0 QTRS
↳1 DependencyPairsProof (⇔)
↳2 QDP
↳3 DependencyGraphProof (⇔)
↳4 AND
↳5 QDP
↳6 QDPOrderProof (⇔)
↳7 QDP
↳8 QDP
g(x, x) → g(a, b)
g(c, g(c, x)) → g(e, g(d, x))
g(d, g(d, x)) → g(c, g(e, x))
g(e, g(e, x)) → g(d, g(c, x))
f(g(x, y)) → g(y, g(f(f(x)), a))
G(x, x) → G(a, b)
G(c, g(c, x)) → G(e, g(d, x))
G(c, g(c, x)) → G(d, x)
G(d, g(d, x)) → G(c, g(e, x))
G(d, g(d, x)) → G(e, x)
G(e, g(e, x)) → G(d, g(c, x))
G(e, g(e, x)) → G(c, x)
F(g(x, y)) → G(y, g(f(f(x)), a))
F(g(x, y)) → G(f(f(x)), a)
F(g(x, y)) → F(f(x))
F(g(x, y)) → F(x)
g(x, x) → g(a, b)
g(c, g(c, x)) → g(e, g(d, x))
g(d, g(d, x)) → g(c, g(e, x))
g(e, g(e, x)) → g(d, g(c, x))
f(g(x, y)) → g(y, g(f(f(x)), a))
G(e, g(e, x)) → G(d, g(c, x))
G(d, g(d, x)) → G(c, g(e, x))
G(c, g(c, x)) → G(e, g(d, x))
G(e, g(e, x)) → G(c, x)
G(c, g(c, x)) → G(d, x)
G(d, g(d, x)) → G(e, x)
g(x, x) → g(a, b)
g(c, g(c, x)) → g(e, g(d, x))
g(d, g(d, x)) → g(c, g(e, x))
g(e, g(e, x)) → g(d, g(c, x))
f(g(x, y)) → g(y, g(f(f(x)), a))
The following pairs can be oriented strictly and are deleted.
The remaining pairs can at least be oriented weakly.
G(e, g(e, x)) → G(c, x)
G(c, g(c, x)) → G(d, x)
G(d, g(d, x)) → G(e, x)
g1 > G1 > d > b
g1 > e > d > b
g1 > a > b
c > G1 > d > b
c > e > d > b
g(x, x) → g(a, b)
g(e, g(e, x)) → g(d, g(c, x))
g(c, g(c, x)) → g(e, g(d, x))
g(d, g(d, x)) → g(c, g(e, x))
G(e, g(e, x)) → G(d, g(c, x))
G(d, g(d, x)) → G(c, g(e, x))
G(c, g(c, x)) → G(e, g(d, x))
g(x, x) → g(a, b)
g(c, g(c, x)) → g(e, g(d, x))
g(d, g(d, x)) → g(c, g(e, x))
g(e, g(e, x)) → g(d, g(c, x))
f(g(x, y)) → g(y, g(f(f(x)), a))
F(g(x, y)) → F(x)
F(g(x, y)) → F(f(x))
g(x, x) → g(a, b)
g(c, g(c, x)) → g(e, g(d, x))
g(d, g(d, x)) → g(c, g(e, x))
g(e, g(e, x)) → g(d, g(c, x))
f(g(x, y)) → g(y, g(f(f(x)), a))