1 /\ 2 <= I394 - 1 /\ 4 <= I393 - 1 /\ I399 <= I393] 78.24/77.37 f29#(I404, I405, I406, I407, I408, I409) -> f31#(I410, 1, I411, I412, I413, I414) [I412 + 4 <= I405 /\ I411 + 2 <= I405 /\ I412 + 6 <= I404 /\ I411 + 4 <= I404 /\ 6 <= I410 - 1 /\ 4 <= I405 - 1 /\ 6 <= I404 - 1 /\ I410 <= I404] 78.24/77.37 f29#(I415, I416, I417, I418, I419, I420) -> f31#(I421, 0, I422, I423, I424, I425) [I423 + 4 <= I416 /\ I422 + 2 <= I416 /\ I423 + 6 <= I415 /\ I422 + 4 <= I415 /\ 6 <= I421 - 1 /\ 4 <= I416 - 1 /\ 6 <= I415 - 1 /\ I421 <= I415] 78.24/77.37 f29#(I426, I427, I428, I429, I430, I431) -> f31#(I432, 1, I433, I434, I435, I436) [I434 + 4 <= I427 /\ I433 + 2 <= I427 /\ I434 + 6 <= I426 /\ I433 + 4 <= I426 /\ 5 <= I432 - 1 /\ 3 <= I427 - 1 /\ 5 <= I426 - 1 /\ I432 <= I426] 78.24/77.37 f29#(I437, I438, I439, I440, I441, I442) -> f29#(I443, I444, I445, I446, I447, I448) [-1 <= I444 - 1 /\ 0 <= I443 - 1 /\ 1 <= I438 - 1 /\ 3 <= I437 - 1 /\ I444 + 4 <= I437 /\ I443 + 2 <= I437] 78.24/77.37 f30#(I449, I450, I451, I452, I453, I454) -> f29#(I455, I456, I457, I458, I459, I460) [I451 + 4 <= I449 /\ -1 <= I456 - 1 /\ 0 <= I455 - 1 /\ 0 <= I450 - 1 /\ 2 <= I449 - 1 /\ I456 + 1 <= I450 /\ I456 + 3 <= I449 /\ I455 <= I450 /\ I455 + 2 <= I449] 78.24/77.37 f29#(I461, I462, I463, I464, I465, I466) -> f30#(I467, I468, I469, I470, I471, I472) [I469 + 2 <= I462 /\ I469 + 4 <= I461 /\ -1 <= I468 - 1 /\ 2 <= I467 - 1 /\ 0 <= I462 - 1 /\ 2 <= I461 - 1 /\ I468 + 2 <= I461 /\ I467 <= I461] 78.24/77.37 f6#(I473, I474, I475, I476, I477, I478) -> f29#(I479, I480, I481, I482, I483, I484) [I474 + 4 <= I473 /\ 0 <= I480 - 1 /\ 2 <= I479 - 1 /\ 2 <= I473 - 1 /\ I480 + 2 <= I473 /\ I479 <= I473] 78.24/77.37 f19#(I584, I585, I586, I587, I588, I589) -> f19#(I590, I591, I592, I593, I594, I595) [-1 <= I591 - 1 /\ 0 <= I590 - 1 /\ 0 <= I585 - 1 /\ 2 <= I584 - 1 /\ I591 + 1 <= I585 /\ I590 + 2 <= I584] 78.24/77.37 f26#(I596, I597, I598, I599, I600, I601) -> f26#(I602, I597, I603, I604, I605, I606) [I603 + 4 <= I596 /\ I598 + 2 <= I596 /\ 0 <= I602 - 1 /\ 2 <= I596 - 1 /\ I602 + 2 <= I596 /\ 0 <= I597 - 1 /\ I597 <= I598 /\ 0 <= I598 - 1] 78.24/77.37 f26#(I607, I608, I609, I610, I611, I612) -> f26#(I613, I608, I614, I615, I616, I617) [I614 + 4 <= I607 /\ I609 + 2 <= I607 /\ 0 <= I613 - 1 /\ 2 <= I607 - 1 /\ I613 + 2 <= I607 /\ I609 <= I608 - 1 /\ 0 <= I608 - 1] 78.24/77.37 f18#(I618, I619, I620, I621, I622, I623) -> f26#(I624, I621, I622, I625, I626, I627) [I622 = I623 /\ I622 + 2 <= I619 /\ I622 + 4 <= I618 /\ 0 <= I624 - 1 /\ -1 <= I620 - 1 /\ 0 <= I619 - 1 /\ 2 <= I618 - 1 /\ I624 <= I619 /\ 0 <= I621 - 1 /\ I624 + 2 <= I618] 78.24/77.37 f25#(I727, I728, I729, I730, I731, I732) -> f19#(I733, I734, I735, I736, I737, I738) [I731 + 2 <= I728 /\ I730 + 6 <= I727 /\ I731 + 4 <= I727 /\ -1 <= I734 - 1 /\ 0 <= I733 - 1 /\ -1 <= I729 - 1 /\ 0 <= I728 - 1 /\ 4 <= I727 - 1 /\ I734 <= I729 /\ I733 <= I728 /\ I733 + 2 <= I727] 78.24/77.37 f18#(I739, I740, I741, I742, I743, I744) -> f25#(I745, I746, I747, I748, I743, I749) [I743 = I744 /\ I743 + 2 <= I740 /\ I748 + 6 <= I739 /\ I743 + 4 <= I739 /\ -1 <= I747 - 1 /\ 0 <= I746 - 1 /\ 6 <= I745 - 1 /\ -1 <= I741 - 1 /\ 0 <= I740 - 1 /\ 6 <= I739 - 1 /\ I747 <= I741 /\ I746 <= I740 /\ I746 + 2 <= I739 /\ I742 <= 0 /\ I745 <= I739] 78.24/77.37 f18#(I750, I751, I752, I753, I754, I755) -> f25#(I756, I757, I758, I759, I754, I760) [I754 = I755 /\ I754 + 2 <= I751 /\ I759 + 6 <= I750 /\ I754 + 4 <= I750 /\ -1 <= I758 - 1 /\ 0 <= I757 - 1 /\ 5 <= I756 - 1 /\ -1 <= I752 - 1 /\ 0 <= I751 - 1 /\ 5 <= I750 - 1 /\ I758 <= I752 /\ I757 <= I751 /\ I757 + 2 <= I750 /\ I753 <= 0 /\ I756 <= I750] 78.24/77.37 f18#(I761, I762, I763, I764, I765, I766) -> f25#(I767, I768, I769, I770, I765, I771) [I765 = I766 /\ I765 + 2 <= I762 /\ I770 + 6 <= I761 /\ I765 + 4 <= I761 /\ -1 <= I769 - 1 /\ 0 <= I768 - 1 /\ 6 <= I767 - 1 /\ -1 <= I763 - 1 /\ 0 <= I762 - 1 /\ 6 <= I761 - 1 /\ I769 <= I763 /\ I768 <= I762 /\ I768 + 2 <= I761 /\ I764 <= 0 /\ I767 <= I761] 78.24/77.37 f18#(I772, I773, I774, I775, I776, I777) -> f25#(I778, I779, I780, I781, I776, I782) [I776 = I777 /\ I776 + 2 <= I773 /\ I781 + 6 <= I772 /\ I776 + 4 <= I772 /\ -1 <= I780 - 1 /\ 0 <= I779 - 1 /\ 6 <= I778 - 1 /\ -1 <= I774 - 1 /\ 0 <= I773 - 1 /\ 6 <= I772 - 1 /\ I780 <= I774 /\ I779 <= I773 /\ I779 + 2 <= I772 /\ I775 <= 0 /\ I778 <= I772] 78.24/77.37 f22#(I882, I883, I884, I885, I886, I887) -> f19#(I888, I889, I890, I891, I892, I893) [I886 + 2 <= I883 /\ I885 + 6 <= I882 /\ I886 + 4 <= I882 /\ -1 <= I889 - 1 /\ 0 <= I888 - 1 /\ -1 <= I884 - 1 /\ 0 <= I883 - 1 /\ 4 <= I882 - 1 /\ I889 <= I884 /\ I888 <= I883 /\ I888 + 2 <= I882] 78.24/77.37 f18#(I894, I895, I896, I897, I898, I899) -> f22#(I900, I901, I902, I903, I898, I904) [I898 = I899 /\ I898 + 2 <= I895 /\ I903 + 6 <= I894 /\ I898 + 4 <= I894 /\ -1 <= I902 - 1 /\ 0 <= I901 - 1 /\ 6 <= I900 - 1 /\ -1 <= I896 - 1 /\ 0 <= I895 - 1 /\ 6 <= I894 - 1 /\ I902 <= I896 /\ I901 <= I895 /\ I901 + 2 <= I894 /\ I897 <= 0 /\ I900 <= I894] 78.24/77.37 f18#(I905, I906, I907, I908, I909, I910) -> f22#(I911, I912, I913, I914, I909, I915) [I909 = I910 /\ I909 + 2 <= I906 /\ I914 + 6 <= I905 /\ I909 + 4 <= I905 /\ -1 <= I913 - 1 /\ 0 <= I912 - 1 /\ 5 <= I911 - 1 /\ -1 <= I907 - 1 /\ 0 <= I906 - 1 /\ 5 <= I905 - 1 /\ I913 <= I907 /\ I912 <= I906 /\ I912 + 2 <= I905 /\ I908 <= 0 /\ I911 <= I905] 78.24/77.37 f18#(I916, I917, I918, I919, I920, I921) -> f22#(I922, I923, I924, I925, I920, I926) [I920 = I921 /\ I920 + 2 <= I917 /\ I925 + 6 <= I916 /\ I920 + 4 <= I916 /\ -1 <= I924 - 1 /\ 0 <= I923 - 1 /\ 4 <= I922 - 1 /\ -1 <= I918 - 1 /\ 0 <= I917 - 1 /\ 4 <= I916 - 1 /\ I924 <= I918 /\ I923 <= I917 /\ I923 + 2 <= I916 /\ I919 <= 0 /\ I922 <= I916] 78.24/77.37 f18#(I927, I928, I929, I930, I931, I932) -> f22#(I933, I934, I935, I936, I931, I937) [I931 = I932 /\ I931 + 2 <= I928 /\ I936 + 6 <= I927 /\ I931 + 4 <= I927 /\ -1 <= I935 - 1 /\ 0 <= I934 - 1 /\ 6 <= I933 - 1 /\ -1 <= I929 - 1 /\ 0 <= I928 - 1 /\ 6 <= I927 - 1 /\ I935 <= I929 /\ I934 <= I928 /\ I934 + 2 <= I927 /\ I930 <= 0 /\ I933 <= I927] 78.24/77.37 f18#(I938, I939, I940, I941, I942, I943) -> f22#(I944, I945, I946, I947, I942, I948) [I942 = I943 /\ I942 + 2 <= I939 /\ I947 + 6 <= I938 /\ I942 + 4 <= I938 /\ -1 <= I946 - 1 /\ 0 <= I945 - 1 /\ 6 <= I944 - 1 /\ -1 <= I940 - 1 /\ 0 <= I939 - 1 /\ 6 <= I938 - 1 /\ I946 <= I940 /\ I945 <= I939 /\ I945 + 2 <= I938 /\ I941 <= 0 /\ I944 <= I938] 78.24/77.37 f18#(I949, I950, I951, I952, I953, I954) -> f22#(I955, I956, I957, I958, I953, I959) [I953 = I954 /\ I953 + 2 <= I950 /\ I958 + 6 <= I949 /\ I953 + 4 <= I949 /\ -1 <= I957 - 1 /\ 0 <= I956 - 1 /\ 6 <= I955 - 1 /\ -1 <= I951 - 1 /\ 0 <= I950 - 1 /\ 6 <= I949 - 1 /\ I957 <= I951 /\ I956 <= I950 /\ I956 + 2 <= I949 /\ I952 <= 0 /\ I955 <= I949] 78.24/77.37 f18#(I960, I961, I962, I963, I964, I965) -> f18#(I966, I967, I968, I963 - 1, I964, I964) [I964 = I965 /\ I964 + 2 <= I961 /\ I964 + 4 <= I960 /\ 2 <= I968 - 1 /\ 1 <= I967 - 1 /\ 3 <= I966 - 1 /\ -1 <= I962 - 1 /\ 1 <= I961 - 1 /\ 3 <= I960 - 1 /\ I968 - 3 <= I962 /\ I967 <= I961 /\ I967 + 2 <= I960 /\ 0 <= I963 - 1 /\ I966 <= I960] 78.24/77.37 f18#(I969, I970, I971, I972, I973, I974) -> f18#(I975, I976, I977, I972 - 1, I973, I973) [I973 = I974 /\ I973 + 2 <= I970 /\ I973 + 4 <= I969 /\ 1 <= I977 - 1 /\ 1 <= I976 - 1 /\ 3 <= I975 - 1 /\ -1 <= I971 - 1 /\ 1 <= I970 - 1 /\ 3 <= I969 - 1 /\ I977 - 2 <= I971 /\ I976 <= I970 /\ I976 + 2 <= I969 /\ 0 <= I972 - 1 /\ I975 <= I969] 78.24/77.37 f18#(I978, I979, I980, I981, I982, I983) -> f18#(I984, I985, I986, I981 - 1, I982, I982) [I982 = I983 /\ I982 + 2 <= I979 /\ I982 + 4 <= I978 /\ 0 <= I986 - 1 /\ 2 <= I985 - 1 /\ 4 <= I984 - 1 /\ -1 <= I980 - 1 /\ 2 <= I979 - 1 /\ 4 <= I978 - 1 /\ I985 <= I979 /\ I985 + 2 <= I978 /\ 0 <= I981 - 1 /\ I984 <= I978] 78.24/77.37 f18#(I1086, I1087, I1088, I1089, I1090, I1091) -> f19#(I1092, I1093, I1094, I1095, I1096, I1097) [I1090 = I1091 /\ I1090 + 2 <= I1087 /\ I1090 + 4 <= I1086 /\ -1 <= I1093 - 1 /\ 0 <= I1092 - 1 /\ -1 <= I1088 - 1 /\ 0 <= I1087 - 1 /\ 2 <= I1086 - 1 /\ I1093 <= I1088 /\ I1092 <= I1087 /\ I1089 <= 0 /\ I1092 + 2 <= I1086] 78.24/77.37 f18#(I1098, I1099, I1100, I1101, I1102, I1103) -> f17#(I1104, I1105, I1106, I1107, I1108, I1109) [I1102 = I1103 /\ I1102 + 2 <= I1099 /\ I1106 + 4 <= I1098 /\ I1102 + 4 <= I1098 /\ -1 <= I1105 - 1 /\ 0 <= I1104 - 1 /\ -1 <= I1100 - 1 /\ 0 <= I1099 - 1 /\ 2 <= I1098 - 1 /\ I1105 + 3 <= I1098 /\ I1101 <= 0 /\ I1104 + 2 <= I1098] 78.24/77.37 f17#(I1110, I1111, I1112, I1113, I1114, I1115) -> f18#(I1116, I1117, I1118, I1119, I1120, I1121) [I1119 = I1121 /\ I1119 = I1120 /\ I1119 + 2 <= I1111 /\ I1112 + 2 <= I1110 /\ I1119 + 4 <= I1110 /\ -1 <= I1118 - 1 /\ 0 <= I1117 - 1 /\ 2 <= I1116 - 1 /\ 0 <= I1111 - 1 /\ 2 <= I1110 - 1 /\ I1118 + 1 <= I1111 /\ I1118 + 3 <= I1110 /\ I1117 <= I1111 /\ I1117 + 2 <= I1110 /\ I1116 <= I1110] 78.24/77.37 f4#(I1122, I1123, I1124, I1125, I1126, I1127) -> f17#(I1128, I1129, I1130, I1131, I1132, I1133) [I1130 + 2 <= I1122 /\ -1 <= I1129 - 1 /\ 0 <= I1128 - 1 /\ 0 <= I1122 - 1 /\ I1129 + 1 <= I1122 /\ I1128 <= I1122] 78.24/77.37 f15#(I1134, I1135, I1136, I1137, I1138, I1139) -> f15#(I1140, I1141, I1142, I1143, I1144, I1145) [-1 <= I1140 - 1 /\ 0 <= I1134 - 1 /\ I1140 + 1 <= I1134] 78.24/77.37 f14#(I1146, I1147, I1148, I1149, I1150, I1151) -> f14#(I1152, I1153, I1154, I1155, I1156, I1157) [-1 <= I1152 - 1 /\ 0 <= I1146 - 1 /\ I1152 + 1 <= I1146] 78.24/77.37 f16#(I1158, I1159, I1160, I1161, I1162, I1163) -> f15#(I1164, I1165, I1166, I1167, I1168, I1169) [I1162 + 4 <= I1158 /\ I1161 + 4 <= I1158 /\ 2 <= I1164 - 1 /\ -1 <= I1160 - 1 /\ 2 <= I1158 - 1 /\ I1164 <= I1158] 78.24/77.37 f16#(I1170, I1171, I1172, I1173, I1174, I1175) -> f3#(I1171, I1176, I1177, I1178, I1179, I1180) [I1174 + 4 <= I1170 /\ I1173 + 4 <= I1170 /\ -1 <= I1177 - 1 /\ -1 <= I1176 - 1 /\ -1 <= I1172 - 1 /\ 2 <= I1170 - 1 /\ I1177 <= I1172 /\ I1176 <= I1172] 78.24/77.37 f8#(I1181, I1182, I1183, I1184, I1185, I1186) -> f16#(I1187, I1181, I1188, I1184, I1189, I1190) [I1184 + 2 <= I1182 /\ -1 <= I1188 - 1 /\ 4 <= I1187 - 1 /\ -1 <= I1185 - 1 /\ -1 <= I1183 - 1 /\ 0 <= I1182 - 1 /\ I1188 <= I1185 /\ I1188 + 1 <= I1182] 78.24/77.37 f8#(I1191, I1192, I1193, I1194, I1195, I1196) -> f16#(I1197, I1191, I1198, I1194, I1199, I1200) [I1194 + 2 <= I1192 /\ -1 <= I1198 - 1 /\ 2 <= I1197 - 1 /\ -1 <= I1195 - 1 /\ -1 <= I1193 - 1 /\ 0 <= I1192 - 1 /\ I1198 <= I1195 /\ I1198 + 1 <= I1192] 78.24/77.37 f8#(I1201, I1202, I1203, I1204, I1205, I1206) -> f15#(I1207, I1208, I1209, I1210, I1211, I1212) [I1204 + 2 <= I1202 /\ -1 <= I1207 - 1 /\ -1 <= I1205 - 1 /\ -1 <= I1203 - 1 /\ 0 <= I1202 - 1 /\ I1207 <= I1205 /\ I1207 <= I1203 /\ I1207 + 1 <= I1202] 78.24/77.37 f8#(I1213, I1214, I1215, I1216, I1217, I1218) -> f3#(I1213, I1219, I1220, I1221, I1222, I1223) [I1216 + 2 <= I1214 /\ -1 <= I1220 - 1 /\ -1 <= I1219 - 1 /\ -1 <= I1217 - 1 /\ -1 <= I1215 - 1 /\ 0 <= I1214 - 1 /\ I1220 <= I1217 /\ I1220 + 1 <= I1214 /\ I1219 <= I1217 /\ I1219 + 1 <= I1214] 78.24/77.37 f12#(I1224, I1225, I1226, I1227, I1228, I1229) -> f15#(I1230, I1231, I1232, I1233, I1234, I1235) [I1225 + 4 <= I1224 /\ 3 <= I1230 - 1 /\ 3 <= I1224 - 1 /\ I1230 <= I1224] 78.24/77.37 f10#(I1236, I1237, I1238, I1239, I1240, I1241) -> f15#(I1242, I1243, I1244, I1245, I1246, I1247) [-1 <= I1242 - 1] 78.24/77.37 f8#(I1248, I1249, I1250, I1251, I1252, I1253) -> f14#(I1254, I1255, I1256, I1257, I1258, I1259) [I1251 + 2 <= I1249 /\ -1 <= I1254 - 1 /\ -1 <= I1252 - 1 /\ -1 <= I1250 - 1 /\ 0 <= I1249 - 1 /\ I1254 <= I1250] 78.24/77.37 f13#(I1260, I1261, I1262, I1263, I1264, I1265) -> f12#(I1266, I1261, I1267, I1268, I1269, I1270) [I1261 + 4 <= I1260 /\ 3 <= I1266 - 1 /\ 3 <= I1260 - 1 /\ I1266 <= I1260] 78.24/77.37 f7#(I1271, I1272, I1273, I1274, I1275, I1276) -> f12#(I1277, I1274, I1278, I1279, I1280, I1281) [0 = I1273 /\ I1274 + 2 <= I1272 /\ 3 <= I1277 - 1 /\ -1 <= I1275 - 1 /\ 0 <= I1272 - 1 /\ I1277 - 3 <= I1272] 78.24/77.37 f11#(I1282, I1283, I1284, I1285, I1286, I1287) -> f10#(I1282, I1283, I1288, I1289, I1290, I1291) 78.24/77.37 f7#(I1292, I1293, I1294, I1295, I1296, I1297) -> f10#(I1292, I1298, I1299, I1300, I1301, I1302) [I1295 + 2 <= I1293 /\ -1 <= I1296 - 1 /\ 0 <= I1294 - 1 /\ 0 <= I1293 - 1] 78.24/77.37 f7#(I1303, I1304, I1305, I1306, I1307, I1308) -> f10#(I1303, I1309, I1310, I1311, I1312, I1313) [I1306 + 2 <= I1304 /\ -1 <= I1307 - 1 /\ I1305 <= -1 /\ 0 <= I1304 - 1] 78.24/77.37 f9#(I1314, I1315, I1316, I1317, I1318, I1319) -> f8#(I1314, I1320, I1321, I1316, I1322, I1323) [I1316 + 2 <= I1315 /\ -1 <= I1322 - 1 /\ -1 <= I1321 - 1 /\ 0 <= I1320 - 1 /\ -1 <= I1317 - 1 /\ 0 <= I1315 - 1 /\ I1322 <= I1317 /\ I1322 + 1 <= I1315 /\ I1321 <= I1317 /\ I1321 + 1 <= I1315 /\ I1320 <= I1315] 78.24/77.37 f3#(I1324, I1325, I1326, I1327, I1328, I1329) -> f8#(I1324, I1330, I1331, I1332, I1333, I1334) [I1332 + 2 <= I1326 /\ I1332 + 2 <= I1325 /\ -1 <= I1333 - 1 /\ -1 <= I1331 - 1 /\ 0 <= I1330 - 1 /\ 0 <= I1326 - 1 /\ 0 <= I1325 - 1 /\ I1333 + 1 <= I1326 /\ I1333 + 1 <= I1325 /\ I1330 <= I1326 /\ I1330 <= I1325 /\ 0 <= I1324 - I1332 - 1 /\ I1324 - I1332 <= I1324 - 1] 78.24/77.37 f3#(I1335, I1336, I1337, I1338, I1339, I1340) -> f8#(I1335, I1341, I1342, I1343, I1344, I1345) [I1343 + 2 <= I1337 /\ I1343 + 2 <= I1336 /\ -1 <= I1344 - 1 /\ -1 <= I1342 - 1 /\ 0 <= I1341 - 1 /\ 0 <= I1337 - 1 /\ 0 <= I1336 - 1 /\ I1344 + 1 <= I1337 /\ I1344 + 1 <= I1336 /\ I1342 + 1 <= I1337 /\ I1342 + 1 <= I1336 /\ I1341 <= I1337 /\ I1341 <= I1336 /\ 0 <= I1335 - I1343 - 1 /\ I1335 - I1343 <= I1335 - 1] 78.24/77.37 f7#(I1346, I1347, I1348, I1349, I1350, I1351) -> f3#(I1346, I1352, I1353, I1354, I1355, I1356) [0 = I1348 /\ I1349 + 2 <= I1347 /\ -1 <= I1353 - 1 /\ -1 <= I1352 - 1 /\ -1 <= I1350 - 1 /\ 0 <= I1347 - 1 /\ I1353 <= I1350 /\ I1353 + 1 <= I1347 /\ I1352 <= I1350 /\ I1352 + 1 <= I1347] 78.24/77.37 f7#(I1357, I1358, I1359, I1360, I1361, I1362) -> f3#(I1357, I1363, I1364, I1365, I1366, I1367) [I1360 + 2 <= I1358 /\ -1 <= I1364 - 1 /\ -1 <= I1363 - 1 /\ -1 <= I1361 - 1 /\ 0 <= I1358 - 1 /\ I1364 <= I1361 /\ I1364 + 1 <= I1358 /\ I1363 <= I1361 /\ 0 <= I1359 - 1 /\ I1363 + 1 <= I1358] 78.24/77.37 f7#(I1368, I1369, I1370, I1371, I1372, I1373) -> f3#(I1368, I1374, I1375, I1376, I1377, I1378) [I1371 + 2 <= I1369 /\ -1 <= I1375 - 1 /\ -1 <= I1374 - 1 /\ -1 <= I1372 - 1 /\ 0 <= I1369 - 1 /\ I1375 <= I1372 /\ I1375 + 1 <= I1369 /\ I1374 <= I1372 /\ I1370 <= -1 /\ I1374 + 1 <= I1369] 78.24/77.37 f3#(I1379, I1380, I1381, I1382, I1383, I1384) -> f3#(I1385, I1386, I1387, I1388, I1389, I1390) [I1379 - I1391 <= I1379 - 1 /\ 0 <= I1379 - I1391 - 1 /\ I1386 <= I1380 /\ I1386 <= I1381 /\ I1387 <= I1380 /\ I1387 <= I1381 /\ 0 <= I1380 - 1 /\ 0 <= I1381 - 1 /\ 0 <= I1386 - 1 /\ 0 <= I1387 - 1 /\ I1391 + 2 <= I1380 /\ I1391 + 2 <= I1381 /\ I1379 - I1391 = I1385] 78.24/77.37 f3#(I1392, I1393, I1394, I1395, I1396, I1397) -> f7#(I1392, I1398, I1399, I1400, I1401, I1402) [I1392 - I1400 = I1399 /\ I1400 + 2 <= I1394 /\ I1400 + 2 <= I1393 /\ -1 <= I1401 - 1 /\ 0 <= I1398 - 1 /\ 0 <= I1394 - 1 /\ 0 <= I1393 - 1 /\ I1401 + 1 <= I1394 /\ I1401 + 1 <= I1393 /\ I1398 <= I1394 /\ I1398 <= I1393 /\ 0 <= I1392 - I1400 - 1 /\ I1392 <= I1392 - I1400] 78.24/77.37 f3#(I1403, I1404, I1405, I1406, I1407, I1408) -> f7#(I1403, I1409, I1410, I1411, I1412, I1413) [I1403 - I1411 = I1410 /\ I1411 + 2 <= I1405 /\ I1411 + 2 <= I1404 /\ -1 <= I1412 - 1 /\ 0 <= I1409 - 1 /\ 0 <= I1405 - 1 /\ 0 <= I1404 - 1 /\ I1412 + 1 <= I1405 /\ I1412 + 1 <= I1404 /\ I1409 <= I1405 /\ I1403 - I1411 <= 0 /\ I1409 <= I1404] 78.24/77.37 f4#(I1414, I1415, I1416, I1417, I1418, I1419) -> f6#(I1420, I1421, I1422, I1423, I1424, I1425) [I1421 + 4 <= I1414 /\ 4 <= I1420 - 1 /\ 4 <= I1414 - 1 /\ I1420 <= I1414] 78.24/77.37 f4#(I1426, I1427, I1428, I1429, I1430, I1431) -> f6#(I1432, I1433, I1434, I1435, I1436, I1437) [I1433 + 4 <= I1426 /\ 3 <= I1432 - 1 /\ 3 <= I1426 - 1 /\ I1432 <= I1426] 78.24/77.37 f4#(I1438, I1439, I1440, I1441, I1442, I1443) -> f6#(I1444, I1445, I1446, I1447, I1448, I1449) [I1445 + 4 <= I1438 /\ 2 <= I1444 - 1 /\ 2 <= I1438 - 1 /\ I1444 <= I1438] 78.24/77.37 f4#(I1450, I1451, I1452, I1453, I1454, I1455) -> f6#(I1456, I1457, I1458, I1459, I1460, I1461) [I1457 + 4 <= I1450 /\ 4 <= I1456 - 1 /\ 4 <= I1450 - 1 /\ I1456 <= I1450] 78.24/77.37 f4#(I1462, I1463, I1464, I1465, I1466, I1467) -> f6#(I1468, I1469, I1470, I1471, I1472, I1473) [I1469 + 4 <= I1462 /\ 4 <= I1468 - 1 /\ 4 <= I1462 - 1 /\ I1468 <= I1462] 78.24/77.37 f4#(I1474, I1475, I1476, I1477, I1478, I1479) -> f6#(I1480, I1481, I1482, I1483, I1484, I1485) [I1481 + 4 <= I1474 /\ 4 <= I1480 - 1 /\ 4 <= I1474 - 1 /\ I1480 <= I1474] 78.24/77.37 f5#(I1486, I1487, I1488, I1489, I1490, I1491) -> f4#(I1492, I1493, I1494, I1495, I1496, I1497) [-1 <= I1492 - 1 /\ 0 <= I1486 - 1 /\ I1492 + 1 <= I1486] 78.24/77.37 f2#(I1498, I1499, I1500, I1501, I1502, I1503) -> f4#(I1504, I1505, I1506, I1507, I1508, I1509) [I1502 + 2 <= I1499 /\ -1 <= I1504 - 1 /\ 0 <= I1499 - 1 /\ I1501 <= I1500 - 1 /\ 0 <= I1498 - 1] 78.24/77.37 f2#(I1510, I1511, I1512, I1513, I1514, I1515) -> f4#(I1516, I1517, I1518, I1519, I1520, I1521) [I1514 + 2 <= I1511 /\ -1 <= I1516 - 1 /\ 0 <= I1511 - 1 /\ 0 <= I1510 - 1 /\ I1516 + 1 <= I1511 /\ I1513 <= I1512 - 1 /\ I1516 + 1 <= I1510] 78.24/77.37 f2#(I1522, I1523, I1524, I1525, I1526, I1527) -> f2#(I1528, I1529, I1524 + 1, I1525, I1524, I1530) [I1526 + 2 <= I1523 /\ 2 <= I1529 - 1 /\ 0 <= I1528 - 1 /\ 0 <= I1523 - 1 /\ 0 <= I1522 - 1 /\ I1528 <= I1523 /\ I1524 <= I1525 /\ I1528 <= I1522] 78.24/77.37 f2#(I1531, I1532, I1533, I1534, I1535, I1536) -> f3#(I1534, I1537, I1538, I1539, I1540, I1541) [I1535 + 2 <= I1532 /\ 0 <= I1538 - 1 /\ 0 <= I1537 - 1 /\ 0 <= I1532 - 1 /\ 0 <= I1531 - 1 /\ I1538 <= I1532 /\ I1534 <= I1533 - 1 /\ I1537 <= I1532] 78.24/77.37 f1#(I1542, I1543, I1544, I1545, I1546, I1547) -> f2#(I1548, I1549, 2, I1543, 1, I1550) [2 <= I1549 - 1 /\ 0 <= I1548 - 1 /\ 0 <= I1542 - 1 /\ I1549 - 2 <= I1542 /\ -1 <= I1543 - 1 /\ I1548 <= I1542] 78.24/77.37 R = 78.24/77.37 init(x1, x2, x3, x4, x5, x6) -> f1(rnd1, rnd2, rnd3, rnd4, rnd5, rnd6) 78.24/77.37 f33(I0, I1, I2, I3, I4, I5) -> f35(I6, 0, I7, I8, I9, I10) [0 <= I1 - 1 /\ y1 <= I2 - 1 /\ I6 <= I0 /\ 4 <= I0 - 1 /\ 4 <= I6 - 1 /\ I2 + 2 <= I0] 78.24/77.37 f33(I11, I12, I13, I14, I15, I16) -> f35(I17, 0, I18, I19, I20, I21) [I12 <= -1 /\ I22 <= I13 - 1 /\ I17 <= I11 /\ 4 <= I11 - 1 /\ 4 <= I17 - 1 /\ I13 + 2 <= I11] 78.24/77.37 f33(I23, I24, I25, I26, I27, I28) -> f35(I29, 0, I30, I31, I32, I33) [0 <= I24 - 1 /\ I25 <= I34 - 1 /\ I29 <= I23 /\ 4 <= I23 - 1 /\ 4 <= I29 - 1 /\ I25 + 2 <= I23] 78.24/77.37 f33(I35, I36, I37, I38, I39, I40) -> f35(I41, 0, I42, I43, I44, I45) [I36 <= -1 /\ I37 <= I46 - 1 /\ I41 <= I35 /\ 4 <= I35 - 1 /\ 4 <= I41 - 1 /\ I37 + 2 <= I35] 78.24/77.37 f33(I47, I48, I49, I50, I51, I52) -> f35(I53, 0, I54, I55, I56, I57) [0 <= I48 - 1 /\ I58 <= I49 - 1 /\ I53 <= I47 /\ 4 <= I47 - 1 /\ 4 <= I53 - 1 /\ I49 + 2 <= I47] 78.24/77.37 f33(I59, I60, I61, I62, I63, I64) -> f35(I65, 0, I66, I67, I68, I69) [I60 <= -1 /\ I70 <= I61 - 1 /\ I65 <= I59 /\ 4 <= I59 - 1 /\ 4 <= I65 - 1 /\ I61 + 2 <= I59] 78.24/77.37 f33(I71, I72, I73, I74, I75, I76) -> f35(I77, 0, I78, I79, I80, I81) [0 <= I72 - 1 /\ I73 <= I82 - 1 /\ I77 <= I71 /\ 4 <= I71 - 1 /\ 4 <= I77 - 1 /\ I73 + 2 <= I71] 78.24/77.37 f33(I83, I84, I85, I86, I87, I88) -> f35(I89, 0, I90, I91, I92, I93) [I84 <= -1 /\ I85 <= I94 - 1 /\ I89 <= I83 /\ 4 <= I83 - 1 /\ 4 <= I89 - 1 /\ I85 + 2 <= I83] 78.24/77.37 f33(I95, I96, I97, I98, I99, I100) -> f35(I101, 1, I102, I103, I104, I105) [0 <= I96 - 1 /\ I106 <= I97 - 1 /\ I101 <= I95 /\ 6 <= I95 - 1 /\ 6 <= I101 - 1 /\ I97 + 2 <= I95] 78.24/77.37 f33(I107, I108, I109, I110, I111, I112) -> f35(I113, 1, I114, I115, I116, I117) [I108 <= -1 /\ I118 <= I109 - 1 /\ I113 <= I107 /\ 6 <= I107 - 1 /\ 6 <= I113 - 1 /\ I109 + 2 <= I107] 78.24/77.37 f33(I119, I120, I121, I122, I123, I124) -> f35(I125, 1, I126, I127, I128, I129) [0 <= I120 - 1 /\ I121 <= I130 - 1 /\ I125 <= I119 /\ 6 <= I119 - 1 /\ 6 <= I125 - 1 /\ I121 + 2 <= I119] 78.24/77.37 f33(I131, I132, I133, I134, I135, I136) -> f35(I137, 1, I138, I139, I140, I141) [I132 <= -1 /\ I133 <= I142 - 1 /\ I137 <= I131 /\ 6 <= I131 - 1 /\ 6 <= I137 - 1 /\ I133 + 2 <= I131]
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return to Integer_Transition_Systems 2019-03-29 01.54