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Integer_Transition_Systems 2019-03-29 01.54 pair #432275198
details
property
value
status
complete
benchmark
create_seg.t2.smt2
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n012.star.cs.uiowa.edu
space
From_T2
run statistics
property
value
solver
VeryMax-termCOMP17
configuration
termcomp2019_ITS
runtime (wallclock)
0.06915 seconds
cpu usage
0.069287
user time
0.056713
system time
0.012574
max virtual memory
113176.0
max residence set size
6704.0
stage attributes
key
value
starexec-result
YES
output
0.00/0.06 YES 0.00/0.06 0.00/0.06 Solver Timeout: 4 0.00/0.06 Global Timeout: 300 0.00/0.06 No parsing errors! 0.00/0.06 Init Location: 0 0.00/0.06 Transitions: 0.00/0.06 <l0, l7, true> 0.00/0.06 <l1, l2, (undef18 = undef18) /\ (undef12 = (0 + undef18)) /\ (undef7 = undef7) /\ (undef6 = (0 + undef12)) /\ (undef3 = (0 + tail_14^0)) /\ (undef2 = (0 + undef3)) /\ (undef4 = 0) /\ (0 <= (0 + undef4)) /\ ((0 + undef4) <= 0) /\ ((0 + undef12) <= (0 + undef6)) /\ ((0 + undef6) <= (0 + undef12)) /\ ((0 + tail_14^0) <= (0 + undef3)) /\ ((0 + undef3) <= (0 + tail_14^0)) /\ ((0 + tail_14^0) <= (0 + undef2)) /\ ((0 + undef2) <= (0 + tail_14^0)) /\ ((0 + undef3) <= (0 + undef2)) /\ ((0 + undef2) <= (0 + undef3)), par{head_21^0 -> undef2, head_SLAM_f_18^0 -> undef3, i_19^0 -> undef4, length_17^0 -> undef6, nondet_12^0 -> undef7, result_dot_nondet_sdv_special_RETURN_VALUE_13^0 -> undef12}> 0.00/0.06 <l3, l4, (undef30 = undef30) /\ ((0 + length_17^0) <= (0 + i_19^0)) /\ (undef38 = (0 + head_21^0)) /\ (undef36 = (0 + undef38)) /\ (undef24 = undef24) /\ (undef21 = undef21) /\ (undef22 = undef22) /\ (undef33 = undef33) /\ (undef20 = undef20) /\ (undef29 = undef29) /\ (undef35 = undef35) /\ (undef34 = undef34) /\ (undef37 = undef37) /\ (1 <= (0 + undef30)) /\ ((0 + undef30) <= 1) /\ (1 <= (0 + undef30)) /\ ((0 + undef30) <= 1), par{head_16^0 -> (0 + undef36), head_21^0 -> undef20, head_SLAM_f_18^0 -> undef21, i_19^0 -> undef22, length_17^0 -> undef24, result_11^0 -> (0 + temp0_15^0), result_dot_SLAyer_malloc_sdv_special_RETURN_VALUE_22^0 -> undef29, result_dot_nondet_sdv_special_RETURN_VALUE_13^0 -> undef30, temp0_20^0 -> undef33, temp_26^0 -> undef34, tmp_23^0 -> undef35}> 0.00/0.06 <l3, l5, (undef50 = undef50) /\ (undef51 = undef51) /\ (undef41 = undef41) /\ (undef49 = undef49) /\ (undef46 = undef46) /\ ((1 + i_19^0) <= (0 + length_17^0)) /\ (undef55 = (0 + temp_26^0)) /\ (undef54 = undef54) /\ (undef40 = (0 + undef55)) /\ (undef42 = (1 + i_19^0)) /\ (2 <= (0 + undef42)) /\ ((0 + undef42) <= 2) /\ ((0 + undef50) <= (0 + length_17^0)) /\ ((0 + length_17^0) <= (0 + undef50)) /\ ((0 + undef51) <= (0 + undef41)) /\ ((0 + undef41) <= (0 + undef51)) /\ ((0 + undef40) <= (0 + undef49)) /\ ((0 + undef49) <= (0 + undef40)) /\ ((0 + undef40) <= (0 + undef55)) /\ ((0 + undef55) <= (0 + undef40)) /\ ((0 + undef49) <= (0 + undef55)) /\ ((0 + undef55) <= (0 + undef49)) /\ (1 <= (0 + length_17^0)) /\ (2 <= (0 + length_17^0)), par{head_21^0 -> undef40, head_SLAM_f_18^0 -> undef41, i_19^0 -> undef42, rcd_50^0 -> undef46, result_dot_SLAyer_malloc_sdv_special_RETURN_VALUE_22^0 -> undef49, result_dot_nondet_sdv_special_RETURN_VALUE_13^0 -> undef50, tail_14^0 -> undef51, temp_26^0 -> undef54, tmp_23^0 -> undef55}> 0.00/0.06 <l5, l4, (0 <= (0 + i_19^0)) /\ (undef67 = undef67) /\ ((0 + length_17^0) <= (0 + i_19^0)) /\ (undef75 = (0 + head_21^0)) /\ (undef73 = (0 + undef75)) /\ (undef61 = undef61) /\ (undef58 = undef58) /\ (undef59 = undef59) /\ (undef70 = undef70) /\ (undef57 = undef57) /\ (undef66 = undef66) /\ (undef72 = undef72) /\ (undef71 = undef71) /\ (undef74 = undef74) /\ (1 <= (0 + undef67)) /\ (2 <= (0 + undef67)) /\ ((0 + undef67) <= (0 + undef59)), par{head_16^0 -> (0 + undef73), head_21^0 -> undef57, head_SLAM_f_18^0 -> undef58, i_19^0 -> undef59, length_17^0 -> undef61, result_11^0 -> (0 + temp0_15^0), result_dot_SLAyer_malloc_sdv_special_RETURN_VALUE_22^0 -> undef66, result_dot_nondet_sdv_special_RETURN_VALUE_13^0 -> undef67, temp0_20^0 -> undef70, temp_26^0 -> undef71, tmp_23^0 -> undef72}> 0.00/0.06 <l5, l6, (0 <= (0 + i_19^0)) /\ (undef84 = undef84) /\ (undef80 = undef80) /\ ((1 + i_19^0) <= (0 + length_17^0)) /\ (undef92 = (0 + temp_26^0)) /\ (undef91 = undef91) /\ (undef79 = (1 + i_19^0)) /\ ((0 + undef79) <= (1 + undef80)) /\ ((1 + undef80) <= (0 + undef79)) /\ ((0 + undef80) <= (~(1) + undef79)) /\ ((~(1) + undef79) <= (0 + undef80)) /\ ((1 + undef80) <= (0 + length_17^0)), par{head_21^0 -> (0 + undef92), i_19^0 -> undef79, i_86^0 -> undef80, rcd_80^0 -> undef84, temp_26^0 -> undef91, tmp_23^0 -> undef92}> 0.00/0.06 <l6, l5, true> 0.00/0.06 <l2, l4, (undef121 = undef121) /\ ((0 + length_17^0) <= (0 + i_19^0)) /\ (undef129 = (0 + head_21^0)) /\ (undef127 = (0 + undef129)) /\ (undef115 = undef115) /\ (undef112 = undef112) /\ (undef113 = undef113) /\ (undef124 = undef124) /\ (undef111 = undef111) /\ (undef120 = undef120) /\ (undef126 = undef126) /\ (undef125 = undef125) /\ (undef128 = undef128) /\ ((0 + undef121) <= 0), par{head_16^0 -> (0 + undef127), head_21^0 -> undef111, head_SLAM_f_18^0 -> undef112, i_19^0 -> undef113, length_17^0 -> undef115, result_11^0 -> (0 + temp0_15^0), result_dot_SLAyer_malloc_sdv_special_RETURN_VALUE_22^0 -> undef120, result_dot_nondet_sdv_special_RETURN_VALUE_13^0 -> undef121, temp0_20^0 -> undef124, temp_26^0 -> undef125, tmp_23^0 -> undef126}> 0.00/0.06 <l2, l3, (undef141 = undef141) /\ (undef142 = undef142) /\ (undef132 = undef132) /\ (undef140 = undef140) /\ ((1 + i_19^0) <= (0 + length_17^0)) /\ (undef146 = (0 + temp_26^0)) /\ (undef145 = undef145) /\ (undef131 = (0 + undef146)) /\ (undef133 = (1 + i_19^0)) /\ (1 <= (0 + undef133)) /\ ((0 + undef133) <= 1) /\ ((0 + undef141) <= (0 + length_17^0)) /\ ((0 + length_17^0) <= (0 + undef141)) /\ ((0 + undef142) <= (0 + undef132)) /\ ((0 + undef132) <= (0 + undef142)) /\ ((0 + undef131) <= (0 + undef140)) /\ ((0 + undef140) <= (0 + undef131)) /\ ((0 + undef131) <= (0 + undef146)) /\ ((0 + undef146) <= (0 + undef131)) /\ ((0 + undef140) <= (0 + undef146)) /\ ((0 + undef146) <= (0 + undef140)) /\ (1 <= (0 + length_17^0)), par{head_21^0 -> undef131, head_SLAM_f_18^0 -> undef132, i_19^0 -> undef133, result_dot_SLAyer_malloc_sdv_special_RETURN_VALUE_22^0 -> undef140, result_dot_nondet_sdv_special_RETURN_VALUE_13^0 -> undef141, tail_14^0 -> undef142, temp_26^0 -> undef145, tmp_23^0 -> undef146}> 0.00/0.06 <l7, l1, true> 0.00/0.06 0.00/0.06 Fresh variables: 0.00/0.06 undef2, undef3, undef4, undef6, undef7, undef12, undef18, undef20, undef21, undef22, undef24, undef29, undef30, undef33, undef34, undef35, undef36, undef37, undef38, undef40, undef41, undef42, undef46, undef49, undef50, undef51, undef54, undef55, undef57, undef58, undef59, undef61, undef66, undef67, undef70, undef71, undef72, undef73, undef74, undef75, undef79, undef80, undef84, undef91, undef92, undef111, undef112, undef113, undef115, undef120, undef121, undef124, undef125, undef126, undef127, undef128, undef129, undef131, undef132, undef133, undef140, undef141, undef142, undef145, undef146, 0.00/0.06 0.00/0.06 Undef variables: 0.00/0.06 undef2, undef3, undef4, undef6, undef7, undef12, undef18, undef20, undef21, undef22, undef24, undef29, undef30, undef33, undef34, undef35, undef36, undef37, undef38, undef40, undef41, undef42, undef46, undef49, undef50, undef51, undef54, undef55, undef57, undef58, undef59, undef61, undef66, undef67, undef70, undef71, undef72, undef73, undef74, undef75, undef79, undef80, undef84, undef91, undef92, undef111, undef112, undef113, undef115, undef120, undef121, undef124, undef125, undef126, undef127, undef128, undef129, undef131, undef132, undef133, undef140, undef141, undef142, undef145, undef146, 0.00/0.06 0.00/0.06 Abstraction variables: 0.00/0.06 0.00/0.06 Exit nodes: 0.00/0.06 0.00/0.06 Accepting locations: 0.00/0.06 0.00/0.06 Asserts: 0.00/0.06 0.00/0.06 Preprocessed LLVMGraph 0.00/0.06 Init Location: 0 0.00/0.06 Transitions: 0.00/0.06 <l0, l4, (undef18 = undef18) /\ (undef12 = (0 + undef18)) /\ (undef7 = undef7) /\ (undef6 = (0 + undef12)) /\ (undef3 = (0 + tail_14^0)) /\ (undef2 = (0 + undef3)) /\ (undef4 = 0) /\ (0 <= (0 + undef4)) /\ ((0 + undef4) <= 0) /\ ((0 + undef12) <= (0 + undef6)) /\ ((0 + undef6) <= (0 + undef12)) /\ ((0 + tail_14^0) <= (0 + undef3)) /\ ((0 + undef3) <= (0 + tail_14^0)) /\ ((0 + tail_14^0) <= (0 + undef2)) /\ ((0 + undef2) <= (0 + tail_14^0)) /\ ((0 + undef3) <= (0 + undef2)) /\ ((0 + undef2) <= (0 + undef3)) /\ (undef121 = undef121) /\ ((0 + undef6) <= (0 + undef4)) /\ (undef129 = (0 + undef2)) /\ (undef127 = (0 + undef129)) /\ (undef115 = undef115) /\ (undef112 = undef112) /\ (undef113 = undef113) /\ (undef124 = undef124) /\ (undef111 = undef111) /\ (undef120 = undef120) /\ (undef126 = undef126) /\ (undef125 = undef125) /\ (undef128 = undef128) /\ ((0 + undef121) <= 0), par{head_21^0 -> undef111, i_19^0 -> undef113, length_17^0 -> undef115, temp_26^0 -> undef125}> 0.00/0.06 <l0, l4, (undef18 = undef18) /\ (undef12 = (0 + undef18)) /\ (undef7 = undef7) /\ (undef6 = (0 + undef12)) /\ (undef3 = (0 + tail_14^0)) /\ (undef2 = (0 + undef3)) /\ (undef4 = 0) /\ (0 <= (0 + undef4)) /\ ((0 + undef4) <= 0) /\ ((0 + undef12) <= (0 + undef6)) /\ ((0 + undef6) <= (0 + undef12)) /\ ((0 + tail_14^0) <= (0 + undef3)) /\ ((0 + undef3) <= (0 + tail_14^0)) /\ ((0 + tail_14^0) <= (0 + undef2)) /\ ((0 + undef2) <= (0 + tail_14^0)) /\ ((0 + undef3) <= (0 + undef2)) /\ ((0 + undef2) <= (0 + undef3)) /\ (undef141 = undef141) /\ (undef142 = undef142) /\ (undef132 = undef132) /\ (undef140 = undef140) /\ ((1 + undef4) <= (0 + undef6)) /\ (undef146 = (0 + temp_26^0)) /\ (undef145 = undef145) /\ (undef131 = (0 + undef146)) /\ (undef133 = (1 + undef4)) /\ (1 <= (0 + undef133)) /\ ((0 + undef133) <= 1) /\ ((0 + undef141) <= (0 + undef6)) /\ ((0 + undef6) <= (0 + undef141)) /\ ((0 + undef142) <= (0 + undef132)) /\ ((0 + undef132) <= (0 + undef142)) /\ ((0 + undef131) <= (0 + undef140)) /\ ((0 + undef140) <= (0 + undef131)) /\ ((0 + undef131) <= (0 + undef146)) /\ ((0 + undef146) <= (0 + undef131)) /\ ((0 + undef140) <= (0 + undef146)) /\ ((0 + undef146) <= (0 + undef140)) /\ (1 <= (0 + undef6)) /\ (undef30 = undef30) /\ ((0 + undef6) <= (0 + undef133)) /\ (undef38 = (0 + undef131)) /\ (undef36 = (0 + undef38)) /\ (undef24 = undef24) /\ (undef21 = undef21) /\ (undef22 = undef22) /\ (undef33 = undef33) /\ (undef20 = undef20) /\ (undef29 = undef29) /\ (undef35 = undef35) /\ (undef34 = undef34) /\ (undef37 = undef37) /\ (1 <= (0 + undef30)) /\ ((0 + undef30) <= 1) /\ (1 <= (0 + undef30)) /\ ((0 + undef30) <= 1), par{head_21^0 -> undef20, i_19^0 -> undef22, length_17^0 -> undef24, tail_14^0 -> undef142, temp_26^0 -> undef34}> 0.00/0.06 <l0, l5, (undef18 = undef18) /\ (undef12 = (0 + undef18)) /\ (undef7 = undef7) /\ (undef6 = (0 + undef12)) /\ (undef3 = (0 + tail_14^0)) /\ (undef2 = (0 + undef3)) /\ (undef4 = 0) /\ (0 <= (0 + undef4)) /\ ((0 + undef4) <= 0) /\ ((0 + undef12) <= (0 + undef6)) /\ ((0 + undef6) <= (0 + undef12)) /\ ((0 + tail_14^0) <= (0 + undef3)) /\ ((0 + undef3) <= (0 + tail_14^0)) /\ ((0 + tail_14^0) <= (0 + undef2)) /\ ((0 + undef2) <= (0 + tail_14^0)) /\ ((0 + undef3) <= (0 + undef2)) /\ ((0 + undef2) <= (0 + undef3)) /\ (undef141 = undef141) /\ (undef142 = undef142) /\ (undef132 = undef132) /\ (undef140 = undef140) /\ ((1 + undef4) <= (0 + undef6)) /\ (undef146 = (0 + temp_26^0)) /\ (undef145 = undef145) /\ (undef131 = (0 + undef146)) /\ (undef133 = (1 + undef4)) /\ (1 <= (0 + undef133)) /\ ((0 + undef133) <= 1) /\ ((0 + undef141) <= (0 + undef6)) /\ ((0 + undef6) <= (0 + undef141)) /\ ((0 + undef142) <= (0 + undef132)) /\ ((0 + undef132) <= (0 + undef142)) /\ ((0 + undef131) <= (0 + undef140)) /\ ((0 + undef140) <= (0 + undef131)) /\ ((0 + undef131) <= (0 + undef146)) /\ ((0 + undef146) <= (0 + undef131)) /\ ((0 + undef140) <= (0 + undef146)) /\ ((0 + undef146) <= (0 + undef140)) /\ (1 <= (0 + undef6)) /\ (undef50 = undef50) /\ (undef51 = undef51) /\ (undef41 = undef41) /\ (undef49 = undef49) /\ (undef46 = undef46) /\ ((1 + undef133) <= (0 + undef6)) /\ (undef55 = (0 + undef145)) /\ (undef54 = undef54) /\ (undef40 = (0 + undef55)) /\ (undef42 = (1 + undef133)) /\ (2 <= (0 + undef42)) /\ ((0 + undef42) <= 2) /\ ((0 + undef50) <= (0 + undef6)) /\ ((0 + undef6) <= (0 + undef50)) /\ ((0 + undef51) <= (0 + undef41)) /\ ((0 + undef41) <= (0 + undef51)) /\ ((0 + undef40) <= (0 + undef49)) /\ ((0 + undef49) <= (0 + undef40)) /\ ((0 + undef40) <= (0 + undef55)) /\ ((0 + undef55) <= (0 + undef40)) /\ ((0 + undef49) <= (0 + undef55)) /\ ((0 + undef55) <= (0 + undef49)) /\ (1 <= (0 + undef6)) /\ (2 <= (0 + undef6)), par{head_21^0 -> undef40, i_19^0 -> undef42, length_17^0 -> undef6, tail_14^0 -> undef51, temp_26^0 -> undef54}> 0.00/0.06 <l5, l4, (0 <= (0 + i_19^0)) /\ (undef67 = undef67) /\ ((0 + length_17^0) <= (0 + i_19^0)) /\ (undef75 = (0 + head_21^0)) /\ (undef73 = (0 + undef75)) /\ (undef61 = undef61) /\ (undef58 = undef58) /\ (undef59 = undef59) /\ (undef70 = undef70) /\ (undef57 = undef57) /\ (undef66 = undef66) /\ (undef72 = undef72) /\ (undef71 = undef71) /\ (undef74 = undef74) /\ (1 <= (0 + undef67)) /\ (2 <= (0 + undef67)) /\ ((0 + undef67) <= (0 + undef59)), par{head_21^0 -> undef57, i_19^0 -> undef59, length_17^0 -> undef61, temp_26^0 -> undef71}> 0.00/0.06 <l5, l5, (0 <= (0 + i_19^0)) /\ (undef84 = undef84) /\ (undef80 = undef80) /\ ((1 + i_19^0) <= (0 + length_17^0)) /\ (undef92 = (0 + temp_26^0)) /\ (undef91 = undef91) /\ (undef79 = (1 + i_19^0)) /\ ((0 + undef79) <= (1 + undef80)) /\ ((1 + undef80) <= (0 + undef79)) /\ ((0 + undef80) <= (~(1) + undef79)) /\ ((~(1) + undef79) <= (0 + undef80)) /\ ((1 + undef80) <= (0 + length_17^0)), par{head_21^0 -> (0 + undef92), i_19^0 -> undef79, temp_26^0 -> undef91}> 0.00/0.06 0.00/0.06 Fresh variables: 0.00/0.06 undef2, undef3, undef4, undef6, undef7, undef12, undef18, undef20, undef21, undef22, undef24, undef29, undef30, undef33, undef34, undef35, undef36, undef37, undef38, undef40, undef41, undef42, undef46, undef49, undef50, undef51, undef54, undef55, undef57, undef58, undef59, undef61, undef66, undef67, undef70, undef71, undef72, undef73, undef74, undef75, undef79, undef80, undef84, undef91, undef92, undef111, undef112, undef113, undef115, undef120, undef121, undef124, undef125, undef126, undef127, undef128, undef129, undef131, undef132, undef133, undef140, undef141, undef142, undef145, undef146, 0.00/0.06 0.00/0.06 Undef variables: 0.00/0.06 undef2, undef3, undef4, undef6, undef7, undef12, undef18, undef20, undef21, undef22, undef24, undef29, undef30, undef33, undef34, undef35, undef36, undef37, undef38, undef40, undef41, undef42, undef46, undef49, undef50, undef51, undef54, undef55, undef57, undef58, undef59, undef61, undef66, undef67, undef70, undef71, undef72, undef73, undef74, undef75, undef79, undef80, undef84, undef91, undef92, undef111, undef112, undef113, undef115, undef120, undef121, undef124, undef125, undef126, undef127, undef128, undef129, undef131, undef132, undef133, undef140, undef141, undef142, undef145, undef146, 0.00/0.06 0.00/0.06 Abstraction variables: 0.00/0.06 0.00/0.06 Exit nodes: 0.00/0.06 0.00/0.06 Accepting locations: 0.00/0.06 0.00/0.06 Asserts: 0.00/0.06 0.00/0.06 ************************************************************* 0.00/0.06 ******************************************************************************************* 0.00/0.06 *********************** WORKING TRANSITION SYSTEM (DAG) *********************** 0.00/0.06 ******************************************************************************************* 0.00/0.06 0.00/0.06 Init Location: 0 0.00/0.06 Graph 0: 0.00/0.06 Transitions: 0.00/0.06 Variables: 0.00/0.06 0.00/0.06 Graph 1: 0.00/0.06 Transitions: 0.00/0.06 <l5, l5, 0 <= i_19^0 /\ 1 + i_19^0 <= length_17^0 /\ 1 + undef80 <= length_17^0 /\ temp_26^0 = undef92 /\ 1 + i_19^0 = undef79 /\ undef79 = 1 + undef80, {head_21^0 -> undef92, i_19^0 -> undef79, temp_26^0 -> undef91, rest remain the same}> 0.00/0.06 Variables: 0.00/0.06 head_21^0, i_19^0, length_17^0, temp_26^0 0.00/0.06 0.00/0.06 Graph 2: 0.00/0.06 Transitions: 0.00/0.06 Variables: 0.00/0.06 0.00/0.06 Precedence: 0.00/0.06 Graph 0 0.00/0.06 0.00/0.06 Graph 1 0.00/0.06 <l0, l5, 1 + undef4 <= undef6 /\ 1 + undef133 <= undef6 /\ 2 <= undef6 /\ tail_14^0 = undef2 /\ tail_14^0 = undef3 /\ temp_26^0 = undef146 /\ undef2 = undef3 /\ undef4 = 0 /\ undef6 = undef12 /\ undef6 = undef50 /\ undef6 = undef141 /\ undef12 = undef18 /\ undef40 = undef49 /\ undef40 = undef55 /\ undef41 = undef51 /\ undef49 = undef55 /\ undef55 = undef145 /\ undef131 = undef140 /\ undef131 = undef146 /\ undef132 = undef142 /\ undef140 = undef146 /\ 1 + undef4 = undef133 /\ undef42 = 1 + undef133 /\ undef133 = 1 /\ undef42 = 2, {head_21^0 -> undef40, i_19^0 -> undef42, length_17^0 -> undef6, tail_14^0 -> undef51, temp_26^0 -> undef54, rest remain the same}> 0.00/0.06 0.00/0.06 Graph 2 0.00/0.06 <l0, l4, undef6 <= undef4 /\ undef121 <= 0 /\ tail_14^0 = undef2 /\ tail_14^0 = undef3 /\ undef2 = undef3 /\ undef2 = undef129 /\ undef4 = 0 /\ undef6 = undef12 /\ undef12 = undef18 /\ undef127 = undef129, {head_21^0 -> undef111, i_19^0 -> undef113, length_17^0 -> undef115, temp_26^0 -> undef125, rest remain the same}> 0.00/0.06 <l0, l4, undef6 <= undef133 /\ 1 + undef4 <= undef6 /\ 1 <= undef6 /\ tail_14^0 = undef2 /\ tail_14^0 = undef3 /\ temp_26^0 = undef146 /\ undef2 = undef3 /\ undef4 = 0 /\ undef6 = undef12 /\ undef6 = undef141 /\ undef12 = undef18 /\ undef36 = undef38 /\ undef38 = undef131 /\ undef131 = undef140 /\ undef131 = undef146 /\ undef132 = undef142 /\ undef140 = undef146 /\ 1 + undef4 = undef133 /\ undef30 = 1 /\ undef133 = 1, {head_21^0 -> undef20, i_19^0 -> undef22, length_17^0 -> undef24, tail_14^0 -> undef142, temp_26^0 -> undef34, rest remain the same}> 0.00/0.06 <l5, l4, 0 <= i_19^0 /\ length_17^0 <= i_19^0 /\ undef67 <= undef59 /\ 2 <= undef67 /\ head_21^0 = undef75 /\ undef73 = undef75, {head_21^0 -> undef57, i_19^0 -> undef59, length_17^0 -> undef61, temp_26^0 -> undef71, rest remain the same}> 0.00/0.06 0.00/0.06 Map Locations to Subgraph: 0.00/0.06 ( 0 , 0 ) 0.00/0.06 ( 4 , 2 ) 0.00/0.06 ( 5 , 1 ) 0.00/0.06 0.00/0.06 ******************************************************************************************* 0.00/0.06 ******************************** CHECKING ASSERTIONS ******************************** 0.00/0.06 ******************************************************************************************* 0.00/0.06 0.00/0.06 Proving termination of subgraph 0 0.00/0.06 Proving termination of subgraph 1 0.00/0.06 Checking unfeasibility... 0.00/0.06 Time used: 0.004631 0.00/0.06
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return to Integer_Transition_Systems 2019-03-29 01.54