Certification Problem
Input (TPDB SRS_Standard/Waldmann_07_size12/size-12-alpha-2-num-15)
The rewrite relation of the following TRS is considered.
a(x1) |
→ |
x1 |
(1) |
a(a(x1)) |
→ |
a(b(a(b(x1)))) |
(2) |
b(b(b(b(x1)))) |
→ |
a(x1) |
(3) |
Property / Task
Prove or disprove termination.Answer / Result
Yes.Proof (by ttt2 @ termCOMP 2023)
1 Closure Under Flat Contexts
Using the flat contexts
{a(☐), b(☐)}
We obtain the transformed TRS
a(a(x1)) |
→ |
a(x1) |
(4) |
b(a(x1)) |
→ |
b(x1) |
(5) |
a(a(x1)) |
→ |
a(b(a(b(x1)))) |
(2) |
a(b(b(b(b(x1))))) |
→ |
a(a(x1)) |
(6) |
b(b(b(b(b(x1))))) |
→ |
b(a(x1)) |
(7) |
1.1 Semantic Labeling
Root-labeling is applied.
We obtain the labeled TRS
aa(aa(x1)) |
→ |
aa(x1) |
(8) |
aa(ab(x1)) |
→ |
ab(x1) |
(9) |
ba(aa(x1)) |
→ |
ba(x1) |
(10) |
ba(ab(x1)) |
→ |
bb(x1) |
(11) |
aa(aa(x1)) |
→ |
ab(ba(ab(ba(x1)))) |
(12) |
aa(ab(x1)) |
→ |
ab(ba(ab(bb(x1)))) |
(13) |
ab(bb(bb(bb(ba(x1))))) |
→ |
aa(aa(x1)) |
(14) |
ab(bb(bb(bb(bb(x1))))) |
→ |
aa(ab(x1)) |
(15) |
bb(bb(bb(bb(ba(x1))))) |
→ |
ba(aa(x1)) |
(16) |
bb(bb(bb(bb(bb(x1))))) |
→ |
ba(ab(x1)) |
(17) |
1.1.1 Dependency Pair Transformation
The following set of initial dependency pairs has been identified.
ba#(aa(x1)) |
→ |
ba#(x1) |
(18) |
ba#(ab(x1)) |
→ |
bb#(x1) |
(19) |
aa#(aa(x1)) |
→ |
ba#(x1) |
(20) |
aa#(aa(x1)) |
→ |
ab#(ba(x1)) |
(21) |
aa#(aa(x1)) |
→ |
ba#(ab(ba(x1))) |
(22) |
aa#(aa(x1)) |
→ |
ab#(ba(ab(ba(x1)))) |
(23) |
aa#(ab(x1)) |
→ |
bb#(x1) |
(24) |
aa#(ab(x1)) |
→ |
ab#(bb(x1)) |
(25) |
aa#(ab(x1)) |
→ |
ba#(ab(bb(x1))) |
(26) |
aa#(ab(x1)) |
→ |
ab#(ba(ab(bb(x1)))) |
(27) |
ab#(bb(bb(bb(ba(x1))))) |
→ |
aa#(x1) |
(28) |
ab#(bb(bb(bb(ba(x1))))) |
→ |
aa#(aa(x1)) |
(29) |
ab#(bb(bb(bb(bb(x1))))) |
→ |
ab#(x1) |
(30) |
ab#(bb(bb(bb(bb(x1))))) |
→ |
aa#(ab(x1)) |
(31) |
bb#(bb(bb(bb(ba(x1))))) |
→ |
aa#(x1) |
(32) |
bb#(bb(bb(bb(ba(x1))))) |
→ |
ba#(aa(x1)) |
(33) |
bb#(bb(bb(bb(bb(x1))))) |
→ |
ab#(x1) |
(34) |
bb#(bb(bb(bb(bb(x1))))) |
→ |
ba#(ab(x1)) |
(35) |
1.1.1.1 Reduction Pair Processor with Usable Rules
Using the linear polynomial interpretation over the arctic semiring over the integers
[ba(x1)] |
= |
1 · x1 +
-∞ |
[bb#(x1)] |
= |
0 · x1 +
-∞ |
[ab(x1)] |
= |
0 · x1 +
-∞ |
[bb(x1)] |
= |
1 · x1 +
-∞ |
[ba#(x1)] |
= |
0 · x1 +
-∞ |
[ab#(x1)] |
= |
0 · x1 +
-∞ |
[aa#(x1)] |
= |
2 · x1 +
-∞ |
[aa(x1)] |
= |
2 · x1 +
-∞ |
together with the usable
rules
aa(aa(x1)) |
→ |
aa(x1) |
(8) |
aa(ab(x1)) |
→ |
ab(x1) |
(9) |
ba(aa(x1)) |
→ |
ba(x1) |
(10) |
ba(ab(x1)) |
→ |
bb(x1) |
(11) |
aa(aa(x1)) |
→ |
ab(ba(ab(ba(x1)))) |
(12) |
aa(ab(x1)) |
→ |
ab(ba(ab(bb(x1)))) |
(13) |
ab(bb(bb(bb(ba(x1))))) |
→ |
aa(aa(x1)) |
(14) |
ab(bb(bb(bb(bb(x1))))) |
→ |
aa(ab(x1)) |
(15) |
bb(bb(bb(bb(ba(x1))))) |
→ |
ba(aa(x1)) |
(16) |
bb(bb(bb(bb(bb(x1))))) |
→ |
ba(ab(x1)) |
(17) |
(w.r.t. the implicit argument filter of the reduction pair),
the
pairs
ba#(aa(x1)) |
→ |
ba#(x1) |
(18) |
aa#(aa(x1)) |
→ |
ba#(x1) |
(20) |
aa#(aa(x1)) |
→ |
ab#(ba(x1)) |
(21) |
aa#(aa(x1)) |
→ |
ba#(ab(ba(x1))) |
(22) |
aa#(aa(x1)) |
→ |
ab#(ba(ab(ba(x1)))) |
(23) |
aa#(ab(x1)) |
→ |
bb#(x1) |
(24) |
aa#(ab(x1)) |
→ |
ab#(bb(x1)) |
(25) |
aa#(ab(x1)) |
→ |
ba#(ab(bb(x1))) |
(26) |
ab#(bb(bb(bb(ba(x1))))) |
→ |
aa#(x1) |
(28) |
ab#(bb(bb(bb(bb(x1))))) |
→ |
ab#(x1) |
(30) |
ab#(bb(bb(bb(bb(x1))))) |
→ |
aa#(ab(x1)) |
(31) |
bb#(bb(bb(bb(ba(x1))))) |
→ |
aa#(x1) |
(32) |
bb#(bb(bb(bb(ba(x1))))) |
→ |
ba#(aa(x1)) |
(33) |
bb#(bb(bb(bb(bb(x1))))) |
→ |
ab#(x1) |
(34) |
bb#(bb(bb(bb(bb(x1))))) |
→ |
ba#(ab(x1)) |
(35) |
could be deleted.
1.1.1.1.1 Dependency Graph Processor
The dependency pairs are split into 1
component.