MAYBE
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict Trs:
{ p(0()) -> 0()
, p(s(X)) -> X
, leq(0(), Y) -> true()
, leq(s(X), 0()) -> false()
, leq(s(X), s(Y)) -> leq(X, Y)
, if(true(), X, Y) -> X
, if(false(), X, Y) -> Y
, diff(X, Y) -> if(leq(X, Y), 0(), s(diff(p(X), Y))) }
Obligation:
runtime complexity
Answer:
MAYBE
None of the processors succeeded.
Details of failed attempt(s):
-----------------------------
1) 'WithProblem (timeout of 60 seconds)' failed due to the
following reason:
Computation stopped due to timeout after 60.0 seconds.
2) 'Best' failed due to the following reason:
None of the processors succeeded.
Details of failed attempt(s):
-----------------------------
1) 'WithProblem (timeout of 30 seconds) (timeout of 60 seconds)'
failed due to the following reason:
Computation stopped due to timeout after 30.0 seconds.
2) 'Fastest (timeout of 5 seconds) (timeout of 60 seconds)' failed
due to the following reason:
None of the processors succeeded.
Details of failed attempt(s):
-----------------------------
1) 'Bounds with minimal-enrichment and initial automaton 'match''
failed due to the following reason:
match-boundness of the problem could not be verified.
2) 'Bounds with perSymbol-enrichment and initial automaton 'match''
failed due to the following reason:
match-boundness of the problem could not be verified.
3) 'Best' failed due to the following reason:
None of the processors succeeded.
Details of failed attempt(s):
-----------------------------
1) 'Polynomial Path Order (PS) (timeout of 60 seconds)' failed due
to the following reason:
The processor is inapplicable, reason:
Processor only applicable for innermost runtime complexity analysis
2) 'bsearch-popstar (timeout of 60 seconds)' failed due to the
following reason:
The processor is inapplicable, reason:
Processor only applicable for innermost runtime complexity analysis
3) 'Innermost Weak Dependency Pairs (timeout of 60 seconds)' failed
due to the following reason:
We add the following weak dependency pairs:
Strict DPs:
{ p^#(0()) -> c_1()
, p^#(s(X)) -> c_2(X)
, leq^#(0(), Y) -> c_3()
, leq^#(s(X), 0()) -> c_4()
, leq^#(s(X), s(Y)) -> c_5(leq^#(X, Y))
, if^#(true(), X, Y) -> c_6(X)
, if^#(false(), X, Y) -> c_7(Y)
, diff^#(X, Y) -> c_8(if^#(leq(X, Y), 0(), s(diff(p(X), Y)))) }
and mark the set of starting terms.
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict DPs:
{ p^#(0()) -> c_1()
, p^#(s(X)) -> c_2(X)
, leq^#(0(), Y) -> c_3()
, leq^#(s(X), 0()) -> c_4()
, leq^#(s(X), s(Y)) -> c_5(leq^#(X, Y))
, if^#(true(), X, Y) -> c_6(X)
, if^#(false(), X, Y) -> c_7(Y)
, diff^#(X, Y) -> c_8(if^#(leq(X, Y), 0(), s(diff(p(X), Y)))) }
Strict Trs:
{ p(0()) -> 0()
, p(s(X)) -> X
, leq(0(), Y) -> true()
, leq(s(X), 0()) -> false()
, leq(s(X), s(Y)) -> leq(X, Y)
, if(true(), X, Y) -> X
, if(false(), X, Y) -> Y
, diff(X, Y) -> if(leq(X, Y), 0(), s(diff(p(X), Y))) }
Obligation:
runtime complexity
Answer:
MAYBE
We estimate the number of application of {1,3,4} by applications of
Pre({1,3,4}) = {2,5,6,7}. Here rules are labeled as follows:
DPs:
{ 1: p^#(0()) -> c_1()
, 2: p^#(s(X)) -> c_2(X)
, 3: leq^#(0(), Y) -> c_3()
, 4: leq^#(s(X), 0()) -> c_4()
, 5: leq^#(s(X), s(Y)) -> c_5(leq^#(X, Y))
, 6: if^#(true(), X, Y) -> c_6(X)
, 7: if^#(false(), X, Y) -> c_7(Y)
, 8: diff^#(X, Y) -> c_8(if^#(leq(X, Y), 0(), s(diff(p(X), Y)))) }
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict DPs:
{ p^#(s(X)) -> c_2(X)
, leq^#(s(X), s(Y)) -> c_5(leq^#(X, Y))
, if^#(true(), X, Y) -> c_6(X)
, if^#(false(), X, Y) -> c_7(Y)
, diff^#(X, Y) -> c_8(if^#(leq(X, Y), 0(), s(diff(p(X), Y)))) }
Strict Trs:
{ p(0()) -> 0()
, p(s(X)) -> X
, leq(0(), Y) -> true()
, leq(s(X), 0()) -> false()
, leq(s(X), s(Y)) -> leq(X, Y)
, if(true(), X, Y) -> X
, if(false(), X, Y) -> Y
, diff(X, Y) -> if(leq(X, Y), 0(), s(diff(p(X), Y))) }
Weak DPs:
{ p^#(0()) -> c_1()
, leq^#(0(), Y) -> c_3()
, leq^#(s(X), 0()) -> c_4() }
Obligation:
runtime complexity
Answer:
MAYBE
Empty strict component of the problem is NOT empty.
Arrrr..