Problem:
a__zeros() -> cons(0(),zeros())
a__and(tt(),X) -> mark(X)
a__length(nil()) -> 0()
a__length(cons(N,L)) -> s(a__length(mark(L)))
mark(zeros()) -> a__zeros()
mark(and(X1,X2)) -> a__and(mark(X1),X2)
mark(length(X)) -> a__length(mark(X))
mark(cons(X1,X2)) -> cons(mark(X1),X2)
mark(0()) -> 0()
mark(tt()) -> tt()
mark(nil()) -> nil()
mark(s(X)) -> s(mark(X))
a__zeros() -> zeros()
a__and(X1,X2) -> and(X1,X2)
a__length(X) -> length(X)
Proof:
Matrix Interpretation Processor: dim=1
interpretation:
[length](x0) = 4x0 + 3,
[and](x0, x1) = x0 + 3x1 + 4,
[s](x0) = x0,
[a__length](x0) = 4x0 + 3,
[nil] = 1,
[mark](x0) = 4x0 + 2,
[a__and](x0, x1) = x0 + 4x1 + 4,
[tt] = 0,
[cons](x0, x1) = 4x0 + 4x1 + 2,
[zeros] = 0,
[0] = 0,
[a__zeros] = 2
orientation:
a__zeros() = 2 >= 2 = cons(0(),zeros())
a__and(tt(),X) = 4X + 4 >= 4X + 2 = mark(X)
a__length(nil()) = 7 >= 0 = 0()
a__length(cons(N,L)) = 16L + 16N + 11 >= 16L + 11 = s(a__length(mark(L)))
mark(zeros()) = 2 >= 2 = a__zeros()
mark(and(X1,X2)) = 4X1 + 12X2 + 18 >= 4X1 + 4X2 + 6 = a__and(mark(X1),X2)
mark(length(X)) = 16X + 14 >= 16X + 11 = a__length(mark(X))
mark(cons(X1,X2)) = 16X1 + 16X2 + 10 >= 16X1 + 4X2 + 10 = cons(mark(X1),X2)
mark(0()) = 2 >= 0 = 0()
mark(tt()) = 2 >= 0 = tt()
mark(nil()) = 6 >= 1 = nil()
mark(s(X)) = 4X + 2 >= 4X + 2 = s(mark(X))
a__zeros() = 2 >= 0 = zeros()
a__and(X1,X2) = X1 + 4X2 + 4 >= X1 + 3X2 + 4 = and(X1,X2)
a__length(X) = 4X + 3 >= 4X + 3 = length(X)
problem:
a__zeros() -> cons(0(),zeros())
a__length(cons(N,L)) -> s(a__length(mark(L)))
mark(zeros()) -> a__zeros()
mark(cons(X1,X2)) -> cons(mark(X1),X2)
mark(s(X)) -> s(mark(X))
a__and(X1,X2) -> and(X1,X2)
a__length(X) -> length(X)
Matrix Interpretation Processor: dim=1
interpretation:
[length](x0) = x0,
[and](x0, x1) = 4x0 + x1,
[s](x0) = x0,
[a__length](x0) = x0 + 1,
[mark](x0) = 2x0,
[a__and](x0, x1) = 4x0 + 4x1 + 1,
[cons](x0, x1) = x0 + 4x1,
[zeros] = 0,
[0] = 0,
[a__zeros] = 0
orientation:
a__zeros() = 0 >= 0 = cons(0(),zeros())
a__length(cons(N,L)) = 4L + N + 1 >= 2L + 1 = s(a__length(mark(L)))
mark(zeros()) = 0 >= 0 = a__zeros()
mark(cons(X1,X2)) = 2X1 + 8X2 >= 2X1 + 4X2 = cons(mark(X1),X2)
mark(s(X)) = 2X >= 2X = s(mark(X))
a__and(X1,X2) = 4X1 + 4X2 + 1 >= 4X1 + X2 = and(X1,X2)
a__length(X) = X + 1 >= X = length(X)
problem:
a__zeros() -> cons(0(),zeros())
a__length(cons(N,L)) -> s(a__length(mark(L)))
mark(zeros()) -> a__zeros()
mark(cons(X1,X2)) -> cons(mark(X1),X2)
mark(s(X)) -> s(mark(X))
Matrix Interpretation Processor: dim=3
interpretation:
[1 0 0]
[s](x0) = [0 1 0]x0
[0 0 0] ,
[1 0 0] [1]
[a__length](x0) = [0 0 0]x0 + [0]
[0 0 0] [0],
[1 1 0] [0]
[mark](x0) = [1 1 0]x0 + [0]
[1 0 0] [1],
[1 0 0] [1 1 0] [0]
[cons](x0, x1) = [0 1 0]x0 + [0 0 0]x1 + [1]
[0 0 0] [0 0 0] [0],
[0]
[zeros] = [1]
[0],
[0]
[0] = [0]
[0],
[1]
[a__zeros] = [1]
[0]
orientation:
[1] [1]
a__zeros() = [1] >= [1] = cons(0(),zeros())
[0] [0]
[1 1 0] [1 0 0] [1] [1 1 0] [1]
a__length(cons(N,L)) = [0 0 0]L + [0 0 0]N + [0] >= [0 0 0]L + [0] = s(a__length(mark(L)))
[0 0 0] [0 0 0] [0] [0 0 0] [0]
[1] [1]
mark(zeros()) = [1] >= [1] = a__zeros()
[1] [0]
[1 1 0] [1 1 0] [1] [1 1 0] [1 1 0] [0]
mark(cons(X1,X2)) = [1 1 0]X1 + [1 1 0]X2 + [1] >= [1 1 0]X1 + [0 0 0]X2 + [1] = cons(mark(X1),X2)
[1 0 0] [1 1 0] [1] [0 0 0] [0 0 0] [0]
[1 1 0] [0] [1 1 0]
mark(s(X)) = [1 1 0]X + [0] >= [1 1 0]X = s(mark(X))
[1 0 0] [1] [0 0 0]
problem:
a__zeros() -> cons(0(),zeros())
a__length(cons(N,L)) -> s(a__length(mark(L)))
mark(zeros()) -> a__zeros()
mark(s(X)) -> s(mark(X))
Unfolding Processor:
loop length: 3
terms:
a__length(cons(N,zeros()))
s(a__length(mark(zeros())))
s(a__length(a__zeros()))
context: s([])
substitution:
N -> 0()
Qed