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Integer_Transition_Systems 2019-03-29 01.54 pair #432274148
details
property
value
status
complete
benchmark
nakata_withassume.t2.smt2
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n072.star.cs.uiowa.edu
space
From_T2
run statistics
property
value
solver
VeryMax-termCOMP17
configuration
termcomp2019_ITS
runtime (wallclock)
4.10718 seconds
cpu usage
4.10673
user time
3.83812
system time
0.268613
max virtual memory
691632.0
max residence set size
35224.0
stage attributes
key
value
starexec-result
YES
output
4.09/4.10 YES 4.09/4.10 4.09/4.10 Solver Timeout: 4 4.09/4.10 Global Timeout: 300 4.09/4.10 No parsing errors! 4.09/4.10 Init Location: 0 4.09/4.10 Transitions: 4.09/4.10 <l0, l23, true> 4.09/4.10 <l1, l2, ((0 + seq^0) <= (1 + n^0))> 4.09/4.10 <l3, l1, ((0 + max^0) <= (0 + m^0))> 4.09/4.10 <l3, l1, ((1 + m^0) <= (0 + max^0)), par{m^0 -> (1 + m^0)}> 4.09/4.10 <l4, l5, (undef38 = (1 + seq^0)) /\ (undef40 = undef40) /\ (0 <= (0 + undef40)), par{pi^0 -> (0 + undef38), pos^0 -> 0, seq^0 -> undef38, wpos^0 -> 0, z^0 -> undef40}> 4.09/4.10 <l6, l4, ((0 + pi^0) <= 0)> 4.09/4.10 <l6, l5, (1 <= (0 + pi^0)) /\ ((0 + c2^0) <= 0), par{pi^0 -> (~(1) + pi^0), wpos^0 -> 0}> 4.09/4.10 <l7, l4, (2 <= (0 + wpos^0))> 4.09/4.10 <l7, l6, ((0 + wpos^0) <= 1)> 4.09/4.10 <l8, l7, (1 <= (0 + wpos^0))> 4.09/4.10 <l8, l5, ((0 + wpos^0) <= 0) /\ (1 <= (0 + c2^0)), par{wpos^0 -> (1 + wpos^0)}> 4.09/4.10 <l9, l5, (2 <= (0 + pos^0))> 4.09/4.10 <l9, l8, ((0 + pos^0) <= 1)> 4.09/4.10 <l5, l1, ((1 + c2^0) <= 1), par{m^0 -> (~(1) + m^0)}> 4.09/4.10 <l5, l3, (1 <= (0 + c2^0))> 4.09/4.10 <l10, l9, (1 <= (0 + pos^0))> 4.09/4.10 <l10, l5, ((0 + pos^0) <= 0) /\ ((0 + c2^0) <= 0), par{pos^0 -> (1 + pos^0)}> 4.09/4.10 <l11, l5, (1 <= (0 + z^0)), par{z^0 -> (~(1) + z^0)}> 4.09/4.10 <l11, l10, ((0 + z^0) <= 0)> 4.09/4.10 <l12, l13, (undef188 = (1 + seq^0)) /\ (undef190 = undef190) /\ (0 <= (0 + undef190)), par{pi^0 -> (0 + undef188), pos^0 -> 0, seq^0 -> undef188, wpos^0 -> 0, z^0 -> undef190}> 4.09/4.10 <l14, l12, ((0 + pi^0) <= 0)> 4.09/4.10 <l14, l13, (1 <= (0 + pi^0)) /\ ((0 + c1^0) <= 0), par{pi^0 -> (~(1) + pi^0), wpos^0 -> 0}> 4.09/4.10 <l15, l12, (2 <= (0 + wpos^0))> 4.09/4.10 <l15, l14, ((0 + wpos^0) <= 1)> 4.09/4.10 <l16, l15, (1 <= (0 + wpos^0))> 4.09/4.10 <l16, l13, ((0 + wpos^0) <= 0) /\ (1 <= (0 + c1^0)), par{wpos^0 -> (1 + wpos^0)}> 4.09/4.10 <l17, l13, (2 <= (0 + pos^0))> 4.09/4.10 <l17, l16, ((0 + pos^0) <= 1)> 4.09/4.10 <l13, l1, ((1 + c1^0) <= 1)> 4.09/4.10 <l13, l11, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1), par{c2^0 -> undef282}> 4.09/4.10 <l18, l17, (1 <= (0 + pos^0))> 4.09/4.10 <l18, l13, ((0 + pos^0) <= 0) /\ ((0 + c1^0) <= 0), par{pos^0 -> (1 + pos^0)}> 4.09/4.10 <l19, l13, (1 <= (0 + z^0)), par{z^0 -> (~(1) + z^0)}> 4.09/4.10 <l19, l18, ((0 + z^0) <= 0)> 4.09/4.10 <l20, l2, (undef338 = 1) /\ (undef340 = undef340) /\ (0 <= (0 + undef340)) /\ (undef335 = undef335) /\ (0 <= (0 + undef335)) /\ (undef334 = undef334) /\ (0 <= (0 + undef334)) /\ ((0 + undef334) <= (0 + undef335)) /\ (undef333 = undef333) /\ ((0 + undef333) <= (0 + undef334)) /\ (0 <= (0 + undef333)), par{m^0 -> undef333, max^0 -> undef334, n^0 -> undef335, pi^0 -> (0 + undef338), pos^0 -> 0, seq^0 -> undef338, wpos^0 -> 0, z^0 -> undef340}> 4.09/4.10 <l21, l22, ((0 + m^0) <= 0)> 4.09/4.10 <l21, l19, (1 <= (0 + m^0)) /\ (undef351 = undef351) /\ (0 <= (0 + undef351)) /\ ((0 + undef351) <= 1), par{c1^0 -> undef351}> 4.09/4.10 <l2, l21, true> 4.09/4.10 <l23, l20, true> 4.09/4.10 4.09/4.10 Fresh variables: 4.09/4.10 undef38, undef40, undef188, undef190, undef282, undef333, undef334, undef335, undef338, undef340, undef351, 4.09/4.10 4.09/4.10 Undef variables: 4.09/4.10 undef38, undef40, undef188, undef190, undef282, undef333, undef334, undef335, undef338, undef340, undef351, 4.09/4.10 4.09/4.10 Abstraction variables: 4.09/4.10 4.09/4.10 Exit nodes: 4.09/4.10 4.09/4.10 Accepting locations: 4.09/4.10 4.09/4.10 Asserts: 4.09/4.10 4.09/4.10 Preprocessed LLVMGraph 4.09/4.10 Init Location: 0 4.09/4.10 Transitions: 4.09/4.10 <l0, l2, (m^0 = undef333) /\ (max^0 = undef334) /\ (n^0 = undef335) /\ (pi^0 = (0 + undef338)) /\ (pos^0 = 0) /\ (seq^0 = undef338) /\ (wpos^0 = 0) /\ (z^0 = undef340) /\ (undef338 = 1) /\ (undef340 = undef340) /\ (0 <= (0 + undef340)) /\ (undef335 = undef335) /\ (0 <= (0 + undef335)) /\ (undef334 = undef334) /\ (0 <= (0 + undef334)) /\ ((0 + undef334) <= (0 + undef335)) /\ (undef333 = undef333) /\ ((0 + undef333) <= (0 + undef334)) /\ (0 <= (0 + undef333))> 4.09/4.10 <l2, l22, ((0 + m^0) <= 0)> 4.09/4.10 <l2, l13, (1 <= (0 + m^0)) /\ (undef351 = undef351) /\ (0 <= (0 + undef351)) /\ ((0 + undef351) <= 1) /\ (1 <= (0 + z^0)), par{c1^0 -> undef351, z^0 -> (~(1) + z^0)}> 4.09/4.10 <l2, l13, (1 <= (0 + m^0)) /\ (undef351 = undef351) /\ (0 <= (0 + undef351)) /\ ((0 + undef351) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ (2 <= (0 + pos^0)), par{c1^0 -> undef351}> 4.09/4.10 <l2, l13, (1 <= (0 + m^0)) /\ (undef351 = undef351) /\ (0 <= (0 + undef351)) /\ ((0 + undef351) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ (2 <= (0 + wpos^0)) /\ (undef188 = (1 + seq^0)) /\ (undef190 = undef190) /\ (0 <= (0 + undef190)), par{c1^0 -> undef351, pi^0 -> (0 + undef188), pos^0 -> 0, seq^0 -> undef188, wpos^0 -> 0, z^0 -> undef190}> 4.09/4.10 <l2, l13, (1 <= (0 + m^0)) /\ (undef351 = undef351) /\ (0 <= (0 + undef351)) /\ ((0 + undef351) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ ((0 + wpos^0) <= 1) /\ ((0 + pi^0) <= 0) /\ (undef188 = (1 + seq^0)) /\ (undef190 = undef190) /\ (0 <= (0 + undef190)), par{c1^0 -> undef351, pi^0 -> (0 + undef188), pos^0 -> 0, seq^0 -> undef188, wpos^0 -> 0, z^0 -> undef190}> 4.09/4.10 <l2, l13, (1 <= (0 + m^0)) /\ (undef351 = undef351) /\ (0 <= (0 + undef351)) /\ ((0 + undef351) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ ((0 + wpos^0) <= 1) /\ (1 <= (0 + pi^0)) /\ ((0 + undef351) <= 0), par{c1^0 -> undef351, pi^0 -> (~(1) + pi^0), wpos^0 -> 0}> 4.09/4.10 <l2, l13, (1 <= (0 + m^0)) /\ (undef351 = undef351) /\ (0 <= (0 + undef351)) /\ ((0 + undef351) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ ((0 + wpos^0) <= 0) /\ (1 <= (0 + undef351)), par{c1^0 -> undef351, wpos^0 -> (1 + wpos^0)}> 4.09/4.10 <l2, l13, (1 <= (0 + m^0)) /\ (undef351 = undef351) /\ (0 <= (0 + undef351)) /\ ((0 + undef351) <= 1) /\ ((0 + z^0) <= 0) /\ ((0 + pos^0) <= 0) /\ ((0 + undef351) <= 0), par{c1^0 -> undef351, pos^0 -> (1 + pos^0)}> 4.09/4.10 <l13, l2, ((1 + c1^0) <= 1) /\ ((0 + seq^0) <= (1 + n^0))> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ (1 <= (0 + z^0)) /\ ((1 + undef282) <= 1) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (~(1) + m^0), z^0 -> (~(1) + z^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ (1 <= (0 + z^0)) /\ (1 <= (0 + undef282)) /\ ((0 + max^0) <= (0 + m^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, z^0 -> (~(1) + z^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ (1 <= (0 + z^0)) /\ (1 <= (0 + undef282)) /\ ((1 + m^0) <= (0 + max^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (1 + m^0), z^0 -> (~(1) + z^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ (2 <= (0 + pos^0)) /\ ((1 + undef282) <= 1) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (~(1) + m^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ (2 <= (0 + pos^0)) /\ (1 <= (0 + undef282)) /\ ((0 + max^0) <= (0 + m^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ (2 <= (0 + pos^0)) /\ (1 <= (0 + undef282)) /\ ((1 + m^0) <= (0 + max^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (1 + m^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ (2 <= (0 + wpos^0)) /\ (undef38 = (1 + seq^0)) /\ (undef40 = undef40) /\ (0 <= (0 + undef40)) /\ ((1 + undef282) <= 1) /\ ((0 + undef38) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (~(1) + m^0), pi^0 -> (0 + undef38), pos^0 -> 0, seq^0 -> undef38, wpos^0 -> 0, z^0 -> undef40}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ (2 <= (0 + wpos^0)) /\ (undef38 = (1 + seq^0)) /\ (undef40 = undef40) /\ (0 <= (0 + undef40)) /\ (1 <= (0 + undef282)) /\ ((0 + max^0) <= (0 + m^0)) /\ ((0 + undef38) <= (1 + n^0)), par{c2^0 -> undef282, pi^0 -> (0 + undef38), pos^0 -> 0, seq^0 -> undef38, wpos^0 -> 0, z^0 -> undef40}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ (2 <= (0 + wpos^0)) /\ (undef38 = (1 + seq^0)) /\ (undef40 = undef40) /\ (0 <= (0 + undef40)) /\ (1 <= (0 + undef282)) /\ ((1 + m^0) <= (0 + max^0)) /\ ((0 + undef38) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (1 + m^0), pi^0 -> (0 + undef38), pos^0 -> 0, seq^0 -> undef38, wpos^0 -> 0, z^0 -> undef40}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ ((0 + wpos^0) <= 1) /\ ((0 + pi^0) <= 0) /\ (undef38 = (1 + seq^0)) /\ (undef40 = undef40) /\ (0 <= (0 + undef40)) /\ ((1 + undef282) <= 1) /\ ((0 + undef38) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (~(1) + m^0), pi^0 -> (0 + undef38), pos^0 -> 0, seq^0 -> undef38, wpos^0 -> 0, z^0 -> undef40}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ ((0 + wpos^0) <= 1) /\ ((0 + pi^0) <= 0) /\ (undef38 = (1 + seq^0)) /\ (undef40 = undef40) /\ (0 <= (0 + undef40)) /\ (1 <= (0 + undef282)) /\ ((0 + max^0) <= (0 + m^0)) /\ ((0 + undef38) <= (1 + n^0)), par{c2^0 -> undef282, pi^0 -> (0 + undef38), pos^0 -> 0, seq^0 -> undef38, wpos^0 -> 0, z^0 -> undef40}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ ((0 + wpos^0) <= 1) /\ ((0 + pi^0) <= 0) /\ (undef38 = (1 + seq^0)) /\ (undef40 = undef40) /\ (0 <= (0 + undef40)) /\ (1 <= (0 + undef282)) /\ ((1 + m^0) <= (0 + max^0)) /\ ((0 + undef38) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (1 + m^0), pi^0 -> (0 + undef38), pos^0 -> 0, seq^0 -> undef38, wpos^0 -> 0, z^0 -> undef40}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ ((0 + wpos^0) <= 1) /\ (1 <= (0 + pi^0)) /\ ((0 + undef282) <= 0) /\ ((1 + undef282) <= 1) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (~(1) + m^0), pi^0 -> (~(1) + pi^0), wpos^0 -> 0}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ ((0 + wpos^0) <= 1) /\ (1 <= (0 + pi^0)) /\ ((0 + undef282) <= 0) /\ (1 <= (0 + undef282)) /\ ((0 + max^0) <= (0 + m^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, pi^0 -> (~(1) + pi^0), wpos^0 -> 0}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ (1 <= (0 + wpos^0)) /\ ((0 + wpos^0) <= 1) /\ (1 <= (0 + pi^0)) /\ ((0 + undef282) <= 0) /\ (1 <= (0 + undef282)) /\ ((1 + m^0) <= (0 + max^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (1 + m^0), pi^0 -> (~(1) + pi^0), wpos^0 -> 0}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ ((0 + wpos^0) <= 0) /\ (1 <= (0 + undef282)) /\ ((1 + undef282) <= 1) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (~(1) + m^0), wpos^0 -> (1 + wpos^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ ((0 + wpos^0) <= 0) /\ (1 <= (0 + undef282)) /\ (1 <= (0 + undef282)) /\ ((0 + max^0) <= (0 + m^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, wpos^0 -> (1 + wpos^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ (1 <= (0 + pos^0)) /\ ((0 + pos^0) <= 1) /\ ((0 + wpos^0) <= 0) /\ (1 <= (0 + undef282)) /\ (1 <= (0 + undef282)) /\ ((1 + m^0) <= (0 + max^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (1 + m^0), wpos^0 -> (1 + wpos^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ ((0 + pos^0) <= 0) /\ ((0 + undef282) <= 0) /\ ((1 + undef282) <= 1) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (~(1) + m^0), pos^0 -> (1 + pos^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ ((0 + pos^0) <= 0) /\ ((0 + undef282) <= 0) /\ (1 <= (0 + undef282)) /\ ((0 + max^0) <= (0 + m^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, pos^0 -> (1 + pos^0)}> 4.09/4.10 <l13, l2, (1 <= (0 + c1^0)) /\ (undef282 = undef282) /\ (0 <= (0 + undef282)) /\ ((0 + undef282) <= 1) /\ ((0 + z^0) <= 0) /\ ((0 + pos^0) <= 0) /\ ((0 + undef282) <= 0) /\ (1 <= (0 + undef282)) /\ ((1 + m^0) <= (0 + max^0)) /\ ((0 + seq^0) <= (1 + n^0)), par{c2^0 -> undef282, m^0 -> (1 + m^0), pos^0 -> (1 + pos^0)}> 4.09/4.10 4.09/4.10 Fresh variables: 4.09/4.10 undef38, undef40, undef188, undef190, undef282, undef333, undef334, undef335, undef338, undef340, undef351, 4.09/4.10 4.09/4.10 Undef variables:
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