Spaces
Explore
Communities
Statistics
Reports
Cluster
Status
Help
Integer_Transition_Systems 2019-03-29 01.54 pair #432273965
details
property
value
status
complete
benchmark
java_DivWithoutMinus.c.t2.smt2
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n142.star.cs.uiowa.edu
space
From_T2
run statistics
property
value
solver
VeryMax-termCOMP17
configuration
termcomp2019_ITS
runtime (wallclock)
2.32922 seconds
cpu usage
2.30383
user time
1.97318
system time
0.330659
max virtual memory
994484.0
max residence set size
262860.0
stage attributes
key
value
starexec-result
YES
output
2.28/2.32 YES 2.28/2.32 2.28/2.32 Solver Timeout: 4 2.28/2.32 Global Timeout: 300 2.28/2.32 No parsing errors! 2.28/2.32 Init Location: 0 2.28/2.32 Transitions: 2.28/2.32 <l0, l11, true> 2.28/2.32 <l1, l2, (undef1 = (0 + x0^0)) /\ (undef2 = (0 + x1^0)) /\ (undef3 = (0 + x2^0)) /\ (undef4 = (0 + x3^0)), par{oldX0^0 -> undef1, oldX1^0 -> undef2, oldX2^0 -> undef3, oldX3^0 -> undef4, x0^0 -> (0 + undef1), x1^0 -> (0 + undef2), x2^0 -> (~(1) + undef3), x3^0 -> (~(1) + undef4)}> 2.28/2.32 <l3, l1, (undef13 = (0 + x0^0)) /\ (undef14 = (0 + x1^0)) /\ (undef15 = (0 + x2^0)) /\ (undef16 = (0 + x3^0)) /\ (1 <= (0 + undef15)), par{oldX0^0 -> undef13, oldX1^0 -> undef14, oldX2^0 -> undef15, oldX3^0 -> undef16, x0^0 -> (0 + undef13), x1^0 -> (0 + undef14), x2^0 -> (0 + undef15), x3^0 -> (0 + undef16)}> 2.28/2.32 <l3, l1, (undef25 = (0 + x0^0)) /\ (undef26 = (0 + x1^0)) /\ (undef27 = (0 + x2^0)) /\ (undef28 = (0 + x3^0)) /\ ((1 + undef27) <= 0), par{oldX0^0 -> undef25, oldX1^0 -> undef26, oldX2^0 -> undef27, oldX3^0 -> undef28, x0^0 -> (0 + undef25), x1^0 -> (0 + undef26), x2^0 -> (0 + undef27), x3^0 -> (0 + undef28)}> 2.28/2.32 <l3, l4, (undef37 = (0 + x0^0)) /\ (undef38 = (0 + x1^0)) /\ (undef39 = (0 + x2^0)) /\ (undef40 = (0 + x3^0)) /\ ((0 + undef39) <= 0) /\ (0 <= (0 + undef39)), par{oldX0^0 -> undef37, oldX1^0 -> undef38, oldX2^0 -> undef39, oldX3^0 -> undef40, x0^0 -> (0 + undef37), x1^0 -> (0 + undef38), x2^0 -> (0 + undef39), x3^0 -> (0 + undef40)}> 2.28/2.32 <l5, l6, (undef49 = (0 + x0^0)) /\ (undef50 = (0 + x1^0)) /\ (undef51 = (0 + x2^0)) /\ (undef52 = (0 + x3^0)) /\ ((0 + undef52) <= 0), par{oldX0^0 -> undef49, oldX1^0 -> undef50, oldX2^0 -> undef51, oldX3^0 -> undef52, x0^0 -> (0 + undef49), x1^0 -> (0 + undef50), x2^0 -> (0 + undef51), x3^0 -> (0 + undef52)}> 2.28/2.32 <l5, l6, (undef61 = (0 + x0^0)) /\ (undef62 = (0 + x1^0)) /\ (undef63 = (0 + x2^0)) /\ (undef64 = (0 + x3^0)) /\ ((0 + undef63) <= 0), par{oldX0^0 -> undef61, oldX1^0 -> undef62, oldX2^0 -> undef63, oldX3^0 -> undef64, x0^0 -> (0 + undef61), x1^0 -> (0 + undef62), x2^0 -> (0 + undef63), x3^0 -> (0 + undef64)}> 2.28/2.32 <l5, l3, (undef73 = (0 + x0^0)) /\ (undef74 = (0 + x1^0)) /\ (undef75 = (0 + x2^0)) /\ (undef76 = (0 + x3^0)) /\ (1 <= (0 + undef75)) /\ (1 <= (0 + undef76)), par{oldX0^0 -> undef73, oldX1^0 -> undef74, oldX2^0 -> undef75, oldX3^0 -> undef76, x0^0 -> (0 + undef73), x1^0 -> (0 + undef74), x2^0 -> (0 + undef75), x3^0 -> (0 + undef76)}> 2.28/2.32 <l4, l2, (undef85 = (0 + x0^0)) /\ (undef86 = (0 + x1^0)) /\ (undef88 = (0 + x3^0)), par{oldX0^0 -> undef85, oldX1^0 -> undef86, oldX2^0 -> (0 + x2^0), oldX3^0 -> undef88, x0^0 -> (0 + undef85), x1^0 -> (1 + undef86), x2^0 -> (0 + undef85), x3^0 -> (0 + undef88)}> 2.28/2.32 <l7, l5, (undef97 = (0 + x0^0)) /\ (undef98 = (0 + x1^0)) /\ (undef99 = (0 + x2^0)) /\ (undef100 = (0 + x3^0)) /\ (1 <= (0 + undef99)), par{oldX0^0 -> undef97, oldX1^0 -> undef98, oldX2^0 -> undef99, oldX3^0 -> undef100, x0^0 -> (0 + undef97), x1^0 -> (0 + undef98), x2^0 -> (0 + undef99), x3^0 -> (0 + undef100)}> 2.28/2.32 <l7, l5, (undef109 = (0 + x0^0)) /\ (undef110 = (0 + x1^0)) /\ (undef111 = (0 + x2^0)) /\ (undef112 = (0 + x3^0)) /\ ((1 + undef111) <= 0), par{oldX0^0 -> undef109, oldX1^0 -> undef110, oldX2^0 -> undef111, oldX3^0 -> undef112, x0^0 -> (0 + undef109), x1^0 -> (0 + undef110), x2^0 -> (0 + undef111), x3^0 -> (0 + undef112)}> 2.28/2.32 <l7, l4, (undef121 = (0 + x0^0)) /\ (undef122 = (0 + x1^0)) /\ (undef123 = (0 + x2^0)) /\ (undef124 = (0 + x3^0)) /\ ((0 + undef123) <= 0) /\ (0 <= (0 + undef123)), par{oldX0^0 -> undef121, oldX1^0 -> undef122, oldX2^0 -> undef123, oldX3^0 -> undef124, x0^0 -> (0 + undef121), x1^0 -> (0 + undef122), x2^0 -> (0 + undef123), x3^0 -> (0 + undef124)}> 2.28/2.32 <l6, l8, (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> undef137, oldX5^0 -> undef138, oldX6^0 -> undef139, oldX7^0 -> undef140, x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l2, l7, (undef145 = (0 + x0^0)) /\ (undef146 = (0 + x1^0)) /\ (undef147 = (0 + x2^0)) /\ (undef148 = (0 + x3^0)) /\ (1 <= (0 + undef145)), par{oldX0^0 -> undef145, oldX1^0 -> undef146, oldX2^0 -> undef147, oldX3^0 -> undef148, x0^0 -> (0 + undef145), x1^0 -> (0 + undef146), x2^0 -> (0 + undef147), x3^0 -> (0 + undef148)}> 2.28/2.32 <l2, l6, (undef157 = (0 + x0^0)) /\ (undef158 = (0 + x1^0)) /\ (undef159 = (0 + x2^0)) /\ (undef160 = (0 + x3^0)) /\ ((0 + undef157) <= 0), par{oldX0^0 -> undef157, oldX1^0 -> undef158, oldX2^0 -> undef159, oldX3^0 -> undef160, x0^0 -> (0 + undef157), x1^0 -> (0 + undef158), x2^0 -> (0 + undef159), x3^0 -> (0 + undef160)}> 2.28/2.32 <l9, l2, (undef173 = undef173) /\ (undef174 = undef174), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> undef173, oldX5^0 -> undef174, x0^0 -> (0 + undef173), x1^0 -> 0, x2^0 -> (0 + undef173), x3^0 -> (0 + undef174)}> 2.28/2.32 <l10, l9, (undef185 = undef185) /\ (undef186 = undef186) /\ (undef187 = undef187) /\ (undef188 = undef188), par{oldX0^0 -> (0 + x0^0), oldX1^0 -> (0 + x1^0), oldX2^0 -> (0 + x2^0), oldX3^0 -> (0 + x3^0), oldX4^0 -> undef185, oldX5^0 -> undef186, oldX6^0 -> undef187, oldX7^0 -> undef188, x0^0 -> (0 + undef185), x1^0 -> (0 + undef186), x2^0 -> (0 + undef187), x3^0 -> (0 + undef188)}> 2.28/2.32 <l10, l1, true> 2.28/2.32 <l10, l3, true> 2.28/2.32 <l10, l5, true> 2.28/2.32 <l10, l4, true> 2.28/2.32 <l10, l7, true> 2.28/2.32 <l10, l6, true> 2.28/2.32 <l10, l2, true> 2.28/2.32 <l10, l9, true> 2.28/2.32 <l10, l8, true> 2.28/2.32 <l11, l10, true> 2.28/2.32 2.28/2.32 Fresh variables: 2.28/2.32 undef1, undef2, undef3, undef4, undef13, undef14, undef15, undef16, undef25, undef26, undef27, undef28, undef37, undef38, undef39, undef40, undef49, undef50, undef51, undef52, undef61, undef62, undef63, undef64, undef73, undef74, undef75, undef76, undef85, undef86, undef88, undef97, undef98, undef99, undef100, undef109, undef110, undef111, undef112, undef121, undef122, undef123, undef124, undef137, undef138, undef139, undef140, undef145, undef146, undef147, undef148, undef157, undef158, undef159, undef160, undef173, undef174, undef185, undef186, undef187, undef188, 2.28/2.32 2.28/2.32 Undef variables: 2.28/2.32 undef1, undef2, undef3, undef4, undef13, undef14, undef15, undef16, undef25, undef26, undef27, undef28, undef37, undef38, undef39, undef40, undef49, undef50, undef51, undef52, undef61, undef62, undef63, undef64, undef73, undef74, undef75, undef76, undef85, undef86, undef88, undef97, undef98, undef99, undef100, undef109, undef110, undef111, undef112, undef121, undef122, undef123, undef124, undef137, undef138, undef139, undef140, undef145, undef146, undef147, undef148, undef157, undef158, undef159, undef160, undef173, undef174, undef185, undef186, undef187, undef188, 2.28/2.32 2.28/2.32 Abstraction variables: 2.28/2.32 2.28/2.32 Exit nodes: 2.28/2.32 2.28/2.32 Accepting locations: 2.28/2.32 2.28/2.32 Asserts: 2.28/2.32 2.28/2.32 Preprocessed LLVMGraph 2.28/2.32 Init Location: 0 2.28/2.32 Transitions: 2.28/2.32 <l0, l2, (undef185 = undef185) /\ (undef186 = undef186) /\ (undef187 = undef187) /\ (undef188 = undef188) /\ (undef173 = undef173) /\ (undef174 = undef174), par{x0^0 -> (0 + undef173), x1^0 -> 0, x2^0 -> (0 + undef173), x3^0 -> (0 + undef174)}> 2.28/2.32 <l0, l2, (undef1 = (0 + x0^0)) /\ (undef2 = (0 + x1^0)) /\ (undef3 = (0 + x2^0)) /\ (undef4 = (0 + x3^0)), par{x0^0 -> (0 + undef1), x1^0 -> (0 + undef2), x2^0 -> (~(1) + undef3), x3^0 -> (~(1) + undef4)}> 2.28/2.32 <l0, l3, true> 2.28/2.32 <l0, l8, (undef49 = (0 + x0^0)) /\ (undef50 = (0 + x1^0)) /\ (undef51 = (0 + x2^0)) /\ (undef52 = (0 + x3^0)) /\ ((0 + undef52) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l0, l8, (undef61 = (0 + x0^0)) /\ (undef62 = (0 + x1^0)) /\ (undef63 = (0 + x2^0)) /\ (undef64 = (0 + x3^0)) /\ ((0 + undef63) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l0, l3, (undef73 = (0 + x0^0)) /\ (undef74 = (0 + x1^0)) /\ (undef75 = (0 + x2^0)) /\ (undef76 = (0 + x3^0)) /\ (1 <= (0 + undef75)) /\ (1 <= (0 + undef76)), par{x0^0 -> (0 + undef73), x1^0 -> (0 + undef74), x2^0 -> (0 + undef75), x3^0 -> (0 + undef76)}> 2.28/2.32 <l0, l2, (undef85 = (0 + x0^0)) /\ (undef86 = (0 + x1^0)) /\ (undef88 = (0 + x3^0)), par{x0^0 -> (0 + undef85), x1^0 -> (1 + undef86), x2^0 -> (0 + undef85), x3^0 -> (0 + undef88)}> 2.28/2.32 <l0, l8, (undef97 = (0 + x0^0)) /\ (undef98 = (0 + x1^0)) /\ (undef99 = (0 + x2^0)) /\ (undef100 = (0 + x3^0)) /\ (1 <= (0 + undef99)) /\ (undef49 = (0 + (0 + undef97))) /\ (undef50 = (0 + (0 + undef98))) /\ (undef51 = (0 + (0 + undef99))) /\ (undef52 = (0 + (0 + undef100))) /\ ((0 + undef52) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l0, l3, (undef97 = (0 + x0^0)) /\ (undef98 = (0 + x1^0)) /\ (undef99 = (0 + x2^0)) /\ (undef100 = (0 + x3^0)) /\ (1 <= (0 + undef99)) /\ (undef73 = (0 + (0 + undef97))) /\ (undef74 = (0 + (0 + undef98))) /\ (undef75 = (0 + (0 + undef99))) /\ (undef76 = (0 + (0 + undef100))) /\ (1 <= (0 + undef75)) /\ (1 <= (0 + undef76)), par{x0^0 -> (0 + undef73), x1^0 -> (0 + undef74), x2^0 -> (0 + undef75), x3^0 -> (0 + undef76)}> 2.28/2.32 <l0, l8, (undef109 = (0 + x0^0)) /\ (undef110 = (0 + x1^0)) /\ (undef111 = (0 + x2^0)) /\ (undef112 = (0 + x3^0)) /\ ((1 + undef111) <= 0) /\ (undef49 = (0 + (0 + undef109))) /\ (undef50 = (0 + (0 + undef110))) /\ (undef51 = (0 + (0 + undef111))) /\ (undef52 = (0 + (0 + undef112))) /\ ((0 + undef52) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l0, l8, (undef109 = (0 + x0^0)) /\ (undef110 = (0 + x1^0)) /\ (undef111 = (0 + x2^0)) /\ (undef112 = (0 + x3^0)) /\ ((1 + undef111) <= 0) /\ (undef61 = (0 + (0 + undef109))) /\ (undef62 = (0 + (0 + undef110))) /\ (undef63 = (0 + (0 + undef111))) /\ (undef64 = (0 + (0 + undef112))) /\ ((0 + undef63) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l0, l2, (undef121 = (0 + x0^0)) /\ (undef122 = (0 + x1^0)) /\ (undef123 = (0 + x2^0)) /\ (undef124 = (0 + x3^0)) /\ ((0 + undef123) <= 0) /\ (0 <= (0 + undef123)) /\ (undef85 = (0 + (0 + undef121))) /\ (undef86 = (0 + (0 + undef122))) /\ (undef88 = (0 + (0 + undef124))), par{x0^0 -> (0 + undef85), x1^0 -> (1 + undef86), x2^0 -> (0 + undef85), x3^0 -> (0 + undef88)}> 2.28/2.32 <l0, l8, (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l0, l2, true> 2.28/2.32 <l0, l2, (undef173 = undef173) /\ (undef174 = undef174), par{x0^0 -> (0 + undef173), x1^0 -> 0, x2^0 -> (0 + undef173), x3^0 -> (0 + undef174)}> 2.28/2.32 <l0, l8, true> 2.28/2.32 <l2, l8, (undef145 = (0 + x0^0)) /\ (undef146 = (0 + x1^0)) /\ (undef147 = (0 + x2^0)) /\ (undef148 = (0 + x3^0)) /\ (1 <= (0 + undef145)) /\ (undef97 = (0 + (0 + undef145))) /\ (undef98 = (0 + (0 + undef146))) /\ (undef99 = (0 + (0 + undef147))) /\ (undef100 = (0 + (0 + undef148))) /\ (1 <= (0 + undef99)) /\ (undef49 = (0 + (0 + undef97))) /\ (undef50 = (0 + (0 + undef98))) /\ (undef51 = (0 + (0 + undef99))) /\ (undef52 = (0 + (0 + undef100))) /\ ((0 + undef52) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l2, l3, (undef145 = (0 + x0^0)) /\ (undef146 = (0 + x1^0)) /\ (undef147 = (0 + x2^0)) /\ (undef148 = (0 + x3^0)) /\ (1 <= (0 + undef145)) /\ (undef97 = (0 + (0 + undef145))) /\ (undef98 = (0 + (0 + undef146))) /\ (undef99 = (0 + (0 + undef147))) /\ (undef100 = (0 + (0 + undef148))) /\ (1 <= (0 + undef99)) /\ (undef73 = (0 + (0 + undef97))) /\ (undef74 = (0 + (0 + undef98))) /\ (undef75 = (0 + (0 + undef99))) /\ (undef76 = (0 + (0 + undef100))) /\ (1 <= (0 + undef75)) /\ (1 <= (0 + undef76)), par{x0^0 -> (0 + undef73), x1^0 -> (0 + undef74), x2^0 -> (0 + undef75), x3^0 -> (0 + undef76)}> 2.28/2.32 <l2, l8, (undef145 = (0 + x0^0)) /\ (undef146 = (0 + x1^0)) /\ (undef147 = (0 + x2^0)) /\ (undef148 = (0 + x3^0)) /\ (1 <= (0 + undef145)) /\ (undef109 = (0 + (0 + undef145))) /\ (undef110 = (0 + (0 + undef146))) /\ (undef111 = (0 + (0 + undef147))) /\ (undef112 = (0 + (0 + undef148))) /\ ((1 + undef111) <= 0) /\ (undef49 = (0 + (0 + undef109))) /\ (undef50 = (0 + (0 + undef110))) /\ (undef51 = (0 + (0 + undef111))) /\ (undef52 = (0 + (0 + undef112))) /\ ((0 + undef52) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l2, l8, (undef145 = (0 + x0^0)) /\ (undef146 = (0 + x1^0)) /\ (undef147 = (0 + x2^0)) /\ (undef148 = (0 + x3^0)) /\ (1 <= (0 + undef145)) /\ (undef109 = (0 + (0 + undef145))) /\ (undef110 = (0 + (0 + undef146))) /\ (undef111 = (0 + (0 + undef147))) /\ (undef112 = (0 + (0 + undef148))) /\ ((1 + undef111) <= 0) /\ (undef61 = (0 + (0 + undef109))) /\ (undef62 = (0 + (0 + undef110))) /\ (undef63 = (0 + (0 + undef111))) /\ (undef64 = (0 + (0 + undef112))) /\ ((0 + undef63) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l2, l2, (undef145 = (0 + x0^0)) /\ (undef146 = (0 + x1^0)) /\ (undef147 = (0 + x2^0)) /\ (undef148 = (0 + x3^0)) /\ (1 <= (0 + undef145)) /\ (undef121 = (0 + (0 + undef145))) /\ (undef122 = (0 + (0 + undef146))) /\ (undef123 = (0 + (0 + undef147))) /\ (undef124 = (0 + (0 + undef148))) /\ ((0 + undef123) <= 0) /\ (0 <= (0 + undef123)) /\ (undef85 = (0 + (0 + undef121))) /\ (undef86 = (0 + (0 + undef122))) /\ (undef88 = (0 + (0 + undef124))), par{x0^0 -> (0 + undef85), x1^0 -> (1 + undef86), x2^0 -> (0 + undef85), x3^0 -> (0 + undef88)}> 2.28/2.32 <l2, l8, (undef157 = (0 + x0^0)) /\ (undef158 = (0 + x1^0)) /\ (undef159 = (0 + x2^0)) /\ (undef160 = (0 + x3^0)) /\ ((0 + undef157) <= 0) /\ (undef137 = undef137) /\ (undef138 = undef138) /\ (undef139 = undef139) /\ (undef140 = undef140), par{x0^0 -> (0 + undef137), x1^0 -> (0 + undef138), x2^0 -> (0 + undef139), x3^0 -> (0 + undef140)}> 2.28/2.32 <l3, l2, (undef13 = (0 + x0^0)) /\ (undef14 = (0 + x1^0)) /\ (undef15 = (0 + x2^0)) /\ (undef16 = (0 + x3^0)) /\ (1 <= (0 + undef15)) /\ (undef1 = (0 + (0 + undef13))) /\ (undef2 = (0 + (0 + undef14))) /\ (undef3 = (0 + (0 + undef15))) /\ (undef4 = (0 + (0 + undef16))), par{x0^0 -> (0 + undef1), x1^0 -> (0 + undef2), x2^0 -> (~(1) + undef3), x3^0 -> (~(1) + undef4)}> 2.28/2.32 <l3, l2, (undef25 = (0 + x0^0)) /\ (undef26 = (0 + x1^0)) /\ (undef27 = (0 + x2^0)) /\ (undef28 = (0 + x3^0)) /\ ((1 + undef27) <= 0) /\ (undef1 = (0 + (0 + undef25))) /\ (undef2 = (0 + (0 + undef26))) /\ (undef3 = (0 + (0 + undef27))) /\ (undef4 = (0 + (0 + undef28))), par{x0^0 -> (0 + undef1), x1^0 -> (0 + undef2), x2^0 -> (~(1) + undef3), x3^0 -> (~(1) + undef4)}> 2.28/2.32 <l3, l2, (undef37 = (0 + x0^0)) /\ (undef38 = (0 + x1^0)) /\ (undef39 = (0 + x2^0)) /\ (undef40 = (0 + x3^0)) /\ ((0 + undef39) <= 0) /\ (0 <= (0 + undef39)) /\ (undef85 = (0 + (0 + undef37))) /\ (undef86 = (0 + (0 + undef38))) /\ (undef88 = (0 + (0 + undef40))), par{x0^0 -> (0 + undef85), x1^0 -> (1 + undef86), x2^0 -> (0 + undef85), x3^0 -> (0 + undef88)}> 2.28/2.32 2.28/2.32 Fresh variables: 2.28/2.32 undef1, undef2, undef3, undef4, undef13, undef14, undef15, undef16, undef25, undef26, undef27, undef28, undef37, undef38, undef39, undef40, undef49, undef50, undef51, undef52, undef61, undef62, undef63, undef64, undef73, undef74, undef75, undef76, undef85, undef86, undef88, undef97, undef98, undef99, undef100, undef109, undef110, undef111, undef112, undef121, undef122, undef123, undef124, undef137, undef138, undef139, undef140, undef145, undef146, undef147, undef148, undef157, undef158, undef159, undef160, undef173, undef174, undef185, undef186, undef187, undef188, 2.28/2.32 2.28/2.32 Undef variables: 2.28/2.32 undef1, undef2, undef3, undef4, undef13, undef14, undef15, undef16, undef25, undef26, undef27, undef28, undef37, undef38, undef39, undef40, undef49, undef50, undef51, undef52, undef61, undef62, undef63, undef64, undef73, undef74, undef75, undef76, undef85, undef86, undef88, undef97, undef98, undef99, undef100, undef109, undef110, undef111, undef112, undef121, undef122, undef123, undef124, undef137, undef138, undef139, undef140, undef145, undef146, undef147, undef148, undef157, undef158, undef159, undef160, undef173, undef174, undef185, undef186, undef187, undef188, 2.28/2.32 2.28/2.32 Abstraction variables: 2.28/2.32 2.28/2.32 Exit nodes: 2.28/2.32 2.28/2.32 Accepting locations: 2.28/2.32 2.28/2.32 Asserts: 2.28/2.32 2.28/2.32 ************************************************************* 2.28/2.32 ******************************************************************************************* 2.28/2.32 *********************** WORKING TRANSITION SYSTEM (DAG) *********************** 2.28/2.32 ******************************************************************************************* 2.28/2.32 2.28/2.32 Init Location: 0 2.28/2.32 Graph 0: 2.28/2.32 Transitions:
popout
output may be truncated. 'popout' for the full output.
job log
popout
actions
all output
return to Integer_Transition_Systems 2019-03-29 01.54