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Integer_Transition_Systems 2019-03-29 01.54 pair #432276359
details
property
value
status
complete
benchmark
rlft3.t2.smt2
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n052.star.cs.uiowa.edu
space
From_T2
run statistics
property
value
solver
VeryMax-termCOMP17
configuration
termcomp2019_ITS
runtime (wallclock)
268.322 seconds
cpu usage
268.04
user time
252.987
system time
15.053
max virtual memory
1214820.0
max residence set size
562920.0
stage attributes
key
value
starexec-result
NO
output
267.96/268.30 NO 267.96/268.30 267.96/268.30 Solver Timeout: 4 267.96/268.30 Global Timeout: 300 267.96/268.30 No parsing errors! 267.96/268.30 Init Location: 0 267.96/268.30 Transitions: 267.96/268.30 <l0, l27, true> 267.96/268.30 <l1, l2, true> 267.96/268.30 <l3, l1, (0 <= (0 + isign^0))> 267.96/268.30 <l3, l1, ((1 + isign^0) <= ~(1))> 267.96/268.30 <l3, l1, ((0 + isign^0) <= ~(1)) /\ (~(1) <= (0 + isign^0))> 267.96/268.30 <l4, l5, true> 267.96/268.30 <l6, l7, (undef124 = undef124) /\ (undef114 = undef114) /\ (undef113 = undef113) /\ (undef115 = undef115) /\ (undef116 = undef116), par{h1i^0 -> undef113, h1r^0 -> undef114, h2i^0 -> undef115, h2r^0 -> undef116, j3^0 -> undef124}> 267.96/268.30 <l8, l6, true, par{j2^0 -> ((2 + (~(1) * i2^0)) + nn2^0)}> 267.96/268.30 <l9, l6, ((0 + i2^0) <= 1) /\ (1 <= (0 + i2^0)), par{j2^0 -> 1}> 267.96/268.30 <l9, l8, (2 <= (0 + i2^0))> 267.96/268.30 <l9, l8, ((1 + i2^0) <= 1)> 267.96/268.30 <l7, l10, true, par{i2^0 -> (1 + i2^0)}> 267.96/268.30 <l11, l12, true> 267.96/268.30 <l13, l7, (undef268 = undef268) /\ (undef267 = undef267) /\ (undef269 = undef269) /\ (undef270 = undef270), par{h1i^0 -> undef267, h1r^0 -> undef268, h2i^0 -> undef269, h2r^0 -> undef270}> 267.96/268.30 <l14, l13, (undef299 = undef299), par{j2^0 -> undef299}> 267.96/268.30 <l15, l13, ((0 + i2^0) <= 1) /\ (1 <= (0 + i2^0)), par{j2^0 -> 1}> 267.96/268.30 <l15, l14, (2 <= (0 + i2^0))> 267.96/268.30 <l15, l14, ((1 + i2^0) <= 1)> 267.96/268.30 <l16, l17, true> 267.96/268.30 <l18, l9, (2 <= (0 + i3^0))> 267.96/268.30 <l18, l9, ((1 + i3^0) <= 1)> 267.96/268.30 <l18, l15, ((0 + i3^0) <= 1) /\ (1 <= (0 + i3^0))> 267.96/268.30 <l19, l20, ((1 + nn2^0) <= (0 + i2^0)) /\ (undef483 = undef483) /\ (undef480 = undef480), par{i3^0 -> (1 + i3^0), ii3^0 -> (2 + ii3^0), wi^0 -> undef480, wr^0 -> undef483, wtemp^0 -> (0 + wr^0)}> 267.96/268.30 <l19, l18, ((0 + i2^0) <= (0 + nn2^0))> 267.96/268.30 <l21, l16, true, par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l21, l10, true> 267.96/268.30 <l22, l20, true, par{wi^0 -> 0, wr^0 -> 1}> 267.96/268.30 <l23, l22, true, par{j1___0^0 -> ((2 + (~(1) * i1^0)) + nn1^0)}> 267.96/268.30 <l20, l21, true> 267.96/268.30 <l24, l22, ((0 + i1^0) <= 1) /\ (1 <= (0 + i1^0)), par{j1___0^0 -> 1}> 267.96/268.30 <l24, l23, (2 <= (0 + i1^0))> 267.96/268.30 <l24, l23, ((1 + i1^0) <= 1)> 267.96/268.30 <l17, l3, ((1 + nn1^0) <= (0 + i1^0))> 267.96/268.30 <l17, l24, ((0 + i1^0) <= (0 + nn1^0))> 267.96/268.30 <l10, l19, true> 267.96/268.30 <l12, l4, ((1 + nn2^0) <= (0 + i2^0)), par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l12, l11, ((0 + i2^0) <= (0 + nn2^0)) /\ (undef793 = (1 + j2^0)), par{i2^0 -> (1 + i2^0), j2^0 -> (1 + undef793)}> 267.96/268.30 <l5, l16, ((1 + nn1^0) <= (0 + i1^0))> 267.96/268.30 <l5, l11, ((0 + i1^0) <= (0 + nn1^0))> 267.96/268.30 <l25, l16, (2 <= (0 + isign^0))> 267.96/268.30 <l25, l16, ((1 + isign^0) <= 1)> 267.96/268.30 <l25, l4, ((0 + isign^0) <= 1) /\ (1 <= (0 + isign^0))> 267.96/268.30 <l26, l25, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922), par{c1^0 -> undef904, c2^0 -> undef905, theta^0 -> undef920, wpi^0 -> undef922, wpr^0 -> undef923, wtemp^0 -> undef925}> 267.96/268.30 <l27, l26, true> 267.96/268.30 267.96/268.30 Fresh variables: 267.96/268.30 undef113, undef114, undef115, undef116, undef124, undef267, undef268, undef269, undef270, undef299, undef480, undef483, undef793, undef904, undef905, undef920, undef922, undef923, undef925, 267.96/268.30 267.96/268.30 Undef variables: 267.96/268.30 undef113, undef114, undef115, undef116, undef124, undef267, undef268, undef269, undef270, undef299, undef480, undef483, undef793, undef904, undef905, undef920, undef922, undef923, undef925, 267.96/268.30 267.96/268.30 Abstraction variables: 267.96/268.30 267.96/268.30 Exit nodes: 267.96/268.30 267.96/268.30 Accepting locations: 267.96/268.30 267.96/268.30 Asserts: 267.96/268.30 267.96/268.30 Preprocessed LLVMGraph 267.96/268.30 Init Location: 0 267.96/268.30 Transitions: 267.96/268.30 <l0, l2, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ (2 <= (0 + isign^0)) /\ ((1 + nn1^0) <= (0 + i1^0)) /\ (0 <= (0 + isign^0))> 267.96/268.30 <l0, l20, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ (2 <= (0 + isign^0)) /\ ((0 + i1^0) <= (0 + nn1^0)) /\ ((0 + i1^0) <= 1) /\ (1 <= (0 + i1^0)), par{wr^0 -> 1}> 267.96/268.30 <l0, l20, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ (2 <= (0 + isign^0)) /\ ((0 + i1^0) <= (0 + nn1^0)) /\ (2 <= (0 + i1^0)), par{wr^0 -> 1}> 267.96/268.30 <l0, l20, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ (2 <= (0 + isign^0)) /\ ((0 + i1^0) <= (0 + nn1^0)) /\ ((1 + i1^0) <= 1), par{wr^0 -> 1}> 267.96/268.30 <l0, l2, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ ((1 + isign^0) <= 1) /\ ((1 + nn1^0) <= (0 + i1^0)) /\ (0 <= (0 + isign^0))> 267.96/268.30 <l0, l2, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ ((1 + isign^0) <= 1) /\ ((1 + nn1^0) <= (0 + i1^0)) /\ ((1 + isign^0) <= ~(1))> 267.96/268.30 <l0, l2, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ ((1 + isign^0) <= 1) /\ ((1 + nn1^0) <= (0 + i1^0)) /\ ((0 + isign^0) <= ~(1)) /\ (~(1) <= (0 + isign^0))> 267.96/268.30 <l0, l20, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ ((1 + isign^0) <= 1) /\ ((0 + i1^0) <= (0 + nn1^0)) /\ ((0 + i1^0) <= 1) /\ (1 <= (0 + i1^0)), par{wr^0 -> 1}> 267.96/268.30 <l0, l20, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ ((1 + isign^0) <= 1) /\ ((0 + i1^0) <= (0 + nn1^0)) /\ (2 <= (0 + i1^0)), par{wr^0 -> 1}> 267.96/268.30 <l0, l20, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ ((1 + isign^0) <= 1) /\ ((0 + i1^0) <= (0 + nn1^0)) /\ ((1 + i1^0) <= 1), par{wr^0 -> 1}> 267.96/268.30 <l0, l2, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ ((0 + isign^0) <= 1) /\ (1 <= (0 + isign^0)) /\ ((1 + nn1^0) <= (0 + i1^0)) /\ ((1 + nn1^0) <= (0 + i1^0)) /\ (0 <= (0 + isign^0))> 267.96/268.30 <l0, l11, (undef904 = undef904) /\ (undef905 = undef905) /\ (undef920 = undef920) /\ (undef925 = undef925) /\ (undef923 = undef923) /\ (undef922 = undef922) /\ ((0 + isign^0) <= 1) /\ (1 <= (0 + isign^0)) /\ ((0 + i1^0) <= (0 + nn1^0))> 267.96/268.30 <l10, l20, ((1 + nn2^0) <= (0 + i2^0)) /\ (undef483 = undef483) /\ (undef480 = undef480), par{i3^0 -> (1 + i3^0), ii3^0 -> (2 + ii3^0), wr^0 -> undef483}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ (2 <= (0 + i3^0)) /\ ((0 + i2^0) <= 1) /\ (1 <= (0 + i2^0)) /\ (undef124 = undef124) /\ (undef114 = undef114) /\ (undef113 = undef113) /\ (undef115 = undef115) /\ (undef116 = undef116), par{i2^0 -> (1 + i2^0), j2^0 -> 1}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ (2 <= (0 + i3^0)) /\ (2 <= (0 + i2^0)) /\ (undef124 = undef124) /\ (undef114 = undef114) /\ (undef113 = undef113) /\ (undef115 = undef115) /\ (undef116 = undef116), par{i2^0 -> (1 + i2^0), j2^0 -> ((2 + (~(1) * i2^0)) + nn2^0)}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ (2 <= (0 + i3^0)) /\ ((1 + i2^0) <= 1) /\ (undef124 = undef124) /\ (undef114 = undef114) /\ (undef113 = undef113) /\ (undef115 = undef115) /\ (undef116 = undef116), par{i2^0 -> (1 + i2^0), j2^0 -> ((2 + (~(1) * i2^0)) + nn2^0)}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ ((1 + i3^0) <= 1) /\ ((0 + i2^0) <= 1) /\ (1 <= (0 + i2^0)) /\ (undef124 = undef124) /\ (undef114 = undef114) /\ (undef113 = undef113) /\ (undef115 = undef115) /\ (undef116 = undef116), par{i2^0 -> (1 + i2^0), j2^0 -> 1}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ ((1 + i3^0) <= 1) /\ (2 <= (0 + i2^0)) /\ (undef124 = undef124) /\ (undef114 = undef114) /\ (undef113 = undef113) /\ (undef115 = undef115) /\ (undef116 = undef116), par{i2^0 -> (1 + i2^0), j2^0 -> ((2 + (~(1) * i2^0)) + nn2^0)}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ ((1 + i3^0) <= 1) /\ ((1 + i2^0) <= 1) /\ (undef124 = undef124) /\ (undef114 = undef114) /\ (undef113 = undef113) /\ (undef115 = undef115) /\ (undef116 = undef116), par{i2^0 -> (1 + i2^0), j2^0 -> ((2 + (~(1) * i2^0)) + nn2^0)}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ ((0 + i3^0) <= 1) /\ (1 <= (0 + i3^0)) /\ ((0 + i2^0) <= 1) /\ (1 <= (0 + i2^0)) /\ (undef268 = undef268) /\ (undef267 = undef267) /\ (undef269 = undef269) /\ (undef270 = undef270), par{i2^0 -> (1 + i2^0), j2^0 -> 1}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ ((0 + i3^0) <= 1) /\ (1 <= (0 + i3^0)) /\ (2 <= (0 + i2^0)) /\ (undef299 = undef299) /\ (undef268 = undef268) /\ (undef267 = undef267) /\ (undef269 = undef269) /\ (undef270 = undef270), par{i2^0 -> (1 + i2^0), j2^0 -> undef299}> 267.96/268.30 <l10, l10, ((0 + i2^0) <= (0 + nn2^0)) /\ ((0 + i3^0) <= 1) /\ (1 <= (0 + i3^0)) /\ ((1 + i2^0) <= 1) /\ (undef299 = undef299) /\ (undef268 = undef268) /\ (undef267 = undef267) /\ (undef269 = undef269) /\ (undef270 = undef270), par{i2^0 -> (1 + i2^0), j2^0 -> undef299}> 267.96/268.30 <l11, l2, ((1 + nn2^0) <= (0 + i2^0)) /\ ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ (0 <= (0 + isign^0)), par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l11, l2, ((1 + nn2^0) <= (0 + i2^0)) /\ ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ ((1 + isign^0) <= ~(1)), par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l11, l2, ((1 + nn2^0) <= (0 + i2^0)) /\ ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ ((0 + isign^0) <= ~(1)) /\ (~(1) <= (0 + isign^0)), par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l11, l11, ((1 + nn2^0) <= (0 + i2^0)) /\ ((0 + (1 + i1^0)) <= (0 + nn1^0)), par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l11, l11, ((0 + i2^0) <= (0 + nn2^0)) /\ (undef793 = (1 + j2^0)), par{i2^0 -> (1 + i2^0), j2^0 -> (1 + undef793)}> 267.96/268.30 <l20, l2, ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ (0 <= (0 + isign^0)), par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l20, l2, ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ ((1 + isign^0) <= ~(1)), par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l20, l2, ((1 + nn1^0) <= (0 + (1 + i1^0))) /\ ((0 + isign^0) <= ~(1)) /\ (~(1) <= (0 + isign^0)), par{i1^0 -> (1 + i1^0)}> 267.96/268.30 <l20, l20, ((0 + (1 + i1^0)) <= (0 + nn1^0)) /\ ((0 + (1 + i1^0)) <= 1) /\ (1 <= (0 + (1 + i1^0))), par{i1^0 -> (1 + i1^0), wr^0 -> 1}>
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