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TRS Standard pair #516963278
details
property
value
status
complete
benchmark
Ex5_DLMMU04_FR.xml
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n075.star.cs.uiowa.edu
space
Transformed_CSR_04
run statistics
property
value
solver
NaTT 2.1
configuration
default
runtime (wallclock)
1.50547194481 seconds
cpu usage
1.705510359
max memory
4.99712E7
stage attributes
key
value
output-size
4561
starexec-result
MAYBE
output
/export/starexec/sandbox2/solver/bin/starexec_run_default /export/starexec/sandbox2/benchmark/theBenchmark.xml /export/starexec/sandbox2/output/output_files -------------------------------------------------------------------------------- MAYBE Input TRS: 1: pairNs() -> cons(0(),n__incr(n__oddNs())) 2: oddNs() -> incr(pairNs()) 3: incr(cons(X,XS)) -> cons(s(X),n__incr(activate(XS))) 4: take(0(),XS) -> nil() 5: take(s(N),cons(X,XS)) -> cons(X,n__take(N,activate(XS))) 6: zip(nil(),XS) -> nil() 7: zip(X,nil()) -> nil() 8: zip(cons(X,XS),cons(Y,YS)) -> cons(pair(X,Y),n__zip(activate(XS),activate(YS))) 9: tail(cons(X,XS)) -> activate(XS) 10: repItems(nil()) -> nil() 11: repItems(cons(X,XS)) -> cons(X,n__cons(X,n__repItems(activate(XS)))) 12: incr(X) -> n__incr(X) 13: oddNs() -> n__oddNs() 14: take(X1,X2) -> n__take(X1,X2) 15: zip(X1,X2) -> n__zip(X1,X2) 16: cons(X1,X2) -> n__cons(X1,X2) 17: repItems(X) -> n__repItems(X) 18: activate(n__incr(X)) -> incr(activate(X)) 19: activate(n__oddNs()) -> oddNs() 20: activate(n__take(X1,X2)) -> take(activate(X1),activate(X2)) 21: activate(n__zip(X1,X2)) -> zip(activate(X1),activate(X2)) 22: activate(n__cons(X1,X2)) -> cons(activate(X1),X2) 23: activate(n__repItems(X)) -> repItems(activate(X)) 24: activate(X) -> X Number of strict rules: 24 Direct poly ... removes: 4 10 7 9 6 repItems(x1) w: (5600 + 2 * x1) incr(x1) w: (x1) s(x1) w: (x1) n__oddNs() w: (21653) activate(x1) w: (x1) take(x1,x2) w: (36262 + x2 + x1) pair(x1,x2) w: (x2 + x1) tail(x1) w: (3 + x1) 0() w: (0) n__take(x1,x2) w: (36262 + x2 + x1) n__cons(x1,x2) w: (x2 + x1) nil() w: (878) n__zip(x1,x2) w: (1 + x2 + x1) pairNs() w: (21653) oddNs() w: (21653) n__repItems(x1) w: (5600 + 2 * x1) cons(x1,x2) w: (x2 + x1) n__incr(x1) w: (x1) zip(x1,x2) w: (1 + x2 + x1) Number of strict rules: 19 Direct poly ... failed. Freezing ... failed. Dependency Pairs: #1: #oddNs() -> #incr(pairNs()) #2: #oddNs() -> #pairNs() #3: #repItems(cons(X,XS)) -> #cons(X,n__cons(X,n__repItems(activate(XS)))) #4: #repItems(cons(X,XS)) -> #activate(XS) #5: #activate(n__repItems(X)) -> #repItems(activate(X)) #6: #activate(n__repItems(X)) -> #activate(X) #7: #activate(n__take(X1,X2)) -> #take(activate(X1),activate(X2)) #8: #activate(n__take(X1,X2)) -> #activate(X1) #9: #activate(n__take(X1,X2)) -> #activate(X2) #10: #take(s(N),cons(X,XS)) -> #cons(X,n__take(N,activate(XS))) #11: #take(s(N),cons(X,XS)) -> #activate(XS) #12: #activate(n__cons(X1,X2)) -> #cons(activate(X1),X2) #13: #activate(n__cons(X1,X2)) -> #activate(X1) #14: #activate(n__oddNs()) -> #oddNs() #15: #activate(n__zip(X1,X2)) -> #zip(activate(X1),activate(X2)) #16: #activate(n__zip(X1,X2)) -> #activate(X1) #17: #activate(n__zip(X1,X2)) -> #activate(X2) #18: #incr(cons(X,XS)) -> #cons(s(X),n__incr(activate(XS))) #19: #incr(cons(X,XS)) -> #activate(XS) #20: #pairNs() -> #cons(0(),n__incr(n__oddNs())) #21: #zip(cons(X,XS),cons(Y,YS)) -> #cons(pair(X,Y),n__zip(activate(XS),activate(YS))) #22: #zip(cons(X,XS),cons(Y,YS)) -> #activate(XS) #23: #zip(cons(X,XS),cons(Y,YS)) -> #activate(YS) #24: #activate(n__incr(X)) -> #incr(activate(X)) #25: #activate(n__incr(X)) -> #activate(X) Number of SCCs: 1, DPs: 18 SCC { #1 #4..9 #11 #13..17 #19 #22..25 } Sum... Max... succeeded. repItems(x1) w: (2160 + x1) incr(x1) w: (x1) #cons(x1,x2) w: (0) s(x1) w: (x1) n__oddNs() w: (17224) #take(x1,x2) w: (max{1 + x2, 2 + x1}) activate(x1) w: (x1) take(x1,x2) w: (max{1 + x2, 8368 + x1}) #pairNs() w: (0) pair(x1,x2) w: (max{2 + x2, 1 + x1}) #activate(x1) w: (x1) #zip(x1,x2) w: (max{5920 + x2, 1 + x1}) tail(x1) w: (0) 0() w: (0) n__take(x1,x2) w: (max{1 + x2, 8368 + x1})
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