YES

Problem:
 s(s(0())) -> f(s(0()))
 g(x) -> h(x,x)
 s(x) -> h(x,0())
 s(x) -> h(0(),x)
 f(g(x)) -> g(g(f(x)))
 g(s(x)) -> s(s(g(x)))
 h(f(x),g(x)) -> f(s(x))
 s(s(0())) -> k(0())
 k(0()) -> 0()
 s(s(s(0()))) -> k(s(0()))
 k(s(0())) -> s(0())
 s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
 k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
 h(k(x),g(x)) -> k(s(x))

Proof:
 DP Processor:
  DPs:
   s#(s(0())) -> f#(s(0()))
   g#(x) -> h#(x,x)
   s#(x) -> h#(x,0())
   s#(x) -> h#(0(),x)
   f#(g(x)) -> f#(x)
   f#(g(x)) -> g#(f(x))
   f#(g(x)) -> g#(g(f(x)))
   g#(s(x)) -> g#(x)
   g#(s(x)) -> s#(g(x))
   g#(s(x)) -> s#(s(g(x)))
   h#(f(x),g(x)) -> s#(x)
   h#(f(x),g(x)) -> f#(s(x))
   s#(s(0())) -> k#(0())
   s#(s(s(0()))) -> k#(s(0()))
   s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
   k#(s(s(0()))) -> s#(s(s(0())))
   k#(s(s(0()))) -> s#(s(s(s(0()))))
   k#(s(s(0()))) -> s#(s(s(s(s(0())))))
   k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
   k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
   k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
   h#(k(x),g(x)) -> s#(x)
   h#(k(x),g(x)) -> k#(s(x))
  TRS:
   s(s(0())) -> f(s(0()))
   g(x) -> h(x,x)
   s(x) -> h(x,0())
   s(x) -> h(0(),x)
   f(g(x)) -> g(g(f(x)))
   g(s(x)) -> s(s(g(x)))
   h(f(x),g(x)) -> f(s(x))
   s(s(0())) -> k(0())
   k(0()) -> 0()
   s(s(s(0()))) -> k(s(0()))
   k(s(0())) -> s(0())
   s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
   k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
   h(k(x),g(x)) -> k(s(x))
  TDG Processor:
   DPs:
    s#(s(0())) -> f#(s(0()))
    g#(x) -> h#(x,x)
    s#(x) -> h#(x,0())
    s#(x) -> h#(0(),x)
    f#(g(x)) -> f#(x)
    f#(g(x)) -> g#(f(x))
    f#(g(x)) -> g#(g(f(x)))
    g#(s(x)) -> g#(x)
    g#(s(x)) -> s#(g(x))
    g#(s(x)) -> s#(s(g(x)))
    h#(f(x),g(x)) -> s#(x)
    h#(f(x),g(x)) -> f#(s(x))
    s#(s(0())) -> k#(0())
    s#(s(s(0()))) -> k#(s(0()))
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    k#(s(s(0()))) -> s#(s(s(0())))
    k#(s(s(0()))) -> s#(s(s(s(0()))))
    k#(s(s(0()))) -> s#(s(s(s(s(0())))))
    k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
    h#(k(x),g(x)) -> s#(x)
    h#(k(x),g(x)) -> k#(s(x))
   TRS:
    s(s(0())) -> f(s(0()))
    g(x) -> h(x,x)
    s(x) -> h(x,0())
    s(x) -> h(0(),x)
    f(g(x)) -> g(g(f(x)))
    g(s(x)) -> s(s(g(x)))
    h(f(x),g(x)) -> f(s(x))
    s(s(0())) -> k(0())
    k(0()) -> 0()
    s(s(s(0()))) -> k(s(0()))
    k(s(0())) -> s(0())
    s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
    k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
    h(k(x),g(x)) -> k(s(x))
   graph:
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
    s#(s(s(0()))) -> k#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
    s#(s(0())) -> k#(0())
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
    s#(x) -> h#(0(),x)
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
    s#(x) -> h#(x,0())
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
    s#(s(0())) -> f#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
    s#(s(s(0()))) -> k#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
    s#(s(0())) -> k#(0())
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
    s#(x) -> h#(0(),x)
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
    s#(x) -> h#(x,0())
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
    s#(s(0())) -> f#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
    s#(s(s(0()))) -> k#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
    s#(s(0())) -> k#(0())
    k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
    s#(x) -> h#(0(),x)
    k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
    s#(x) -> h#(x,0())
    k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
    s#(s(0())) -> f#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
    s#(s(s(0()))) -> k#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
    s#(s(0())) -> k#(0())
    k#(s(s(0()))) -> s#(s(s(s(s(0()))))) -> s#(x) -> h#(0(),x)
    k#(s(s(0()))) -> s#(s(s(s(s(0()))))) -> s#(x) -> h#(x,0())
    k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
    s#(s(0())) -> f#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(0())))) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    k#(s(s(0()))) -> s#(s(s(s(0())))) ->
    s#(s(s(0()))) -> k#(s(0()))
    k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(s(0())) -> k#(0())
    k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(x) -> h#(0(),x)
    k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(x) -> h#(x,0())
    k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(s(0())) -> f#(s(0()))
    k#(s(s(0()))) -> s#(s(s(0()))) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    k#(s(s(0()))) -> s#(s(s(0()))) -> s#(s(s(0()))) -> k#(s(0()))
    k#(s(s(0()))) -> s#(s(s(0()))) -> s#(s(0())) -> k#(0())
    k#(s(s(0()))) -> s#(s(s(0()))) -> s#(x) -> h#(0(),x)
    k#(s(s(0()))) -> s#(s(s(0()))) -> s#(x) -> h#(x,0())
    k#(s(s(0()))) -> s#(s(s(0()))) -> s#(s(0())) -> f#(s(0()))
    h#(k(x),g(x)) -> k#(s(x)) ->
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
    h#(k(x),g(x)) -> k#(s(x)) ->
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
    h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
    h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(s(0())))))
    h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(0()))))
    h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(0())))
    h#(k(x),g(x)) -> s#(x) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    h#(k(x),g(x)) -> s#(x) -> s#(s(s(0()))) -> k#(s(0()))
    h#(k(x),g(x)) -> s#(x) -> s#(s(0())) -> k#(0())
    h#(k(x),g(x)) -> s#(x) -> s#(x) -> h#(0(),x)
    h#(k(x),g(x)) -> s#(x) -> s#(x) -> h#(x,0())
    h#(k(x),g(x)) -> s#(x) -> s#(s(0())) -> f#(s(0()))
    h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> g#(g(f(x)))
    h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> g#(f(x))
    h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> f#(x)
    h#(f(x),g(x)) -> s#(x) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    h#(f(x),g(x)) -> s#(x) -> s#(s(s(0()))) -> k#(s(0()))
    h#(f(x),g(x)) -> s#(x) -> s#(s(0())) -> k#(0())
    h#(f(x),g(x)) -> s#(x) -> s#(x) -> h#(0(),x)
    h#(f(x),g(x)) -> s#(x) -> s#(x) -> h#(x,0())
    h#(f(x),g(x)) -> s#(x) -> s#(s(0())) -> f#(s(0()))
    g#(s(x)) -> g#(x) -> g#(s(x)) -> s#(s(g(x)))
    g#(s(x)) -> g#(x) -> g#(s(x)) -> s#(g(x))
    g#(s(x)) -> g#(x) -> g#(s(x)) -> g#(x)
    g#(s(x)) -> g#(x) -> g#(x) -> h#(x,x)
    g#(s(x)) -> s#(g(x)) -> s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    g#(s(x)) -> s#(g(x)) -> s#(s(s(0()))) -> k#(s(0()))
    g#(s(x)) -> s#(g(x)) -> s#(s(0())) -> k#(0())
    g#(s(x)) -> s#(g(x)) -> s#(x) -> h#(0(),x)
    g#(s(x)) -> s#(g(x)) -> s#(x) -> h#(x,0())
    g#(s(x)) -> s#(g(x)) -> s#(s(0())) -> f#(s(0()))
    g#(s(x)) -> s#(s(g(x))) ->
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
    g#(s(x)) -> s#(s(g(x))) -> s#(s(s(0()))) -> k#(s(0()))
    g#(s(x)) -> s#(s(g(x))) -> s#(s(0())) -> k#(0())
    g#(s(x)) -> s#(s(g(x))) -> s#(x) -> h#(0(),x)
    g#(s(x)) -> s#(s(g(x))) -> s#(x) -> h#(x,0())
    g#(s(x)) -> s#(s(g(x))) -> s#(s(0())) -> f#(s(0()))
    g#(x) -> h#(x,x) -> h#(k(x),g(x)) -> k#(s(x))
    g#(x) -> h#(x,x) -> h#(k(x),g(x)) -> s#(x)
    g#(x) -> h#(x,x) -> h#(f(x),g(x)) -> f#(s(x))
    g#(x) -> h#(x,x) -> h#(f(x),g(x)) -> s#(x)
    f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> s#(s(g(x)))
    f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> s#(g(x))
    f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> g#(x)
    f#(g(x)) -> g#(g(f(x))) -> g#(x) -> h#(x,x)
    f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> s#(s(g(x)))
    f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> s#(g(x))
    f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> g#(x)
    f#(g(x)) -> g#(f(x)) -> g#(x) -> h#(x,x)
    f#(g(x)) -> f#(x) -> f#(g(x)) -> g#(g(f(x)))
    f#(g(x)) -> f#(x) -> f#(g(x)) -> g#(f(x))
    f#(g(x)) -> f#(x) -> f#(g(x)) -> f#(x)
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
    k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
    k#(s(s(0()))) -> s#(s(s(s(s(0())))))
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
    k#(s(s(0()))) -> s#(s(s(s(0()))))
    s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
    k#(s(s(0()))) -> s#(s(s(0())))
    s#(s(s(0()))) -> k#(s(0())) ->
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
    s#(s(s(0()))) -> k#(s(0())) ->
    k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
    s#(s(s(0()))) -> k#(s(0())) ->
    k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
    s#(s(s(0()))) -> k#(s(0())) -> k#(s(s(0()))) -> s#(s(s(s(s(0())))))
    s#(s(s(0()))) -> k#(s(0())) -> k#(s(s(0()))) -> s#(s(s(s(0()))))
    s#(s(s(0()))) -> k#(s(0())) -> k#(s(s(0()))) -> s#(s(s(0())))
    s#(s(0())) -> k#(0()) -> k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
    s#(s(0())) -> k#(0()) -> k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
    s#(s(0())) -> k#(0()) -> k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
    s#(s(0())) -> k#(0()) -> k#(s(s(0()))) -> s#(s(s(s(s(0())))))
    s#(s(0())) -> k#(0()) -> k#(s(s(0()))) -> s#(s(s(s(0()))))
    s#(s(0())) -> k#(0()) -> k#(s(s(0()))) -> s#(s(s(0())))
    s#(s(0())) -> f#(s(0())) -> f#(g(x)) -> g#(g(f(x)))
    s#(s(0())) -> f#(s(0())) -> f#(g(x)) -> g#(f(x))
    s#(s(0())) -> f#(s(0())) -> f#(g(x)) -> f#(x)
    s#(x) -> h#(0(),x) -> h#(k(x),g(x)) -> k#(s(x))
    s#(x) -> h#(0(),x) -> h#(k(x),g(x)) -> s#(x)
    s#(x) -> h#(0(),x) -> h#(f(x),g(x)) -> f#(s(x))
    s#(x) -> h#(0(),x) -> h#(f(x),g(x)) -> s#(x)
    s#(x) -> h#(x,0()) -> h#(k(x),g(x)) -> k#(s(x))
    s#(x) -> h#(x,0()) -> h#(k(x),g(x)) -> s#(x)
    s#(x) -> h#(x,0()) -> h#(f(x),g(x)) -> f#(s(x))
    s#(x) -> h#(x,0()) -> h#(f(x),g(x)) -> s#(x)
   EDG Processor:
    DPs:
     s#(s(0())) -> f#(s(0()))
     g#(x) -> h#(x,x)
     s#(x) -> h#(x,0())
     s#(x) -> h#(0(),x)
     f#(g(x)) -> f#(x)
     f#(g(x)) -> g#(f(x))
     f#(g(x)) -> g#(g(f(x)))
     g#(s(x)) -> g#(x)
     g#(s(x)) -> s#(g(x))
     g#(s(x)) -> s#(s(g(x)))
     h#(f(x),g(x)) -> s#(x)
     h#(f(x),g(x)) -> f#(s(x))
     s#(s(0())) -> k#(0())
     s#(s(s(0()))) -> k#(s(0()))
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     k#(s(s(0()))) -> s#(s(s(0())))
     k#(s(s(0()))) -> s#(s(s(s(0()))))
     k#(s(s(0()))) -> s#(s(s(s(s(0())))))
     k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
     h#(k(x),g(x)) -> s#(x)
     h#(k(x),g(x)) -> k#(s(x))
    TRS:
     s(s(0())) -> f(s(0()))
     g(x) -> h(x,x)
     s(x) -> h(x,0())
     s(x) -> h(0(),x)
     f(g(x)) -> g(g(f(x)))
     g(s(x)) -> s(s(g(x)))
     h(f(x),g(x)) -> f(s(x))
     s(s(0())) -> k(0())
     k(0()) -> 0()
     s(s(s(0()))) -> k(s(0()))
     k(s(0())) -> s(0())
     s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
     k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
     h(k(x),g(x)) -> k(s(x))
    graph:
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
     s#(s(0())) -> f#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
     s#(x) -> h#(x,0())
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
     s#(x) -> h#(0(),x)
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
     s#(s(0())) -> k#(0())
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
     s#(s(s(0()))) -> k#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
     s#(s(0())) -> f#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
     s#(x) -> h#(x,0())
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
     s#(x) -> h#(0(),x)
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
     s#(s(0())) -> k#(0())
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
     s#(s(s(0()))) -> k#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
     s#(s(0())) -> f#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
     s#(x) -> h#(x,0())
     k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
     s#(x) -> h#(0(),x)
     k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
     s#(s(0())) -> k#(0())
     k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
     s#(s(s(0()))) -> k#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
     s#(s(0())) -> f#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(s(0()))))) -> s#(x) -> h#(x,0())
     k#(s(s(0()))) -> s#(s(s(s(s(0()))))) -> s#(x) -> h#(0(),x)
     k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
     s#(s(0())) -> k#(0())
     k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
     s#(s(s(0()))) -> k#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(s(0())) -> f#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(x) -> h#(x,0())
     k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(x) -> h#(0(),x)
     k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(s(0())) -> k#(0())
     k#(s(s(0()))) -> s#(s(s(s(0())))) ->
     s#(s(s(0()))) -> k#(s(0()))
     k#(s(s(0()))) -> s#(s(s(s(0())))) ->
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     k#(s(s(0()))) -> s#(s(s(0()))) -> s#(s(0())) -> f#(s(0()))
     k#(s(s(0()))) -> s#(s(s(0()))) -> s#(x) -> h#(x,0())
     k#(s(s(0()))) -> s#(s(s(0()))) -> s#(x) -> h#(0(),x)
     k#(s(s(0()))) -> s#(s(s(0()))) -> s#(s(0())) -> k#(0())
     k#(s(s(0()))) -> s#(s(s(0()))) -> s#(s(s(0()))) -> k#(s(0()))
     k#(s(s(0()))) -> s#(s(s(0()))) ->
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(0())))
     h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(0()))))
     h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(s(0())))))
     h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
     h#(k(x),g(x)) -> k#(s(x)) ->
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
     h#(k(x),g(x)) -> k#(s(x)) ->
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
     h#(k(x),g(x)) -> s#(x) -> s#(s(0())) -> f#(s(0()))
     h#(k(x),g(x)) -> s#(x) -> s#(x) -> h#(x,0())
     h#(k(x),g(x)) -> s#(x) -> s#(x) -> h#(0(),x)
     h#(k(x),g(x)) -> s#(x) -> s#(s(0())) -> k#(0())
     h#(k(x),g(x)) -> s#(x) -> s#(s(s(0()))) -> k#(s(0()))
     h#(k(x),g(x)) -> s#(x) ->
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> f#(x)
     h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> g#(f(x))
     h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> g#(g(f(x)))
     h#(f(x),g(x)) -> s#(x) -> s#(s(0())) -> f#(s(0()))
     h#(f(x),g(x)) -> s#(x) -> s#(x) -> h#(x,0())
     h#(f(x),g(x)) -> s#(x) -> s#(x) -> h#(0(),x)
     h#(f(x),g(x)) -> s#(x) -> s#(s(0())) -> k#(0())
     h#(f(x),g(x)) -> s#(x) -> s#(s(s(0()))) -> k#(s(0()))
     h#(f(x),g(x)) -> s#(x) -> s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     g#(s(x)) -> g#(x) -> g#(x) -> h#(x,x)
     g#(s(x)) -> g#(x) -> g#(s(x)) -> g#(x)
     g#(s(x)) -> g#(x) -> g#(s(x)) -> s#(g(x))
     g#(s(x)) -> g#(x) -> g#(s(x)) -> s#(s(g(x)))
     g#(s(x)) -> s#(g(x)) -> s#(s(0())) -> f#(s(0()))
     g#(s(x)) -> s#(g(x)) -> s#(x) -> h#(x,0())
     g#(s(x)) -> s#(g(x)) -> s#(x) -> h#(0(),x)
     g#(s(x)) -> s#(g(x)) -> s#(s(0())) -> k#(0())
     g#(s(x)) -> s#(g(x)) -> s#(s(s(0()))) -> k#(s(0()))
     g#(s(x)) -> s#(g(x)) ->
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     g#(s(x)) -> s#(s(g(x))) -> s#(s(0())) -> f#(s(0()))
     g#(s(x)) -> s#(s(g(x))) -> s#(x) -> h#(x,0())
     g#(s(x)) -> s#(s(g(x))) -> s#(x) -> h#(0(),x)
     g#(s(x)) -> s#(s(g(x))) -> s#(s(0())) -> k#(0())
     g#(s(x)) -> s#(s(g(x))) -> s#(s(s(0()))) -> k#(s(0()))
     g#(s(x)) -> s#(s(g(x))) -> s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
     g#(x) -> h#(x,x) -> h#(f(x),g(x)) -> s#(x)
     g#(x) -> h#(x,x) -> h#(f(x),g(x)) -> f#(s(x))
     g#(x) -> h#(x,x) -> h#(k(x),g(x)) -> s#(x)
     g#(x) -> h#(x,x) -> h#(k(x),g(x)) -> k#(s(x))
     f#(g(x)) -> g#(g(f(x))) -> g#(x) -> h#(x,x)
     f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> g#(x)
     f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> s#(g(x))
     f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> s#(s(g(x)))
     f#(g(x)) -> g#(f(x)) -> g#(x) -> h#(x,x)
     f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> g#(x)
     f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> s#(g(x))
     f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> s#(s(g(x)))
     f#(g(x)) -> f#(x) -> f#(g(x)) -> f#(x)
     f#(g(x)) -> f#(x) -> f#(g(x)) -> g#(f(x))
     f#(g(x)) -> f#(x) ->
     f#(g(x)) -> g#(g(f(x)))
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
     k#(s(s(0()))) -> s#(s(s(0())))
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
     k#(s(s(0()))) -> s#(s(s(s(0()))))
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
     k#(s(s(0()))) -> s#(s(s(s(s(0())))))
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
     k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
     s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
     s#(s(s(0()))) -> k#(s(0())) -> k#(s(s(0()))) -> s#(s(s(0())))
     s#(s(s(0()))) -> k#(s(0())) -> k#(s(s(0()))) -> s#(s(s(s(0()))))
     s#(s(s(0()))) -> k#(s(0())) -> k#(s(s(0()))) -> s#(s(s(s(s(0())))))
     s#(s(s(0()))) -> k#(s(0())) ->
     k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
     s#(s(s(0()))) -> k#(s(0())) ->
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
     s#(s(s(0()))) -> k#(s(0())) ->
     k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
     s#(s(0())) -> f#(s(0())) -> f#(g(x)) -> f#(x)
     s#(s(0())) -> f#(s(0())) -> f#(g(x)) -> g#(f(x))
     s#(s(0())) -> f#(s(0())) -> f#(g(x)) -> g#(g(f(x)))
    CDG Processor:
     DPs:
      s#(s(0())) -> f#(s(0()))
      g#(x) -> h#(x,x)
      s#(x) -> h#(x,0())
      s#(x) -> h#(0(),x)
      f#(g(x)) -> f#(x)
      f#(g(x)) -> g#(f(x))
      f#(g(x)) -> g#(g(f(x)))
      g#(s(x)) -> g#(x)
      g#(s(x)) -> s#(g(x))
      g#(s(x)) -> s#(s(g(x)))
      h#(f(x),g(x)) -> s#(x)
      h#(f(x),g(x)) -> f#(s(x))
      s#(s(0())) -> k#(0())
      s#(s(s(0()))) -> k#(s(0()))
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
      k#(s(s(0()))) -> s#(s(s(0())))
      k#(s(s(0()))) -> s#(s(s(s(0()))))
      k#(s(s(0()))) -> s#(s(s(s(s(0())))))
      k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
      h#(k(x),g(x)) -> s#(x)
      h#(k(x),g(x)) -> k#(s(x))
     TRS:
      s(s(0())) -> f(s(0()))
      g(x) -> h(x,x)
      s(x) -> h(x,0())
      s(x) -> h(0(),x)
      f(g(x)) -> g(g(f(x)))
      g(s(x)) -> s(s(g(x)))
      h(f(x),g(x)) -> f(s(x))
      s(s(0())) -> k(0())
      k(0()) -> 0()
      s(s(s(0()))) -> k(s(0()))
      k(s(0())) -> s(0())
      s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
      k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
      h(k(x),g(x)) -> k(s(x))
     graph:
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
      s#(s(0())) -> k#(0())
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
      s#(x) -> h#(0(),x)
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
      s#(x) -> h#(x,0())
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0())))))))) ->
      s#(s(0())) -> f#(s(0()))
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
      s#(s(s(0()))) -> k#(s(0()))
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
      s#(x) -> h#(0(),x)
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(0()))))))) ->
      s#(x) -> h#(x,0())
      k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
      s#(s(0())) -> k#(0())
      k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
      s#(x) -> h#(0(),x)
      k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
      s#(x) -> h#(x,0())
      k#(s(s(0()))) -> s#(s(s(s(s(s(0())))))) ->
      s#(s(0())) -> f#(s(0()))
      k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
      s#(s(s(0()))) -> k#(s(0()))
      k#(s(s(0()))) -> s#(s(s(s(s(0()))))) ->
      s#(x) -> h#(0(),x)
      k#(s(s(0()))) -> s#(s(s(s(s(0()))))) -> s#(x) -> h#(x,0())
      k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(s(0())) -> k#(0())
      k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(x) -> h#(0(),x)
      k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(x) -> h#(x,0())
      k#(s(s(0()))) -> s#(s(s(s(0())))) -> s#(s(0())) -> f#(s(0()))
      k#(s(s(0()))) -> s#(s(s(0()))) -> s#(s(s(0()))) -> k#(s(0()))
      k#(s(s(0()))) -> s#(s(s(0()))) -> s#(x) -> h#(0(),x)
      k#(s(s(0()))) -> s#(s(s(0()))) -> s#(x) -> h#(x,0())
      h#(k(x),g(x)) -> k#(s(x)) ->
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
      h#(k(x),g(x)) -> k#(s(x)) ->
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
      h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
      h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(s(0())))))
      h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(s(0()))))
      h#(k(x),g(x)) -> k#(s(x)) -> k#(s(s(0()))) -> s#(s(s(0())))
      h#(k(x),g(x)) -> s#(x) ->
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
      h#(k(x),g(x)) -> s#(x) -> s#(s(s(0()))) -> k#(s(0()))
      h#(k(x),g(x)) -> s#(x) -> s#(s(0())) -> k#(0())
      h#(k(x),g(x)) -> s#(x) -> s#(x) -> h#(0(),x)
      h#(k(x),g(x)) -> s#(x) -> s#(x) -> h#(x,0())
      h#(k(x),g(x)) -> s#(x) -> s#(s(0())) -> f#(s(0()))
      h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> g#(g(f(x)))
      h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> g#(f(x))
      h#(f(x),g(x)) -> f#(s(x)) -> f#(g(x)) -> f#(x)
      h#(f(x),g(x)) -> s#(x) ->
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
      h#(f(x),g(x)) -> s#(x) -> s#(s(s(0()))) -> k#(s(0()))
      h#(f(x),g(x)) -> s#(x) -> s#(s(0())) -> k#(0())
      h#(f(x),g(x)) -> s#(x) -> s#(x) -> h#(0(),x)
      h#(f(x),g(x)) -> s#(x) -> s#(x) -> h#(x,0())
      h#(f(x),g(x)) -> s#(x) -> s#(s(0())) -> f#(s(0()))
      g#(s(x)) -> g#(x) -> g#(s(x)) -> s#(s(g(x)))
      g#(s(x)) -> g#(x) -> g#(s(x)) -> s#(g(x))
      g#(s(x)) -> g#(x) -> g#(s(x)) -> g#(x)
      g#(s(x)) -> g#(x) -> g#(x) -> h#(x,x)
      g#(s(x)) -> s#(g(x)) ->
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
      g#(s(x)) -> s#(g(x)) -> s#(s(s(0()))) -> k#(s(0()))
      g#(s(x)) -> s#(g(x)) -> s#(s(0())) -> k#(0())
      g#(s(x)) -> s#(g(x)) -> s#(x) -> h#(0(),x)
      g#(s(x)) -> s#(g(x)) -> s#(x) -> h#(x,0())
      g#(s(x)) -> s#(g(x)) -> s#(s(0())) -> f#(s(0()))
      g#(s(x)) -> s#(s(g(x))) ->
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0())))
      g#(s(x)) -> s#(s(g(x))) -> s#(s(s(0()))) -> k#(s(0()))
      g#(s(x)) -> s#(s(g(x))) -> s#(s(0())) -> k#(0())
      g#(s(x)) -> s#(s(g(x))) -> s#(x) -> h#(0(),x)
      g#(s(x)) -> s#(s(g(x))) -> s#(x) -> h#(x,0())
      g#(s(x)) -> s#(s(g(x))) -> s#(s(0())) -> f#(s(0()))
      g#(x) -> h#(x,x) -> h#(k(x),g(x)) -> k#(s(x))
      g#(x) -> h#(x,x) -> h#(k(x),g(x)) -> s#(x)
      g#(x) -> h#(x,x) -> h#(f(x),g(x)) -> f#(s(x))
      g#(x) -> h#(x,x) -> h#(f(x),g(x)) -> s#(x)
      f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> s#(s(g(x)))
      f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> s#(g(x))
      f#(g(x)) -> g#(g(f(x))) -> g#(s(x)) -> g#(x)
      f#(g(x)) -> g#(g(f(x))) -> g#(x) -> h#(x,x)
      f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> s#(s(g(x)))
      f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> s#(g(x))
      f#(g(x)) -> g#(f(x)) -> g#(s(x)) -> g#(x)
      f#(g(x)) -> g#(f(x)) -> g#(x) -> h#(x,x)
      f#(g(x)) -> f#(x) -> f#(g(x)) -> g#(g(f(x)))
      f#(g(x)) -> f#(x) -> f#(g(x)) -> g#(f(x))
      f#(g(x)) -> f#(x) -> f#(g(x)) -> f#(x)
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(s(0()))))))))
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
      k#(s(s(0()))) -> s#(s(s(s(s(s(s(0())))))))
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
      k#(s(s(0()))) -> s#(s(s(s(s(s(0()))))))
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
      k#(s(s(0()))) -> s#(s(s(s(s(0())))))
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) ->
      k#(s(s(0()))) -> s#(s(s(s(0()))))
      s#(s(s(s(s(s(s(s(s(s(0())))))))))) -> k#(s(s(0()))) -> k#(s(s(0()))) -> s#(s(s(0())))
     SCC Processor:
      #sccs: 1
      #rules: 6
      #arcs: 79/529
      DPs:
       h#(f(x),g(x)) -> f#(s(x))
       f#(g(x)) -> f#(x)
       f#(g(x)) -> g#(f(x))
       g#(x) -> h#(x,x)
       g#(s(x)) -> g#(x)
       f#(g(x)) -> g#(g(f(x)))
      TRS:
       s(s(0())) -> f(s(0()))
       g(x) -> h(x,x)
       s(x) -> h(x,0())
       s(x) -> h(0(),x)
       f(g(x)) -> g(g(f(x)))
       g(s(x)) -> s(s(g(x)))
       h(f(x),g(x)) -> f(s(x))
       s(s(0())) -> k(0())
       k(0()) -> 0()
       s(s(s(0()))) -> k(s(0()))
       k(s(0())) -> s(0())
       s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
       k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
       h(k(x),g(x)) -> k(s(x))
      Arctic Interpretation Processor:
       dimension: 1
       interpretation:
        [h#](x0, x1) = 0,
        
        [g#](x0) = 0,
        
        [f#](x0) = -2x0 + 0,
        
        [k](x0) = -4x0 + 2,
        
        [h](x0, x1) = 2,
        
        [g](x0) = x0 + 4,
        
        [f](x0) = x0 + 1,
        
        [s](x0) = 2,
        
        [0] = 1
       orientation:
        h#(f(x),g(x)) = 0 >= 0 = f#(s(x))
        
        f#(g(x)) = -2x + 2 >= -2x + 0 = f#(x)
        
        f#(g(x)) = -2x + 2 >= 0 = g#(f(x))
        
        g#(x) = 0 >= 0 = h#(x,x)
        
        g#(s(x)) = 0 >= 0 = g#(x)
        
        f#(g(x)) = -2x + 2 >= 0 = g#(g(f(x)))
        
        s(s(0())) = 2 >= 2 = f(s(0()))
        
        g(x) = x + 4 >= 2 = h(x,x)
        
        s(x) = 2 >= 2 = h(x,0())
        
        s(x) = 2 >= 2 = h(0(),x)
        
        f(g(x)) = x + 4 >= x + 4 = g(g(f(x)))
        
        g(s(x)) = 4 >= 2 = s(s(g(x)))
        
        h(f(x),g(x)) = 2 >= 2 = f(s(x))
        
        s(s(0())) = 2 >= 2 = k(0())
        
        k(0()) = 2 >= 1 = 0()
        
        s(s(s(0()))) = 2 >= 2 = k(s(0()))
        
        k(s(0())) = 2 >= 2 = s(0())
        
        s(s(s(s(s(s(s(s(s(s(0())))))))))) = 2 >= 2 = k(s(s(0())))
        
        k(s(s(0()))) = 2 >= 2 = s(s(s(s(s(s(s(s(0()))))))))
        
        h(k(x),g(x)) = 2 >= 2 = k(s(x))
       problem:
        DPs:
         h#(f(x),g(x)) -> f#(s(x))
         f#(g(x)) -> f#(x)
         g#(x) -> h#(x,x)
         g#(s(x)) -> g#(x)
        TRS:
         s(s(0())) -> f(s(0()))
         g(x) -> h(x,x)
         s(x) -> h(x,0())
         s(x) -> h(0(),x)
         f(g(x)) -> g(g(f(x)))
         g(s(x)) -> s(s(g(x)))
         h(f(x),g(x)) -> f(s(x))
         s(s(0())) -> k(0())
         k(0()) -> 0()
         s(s(s(0()))) -> k(s(0()))
         k(s(0())) -> s(0())
         s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
         k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
         h(k(x),g(x)) -> k(s(x))
       SCC Processor:
        #sccs: 2
        #rules: 2
        #arcs: 13/16
        DPs:
         g#(s(x)) -> g#(x)
        TRS:
         s(s(0())) -> f(s(0()))
         g(x) -> h(x,x)
         s(x) -> h(x,0())
         s(x) -> h(0(),x)
         f(g(x)) -> g(g(f(x)))
         g(s(x)) -> s(s(g(x)))
         h(f(x),g(x)) -> f(s(x))
         s(s(0())) -> k(0())
         k(0()) -> 0()
         s(s(s(0()))) -> k(s(0()))
         k(s(0())) -> s(0())
         s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
         k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
         h(k(x),g(x)) -> k(s(x))
        Subterm Criterion Processor:
         simple projection:
          pi(g#) = 0
         problem:
          DPs:
           
          TRS:
           s(s(0())) -> f(s(0()))
           g(x) -> h(x,x)
           s(x) -> h(x,0())
           s(x) -> h(0(),x)
           f(g(x)) -> g(g(f(x)))
           g(s(x)) -> s(s(g(x)))
           h(f(x),g(x)) -> f(s(x))
           s(s(0())) -> k(0())
           k(0()) -> 0()
           s(s(s(0()))) -> k(s(0()))
           k(s(0())) -> s(0())
           s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
           k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
           h(k(x),g(x)) -> k(s(x))
         Qed
        
        DPs:
         f#(g(x)) -> f#(x)
        TRS:
         s(s(0())) -> f(s(0()))
         g(x) -> h(x,x)
         s(x) -> h(x,0())
         s(x) -> h(0(),x)
         f(g(x)) -> g(g(f(x)))
         g(s(x)) -> s(s(g(x)))
         h(f(x),g(x)) -> f(s(x))
         s(s(0())) -> k(0())
         k(0()) -> 0()
         s(s(s(0()))) -> k(s(0()))
         k(s(0())) -> s(0())
         s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
         k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
         h(k(x),g(x)) -> k(s(x))
        Subterm Criterion Processor:
         simple projection:
          pi(f#) = 0
         problem:
          DPs:
           
          TRS:
           s(s(0())) -> f(s(0()))
           g(x) -> h(x,x)
           s(x) -> h(x,0())
           s(x) -> h(0(),x)
           f(g(x)) -> g(g(f(x)))
           g(s(x)) -> s(s(g(x)))
           h(f(x),g(x)) -> f(s(x))
           s(s(0())) -> k(0())
           k(0()) -> 0()
           s(s(s(0()))) -> k(s(0()))
           k(s(0())) -> s(0())
           s(s(s(s(s(s(s(s(s(s(0())))))))))) -> k(s(s(0())))
           k(s(s(0()))) -> s(s(s(s(s(s(s(s(0()))))))))
           h(k(x),g(x)) -> k(s(x))
         Qed