Termination w.r.t. Q proof of /home/nowonder/forschung/aprove/satrung/aprove/lpar4/CimeSLASHlog2.trs

Termination w.r.t. Q of the following Term Rewriting System could not be shown:

Q restricted rewrite system:
The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.

↳ QTRS

  ↳ DependencyPairsProof

Q restricted rewrite system:
The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.

Q DP problem:
The TRS P consists of the following rules:

LOG'₁(1₁(x)) -> +¹₂(log'₁(x), 1₁(#))
-¹₂(0₁(x), 1₁(y)) -> -¹₂(-₂(x, y), 1₁(#))
LOG'₁(0₁(x)) -> LOG'₁(x)
-¹₂(1₁(x), 1₁(y)) -> 0¹₁(-₂(x, y))
GE₂(0₁(x), 1₁(y)) -> GE₂(y, x)
GE₂(1₁(x), 0₁(y)) -> GE₂(x, y)
+¹₂(1₁(x), 1₁(y)) -> 0¹₁(+₂(+₂(x, y), 1₁(#)))
+¹₂(0₁(x), 0₁(y)) -> +¹₂(x, y)
-¹₂(0₁(x), 0₁(y)) -> 0¹₁(-₂(x, y))
LOG₁(x) -> LOG'₁(x)
-¹₂(0₁(x), 1₁(y)) -> -¹₂(x, y)
-¹₂(1₁(x), 0₁(y)) -> -¹₂(x, y)
+¹₂(+₂(x, y), z) -> +¹₂(y, z)
+¹₂(0₁(x), 0₁(y)) -> 0¹₁(+₂(x, y))
LOG'₁(1₁(x)) -> LOG'₁(x)
LOG₁(x) -> -¹₂(log'₁(x), 1₁(#))
LOG'₁(0₁(x)) -> GE₂(x, 1₁(#))
GE₂(1₁(x), 1₁(y)) -> GE₂(x, y)
+¹₂(1₁(x), 1₁(y)) -> +¹₂(x, y)
-¹₂(0₁(x), 0₁(y)) -> -¹₂(x, y)
GE₂(0₁(x), 1₁(y)) -> NOT₁(ge₂(y, x))
+¹₂(+₂(x, y), z) -> +¹₂(x, +₂(y, z))
LOG'₁(0₁(x)) -> +¹₂(log'₁(x), 1₁(#))
LOG'₁(0₁(x)) -> IF₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)
GE₂(#, 0₁(x)) -> GE₂(#, x)
GE₂(0₁(x), 0₁(y)) -> GE₂(x, y)
+¹₂(1₁(x), 0₁(y)) -> +¹₂(x, y)
+¹₂(0₁(x), 1₁(y)) -> +¹₂(x, y)
-¹₂(1₁(x), 1₁(y)) -> -¹₂(x, y)
+¹₂(1₁(x), 1₁(y)) -> +¹₂(+₂(x, y), 1₁(#))

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

Q DP problem:
The TRS P consists of the following rules:

LOG'₁(1₁(x)) -> +¹₂(log'₁(x), 1₁(#))
-¹₂(0₁(x), 1₁(y)) -> -¹₂(-₂(x, y), 1₁(#))
LOG'₁(0₁(x)) -> LOG'₁(x)
-¹₂(1₁(x), 1₁(y)) -> 0¹₁(-₂(x, y))
GE₂(0₁(x), 1₁(y)) -> GE₂(y, x)
GE₂(1₁(x), 0₁(y)) -> GE₂(x, y)
+¹₂(1₁(x), 1₁(y)) -> 0¹₁(+₂(+₂(x, y), 1₁(#)))
+¹₂(0₁(x), 0₁(y)) -> +¹₂(x, y)
-¹₂(0₁(x), 0₁(y)) -> 0¹₁(-₂(x, y))
LOG₁(x) -> LOG'₁(x)
-¹₂(0₁(x), 1₁(y)) -> -¹₂(x, y)
-¹₂(1₁(x), 0₁(y)) -> -¹₂(x, y)
+¹₂(+₂(x, y), z) -> +¹₂(y, z)
+¹₂(0₁(x), 0₁(y)) -> 0¹₁(+₂(x, y))
LOG'₁(1₁(x)) -> LOG'₁(x)
LOG₁(x) -> -¹₂(log'₁(x), 1₁(#))
LOG'₁(0₁(x)) -> GE₂(x, 1₁(#))
GE₂(1₁(x), 1₁(y)) -> GE₂(x, y)
+¹₂(1₁(x), 1₁(y)) -> +¹₂(x, y)
-¹₂(0₁(x), 0₁(y)) -> -¹₂(x, y)
GE₂(0₁(x), 1₁(y)) -> NOT₁(ge₂(y, x))
+¹₂(+₂(x, y), z) -> +¹₂(x, +₂(y, z))
LOG'₁(0₁(x)) -> +¹₂(log'₁(x), 1₁(#))
LOG'₁(0₁(x)) -> IF₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)
GE₂(#, 0₁(x)) -> GE₂(#, x)
GE₂(0₁(x), 0₁(y)) -> GE₂(x, y)
+¹₂(1₁(x), 0₁(y)) -> +¹₂(x, y)
+¹₂(0₁(x), 1₁(y)) -> +¹₂(x, y)
-¹₂(1₁(x), 1₁(y)) -> -¹₂(x, y)
+¹₂(1₁(x), 1₁(y)) -> +¹₂(+₂(x, y), 1₁(#))

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
The approximation of the Dependency Graph contains 5 SCCs with 11 less nodes.

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

            ↳ QDPAfsSolverProof

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

Q DP problem:
The TRS P consists of the following rules:

GE₂(#, 0₁(x)) -> GE₂(#, x)

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
By using an argument filtering and a montonic ordering, at least one Dependency Pair of this SCC can be strictly oriented.

GE₂(#, 0₁(x)) -> GE₂(#, x)

Used argument filtering: GE₂(x1, x2) = x2
0₁(x1) = 0₁(x1)
Used ordering: Quasi Precedence: trivial

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

            ↳ QDPAfsSolverProof

              ↳ QDP

                ↳ PisEmptyProof

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

Q DP problem:
P is empty.
The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
The TRS P is empty. Hence, there is no (P,Q,R) chain.

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

Q DP problem:
The TRS P consists of the following rules:

GE₂(1₁(x), 1₁(y)) -> GE₂(x, y)
GE₂(0₁(x), 0₁(y)) -> GE₂(x, y)
GE₂(1₁(x), 0₁(y)) -> GE₂(x, y)
GE₂(0₁(x), 1₁(y)) -> GE₂(y, x)

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

          ↳ QDP

          ↳ QDP

Q DP problem:
The TRS P consists of the following rules:

-¹₂(1₁(x), 0₁(y)) -> -¹₂(x, y)
-¹₂(0₁(x), 1₁(y)) -> -¹₂(x, y)
-¹₂(0₁(x), 0₁(y)) -> -¹₂(x, y)
-¹₂(0₁(x), 1₁(y)) -> -¹₂(-₂(x, y), 1₁(#))
-¹₂(1₁(x), 1₁(y)) -> -¹₂(x, y)

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
By using an argument filtering and a montonic ordering, at least one Dependency Pair of this SCC can be strictly oriented.

-¹₂(0₁(x), 1₁(y)) -> -¹₂(x, y)
-¹₂(1₁(x), 1₁(y)) -> -¹₂(x, y)

Used argument filtering: -¹₂(x1, x2) = x2
0₁(x1) = x1
1₁(x1) = 1₁(x1)
# = #
Used ordering: Quasi Precedence: 1_1 > #

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

              ↳ QDP

                ↳ DependencyGraphProof

          ↳ QDP

          ↳ QDP

Q DP problem:
The TRS P consists of the following rules:

-¹₂(1₁(x), 0₁(y)) -> -¹₂(x, y)
-¹₂(0₁(x), 0₁(y)) -> -¹₂(x, y)
-¹₂(0₁(x), 1₁(y)) -> -¹₂(-₂(x, y), 1₁(#))

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
The approximation of the Dependency Graph contains 2 SCCs.

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

              ↳ QDP

                ↳ DependencyGraphProof

                  ↳ AND

                    ↳ QDP

                      ↳ QDPAfsSolverProof

                    ↳ QDP

          ↳ QDP

          ↳ QDP

Q DP problem:
The TRS P consists of the following rules:

-¹₂(0₁(x), 1₁(y)) -> -¹₂(-₂(x, y), 1₁(#))

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
By using an argument filtering and a montonic ordering, at least one Dependency Pair of this SCC can be strictly oriented.

-¹₂(0₁(x), 1₁(y)) -> -¹₂(-₂(x, y), 1₁(#))

Used argument filtering: -¹₂(x1, x2) = x1
0₁(x1) = 0₁(x1)
-₂(x1, x2) = x1
# = #
1₁(x1) = 1₁(x1)
Used ordering: Quasi Precedence: [0_1, 1_1]

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

              ↳ QDP

                ↳ DependencyGraphProof

                  ↳ AND

                    ↳ QDP

                      ↳ QDPAfsSolverProof

                        ↳ QDP

                          ↳ PisEmptyProof

                    ↳ QDP

          ↳ QDP

          ↳ QDP

Q DP problem:
P is empty.
The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
The TRS P is empty. Hence, there is no (P,Q,R) chain.

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

              ↳ QDP

                ↳ DependencyGraphProof

                  ↳ AND

                    ↳ QDP

                    ↳ QDP

                      ↳ QDPAfsSolverProof

          ↳ QDP

          ↳ QDP

Q DP problem:
The TRS P consists of the following rules:

-¹₂(1₁(x), 0₁(y)) -> -¹₂(x, y)
-¹₂(0₁(x), 0₁(y)) -> -¹₂(x, y)

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
By using an argument filtering and a montonic ordering, at least one Dependency Pair of this SCC can be strictly oriented.

-¹₂(1₁(x), 0₁(y)) -> -¹₂(x, y)
-¹₂(0₁(x), 0₁(y)) -> -¹₂(x, y)

Used argument filtering: -¹₂(x1, x2) = x2
0₁(x1) = 0₁(x1)
Used ordering: Quasi Precedence: trivial

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

              ↳ QDP

                ↳ DependencyGraphProof

                  ↳ AND

                    ↳ QDP

                    ↳ QDP

                      ↳ QDPAfsSolverProof

                        ↳ QDP

                          ↳ PisEmptyProof

          ↳ QDP

          ↳ QDP

Q DP problem:
P is empty.
The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
The TRS P is empty. Hence, there is no (P,Q,R) chain.

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

Q DP problem:
The TRS P consists of the following rules:

+¹₂(0₁(x), 0₁(y)) -> +¹₂(x, y)
+¹₂(1₁(x), 1₁(y)) -> +¹₂(x, y)
+¹₂(+₂(x, y), z) -> +¹₂(y, z)
+¹₂(1₁(x), 0₁(y)) -> +¹₂(x, y)
+¹₂(0₁(x), 1₁(y)) -> +¹₂(x, y)
+¹₂(+₂(x, y), z) -> +¹₂(x, +₂(y, z))
+¹₂(1₁(x), 1₁(y)) -> +¹₂(+₂(x, y), 1₁(#))

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

Q DP problem:
The TRS P consists of the following rules:

LOG'₁(1₁(x)) -> LOG'₁(x)
LOG'₁(0₁(x)) -> LOG'₁(x)

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
By using an argument filtering and a montonic ordering, at least one Dependency Pair of this SCC can be strictly oriented.

LOG'₁(0₁(x)) -> LOG'₁(x)

Used argument filtering: LOG'₁(x1) = x1
1₁(x1) = x1
0₁(x1) = 0₁(x1)
Used ordering: Quasi Precedence: trivial

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

              ↳ QDP

                ↳ QDPAfsSolverProof

Q DP problem:
The TRS P consists of the following rules:

LOG'₁(1₁(x)) -> LOG'₁(x)

The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
By using an argument filtering and a montonic ordering, at least one Dependency Pair of this SCC can be strictly oriented.

LOG'₁(1₁(x)) -> LOG'₁(x)

Used argument filtering: LOG'₁(x1) = x1
1₁(x1) = 1₁(x1)
Used ordering: Quasi Precedence: trivial

↳ QTRS

  ↳ DependencyPairsProof

    ↳ QDP

      ↳ DependencyGraphProof

        ↳ AND

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

          ↳ QDP

            ↳ QDPAfsSolverProof

              ↳ QDP

                ↳ QDPAfsSolverProof

                  ↳ QDP

                    ↳ PisEmptyProof

Q DP problem:
P is empty.
The TRS R consists of the following rules:

0₁(#) -> #
+₂(#, x) -> x
+₂(x, #) -> x
+₂(0₁(x), 0₁(y)) -> 0₁(+₂(x, y))
+₂(0₁(x), 1₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 0₁(y)) -> 1₁(+₂(x, y))
+₂(1₁(x), 1₁(y)) -> 0₁(+₂(+₂(x, y), 1₁(#)))
+₂(+₂(x, y), z) -> +₂(x, +₂(y, z))
-₂(#, x) -> #
-₂(x, #) -> x
-₂(0₁(x), 0₁(y)) -> 0₁(-₂(x, y))
-₂(0₁(x), 1₁(y)) -> 1₁(-₂(-₂(x, y), 1₁(#)))
-₂(1₁(x), 0₁(y)) -> 1₁(-₂(x, y))
-₂(1₁(x), 1₁(y)) -> 0₁(-₂(x, y))
not₁(true) -> false
not₁(false) -> true
if₃(true, x, y) -> x
if₃(false, x, y) -> y
ge₂(0₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(0₁(x), 1₁(y)) -> not₁(ge₂(y, x))
ge₂(1₁(x), 0₁(y)) -> ge₂(x, y)
ge₂(1₁(x), 1₁(y)) -> ge₂(x, y)
ge₂(x, #) -> true
ge₂(#, 0₁(x)) -> ge₂(#, x)
ge₂(#, 1₁(x)) -> false
log₁(x) -> -₂(log'₁(x), 1₁(#))
log'₁(#) -> #
log'₁(1₁(x)) -> +₂(log'₁(x), 1₁(#))
log'₁(0₁(x)) -> if₃(ge₂(x, 1₁(#)), +₂(log'₁(x), 1₁(#)), #)

Q is empty.
We have to consider all minimal (P,Q,R)-chains.
The TRS P is empty. Hence, there is no (P,Q,R) chain.