The rewrite relation of the following TRS is considered.
Root-labeling is applied.
We obtain the labeled TRS
|
aa(ab(bc(ca(x1)))) |
→ |
ac(cc(cb(bb(ba(aa(aa(x1))))))) |
(17) |
|
aa(ab(bc(cb(x1)))) |
→ |
ac(cc(cb(bb(ba(aa(ab(x1))))))) |
(18) |
|
aa(ab(bc(cc(x1)))) |
→ |
ac(cc(cb(bb(ba(aa(ac(x1))))))) |
(19) |
|
ba(ab(bc(ca(x1)))) |
→ |
bc(cc(cb(bb(ba(aa(aa(x1))))))) |
(20) |
|
ba(ab(bc(cb(x1)))) |
→ |
bc(cc(cb(bb(ba(aa(ab(x1))))))) |
(21) |
|
ba(ab(bc(cc(x1)))) |
→ |
bc(cc(cb(bb(ba(aa(ac(x1))))))) |
(22) |
|
ca(ab(bc(ca(x1)))) |
→ |
cc(cc(cb(bb(ba(aa(aa(x1))))))) |
(23) |
|
ca(ab(bc(cb(x1)))) |
→ |
cc(cc(cb(bb(ba(aa(ab(x1))))))) |
(24) |
|
ca(ab(bc(cc(x1)))) |
→ |
cc(cc(cb(bb(ba(aa(ac(x1))))))) |
(25) |
|
aa(aa(x1)) |
→ |
aa(x1) |
(26) |
|
aa(ab(x1)) |
→ |
ab(x1) |
(27) |
|
aa(ac(x1)) |
→ |
ac(x1) |
(28) |
|
ba(aa(x1)) |
→ |
ba(x1) |
(29) |
|
ba(ab(x1)) |
→ |
bb(x1) |
(30) |
|
ba(ac(x1)) |
→ |
bc(x1) |
(31) |
|
ca(aa(x1)) |
→ |
ca(x1) |
(32) |
|
ca(ab(x1)) |
→ |
cb(x1) |
(33) |
|
ca(ac(x1)) |
→ |
cc(x1) |
(34) |
|
ab(ba(x1)) |
→ |
aa(x1) |
(35) |
|
ab(bb(x1)) |
→ |
ab(x1) |
(36) |
|
ab(bc(x1)) |
→ |
ac(x1) |
(37) |
|
bb(ba(x1)) |
→ |
ba(x1) |
(38) |
|
bb(bb(x1)) |
→ |
bb(x1) |
(39) |
|
bb(bc(x1)) |
→ |
bc(x1) |
(40) |
|
cb(ba(x1)) |
→ |
ca(x1) |
(41) |
|
cb(bb(x1)) |
→ |
cb(x1) |
(42) |
|
cb(bc(x1)) |
→ |
cc(x1) |
(43) |
|
ac(ca(x1)) |
→ |
aa(x1) |
(44) |
|
ac(cb(x1)) |
→ |
ab(x1) |
(45) |
|
ac(cc(x1)) |
→ |
ac(x1) |
(46) |
|
bc(ca(x1)) |
→ |
ba(x1) |
(47) |
|
bc(cb(x1)) |
→ |
bb(x1) |
(48) |
|
bc(cc(x1)) |
→ |
bc(x1) |
(49) |
|
cc(ca(x1)) |
→ |
ca(x1) |
(50) |
|
cc(cb(x1)) |
→ |
cb(x1) |
(51) |
|
cc(cc(x1)) |
→ |
cc(x1) |
(52) |
The dependency pairs are split into 6
components.
-
The
1st
component contains the
pair
|
aa#(ab(bc(cb(x1)))) |
→ |
ba#(aa(ab(x1))) |
(57) |
|
ba#(ab(bc(cb(x1)))) |
→ |
ba#(aa(ab(x1))) |
(71) |
|
ba#(ab(bc(cb(x1)))) |
→ |
aa#(ab(x1)) |
(72) |
|
aa#(ab(bc(cb(x1)))) |
→ |
aa#(ab(x1)) |
(58) |
|
aa#(ab(bc(cc(x1)))) |
→ |
ba#(aa(ac(x1))) |
(64) |
|
ba#(ab(bc(cc(x1)))) |
→ |
ba#(aa(ac(x1))) |
(78) |
|
ba#(ab(bc(cc(x1)))) |
→ |
aa#(ac(x1)) |
(79) |
|
aa#(ab(bc(cc(x1)))) |
→ |
aa#(ac(x1)) |
(65) |
|
ba#(aa(x1)) |
→ |
ba#(x1) |
(81) |
1.1.1.1.1.1 Reduction Pair Processor
Using the linear polynomial interpretation over the naturals
| [aa#(x1)] |
= |
1 · x1
|
| [ab(x1)] |
= |
1 · x1
|
| [bc(x1)] |
= |
1 + 1 · x1
|
| [cb(x1)] |
= |
1 · x1
|
| [ba#(x1)] |
= |
1 · x1
|
| [aa(x1)] |
= |
1 · x1
|
| [cc(x1)] |
= |
1 · x1
|
| [ac(x1)] |
= |
1 · x1
|
| [bb(x1)] |
= |
1 · x1
|
| [ba(x1)] |
= |
1 + 1 · x1
|
| [ca(x1)] |
= |
1 + 1 · x1
|
the
pairs
|
aa#(ab(bc(cb(x1)))) |
→ |
ba#(aa(ab(x1))) |
(57) |
|
ba#(ab(bc(cb(x1)))) |
→ |
ba#(aa(ab(x1))) |
(71) |
|
ba#(ab(bc(cb(x1)))) |
→ |
aa#(ab(x1)) |
(72) |
|
aa#(ab(bc(cb(x1)))) |
→ |
aa#(ab(x1)) |
(58) |
|
aa#(ab(bc(cc(x1)))) |
→ |
ba#(aa(ac(x1))) |
(64) |
|
ba#(ab(bc(cc(x1)))) |
→ |
ba#(aa(ac(x1))) |
(78) |
|
ba#(ab(bc(cc(x1)))) |
→ |
aa#(ac(x1)) |
(79) |
|
aa#(ab(bc(cc(x1)))) |
→ |
aa#(ac(x1)) |
(65) |
could be deleted.
1.1.1.1.1.1.1 Monotonic Reduction Pair Processor with Usable Rules
Using the linear polynomial interpretation over the naturals
| [aa(x1)] |
= |
1 · x1
|
| [ba#(x1)] |
= |
1 · x1
|
having no usable rules (w.r.t. the implicit argument filter of the
reduction pair),
the
rule
could be deleted.
1.1.1.1.1.1.1.1 Size-Change Termination
Using size-change termination in combination with
the subterm criterion
one obtains the following initial size-change graphs.
|
ba#(aa(x1)) |
→ |
ba#(x1) |
(81) |
|
| 1 |
> |
1 |
As there is no critical graph in the transitive closure, there are no infinite chains.
-
The
2nd
component contains the
pair
|
ac#(cc(x1)) |
→ |
ac#(x1) |
(87) |
1.1.1.1.1.2 Monotonic Reduction Pair Processor with Usable Rules
Using the linear polynomial interpretation over the naturals
| [cc(x1)] |
= |
1 · x1
|
| [ac#(x1)] |
= |
1 · x1
|
having no usable rules (w.r.t. the implicit argument filter of the
reduction pair),
the
rule
could be deleted.
1.1.1.1.1.2.1 Size-Change Termination
Using size-change termination in combination with
the subterm criterion
one obtains the following initial size-change graphs.
|
ac#(cc(x1)) |
→ |
ac#(x1) |
(87) |
|
| 1 |
> |
1 |
As there is no critical graph in the transitive closure, there are no infinite chains.
-
The
3rd
component contains the
pair
|
ca#(aa(x1)) |
→ |
ca#(x1) |
(83) |
1.1.1.1.1.3 Monotonic Reduction Pair Processor with Usable Rules
Using the linear polynomial interpretation over the naturals
| [aa(x1)] |
= |
1 · x1
|
| [ca#(x1)] |
= |
1 · x1
|
having no usable rules (w.r.t. the implicit argument filter of the
reduction pair),
the
rule
could be deleted.
1.1.1.1.1.3.1 Size-Change Termination
Using size-change termination in combination with
the subterm criterion
one obtains the following initial size-change graphs.
|
ca#(aa(x1)) |
→ |
ca#(x1) |
(83) |
|
| 1 |
> |
1 |
As there is no critical graph in the transitive closure, there are no infinite chains.
-
The
4th
component contains the
pair
|
ab#(bb(x1)) |
→ |
ab#(x1) |
(84) |
1.1.1.1.1.4 Monotonic Reduction Pair Processor with Usable Rules
Using the linear polynomial interpretation over the naturals
| [bb(x1)] |
= |
1 · x1
|
| [ab#(x1)] |
= |
1 · x1
|
having no usable rules (w.r.t. the implicit argument filter of the
reduction pair),
the
rule
could be deleted.
1.1.1.1.1.4.1 Size-Change Termination
Using size-change termination in combination with
the subterm criterion
one obtains the following initial size-change graphs.
|
ab#(bb(x1)) |
→ |
ab#(x1) |
(84) |
|
| 1 |
> |
1 |
As there is no critical graph in the transitive closure, there are no infinite chains.
-
The
5th
component contains the
pair
|
cb#(bb(x1)) |
→ |
cb#(x1) |
(85) |
1.1.1.1.1.5 Monotonic Reduction Pair Processor with Usable Rules
Using the linear polynomial interpretation over the naturals
| [bb(x1)] |
= |
1 · x1
|
| [cb#(x1)] |
= |
1 · x1
|
having no usable rules (w.r.t. the implicit argument filter of the
reduction pair),
the
rule
could be deleted.
1.1.1.1.1.5.1 Size-Change Termination
Using size-change termination in combination with
the subterm criterion
one obtains the following initial size-change graphs.
|
cb#(bb(x1)) |
→ |
cb#(x1) |
(85) |
|
| 1 |
> |
1 |
As there is no critical graph in the transitive closure, there are no infinite chains.
-
The
6th
component contains the
pair
|
bc#(cc(x1)) |
→ |
bc#(x1) |
(88) |
1.1.1.1.1.6 Monotonic Reduction Pair Processor with Usable Rules
Using the linear polynomial interpretation over the naturals
| [cc(x1)] |
= |
1 · x1
|
| [bc#(x1)] |
= |
1 · x1
|
having no usable rules (w.r.t. the implicit argument filter of the
reduction pair),
the
rule
could be deleted.
1.1.1.1.1.6.1 Size-Change Termination
Using size-change termination in combination with
the subterm criterion
one obtains the following initial size-change graphs.
|
bc#(cc(x1)) |
→ |
bc#(x1) |
(88) |
|
| 1 |
> |
1 |
As there is no critical graph in the transitive closure, there are no infinite chains.