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TRS Standard pair #487067434
details
property
value
status
complete
benchmark
#3.6.xml
ran by
Akihisa Yamada
cpu timeout
1200 seconds
wallclock timeout
300 seconds
memory limit
137438953472 bytes
execution host
n074.star.cs.uiowa.edu
space
AG01
run statistics
property
value
solver
muterm 6.0.3
configuration
default
runtime (wallclock)
0.0623579 seconds
cpu usage
0.050761
user time
0.027488
system time
0.023273
max virtual memory
113188.0
max residence set size
5816.0
stage attributes
key
value
starexec-result
YES
output
YES Problem 1: (VAR v_NonEmpty:S x:S y:S) (RULES gcd(0,y:S) -> y:S gcd(s(x:S),0) -> s(x:S) gcd(s(x:S),s(y:S)) -> if_gcd(le(y:S,x:S),s(x:S),s(y:S)) if_gcd(ffalse,s(x:S),s(y:S)) -> gcd(minus(y:S,x:S),s(x:S)) if_gcd(ttrue,s(x:S),s(y:S)) -> gcd(minus(x:S,y:S),s(y:S)) le(0,y:S) -> ttrue le(s(x:S),0) -> ffalse le(s(x:S),s(y:S)) -> le(x:S,y:S) minus(x:S,0) -> x:S minus(x:S,s(y:S)) -> pred(minus(x:S,y:S)) pred(s(x:S)) -> x:S ) Problem 1: Innermost Equivalent Processor: -> Rules: gcd(0,y:S) -> y:S gcd(s(x:S),0) -> s(x:S) gcd(s(x:S),s(y:S)) -> if_gcd(le(y:S,x:S),s(x:S),s(y:S)) if_gcd(ffalse,s(x:S),s(y:S)) -> gcd(minus(y:S,x:S),s(x:S)) if_gcd(ttrue,s(x:S),s(y:S)) -> gcd(minus(x:S,y:S),s(y:S)) le(0,y:S) -> ttrue le(s(x:S),0) -> ffalse le(s(x:S),s(y:S)) -> le(x:S,y:S) minus(x:S,0) -> x:S minus(x:S,s(y:S)) -> pred(minus(x:S,y:S)) pred(s(x:S)) -> x:S -> The term rewriting system is non-overlaping or locally confluent overlay system. Therefore, innermost termination implies termination. Problem 1: Dependency Pairs Processor: -> Pairs: GCD(s(x:S),s(y:S)) -> IF_GCD(le(y:S,x:S),s(x:S),s(y:S)) GCD(s(x:S),s(y:S)) -> LE(y:S,x:S) IF_GCD(ffalse,s(x:S),s(y:S)) -> GCD(minus(y:S,x:S),s(x:S)) IF_GCD(ffalse,s(x:S),s(y:S)) -> MINUS(y:S,x:S) IF_GCD(ttrue,s(x:S),s(y:S)) -> GCD(minus(x:S,y:S),s(y:S)) IF_GCD(ttrue,s(x:S),s(y:S)) -> MINUS(x:S,y:S) LE(s(x:S),s(y:S)) -> LE(x:S,y:S) MINUS(x:S,s(y:S)) -> MINUS(x:S,y:S) MINUS(x:S,s(y:S)) -> PRED(minus(x:S,y:S)) -> Rules: gcd(0,y:S) -> y:S gcd(s(x:S),0) -> s(x:S) gcd(s(x:S),s(y:S)) -> if_gcd(le(y:S,x:S),s(x:S),s(y:S)) if_gcd(ffalse,s(x:S),s(y:S)) -> gcd(minus(y:S,x:S),s(x:S)) if_gcd(ttrue,s(x:S),s(y:S)) -> gcd(minus(x:S,y:S),s(y:S)) le(0,y:S) -> ttrue le(s(x:S),0) -> ffalse le(s(x:S),s(y:S)) -> le(x:S,y:S) minus(x:S,0) -> x:S minus(x:S,s(y:S)) -> pred(minus(x:S,y:S)) pred(s(x:S)) -> x:S Problem 1: SCC Processor: -> Pairs: GCD(s(x:S),s(y:S)) -> IF_GCD(le(y:S,x:S),s(x:S),s(y:S)) GCD(s(x:S),s(y:S)) -> LE(y:S,x:S) IF_GCD(ffalse,s(x:S),s(y:S)) -> GCD(minus(y:S,x:S),s(x:S)) IF_GCD(ffalse,s(x:S),s(y:S)) -> MINUS(y:S,x:S) IF_GCD(ttrue,s(x:S),s(y:S)) -> GCD(minus(x:S,y:S),s(y:S)) IF_GCD(ttrue,s(x:S),s(y:S)) -> MINUS(x:S,y:S) LE(s(x:S),s(y:S)) -> LE(x:S,y:S) MINUS(x:S,s(y:S)) -> MINUS(x:S,y:S) MINUS(x:S,s(y:S)) -> PRED(minus(x:S,y:S)) -> Rules: gcd(0,y:S) -> y:S gcd(s(x:S),0) -> s(x:S) gcd(s(x:S),s(y:S)) -> if_gcd(le(y:S,x:S),s(x:S),s(y:S)) if_gcd(ffalse,s(x:S),s(y:S)) -> gcd(minus(y:S,x:S),s(x:S)) if_gcd(ttrue,s(x:S),s(y:S)) -> gcd(minus(x:S,y:S),s(y:S)) le(0,y:S) -> ttrue le(s(x:S),0) -> ffalse le(s(x:S),s(y:S)) -> le(x:S,y:S) minus(x:S,0) -> x:S minus(x:S,s(y:S)) -> pred(minus(x:S,y:S)) pred(s(x:S)) -> x:S ->Strongly Connected Components: ->->Cycle: ->->-> Pairs: MINUS(x:S,s(y:S)) -> MINUS(x:S,y:S) ->->-> Rules: gcd(0,y:S) -> y:S gcd(s(x:S),0) -> s(x:S) gcd(s(x:S),s(y:S)) -> if_gcd(le(y:S,x:S),s(x:S),s(y:S)) if_gcd(ffalse,s(x:S),s(y:S)) -> gcd(minus(y:S,x:S),s(x:S)) if_gcd(ttrue,s(x:S),s(y:S)) -> gcd(minus(x:S,y:S),s(y:S)) le(0,y:S) -> ttrue le(s(x:S),0) -> ffalse
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