MAYBE
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict Trs:
{ div(x, y) -> quot(x, y, y)
, div(0(), y) -> 0()
, quot(x, 0(), s(z)) -> s(div(x, s(z)))
, quot(0(), s(y), z) -> 0()
, quot(s(x), s(y), z) -> quot(x, y, z) }
Obligation:
innermost runtime complexity
Answer:
MAYBE
We add following weak dependency pairs:
Strict DPs:
{ div^#(x, y) -> c_1(quot^#(x, y, y))
, div^#(0(), y) -> c_2()
, quot^#(x, 0(), s(z)) -> c_3(div^#(x, s(z)))
, quot^#(0(), s(y), z) -> c_4()
, quot^#(s(x), s(y), z) -> c_5(quot^#(x, y, z)) }
and mark the set of starting terms.
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict DPs:
{ div^#(x, y) -> c_1(quot^#(x, y, y))
, div^#(0(), y) -> c_2()
, quot^#(x, 0(), s(z)) -> c_3(div^#(x, s(z)))
, quot^#(0(), s(y), z) -> c_4()
, quot^#(s(x), s(y), z) -> c_5(quot^#(x, y, z)) }
Strict Trs:
{ div(x, y) -> quot(x, y, y)
, div(0(), y) -> 0()
, quot(x, 0(), s(z)) -> s(div(x, s(z)))
, quot(0(), s(y), z) -> 0()
, quot(s(x), s(y), z) -> quot(x, y, z) }
Obligation:
innermost runtime complexity
Answer:
MAYBE
No rule is usable, rules are removed from the input problem.
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict DPs:
{ div^#(x, y) -> c_1(quot^#(x, y, y))
, div^#(0(), y) -> c_2()
, quot^#(x, 0(), s(z)) -> c_3(div^#(x, s(z)))
, quot^#(0(), s(y), z) -> c_4()
, quot^#(s(x), s(y), z) -> c_5(quot^#(x, y, z)) }
Obligation:
innermost runtime complexity
Answer:
MAYBE
The weightgap principle applies (using the following constant
growth matrix-interpretation)
The following argument positions are usable:
Uargs(c_1) = {1}, Uargs(c_3) = {1}, Uargs(c_5) = {1}
TcT has computed following constructor-restricted matrix
interpretation.
[0] = [0]
[s](x1) = [0]
[div^#](x1, x2) = [1]
[c_1](x1) = [1] x1 + [2]
[quot^#](x1, x2, x3) = [0]
[c_2] = [0]
[c_3](x1) = [1] x1 + [0]
[c_4] = [1]
[c_5](x1) = [1] x1 + [2]
This order satisfies following ordering constraints:
Further, it can be verified that all rules not oriented are covered by the weightgap condition.
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict DPs:
{ div^#(x, y) -> c_1(quot^#(x, y, y))
, quot^#(x, 0(), s(z)) -> c_3(div^#(x, s(z)))
, quot^#(0(), s(y), z) -> c_4()
, quot^#(s(x), s(y), z) -> c_5(quot^#(x, y, z)) }
Weak DPs: { div^#(0(), y) -> c_2() }
Obligation:
innermost runtime complexity
Answer:
MAYBE
We estimate the number of application of {3} by applications of
Pre({3}) = {1,4}. Here rules are labeled as follows:
DPs:
{ 1: div^#(x, y) -> c_1(quot^#(x, y, y))
, 2: quot^#(x, 0(), s(z)) -> c_3(div^#(x, s(z)))
, 3: quot^#(0(), s(y), z) -> c_4()
, 4: quot^#(s(x), s(y), z) -> c_5(quot^#(x, y, z))
, 5: div^#(0(), y) -> c_2() }
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict DPs:
{ div^#(x, y) -> c_1(quot^#(x, y, y))
, quot^#(x, 0(), s(z)) -> c_3(div^#(x, s(z)))
, quot^#(s(x), s(y), z) -> c_5(quot^#(x, y, z)) }
Weak DPs:
{ div^#(0(), y) -> c_2()
, quot^#(0(), s(y), z) -> c_4() }
Obligation:
innermost runtime complexity
Answer:
MAYBE
The following weak DPs constitute a sub-graph of the DG that is
closed under successors. The DPs are removed.
{ div^#(0(), y) -> c_2()
, quot^#(0(), s(y), z) -> c_4() }
We are left with following problem, upon which TcT provides the
certificate MAYBE.
Strict DPs:
{ div^#(x, y) -> c_1(quot^#(x, y, y))
, quot^#(x, 0(), s(z)) -> c_3(div^#(x, s(z)))
, quot^#(s(x), s(y), z) -> c_5(quot^#(x, y, z)) }
Obligation:
innermost runtime complexity
Answer:
MAYBE
The input cannot be shown compatible
Arrrr..