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SRS_Standard 2019-03-29 03.29 pair #432292056
details
property
value
status
complete
benchmark
z121.xml
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n130.star.cs.uiowa.edu
space
Zantema_04
run statistics
property
value
solver
ttt2-1.19
configuration
ttt2
runtime (wallclock)
2.56963 seconds
cpu usage
8.88488
user time
6.99416
system time
1.89072
max virtual memory
3579676.0
max residence set size
70312.0
stage attributes
key
value
starexec-result
YES
output
8.83/2.56 YES 8.83/2.56 8.83/2.56 Problem: 8.83/2.56 f(f(x1)) -> b(b(b(x1))) 8.83/2.56 a(f(x1)) -> f(a(a(x1))) 8.83/2.56 b(b(x1)) -> c(c(a(c(x1)))) 8.83/2.56 d(b(x1)) -> d(a(b(x1))) 8.83/2.56 c(c(x1)) -> d(d(d(x1))) 8.83/2.56 b(d(x1)) -> d(b(x1)) 8.83/2.56 c(d(d(x1))) -> f(x1) 8.83/2.56 8.83/2.56 Proof: 8.83/2.56 Matrix Interpretation Processor: dim=1 8.83/2.56 8.83/2.56 interpretation: 8.83/2.56 [d](x0) = x0 + 4, 8.83/2.56 8.83/2.56 [c](x0) = x0 + 6, 8.83/2.56 8.83/2.56 [a](x0) = x0, 8.83/2.56 8.83/2.56 [b](x0) = x0 + 9, 8.83/2.56 8.83/2.56 [f](x0) = x0 + 14 8.83/2.56 orientation: 8.83/2.56 f(f(x1)) = x1 + 28 >= x1 + 27 = b(b(b(x1))) 8.83/2.56 8.83/2.56 a(f(x1)) = x1 + 14 >= x1 + 14 = f(a(a(x1))) 8.83/2.56 8.83/2.56 b(b(x1)) = x1 + 18 >= x1 + 18 = c(c(a(c(x1)))) 8.83/2.56 8.83/2.56 d(b(x1)) = x1 + 13 >= x1 + 13 = d(a(b(x1))) 8.83/2.56 8.83/2.56 c(c(x1)) = x1 + 12 >= x1 + 12 = d(d(d(x1))) 8.83/2.56 8.83/2.56 b(d(x1)) = x1 + 13 >= x1 + 13 = d(b(x1)) 8.83/2.56 8.83/2.56 c(d(d(x1))) = x1 + 14 >= x1 + 14 = f(x1) 8.83/2.56 problem: 8.83/2.56 a(f(x1)) -> f(a(a(x1))) 8.83/2.56 b(b(x1)) -> c(c(a(c(x1)))) 8.83/2.56 d(b(x1)) -> d(a(b(x1))) 8.83/2.56 c(c(x1)) -> d(d(d(x1))) 8.83/2.56 b(d(x1)) -> d(b(x1)) 8.83/2.56 c(d(d(x1))) -> f(x1) 8.83/2.56 String Reversal Processor: 8.83/2.56 f(a(x1)) -> a(a(f(x1))) 8.83/2.56 b(b(x1)) -> c(a(c(c(x1)))) 8.83/2.56 b(d(x1)) -> b(a(d(x1))) 8.83/2.56 c(c(x1)) -> d(d(d(x1))) 8.83/2.56 d(b(x1)) -> b(d(x1)) 8.83/2.56 d(d(c(x1))) -> f(x1) 8.83/2.56 Matrix Interpretation Processor: dim=1 8.83/2.56 8.83/2.56 interpretation: 8.83/2.56 [d](x0) = x0 + 4, 8.83/2.56 8.83/2.56 [c](x0) = x0 + 8, 8.83/2.56 8.83/2.56 [a](x0) = x0, 8.83/2.56 8.83/2.56 [b](x0) = x0 + 14, 8.83/2.56 8.83/2.56 [f](x0) = x0 + 4 8.83/2.56 orientation: 8.83/2.56 f(a(x1)) = x1 + 4 >= x1 + 4 = a(a(f(x1))) 8.83/2.56 8.83/2.56 b(b(x1)) = x1 + 28 >= x1 + 24 = c(a(c(c(x1)))) 8.83/2.56 8.83/2.56 b(d(x1)) = x1 + 18 >= x1 + 18 = b(a(d(x1))) 8.83/2.56 8.83/2.56 c(c(x1)) = x1 + 16 >= x1 + 12 = d(d(d(x1))) 8.83/2.56 8.83/2.56 d(b(x1)) = x1 + 18 >= x1 + 18 = b(d(x1)) 8.83/2.56 8.83/2.56 d(d(c(x1))) = x1 + 16 >= x1 + 4 = f(x1) 8.83/2.56 problem: 8.83/2.56 f(a(x1)) -> a(a(f(x1))) 8.83/2.56 b(d(x1)) -> b(a(d(x1))) 8.83/2.56 d(b(x1)) -> b(d(x1)) 8.83/2.56 Bounds Processor: 8.83/2.56 bound: 1 8.83/2.56 enrichment: match 8.83/2.56 automaton: 8.83/2.56 final states: {8,5,1} 8.83/2.56 transitions: 8.83/2.56 f50() -> 2* 8.83/2.56 a0(4) -> 1* 8.83/2.56 a0(6) -> 7* 8.83/2.56 a0(3) -> 4* 8.83/2.56 f0(2) -> 3* 8.83/2.56 b0(7) -> 5* 8.83/2.56 b0(6) -> 8* 8.83/2.56 d0(2) -> 6* 8.83/2.56 b1(15) -> 16* 8.83/2.56 a1(14) -> 15* 8.83/2.56 d1(13) -> 14* 8.83/2.56 1 -> 3* 8.83/2.56 2 -> 13* 8.83/2.56 8 -> 14,6
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