Term Rewriting System R:
[x, y]
f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Innermost Termination of R to be shown.

`   R`
`     ↳Dependency Pair Analysis`

R contains the following Dependency Pairs:

F(x, a(b(y))) -> F(a(b(x)), y)
F(a(x), y) -> F(x, a(y))
F(b(x), y) -> F(x, b(y))

Furthermore, R contains one SCC.

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Instantiation Transformation`

Dependency Pairs:

F(b(x), y) -> F(x, b(y))
F(a(x), y) -> F(x, a(y))
F(x, a(b(y))) -> F(a(b(x)), y)

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, an Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(a(x), y) -> F(x, a(y))
three new Dependency Pairs are created:

F(a(x''), a(y'')) -> F(x'', a(a(y'')))
F(a(b(x'')), y'') -> F(b(x''), a(y''))
F(a(x''), b(y'')) -> F(x'', a(b(y'')))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Instantiation Transformation`

Dependency Pairs:

F(a(x''), b(y'')) -> F(x'', a(b(y'')))
F(a(x''), a(y'')) -> F(x'', a(a(y'')))
F(x, a(b(y))) -> F(a(b(x)), y)
F(a(b(x'')), y'') -> F(b(x''), a(y''))
F(b(x), y) -> F(x, b(y))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, an Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(b(x), y) -> F(x, b(y))
four new Dependency Pairs are created:

F(b(x''), b(y'')) -> F(x'', b(b(y'')))
F(b(x'), a(a(y''''))) -> F(x', b(a(a(y''''))))
F(b(x'), a(y'''')) -> F(x', b(a(y'''')))
F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 3`
`                 ↳Forward Instantiation Transformation`

Dependency Pairs:

F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))
F(b(x'), a(y'''')) -> F(x', b(a(y'''')))
F(b(x''), b(y'')) -> F(x'', b(b(y'')))
F(b(x'), a(a(y''''))) -> F(x', b(a(a(y''''))))
F(a(b(x'')), y'') -> F(b(x''), a(y''))
F(a(x''), a(y'')) -> F(x'', a(a(y'')))
F(x, a(b(y))) -> F(a(b(x)), y)
F(a(x''), b(y'')) -> F(x'', a(b(y'')))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, a Forward Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(a(x''), a(y'')) -> F(x'', a(a(y'')))
three new Dependency Pairs are created:

F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))
F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))
F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 4`
`                 ↳Forward Instantiation Transformation`

Dependency Pairs:

F(b(x'), a(a(y''''))) -> F(x', b(a(a(y''''))))
F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))
F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))
F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))
F(b(x''), b(y'')) -> F(x'', b(b(y'')))
F(b(x'), a(y'''')) -> F(x', b(a(y'''')))
F(a(x''), b(y'')) -> F(x'', a(b(y'')))
F(x, a(b(y))) -> F(a(b(x)), y)
F(a(b(x'')), y'') -> F(b(x''), a(y''))
F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, a Forward Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(b(x''), b(y'')) -> F(x'', b(b(y'')))
three new Dependency Pairs are created:

F(b(a(b(x''''))), b(y'''')) -> F(a(b(x'''')), b(b(y'''')))
F(b(a(x'''')), b(y'''')) -> F(a(x''''), b(b(y'''')))
F(b(b(x'''')), b(y'''')) -> F(b(x''''), b(b(y'''')))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 5`
`                 ↳Forward Instantiation Transformation`

Dependency Pairs:

F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))
F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))
F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))
F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))
F(b(b(x'''')), b(y'''')) -> F(b(x''''), b(b(y'''')))
F(b(a(x'''')), b(y'''')) -> F(a(x''''), b(b(y'''')))
F(b(a(b(x''''))), b(y'''')) -> F(a(b(x'''')), b(b(y'''')))
F(b(x'), a(y'''')) -> F(x', b(a(y'''')))
F(a(x''), b(y'')) -> F(x'', a(b(y'')))
F(x, a(b(y))) -> F(a(b(x)), y)
F(a(b(x'')), y'') -> F(b(x''), a(y''))
F(b(x'), a(a(y''''))) -> F(x', b(a(a(y''''))))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, a Forward Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(b(x'), a(a(y''''))) -> F(x', b(a(a(y''''))))
five new Dependency Pairs are created:

F(b(a(b(x''''))), a(a(y'''''))) -> F(a(b(x'''')), b(a(a(y'''''))))
F(b(a(x'''')), a(a(y'''''))) -> F(a(x''''), b(a(a(y'''''))))
F(b(b(a(b(x'''''')))), a(a(y''''''))) -> F(b(a(b(x''''''))), b(a(a(y''''''))))
F(b(b(a(x''''''))), a(a(y''''''))) -> F(b(a(x'''''')), b(a(a(y''''''))))
F(b(b(b(x''''''))), a(a(y''''''))) -> F(b(b(x'''''')), b(a(a(y''''''))))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 6`
`                 ↳Forward Instantiation Transformation`

Dependency Pairs:

F(b(b(b(x''''''))), a(a(y''''''))) -> F(b(b(x'''''')), b(a(a(y''''''))))
F(b(b(a(x''''''))), a(a(y''''''))) -> F(b(a(x'''''')), b(a(a(y''''''))))
F(b(b(a(b(x'''''')))), a(a(y''''''))) -> F(b(a(b(x''''''))), b(a(a(y''''''))))
F(b(a(x'''')), a(a(y'''''))) -> F(a(x''''), b(a(a(y'''''))))
F(b(a(b(x''''))), a(a(y'''''))) -> F(a(b(x'''')), b(a(a(y'''''))))
F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))
F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))
F(b(b(x'''')), b(y'''')) -> F(b(x''''), b(b(y'''')))
F(b(a(x'''')), b(y'''')) -> F(a(x''''), b(b(y'''')))
F(b(a(b(x''''))), b(y'''')) -> F(a(b(x'''')), b(b(y'''')))
F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))
F(a(x''), b(y'')) -> F(x'', a(b(y'')))
F(x, a(b(y))) -> F(a(b(x)), y)
F(a(b(x'')), y'') -> F(b(x''), a(y''))
F(b(x'), a(y'''')) -> F(x', b(a(y'''')))
F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, a Forward Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(b(x'), a(y'''')) -> F(x', b(a(y'''')))
five new Dependency Pairs are created:

F(b(a(b(x''''))), a(y''''')) -> F(a(b(x'''')), b(a(y''''')))
F(b(a(x'''')), a(y''''')) -> F(a(x''''), b(a(y''''')))
F(b(b(a(b(x'''''')))), a(y'''''')) -> F(b(a(b(x''''''))), b(a(y'''''')))
F(b(b(a(x''''''))), a(y'''''')) -> F(b(a(x'''''')), b(a(y'''''')))
F(b(b(b(x''''''))), a(y'''''')) -> F(b(b(x'''''')), b(a(y'''''')))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 7`
`                 ↳Forward Instantiation Transformation`

Dependency Pairs:

F(b(b(b(x''''''))), a(y'''''')) -> F(b(b(x'''''')), b(a(y'''''')))
F(b(b(a(x''''''))), a(y'''''')) -> F(b(a(x'''''')), b(a(y'''''')))
F(b(b(a(b(x'''''')))), a(y'''''')) -> F(b(a(b(x''''''))), b(a(y'''''')))
F(b(a(x'''')), a(y''''')) -> F(a(x''''), b(a(y''''')))
F(b(a(b(x''''))), a(y''''')) -> F(a(b(x'''')), b(a(y''''')))
F(b(b(a(x''''''))), a(a(y''''''))) -> F(b(a(x'''''')), b(a(a(y''''''))))
F(b(b(a(b(x'''''')))), a(a(y''''''))) -> F(b(a(b(x''''''))), b(a(a(y''''''))))
F(b(a(x'''')), a(a(y'''''))) -> F(a(x''''), b(a(a(y'''''))))
F(b(a(b(x''''))), a(a(y'''''))) -> F(a(b(x'''')), b(a(a(y'''''))))
F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))
F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))
F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))
F(b(a(x'''')), b(y'''')) -> F(a(x''''), b(b(y'''')))
F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))
F(a(x''), b(y'')) -> F(x'', a(b(y'')))
F(x, a(b(y))) -> F(a(b(x)), y)
F(a(b(x'')), y'') -> F(b(x''), a(y''))
F(b(a(b(x''''))), b(y'''')) -> F(a(b(x'''')), b(b(y'''')))
F(b(b(x'''')), b(y'''')) -> F(b(x''''), b(b(y'''')))
F(b(b(b(x''''''))), a(a(y''''''))) -> F(b(b(x'''''')), b(a(a(y''''''))))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, a Forward Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(a(b(x'')), y'') -> F(b(x''), a(y''))
12 new Dependency Pairs are created:

F(a(b(x''')), b(y''')) -> F(b(x'''), a(b(y''')))
F(a(b(x'''')), b(y'''''')) -> F(b(x''''), a(b(y'''''')))
F(a(b(a(b(x'''''')))), a(y''''''')) -> F(b(a(b(x''''''))), a(a(y''''''')))
F(a(b(a(x''''''))), a(y''''''')) -> F(b(a(x'''''')), a(a(y''''''')))
F(a(b(b(a(b(x''''''''))))), a(y'''''''')) -> F(b(b(a(b(x'''''''')))), a(a(y'''''''')))
F(a(b(b(a(x'''''''')))), a(y'''''''')) -> F(b(b(a(x''''''''))), a(a(y'''''''')))
F(a(b(b(b(x'''''''')))), a(y'''''''')) -> F(b(b(b(x''''''''))), a(a(y'''''''')))
F(a(b(a(b(x'''''')))), y''') -> F(b(a(b(x''''''))), a(y'''))
F(a(b(a(x''''''))), y''') -> F(b(a(x'''''')), a(y'''))
F(a(b(b(a(b(x''''''''))))), y''') -> F(b(b(a(b(x'''''''')))), a(y'''))
F(a(b(b(a(x'''''''')))), y''') -> F(b(b(a(x''''''''))), a(y'''))
F(a(b(b(b(x'''''''')))), y''') -> F(b(b(b(x''''''''))), a(y'''))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 8`
`                 ↳Forward Instantiation Transformation`

Dependency Pairs:

F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))
F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))
F(a(b(b(b(x'''''''')))), a(y'''''''')) -> F(b(b(b(x''''''''))), a(a(y'''''''')))
F(a(b(b(a(x'''''''')))), a(y'''''''')) -> F(b(b(a(x''''''''))), a(a(y'''''''')))
F(a(b(b(a(b(x''''''''))))), a(y'''''''')) -> F(b(b(a(b(x'''''''')))), a(a(y'''''''')))
F(a(b(a(x''''''))), a(y''''''')) -> F(b(a(x'''''')), a(a(y''''''')))
F(a(b(a(b(x'''''')))), a(y''''''')) -> F(b(a(b(x''''''))), a(a(y''''''')))
F(b(b(b(x''''''))), a(a(y''''''))) -> F(b(b(x'''''')), b(a(a(y''''''))))
F(a(b(b(b(x'''''''')))), y''') -> F(b(b(b(x''''''''))), a(y'''))
F(a(b(b(a(x'''''''')))), y''') -> F(b(b(a(x''''''''))), a(y'''))
F(b(b(a(x''''''))), a(y'''''')) -> F(b(a(x'''''')), b(a(y'''''')))
F(b(b(a(b(x'''''')))), a(y'''''')) -> F(b(a(b(x''''''))), b(a(y'''''')))
F(b(b(a(x''''''))), a(a(y''''''))) -> F(b(a(x'''''')), b(a(a(y''''''))))
F(b(b(a(b(x'''''')))), a(a(y''''''))) -> F(b(a(b(x''''''))), b(a(a(y''''''))))
F(a(b(b(a(b(x''''''''))))), y''') -> F(b(b(a(b(x'''''''')))), a(y'''))
F(b(a(x'''')), a(y''''')) -> F(a(x''''), b(a(y''''')))
F(a(b(a(x''''''))), y''') -> F(b(a(x'''''')), a(y'''))
F(b(a(x'''')), a(a(y'''''))) -> F(a(x''''), b(a(a(y'''''))))
F(a(b(a(b(x'''''')))), y''') -> F(b(a(b(x''''''))), a(y'''))
F(b(a(b(x''''))), a(y''''')) -> F(a(b(x'''')), b(a(y''''')))
F(a(b(x'''')), b(y'''''')) -> F(b(x''''), a(b(y'''''')))
F(b(a(x'''')), b(y'''')) -> F(a(x''''), b(b(y'''')))
F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))
F(a(b(x''')), b(y''')) -> F(b(x'''), a(b(y''')))
F(b(a(b(x''''))), a(a(y'''''))) -> F(a(b(x'''')), b(a(a(y'''''))))
F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))
F(x, a(b(y))) -> F(a(b(x)), y)
F(a(x''), b(y'')) -> F(x'', a(b(y'')))
F(b(a(b(x''''))), b(y'''')) -> F(a(b(x'''')), b(b(y'''')))
F(b(b(x'''')), b(y'''')) -> F(b(x''''), b(b(y'''')))
F(b(b(b(x''''''))), a(y'''''')) -> F(b(b(x'''''')), b(a(y'''''')))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, a Forward Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(x, a(b(y))) -> F(a(b(x)), y)
15 new Dependency Pairs are created:

F(x'', a(b(a(b(y''))))) -> F(a(b(x'')), a(b(y'')))
F(x', a(b(b(y'''')))) -> F(a(b(x')), b(y''''))
F(x', a(b(a(y''''')))) -> F(a(b(x')), a(y'''''))
F(x', a(b(b(y''''')))) -> F(a(b(x')), b(y'''''))
F(x', a(b(b(y'''''''')))) -> F(a(b(x')), b(y''''''''))
F(a(b(x'''''''')), a(b(a(y''''''''')))) -> F(a(b(a(b(x'''''''')))), a(y'''''''''))
F(a(x''''''''), a(b(a(y''''''''')))) -> F(a(b(a(x''''''''))), a(y'''''''''))
F(b(a(b(x''''''''''))), a(b(a(y'''''''''')))) -> F(a(b(b(a(b(x''''''''''))))), a(y''''''''''))
F(b(a(x'''''''''')), a(b(a(y'''''''''')))) -> F(a(b(b(a(x'''''''''')))), a(y''''''''''))
F(b(b(x'''''''''')), a(b(a(y'''''''''')))) -> F(a(b(b(b(x'''''''''')))), a(y''''''''''))
F(a(b(x'''''''')), a(b(y'))) -> F(a(b(a(b(x'''''''')))), y')
F(a(x''''''''), a(b(y'))) -> F(a(b(a(x''''''''))), y')
F(b(a(b(x''''''''''))), a(b(y'))) -> F(a(b(b(a(b(x''''''''''))))), y')
F(b(a(x'''''''''')), a(b(y'))) -> F(a(b(b(a(x'''''''''')))), y')
F(b(b(x'''''''''')), a(b(y'))) -> F(a(b(b(b(x'''''''''')))), y')

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 9`
`                 ↳Forward Instantiation Transformation`

Dependency Pairs:

F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))
F(b(a(x'''''''''')), a(b(y'))) -> F(a(b(b(a(x'''''''''')))), y')
F(b(a(b(x''''''''''))), a(b(y'))) -> F(a(b(b(a(b(x''''''''''))))), y')
F(b(a(x'''''''''')), a(b(a(y'''''''''')))) -> F(a(b(b(a(x'''''''''')))), a(y''''''''''))
F(b(a(b(x''''''''''))), a(b(a(y'''''''''')))) -> F(a(b(b(a(b(x''''''''''))))), a(y''''''''''))
F(b(b(x'''''''''')), a(b(y'))) -> F(a(b(b(b(x'''''''''')))), y')
F(a(x''''''''), a(b(y'))) -> F(a(b(a(x''''''''))), y')
F(a(b(x'''''''')), a(b(y'))) -> F(a(b(a(b(x'''''''')))), y')
F(a(x''''''''), a(b(a(y''''''''')))) -> F(a(b(a(x''''''''))), a(y'''''''''))
F(a(b(x'''''''')), a(b(a(y''''''''')))) -> F(a(b(a(b(x'''''''')))), a(y'''''''''))
F(b(b(x'''''''''')), a(b(a(y'''''''''')))) -> F(a(b(b(b(x'''''''''')))), a(y''''''''''))
F(x', a(b(b(y'''''''')))) -> F(a(b(x')), b(y''''''''))
F(x', a(b(b(y''''')))) -> F(a(b(x')), b(y'''''))
F(a(b(b(b(x'''''''')))), y''') -> F(b(b(b(x''''''''))), a(y'''))
F(b(b(b(x''''''))), a(y'''''')) -> F(b(b(x'''''')), b(a(y'''''')))
F(b(b(x'''')), b(y'''')) -> F(b(x''''), b(b(y'''')))
F(b(b(b(x''''''))), a(a(y''''''))) -> F(b(b(x'''''')), b(a(a(y''''''))))
F(a(b(b(b(x'''''''')))), a(y'''''''')) -> F(b(b(b(x''''''''))), a(a(y'''''''')))
F(a(b(b(a(x'''''''')))), a(y'''''''')) -> F(b(b(a(x''''''''))), a(a(y'''''''')))
F(x', a(b(a(y''''')))) -> F(a(b(x')), a(y'''''))
F(a(b(b(a(x'''''''')))), y''') -> F(b(b(a(x''''''''))), a(y'''))
F(x', a(b(b(y'''')))) -> F(a(b(x')), b(y''''))
F(b(b(a(x''''''))), a(y'''''')) -> F(b(a(x'''''')), b(a(y'''''')))
F(b(b(a(b(x'''''')))), a(y'''''')) -> F(b(a(b(x''''''))), b(a(y'''''')))
F(b(b(a(x''''''))), a(a(y''''''))) -> F(b(a(x'''''')), b(a(a(y''''''))))
F(a(b(b(a(b(x''''''''))))), y''') -> F(b(b(a(b(x'''''''')))), a(y'''))
F(b(a(x'''')), b(y'''')) -> F(a(x''''), b(b(y'''')))
F(b(b(a(b(x'''''')))), a(a(y''''''))) -> F(b(a(b(x''''''))), b(a(a(y''''''))))
F(a(b(b(a(b(x''''''''))))), a(y'''''''')) -> F(b(b(a(b(x'''''''')))), a(a(y'''''''')))
F(a(b(a(x''''''))), a(y''''''')) -> F(b(a(x'''''')), a(a(y''''''')))
F(a(b(a(b(x'''''')))), a(y''''''')) -> F(b(a(b(x''''''))), a(a(y''''''')))
F(x'', a(b(a(b(y''))))) -> F(a(b(x'')), a(b(y'')))
F(a(b(a(x''''''))), y''') -> F(b(a(x'''''')), a(y'''))
F(b(a(x'''')), a(a(y'''''))) -> F(a(x''''), b(a(a(y'''''))))
F(a(b(a(b(x'''''')))), y''') -> F(b(a(b(x''''''))), a(y'''))
F(b(a(x'''')), a(y''''')) -> F(a(x''''), b(a(y''''')))
F(a(b(x'''')), b(y'''''')) -> F(b(x''''), a(b(y'''''')))
F(b(a(b(x''''))), a(y''''')) -> F(a(b(x'''')), b(a(y''''')))
F(a(b(x''')), b(y''')) -> F(b(x'''), a(b(y''')))
F(b(a(b(x''''))), b(y'''')) -> F(a(b(x'''')), b(b(y'''')))
F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))
F(a(x''), b(y'')) -> F(x'', a(b(y'')))
F(b(a(b(x''''))), a(a(y'''''))) -> F(a(b(x'''')), b(a(a(y'''''))))
F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))
F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, a Forward Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(a(x''), b(y'')) -> F(x'', a(b(y'')))
29 new Dependency Pairs are created:

F(a(b(x'''')), b(y''')) -> F(b(x''''), a(b(y''')))
F(a(a(a(x''''''))), b(y''')) -> F(a(a(x'''''')), a(b(y''')))
F(a(a(a(b(x'''''')))), b(y''')) -> F(a(a(b(x''''''))), a(b(y''')))
F(a(a(b(x''''''))), b(y''')) -> F(a(b(x'''''')), a(b(y''')))
F(a(b(a(b(x'''''')))), b(y''')) -> F(b(a(b(x''''''))), a(b(y''')))
F(a(b(a(x''''''))), b(y''')) -> F(b(a(x'''''')), a(b(y''')))
F(a(b(b(a(b(x''''''''))))), b(y''')) -> F(b(b(a(b(x'''''''')))), a(b(y''')))
F(a(b(b(a(x'''''''')))), b(y''')) -> F(b(b(a(x''''''''))), a(b(y''')))
F(a(b(b(b(x'''''''')))), b(y''')) -> F(b(b(b(x''''''''))), a(b(y''')))
F(a(a(b(a(b(x''''''''))))), b(y''')) -> F(a(b(a(b(x'''''''')))), a(b(y''')))
F(a(a(b(a(x'''''''')))), b(y''')) -> F(a(b(a(x''''''''))), a(b(y''')))
F(a(a(b(b(a(b(x'''''''''')))))), b(y''')) -> F(a(b(b(a(b(x''''''''''))))), a(b(y''')))
F(a(a(b(b(a(x''''''''''))))), b(y''')) -> F(a(b(b(a(x'''''''''')))), a(b(y''')))
F(a(a(b(b(b(x''''''''''))))), b(y''')) -> F(a(b(b(b(x'''''''''')))), a(b(y''')))
F(a(x''''), b(a(b(y'''')))) -> F(x'''', a(b(a(b(y'''')))))
F(a(x''''), b(b(y''''''))) -> F(x'''', a(b(b(y''''''))))
F(a(x''''), b(a(y'''''''))) -> F(x'''', a(b(a(y'''''''))))
F(a(x''''), b(b(y'''''''))) -> F(x'''', a(b(b(y'''''''))))
F(a(x''''), b(b(y''''''''''))) -> F(x'''', a(b(b(y''''''''''))))
F(a(a(b(x''''''''''))), b(a(y'''''''''''))) -> F(a(b(x'''''''''')), a(b(a(y'''''''''''))))
F(a(a(x'''''''''')), b(a(y'''''''''''))) -> F(a(x''''''''''), a(b(a(y'''''''''''))))
F(a(b(a(b(x'''''''''''')))), b(a(y''''''''''''))) -> F(b(a(b(x''''''''''''))), a(b(a(y''''''''''''))))
F(a(b(a(x''''''''''''))), b(a(y''''''''''''))) -> F(b(a(x'''''''''''')), a(b(a(y''''''''''''))))
F(a(b(b(x''''''''''''))), b(a(y''''''''''''))) -> F(b(b(x'''''''''''')), a(b(a(y''''''''''''))))
F(a(a(b(x''''''''''))), b(y'''')) -> F(a(b(x'''''''''')), a(b(y'''')))
F(a(a(x'''''''''')), b(y'''')) -> F(a(x''''''''''), a(b(y'''')))
F(a(b(a(b(x'''''''''''')))), b(y'''')) -> F(b(a(b(x''''''''''''))), a(b(y'''')))
F(a(b(a(x''''''''''''))), b(y'''')) -> F(b(a(x'''''''''''')), a(b(y'''')))
F(a(b(b(x''''''''''''))), b(y'''')) -> F(b(b(x'''''''''''')), a(b(y'''')))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 10`
`                 ↳Forward Instantiation Transformation`

Dependency Pairs:

F(a(a(x'''''''''')), b(a(y'''''''''''))) -> F(a(x''''''''''), a(b(a(y'''''''''''))))
F(a(a(b(x''''''''''))), b(a(y'''''''''''))) -> F(a(b(x'''''''''')), a(b(a(y'''''''''''))))
F(a(a(x'''''''''')), b(y'''')) -> F(a(x''''''''''), a(b(y'''')))
F(a(a(b(x''''''''''))), b(y'''')) -> F(a(b(x'''''''''')), a(b(y'''')))
F(a(a(b(b(b(x''''''''''))))), b(y''')) -> F(a(b(b(b(x'''''''''')))), a(b(y''')))
F(a(a(b(b(a(x''''''''''))))), b(y''')) -> F(a(b(b(a(x'''''''''')))), a(b(y''')))
F(a(a(b(b(a(b(x'''''''''')))))), b(y''')) -> F(a(b(b(a(b(x''''''''''))))), a(b(y''')))
F(a(a(b(a(x'''''''')))), b(y''')) -> F(a(b(a(x''''''''))), a(b(y''')))
F(a(a(b(a(b(x''''''''))))), b(y''')) -> F(a(b(a(b(x'''''''')))), a(b(y''')))
F(a(a(b(x''''''))), b(y''')) -> F(a(b(x'''''')), a(b(y''')))
F(a(a(a(b(x'''''')))), b(y''')) -> F(a(a(b(x''''''))), a(b(y''')))
F(a(a(a(x''''''))), b(y''')) -> F(a(a(x'''''')), a(b(y''')))
F(a(b(a(x''''''''''''))), b(y'''')) -> F(b(a(x'''''''''''')), a(b(y'''')))
F(a(b(a(b(x'''''''''''')))), b(y'''')) -> F(b(a(b(x''''''''''''))), a(b(y'''')))
F(a(b(a(x''''''''''''))), b(a(y''''''''''''))) -> F(b(a(x'''''''''''')), a(b(a(y''''''''''''))))
F(a(b(a(b(x'''''''''''')))), b(a(y''''''''''''))) -> F(b(a(b(x''''''''''''))), a(b(a(y''''''''''''))))
F(a(b(b(x''''''''''''))), b(y'''')) -> F(b(b(x'''''''''''')), a(b(y'''')))
F(a(b(b(x''''''''''''))), b(a(y''''''''''''))) -> F(b(b(x'''''''''''')), a(b(a(y''''''''''''))))
F(a(x''''), b(b(y''''''''''))) -> F(x'''', a(b(b(y''''''''''))))
F(a(x''''), b(b(y'''''''))) -> F(x'''', a(b(b(y'''''''))))
F(a(x''''), b(a(y'''''''))) -> F(x'''', a(b(a(y'''''''))))
F(a(b(b(a(x'''''''')))), b(y''')) -> F(b(b(a(x''''''''))), a(b(y''')))
F(b(a(x'''''''''')), a(b(y'))) -> F(a(b(b(a(x'''''''''')))), y')
F(a(x''''), b(b(y''''''))) -> F(x'''', a(b(b(y''''''))))
F(a(b(b(b(x'''''''')))), b(y''')) -> F(b(b(b(x''''''''))), a(b(y''')))
F(b(b(x'''''''''')), a(b(y'))) -> F(a(b(b(b(x'''''''''')))), y')
F(a(b(b(a(b(x''''''''))))), b(y''')) -> F(b(b(a(b(x'''''''')))), a(b(y''')))
F(b(a(b(x''''''''''))), a(b(y'))) -> F(a(b(b(a(b(x''''''''''))))), y')
F(b(b(x'''''''''')), a(b(a(y'''''''''')))) -> F(a(b(b(b(x'''''''''')))), a(y''''''''''))
F(b(a(x'''''''''')), a(b(a(y'''''''''')))) -> F(a(b(b(a(x'''''''''')))), a(y''''''''''))
F(a(x''''), b(a(b(y'''')))) -> F(x'''', a(b(a(b(y'''')))))
F(a(x''''''''), a(b(y'))) -> F(a(b(a(x''''''''))), y')
F(a(b(x'''''''')), a(b(y'))) -> F(a(b(a(b(x'''''''')))), y')
F(a(x''''''''), a(b(a(y''''''''')))) -> F(a(b(a(x''''''''))), a(y'''''''''))
F(a(b(x'''''''')), a(b(a(y''''''''')))) -> F(a(b(a(b(x'''''''')))), a(y'''''''''))
F(b(a(b(x''''''''''))), a(b(a(y'''''''''')))) -> F(a(b(b(a(b(x''''''''''))))), a(y''''''''''))
F(a(b(a(x''''''))), b(y''')) -> F(b(a(x'''''')), a(b(y''')))
F(x', a(b(b(y'''''''')))) -> F(a(b(x')), b(y''''''''))
F(a(b(a(b(x'''''')))), b(y''')) -> F(b(a(b(x''''''))), a(b(y''')))
F(x', a(b(b(y''''')))) -> F(a(b(x')), b(y'''''))
F(x', a(b(a(y''''')))) -> F(a(b(x')), a(y'''''))
F(a(b(x'''')), b(y''')) -> F(b(x''''), a(b(y''')))
F(x', a(b(b(y'''')))) -> F(a(b(x')), b(y''''))
F(a(b(b(b(x'''''''')))), y''') -> F(b(b(b(x''''''''))), a(y'''))
F(b(b(b(x''''''))), a(y'''''')) -> F(b(b(x'''''')), b(a(y'''''')))
F(b(b(x'''')), b(y'''')) -> F(b(x''''), b(b(y'''')))
F(b(b(b(x''''''))), a(a(y''''''))) -> F(b(b(x'''''')), b(a(a(y''''''))))
F(a(b(b(b(x'''''''')))), a(y'''''''')) -> F(b(b(b(x''''''''))), a(a(y'''''''')))
F(a(b(b(a(x'''''''')))), a(y'''''''')) -> F(b(b(a(x''''''''))), a(a(y'''''''')))
F(a(b(b(a(b(x''''''''))))), a(y'''''''')) -> F(b(b(a(b(x'''''''')))), a(a(y'''''''')))
F(a(b(a(x''''''))), a(y''''''')) -> F(b(a(x'''''')), a(a(y''''''')))
F(a(b(a(b(x'''''')))), a(y''''''')) -> F(b(a(b(x''''''))), a(a(y''''''')))
F(x'', a(b(a(b(y''))))) -> F(a(b(x'')), a(b(y'')))
F(b(b(a(x''''''))), a(y'''''')) -> F(b(a(x'''''')), b(a(y'''''')))
F(b(b(a(b(x'''''')))), a(y'''''')) -> F(b(a(b(x''''''))), b(a(y'''''')))
F(b(b(a(x''''''))), a(a(y''''''))) -> F(b(a(x'''''')), b(a(a(y''''''))))
F(a(b(b(a(x'''''''')))), y''') -> F(b(b(a(x''''''''))), a(y'''))
F(b(a(x'''')), b(y'''')) -> F(a(x''''), b(b(y'''')))
F(b(b(a(b(x'''''')))), a(a(y''''''))) -> F(b(a(b(x''''''))), b(a(a(y''''''))))
F(a(b(b(a(b(x''''''''))))), y''') -> F(b(b(a(b(x'''''''')))), a(y'''))
F(b(a(x'''')), a(y''''')) -> F(a(x''''), b(a(y''''')))
F(a(b(a(x''''''))), y''') -> F(b(a(x'''''')), a(y'''))
F(b(a(x'''')), a(a(y'''''))) -> F(a(x''''), b(a(a(y'''''))))
F(a(b(a(b(x'''''')))), y''') -> F(b(a(b(x''''''))), a(y'''))
F(b(a(b(x''''))), a(y''''')) -> F(a(b(x'''')), b(a(y''''')))
F(a(b(x'''')), b(y'''''')) -> F(b(x''''), a(b(y'''''')))
F(b(a(b(x''''))), b(y'''')) -> F(a(b(x'''')), b(b(y'''')))
F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))
F(a(b(x''')), b(y''')) -> F(b(x'''), a(b(y''')))
F(b(a(b(x''''))), a(a(y'''''))) -> F(a(b(x'''')), b(a(a(y'''''))))
F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))
F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))
F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

On this DP problem, a Forward Instantiation SCC transformation can be performed.
As a result of transforming the rule

F(b(x'), a(b(y''''))) -> F(x', b(a(b(y''''))))
31 new Dependency Pairs are created:

F(b(b(a(b(x'''''')))), a(b(y''''''))) -> F(b(a(b(x''''''))), b(a(b(y''''''))))
F(b(b(a(x''''''))), a(b(y''''''))) -> F(b(a(x'''''')), b(a(b(y''''''))))
F(b(b(b(x''''''))), a(b(y''''''))) -> F(b(b(x'''''')), b(a(b(y''''''))))
F(b(a(b(x'''''))), a(b(y''''''))) -> F(a(b(x''''')), b(a(b(y''''''))))
F(b(a(b(x''''''))), a(b(y'''''))) -> F(a(b(x'''''')), b(a(b(y'''''))))
F(b(a(b(a(b(x''''''''))))), a(b(y''''''))) -> F(a(b(a(b(x'''''''')))), b(a(b(y''''''))))
F(b(a(b(a(x'''''''')))), a(b(y''''''))) -> F(a(b(a(x''''''''))), b(a(b(y''''''))))
F(b(a(b(b(a(b(x'''''''''')))))), a(b(y''''''))) -> F(a(b(b(a(b(x''''''''''))))), b(a(b(y''''''))))
F(b(a(b(b(a(x''''''''''))))), a(b(y''''''))) -> F(a(b(b(a(x'''''''''')))), b(a(b(y''''''))))
F(b(a(b(b(b(x''''''''''))))), a(b(y''''''))) -> F(a(b(b(b(x'''''''''')))), b(a(b(y''''''))))
F(b(a(b(x''''''))), a(b(y''''''))) -> F(a(b(x'''''')), b(a(b(y''''''))))
F(b(a(a(a(x'''''''')))), a(b(y''''''))) -> F(a(a(a(x''''''''))), b(a(b(y''''''))))
F(b(a(a(a(b(x''''''''))))), a(b(y''''''))) -> F(a(a(a(b(x'''''''')))), b(a(b(y''''''))))
F(b(a(a(b(x'''''''')))), a(b(y''''''))) -> F(a(a(b(x''''''''))), b(a(b(y''''''))))
F(b(a(a(b(a(b(x'''''''''')))))), a(b(y''''''))) -> F(a(a(b(a(b(x''''''''''))))), b(a(b(y''''''))))
F(b(a(a(b(a(x''''''''''))))), a(b(y''''''))) -> F(a(a(b(a(x'''''''''')))), b(a(b(y''''''))))
F(b(a(a(b(b(a(b(x''''''''''''))))))), a(b(y''''''))) -> F(a(a(b(b(a(b(x'''''''''''')))))), b(a(b(y''''''))))
F(b(a(a(b(b(a(x'''''''''''')))))), a(b(y''''''))) -> F(a(a(b(b(a(x''''''''''''))))), b(a(b(y''''''))))
F(b(a(a(b(b(b(x'''''''''''')))))), a(b(y''''''))) -> F(a(a(b(b(b(x''''''''''''))))), b(a(b(y''''''))))
F(b(a(x'''''')), a(b(y''''''))) -> F(a(x''''''), b(a(b(y''''''))))
F(b(a(x'''''')), a(b(y'''''))) -> F(a(x''''''), b(a(b(y'''''))))
F(b(a(a(b(x'''''''''''')))), a(b(y'''''))) -> F(a(a(b(x''''''''''''))), b(a(b(y'''''))))
F(b(a(a(x''''''''''''))), a(b(y'''''))) -> F(a(a(x'''''''''''')), b(a(b(y'''''))))
F(b(a(b(a(b(x''''''''''''''))))), a(b(y'''''))) -> F(a(b(a(b(x'''''''''''''')))), b(a(b(y'''''))))
F(b(a(b(a(x'''''''''''''')))), a(b(y'''''))) -> F(a(b(a(x''''''''''''''))), b(a(b(y'''''))))
F(b(a(b(b(x'''''''''''''')))), a(b(y'''''))) -> F(a(b(b(x''''''''''''''))), b(a(b(y'''''))))
F(b(a(a(b(x'''''''''''')))), a(b(y''''''))) -> F(a(a(b(x''''''''''''))), b(a(b(y''''''))))
F(b(a(a(x''''''''''''))), a(b(y''''''))) -> F(a(a(x'''''''''''')), b(a(b(y''''''))))
F(b(a(b(a(b(x''''''''''''''))))), a(b(y''''''))) -> F(a(b(a(b(x'''''''''''''')))), b(a(b(y''''''))))
F(b(a(b(a(x'''''''''''''')))), a(b(y''''''))) -> F(a(b(a(x''''''''''''''))), b(a(b(y''''''))))
F(b(a(b(b(x'''''''''''''')))), a(b(y''''''))) -> F(a(b(b(x''''''''''''''))), b(a(b(y''''''))))

The transformation is resulting in one new DP problem:

`   R`
`     ↳DPs`
`       →DP Problem 1`
`         ↳Inst`
`           →DP Problem 2`
`             ↳Inst`
`             ...`
`               →DP Problem 11`
`                 ↳Remaining Obligation(s)`

The following remains to be proven:
Dependency Pairs:

F(a(x''''), b(b(y''''''''''))) -> F(x'''', a(b(b(y''''''''''))))
F(a(x''''), b(b(y'''''''))) -> F(x'''', a(b(b(y'''''''))))
F(b(a(b(b(x'''''''''''''')))), a(b(y''''''))) -> F(a(b(b(x''''''''''''''))), b(a(b(y''''''))))
F(b(a(b(a(x'''''''''''''')))), a(b(y''''''))) -> F(a(b(a(x''''''''''''''))), b(a(b(y''''''))))
F(b(a(b(a(b(x''''''''''''''))))), a(b(y''''''))) -> F(a(b(a(b(x'''''''''''''')))), b(a(b(y''''''))))
F(b(a(a(x''''''''''''))), a(b(y''''''))) -> F(a(a(x'''''''''''')), b(a(b(y''''''))))
F(b(a(a(b(x'''''''''''')))), a(b(y''''''))) -> F(a(a(b(x''''''''''''))), b(a(b(y''''''))))
F(b(a(b(b(x'''''''''''''')))), a(b(y'''''))) -> F(a(b(b(x''''''''''''''))), b(a(b(y'''''))))
F(b(a(b(a(x'''''''''''''')))), a(b(y'''''))) -> F(a(b(a(x''''''''''''''))), b(a(b(y'''''))))
F(b(a(b(a(b(x''''''''''''''))))), a(b(y'''''))) -> F(a(b(a(b(x'''''''''''''')))), b(a(b(y'''''))))
F(b(a(a(x''''''''''''))), a(b(y'''''))) -> F(a(a(x'''''''''''')), b(a(b(y'''''))))
F(b(a(a(b(x'''''''''''')))), a(b(y'''''))) -> F(a(a(b(x''''''''''''))), b(a(b(y'''''))))
F(b(a(x'''''')), a(b(y'''''))) -> F(a(x''''''), b(a(b(y'''''))))
F(b(a(x'''''')), a(b(y''''''))) -> F(a(x''''''), b(a(b(y''''''))))
F(b(a(a(b(b(b(x'''''''''''')))))), a(b(y''''''))) -> F(a(a(b(b(b(x''''''''''''))))), b(a(b(y''''''))))
F(b(a(a(b(b(a(x'''''''''''')))))), a(b(y''''''))) -> F(a(a(b(b(a(x''''''''''''))))), b(a(b(y''''''))))
F(b(a(a(b(b(a(b(x''''''''''''))))))), a(b(y''''''))) -> F(a(a(b(b(a(b(x'''''''''''')))))), b(a(b(y''''''))))
F(b(a(a(b(a(x''''''''''))))), a(b(y''''''))) -> F(a(a(b(a(x'''''''''')))), b(a(b(y''''''))))
F(b(a(a(b(a(b(x'''''''''')))))), a(b(y''''''))) -> F(a(a(b(a(b(x''''''''''))))), b(a(b(y''''''))))
F(a(a(b(x''''''''''))), b(y'''')) -> F(a(b(x'''''''''')), a(b(y'''')))
F(a(a(b(x''''''''''))), b(a(y'''''''''''))) -> F(a(b(x'''''''''')), a(b(a(y'''''''''''))))
F(a(a(b(b(b(x''''''''''))))), b(y''')) -> F(a(b(b(b(x'''''''''')))), a(b(y''')))
F(a(a(b(b(a(x''''''''''))))), b(y''')) -> F(a(b(b(a(x'''''''''')))), a(b(y''')))
F(a(a(b(b(a(b(x'''''''''')))))), b(y''')) -> F(a(b(b(a(b(x''''''''''))))), a(b(y''')))
F(a(a(b(a(x'''''''')))), b(y''')) -> F(a(b(a(x''''''''))), a(b(y''')))
F(a(a(b(a(b(x''''''''))))), b(y''')) -> F(a(b(a(b(x'''''''')))), a(b(y''')))
F(a(a(b(x''''''))), b(y''')) -> F(a(b(x'''''')), a(b(y''')))
F(b(a(a(b(x'''''''')))), a(b(y''''''))) -> F(a(a(b(x''''''''))), b(a(b(y''''''))))
F(b(a(a(a(b(x''''''''))))), a(b(y''''''))) -> F(a(a(a(b(x'''''''')))), b(a(b(y''''''))))
F(a(a(x'''''''''')), b(y'''')) -> F(a(x''''''''''), a(b(y'''')))
F(a(a(a(b(x'''''')))), b(y''')) -> F(a(a(b(x''''''))), a(b(y''')))
F(a(a(a(x''''''))), b(y''')) -> F(a(a(x'''''')), a(b(y''')))
F(b(a(a(a(x'''''''')))), a(b(y''''''))) -> F(a(a(a(x''''''''))), b(a(b(y''''''))))
F(a(b(a(x''''''''''''))), b(y'''')) -> F(b(a(x'''''''''''')), a(b(y'''')))
F(b(a(b(x''''''))), a(b(y''''''))) -> F(a(b(x'''''')), b(a(b(y''''''))))
F(b(a(b(b(b(x''''''''''))))), a(b(y''''''))) -> F(a(b(b(b(x'''''''''')))), b(a(b(y''''''))))
F(b(a(b(b(a(x''''''''''))))), a(b(y''''''))) -> F(a(b(b(a(x'''''''''')))), b(a(b(y''''''))))
F(a(b(b(x''''''''''''))), b(y'''')) -> F(b(b(x'''''''''''')), a(b(y'''')))
F(a(b(b(x''''''''''''))), b(a(y''''''''''''))) -> F(b(b(x'''''''''''')), a(b(a(y''''''''''''))))
F(b(a(b(b(a(b(x'''''''''')))))), a(b(y''''''))) -> F(a(b(b(a(b(x''''''''''))))), b(a(b(y''''''))))
F(a(b(a(b(x'''''''''''')))), b(y'''')) -> F(b(a(b(x''''''''''''))), a(b(y'''')))
F(b(a(b(a(x'''''''')))), a(b(y''''''))) -> F(a(b(a(x''''''''))), b(a(b(y''''''))))
F(a(b(a(x''''''''''''))), b(a(y''''''''''''))) -> F(b(a(x'''''''''''')), a(b(a(y''''''''''''))))
F(b(a(b(a(b(x''''''''))))), a(b(y''''''))) -> F(a(b(a(b(x'''''''')))), b(a(b(y''''''))))
F(a(b(a(b(x'''''''''''')))), b(a(y''''''''''''))) -> F(b(a(b(x''''''''''''))), a(b(a(y''''''''''''))))
F(b(a(b(x''''''))), a(b(y'''''))) -> F(a(b(x'''''')), b(a(b(y'''''))))
F(a(x''''), b(a(y'''''''))) -> F(x'''', a(b(a(y'''''''))))
F(b(a(b(x'''''))), a(b(y''''''))) -> F(a(b(x''''')), b(a(b(y''''''))))
F(a(x''''), b(b(y''''''))) -> F(x'''', a(b(b(y''''''))))
F(b(b(a(x''''''))), a(b(y''''''))) -> F(b(a(x'''''')), b(a(b(y''''''))))
F(b(b(a(b(x'''''')))), a(b(y''''''))) -> F(b(a(b(x''''''))), b(a(b(y''''''))))
F(a(b(b(a(x'''''''')))), b(y''')) -> F(b(b(a(x''''''''))), a(b(y''')))
F(b(a(x'''''''''')), a(b(y'))) -> F(a(b(b(a(x'''''''''')))), y')
F(a(x''''), b(a(b(y'''')))) -> F(x'''', a(b(a(b(y'''')))))
F(b(b(b(x''''''))), a(b(y''''''))) -> F(b(b(x'''''')), b(a(b(y''''''))))
F(a(b(b(b(x'''''''')))), b(y''')) -> F(b(b(b(x''''''''))), a(b(y''')))
F(b(b(x'''''''''')), a(b(y'))) -> F(a(b(b(b(x'''''''''')))), y')
F(b(b(x'''''''''')), a(b(a(y'''''''''')))) -> F(a(b(b(b(x'''''''''')))), a(y''''''''''))
F(a(b(b(a(b(x''''''''))))), b(y''')) -> F(b(b(a(b(x'''''''')))), a(b(y''')))
F(b(a(b(x''''''''''))), a(b(y'))) -> F(a(b(b(a(b(x''''''''''))))), y')
F(b(a(x'''''''''')), a(b(a(y'''''''''')))) -> F(a(b(b(a(x'''''''''')))), a(y''''''''''))
F(a(b(a(x''''''))), b(y''')) -> F(b(a(x'''''')), a(b(y''')))
F(a(x''''''''), a(b(y'))) -> F(a(b(a(x''''''''))), y')
F(a(b(x'''''''')), a(b(y'))) -> F(a(b(a(b(x'''''''')))), y')
F(a(x''''''''), a(b(a(y''''''''')))) -> F(a(b(a(x''''''''))), a(y'''''''''))
F(a(b(x'''''''')), a(b(a(y''''''''')))) -> F(a(b(a(b(x'''''''')))), a(y'''''''''))
F(b(a(b(x''''''''''))), a(b(a(y'''''''''')))) -> F(a(b(b(a(b(x''''''''''))))), a(y''''''''''))
F(a(b(a(b(x'''''')))), b(y''')) -> F(b(a(b(x''''''))), a(b(y''')))
F(x', a(b(b(y'''''''')))) -> F(a(b(x')), b(y''''''''))
F(a(b(x'''')), b(y''')) -> F(b(x''''), a(b(y''')))
F(x', a(b(b(y''''')))) -> F(a(b(x')), b(y'''''))
F(a(b(b(b(x'''''''')))), a(y'''''''')) -> F(b(b(b(x''''''''))), a(a(y'''''''')))
F(a(b(b(a(x'''''''')))), a(y'''''''')) -> F(b(b(a(x''''''''))), a(a(y'''''''')))
F(x', a(b(a(y''''')))) -> F(a(b(x')), a(y'''''))
F(b(b(b(x''''''))), a(y'''''')) -> F(b(b(x'''''')), b(a(y'''''')))
F(b(b(x'''')), b(y'''')) -> F(b(x''''), b(b(y'''')))
F(b(b(b(x''''''))), a(a(y''''''))) -> F(b(b(x'''''')), b(a(a(y''''''))))
F(a(b(b(b(x'''''''')))), y''') -> F(b(b(b(x''''''''))), a(y'''))
F(x', a(b(b(y'''')))) -> F(a(b(x')), b(y''''))
F(b(b(a(x''''''))), a(y'''''')) -> F(b(a(x'''''')), b(a(y'''''')))
F(b(b(a(b(x'''''')))), a(y'''''')) -> F(b(a(b(x''''''))), b(a(y'''''')))
F(a(b(b(a(x'''''''')))), y''') -> F(b(b(a(x''''''''))), a(y'''))
F(b(a(x'''')), b(y'''')) -> F(a(x''''), b(b(y'''')))
F(b(b(a(x''''''))), a(a(y''''''))) -> F(b(a(x'''''')), b(a(a(y''''''))))
F(a(b(b(a(b(x''''''''))))), y''') -> F(b(b(a(b(x'''''''')))), a(y'''))
F(b(a(b(x''''))), b(y'''')) -> F(a(b(x'''')), b(b(y'''')))
F(b(b(a(b(x'''''')))), a(a(y''''''))) -> F(b(a(b(x''''''))), b(a(a(y''''''))))
F(a(b(b(a(b(x''''''''))))), a(y'''''''')) -> F(b(b(a(b(x'''''''')))), a(a(y'''''''')))
F(a(b(a(x''''''))), a(y''''''')) -> F(b(a(x'''''')), a(a(y''''''')))
F(a(b(a(b(x'''''')))), a(y''''''')) -> F(b(a(b(x''''''))), a(a(y''''''')))
F(x'', a(b(a(b(y''))))) -> F(a(b(x'')), a(b(y'')))
F(a(b(a(x''''''))), y''') -> F(b(a(x'''''')), a(y'''))
F(b(a(x'''')), a(a(y'''''))) -> F(a(x''''), b(a(a(y'''''))))
F(a(b(a(b(x'''''')))), y''') -> F(b(a(b(x''''''))), a(y'''))
F(b(a(x'''')), a(y''''')) -> F(a(x''''), b(a(y''''')))
F(a(b(x'''')), b(y'''''')) -> F(b(x''''), a(b(y'''''')))
F(b(a(b(x''''))), a(y''''')) -> F(a(b(x'''')), b(a(y''''')))
F(a(b(x''')), b(y''')) -> F(b(x'''), a(b(y''')))
F(b(a(b(x''''))), a(a(y'''''))) -> F(a(b(x'''')), b(a(a(y'''''))))
F(a(b(x'''')), a(y''')) -> F(b(x''''), a(a(y''')))
F(a(a(b(x''''))), a(y'''')) -> F(a(b(x'''')), a(a(y'''')))
F(a(a(x'''')), a(y'''')) -> F(a(x''''), a(a(y'''')))
F(a(a(x'''''''''')), b(a(y'''''''''''))) -> F(a(x''''''''''), a(b(a(y'''''''''''))))

Rules:

f(x, a(b(y))) -> a(f(a(b(x)), y))
f(a(x), y) -> f(x, a(y))
f(b(x), y) -> f(x, b(y))

Strategy:

innermost

Innermost Termination of R could not be shown.
Duration:
0:56 minutes