Certification Problem
Input (TPDB SRS_Relative/Waldmann_19/random-45)
The rewrite relation of the following TRS is considered.
c(c(c(x1))) |
→ |
c(a(a(x1))) |
(1) |
b(a(b(x1))) |
→ |
b(b(c(x1))) |
(2) |
c(a(a(x1))) |
→ |
c(b(a(x1))) |
(3) |
b(a(a(x1))) |
→ |
a(b(c(x1))) |
(4) |
b(b(c(x1))) |
→ |
a(a(c(x1))) |
(5) |
a(c(c(x1))) |
→ |
b(a(c(x1))) |
(6) |
Property / Task
Prove or disprove termination.Answer / Result
Yes.Proof (by matchbox @ termCOMP 2023)
1 Split
We split R in the relative problem D/R-D and R-D, where the rules D
c(c(c(x1))) |
→ |
c(a(a(x1))) |
(1) |
are deleted.
1.1 Closure Under Flat Contexts
Using the flat contexts
{c(☐), b(☐), a(☐)}
We obtain the transformed TRS
c(c(c(c(x1)))) |
→ |
c(c(a(a(x1)))) |
(7) |
b(c(c(c(x1)))) |
→ |
b(c(a(a(x1)))) |
(8) |
a(c(c(c(x1)))) |
→ |
a(c(a(a(x1)))) |
(9) |
c(b(a(b(x1)))) |
→ |
c(b(b(c(x1)))) |
(10) |
c(c(a(a(x1)))) |
→ |
c(c(b(a(x1)))) |
(11) |
c(b(a(a(x1)))) |
→ |
c(a(b(c(x1)))) |
(12) |
c(b(b(c(x1)))) |
→ |
c(a(a(c(x1)))) |
(13) |
c(a(c(c(x1)))) |
→ |
c(b(a(c(x1)))) |
(14) |
b(b(a(b(x1)))) |
→ |
b(b(b(c(x1)))) |
(15) |
b(c(a(a(x1)))) |
→ |
b(c(b(a(x1)))) |
(16) |
b(b(a(a(x1)))) |
→ |
b(a(b(c(x1)))) |
(17) |
b(b(b(c(x1)))) |
→ |
b(a(a(c(x1)))) |
(18) |
b(a(c(c(x1)))) |
→ |
b(b(a(c(x1)))) |
(19) |
a(b(a(b(x1)))) |
→ |
a(b(b(c(x1)))) |
(20) |
a(c(a(a(x1)))) |
→ |
a(c(b(a(x1)))) |
(21) |
a(b(a(a(x1)))) |
→ |
a(a(b(c(x1)))) |
(22) |
a(b(b(c(x1)))) |
→ |
a(a(a(c(x1)))) |
(23) |
a(a(c(c(x1)))) |
→ |
a(b(a(c(x1)))) |
(24) |
1.1.1 Semantic Labeling
The following interpretations form a
model
of the rules.
As carrier we take the set
{0,1,2}.
Symbols are labeled by the interpretation of their arguments using the interpretations
(modulo 3):
[c(x1)] |
= |
3x1 + 0 |
[b(x1)] |
= |
3x1 + 1 |
[a(x1)] |
= |
3x1 + 2 |
We obtain the labeled TRS
c0(c0(c0(c0(x1)))) |
→ |
c0(c2(a2(a0(x1)))) |
(25) |
c0(c0(c0(c2(x1)))) |
→ |
c0(c2(a2(a2(x1)))) |
(26) |
c0(c0(c0(c1(x1)))) |
→ |
c0(c2(a2(a1(x1)))) |
(27) |
a0(c0(c0(c0(x1)))) |
→ |
a0(c2(a2(a0(x1)))) |
(28) |
a0(c0(c0(c2(x1)))) |
→ |
a0(c2(a2(a2(x1)))) |
(29) |
a0(c0(c0(c1(x1)))) |
→ |
a0(c2(a2(a1(x1)))) |
(30) |
b0(c0(c0(c0(x1)))) |
→ |
b0(c2(a2(a0(x1)))) |
(31) |
b0(c0(c0(c2(x1)))) |
→ |
b0(c2(a2(a2(x1)))) |
(32) |
b0(c0(c0(c1(x1)))) |
→ |
b0(c2(a2(a1(x1)))) |
(33) |
c1(b2(a1(b0(x1)))) |
→ |
c1(b1(b0(c0(x1)))) |
(34) |
c1(b2(a1(b2(x1)))) |
→ |
c1(b1(b0(c2(x1)))) |
(35) |
c1(b2(a1(b1(x1)))) |
→ |
c1(b1(b0(c1(x1)))) |
(36) |
a1(b2(a1(b0(x1)))) |
→ |
a1(b1(b0(c0(x1)))) |
(37) |
a1(b2(a1(b2(x1)))) |
→ |
a1(b1(b0(c2(x1)))) |
(38) |
a1(b2(a1(b1(x1)))) |
→ |
a1(b1(b0(c1(x1)))) |
(39) |
b1(b2(a1(b0(x1)))) |
→ |
b1(b1(b0(c0(x1)))) |
(40) |
b1(b2(a1(b2(x1)))) |
→ |
b1(b1(b0(c2(x1)))) |
(41) |
b1(b2(a1(b1(x1)))) |
→ |
b1(b1(b0(c1(x1)))) |
(42) |
c0(c2(a2(a0(x1)))) |
→ |
c0(c1(b2(a0(x1)))) |
(43) |
c0(c2(a2(a2(x1)))) |
→ |
c0(c1(b2(a2(x1)))) |
(44) |
c0(c2(a2(a1(x1)))) |
→ |
c0(c1(b2(a1(x1)))) |
(45) |
a0(c2(a2(a0(x1)))) |
→ |
a0(c1(b2(a0(x1)))) |
(46) |
a0(c2(a2(a2(x1)))) |
→ |
a0(c1(b2(a2(x1)))) |
(47) |
a0(c2(a2(a1(x1)))) |
→ |
a0(c1(b2(a1(x1)))) |
(48) |
b0(c2(a2(a0(x1)))) |
→ |
b0(c1(b2(a0(x1)))) |
(49) |
b0(c2(a2(a2(x1)))) |
→ |
b0(c1(b2(a2(x1)))) |
(50) |
b0(c2(a2(a1(x1)))) |
→ |
b0(c1(b2(a1(x1)))) |
(51) |
c1(b2(a2(a0(x1)))) |
→ |
c2(a1(b0(c0(x1)))) |
(52) |
c1(b2(a2(a2(x1)))) |
→ |
c2(a1(b0(c2(x1)))) |
(53) |
c1(b2(a2(a1(x1)))) |
→ |
c2(a1(b0(c1(x1)))) |
(54) |
a1(b2(a2(a0(x1)))) |
→ |
a2(a1(b0(c0(x1)))) |
(55) |
a1(b2(a2(a2(x1)))) |
→ |
a2(a1(b0(c2(x1)))) |
(56) |
a1(b2(a2(a1(x1)))) |
→ |
a2(a1(b0(c1(x1)))) |
(57) |
b1(b2(a2(a0(x1)))) |
→ |
b2(a1(b0(c0(x1)))) |
(58) |
b1(b2(a2(a2(x1)))) |
→ |
b2(a1(b0(c2(x1)))) |
(59) |
b1(b2(a2(a1(x1)))) |
→ |
b2(a1(b0(c1(x1)))) |
(60) |
c1(b1(b0(c0(x1)))) |
→ |
c2(a2(a0(c0(x1)))) |
(61) |
c1(b1(b0(c2(x1)))) |
→ |
c2(a2(a0(c2(x1)))) |
(62) |
c1(b1(b0(c1(x1)))) |
→ |
c2(a2(a0(c1(x1)))) |
(63) |
a1(b1(b0(c0(x1)))) |
→ |
a2(a2(a0(c0(x1)))) |
(64) |
a1(b1(b0(c2(x1)))) |
→ |
a2(a2(a0(c2(x1)))) |
(65) |
a1(b1(b0(c1(x1)))) |
→ |
a2(a2(a0(c1(x1)))) |
(66) |
b1(b1(b0(c0(x1)))) |
→ |
b2(a2(a0(c0(x1)))) |
(67) |
b1(b1(b0(c2(x1)))) |
→ |
b2(a2(a0(c2(x1)))) |
(68) |
b1(b1(b0(c1(x1)))) |
→ |
b2(a2(a0(c1(x1)))) |
(69) |
c2(a0(c0(c0(x1)))) |
→ |
c1(b2(a0(c0(x1)))) |
(70) |
c2(a0(c0(c2(x1)))) |
→ |
c1(b2(a0(c2(x1)))) |
(71) |
c2(a0(c0(c1(x1)))) |
→ |
c1(b2(a0(c1(x1)))) |
(72) |
a2(a0(c0(c0(x1)))) |
→ |
a1(b2(a0(c0(x1)))) |
(73) |
a2(a0(c0(c2(x1)))) |
→ |
a1(b2(a0(c2(x1)))) |
(74) |
a2(a0(c0(c1(x1)))) |
→ |
a1(b2(a0(c1(x1)))) |
(75) |
b2(a0(c0(c0(x1)))) |
→ |
b1(b2(a0(c0(x1)))) |
(76) |
b2(a0(c0(c2(x1)))) |
→ |
b1(b2(a0(c2(x1)))) |
(77) |
b2(a0(c0(c1(x1)))) |
→ |
b1(b2(a0(c1(x1)))) |
(78) |
1.1.1.1 Rule Removal
Using the
matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1
[c0(x1)] |
= |
x1 +
|
[c1(x1)] |
= |
x1 +
|
[c2(x1)] |
= |
x1 +
|
[b0(x1)] |
= |
x1 +
|
[b1(x1)] |
= |
x1 +
|
[b2(x1)] |
= |
x1 +
|
[a0(x1)] |
= |
x1 +
|
[a1(x1)] |
= |
x1 +
|
[a2(x1)] |
= |
x1 +
|
all of the following rules can be deleted.
c0(c0(c0(c0(x1)))) |
→ |
c0(c2(a2(a0(x1)))) |
(25) |
a0(c0(c0(c0(x1)))) |
→ |
a0(c2(a2(a0(x1)))) |
(28) |
b0(c0(c0(c0(x1)))) |
→ |
b0(c2(a2(a0(x1)))) |
(31) |
c1(b2(a1(b2(x1)))) |
→ |
c1(b1(b0(c2(x1)))) |
(35) |
c1(b2(a1(b1(x1)))) |
→ |
c1(b1(b0(c1(x1)))) |
(36) |
a1(b2(a1(b2(x1)))) |
→ |
a1(b1(b0(c2(x1)))) |
(38) |
a1(b2(a1(b1(x1)))) |
→ |
a1(b1(b0(c1(x1)))) |
(39) |
b1(b2(a1(b2(x1)))) |
→ |
b1(b1(b0(c2(x1)))) |
(41) |
b1(b2(a1(b1(x1)))) |
→ |
b1(b1(b0(c1(x1)))) |
(42) |
c1(b2(a2(a2(x1)))) |
→ |
c2(a1(b0(c2(x1)))) |
(53) |
c1(b2(a2(a1(x1)))) |
→ |
c2(a1(b0(c1(x1)))) |
(54) |
a1(b2(a2(a2(x1)))) |
→ |
a2(a1(b0(c2(x1)))) |
(56) |
a1(b2(a2(a1(x1)))) |
→ |
a2(a1(b0(c1(x1)))) |
(57) |
b1(b2(a2(a2(x1)))) |
→ |
b2(a1(b0(c2(x1)))) |
(59) |
b1(b2(a2(a1(x1)))) |
→ |
b2(a1(b0(c1(x1)))) |
(60) |
1.1.1.1.1 Rule Removal
Using the
matrix interpretations of dimension 1 with strict dimension 1 over the naturals
[c0(x1)] |
= |
· x1 +
|
[c1(x1)] |
= |
· x1 +
|
[c2(x1)] |
= |
· x1 +
|
[b0(x1)] |
= |
· x1 +
|
[b1(x1)] |
= |
· x1 +
|
[b2(x1)] |
= |
· x1 +
|
[a0(x1)] |
= |
· x1 +
|
[a1(x1)] |
= |
· x1 +
|
[a2(x1)] |
= |
· x1 +
|
all of the following rules can be deleted.
c0(c0(c0(c2(x1)))) |
→ |
c0(c2(a2(a2(x1)))) |
(26) |
c0(c0(c0(c1(x1)))) |
→ |
c0(c2(a2(a1(x1)))) |
(27) |
a0(c0(c0(c2(x1)))) |
→ |
a0(c2(a2(a2(x1)))) |
(29) |
a0(c0(c0(c1(x1)))) |
→ |
a0(c2(a2(a1(x1)))) |
(30) |
b0(c0(c0(c2(x1)))) |
→ |
b0(c2(a2(a2(x1)))) |
(32) |
b0(c0(c0(c1(x1)))) |
→ |
b0(c2(a2(a1(x1)))) |
(33) |
1.1.1.1.1.1 R is empty
There are no rules in the TRS. Hence, it is terminating.
1.2 Split
We split R in the relative problem D/R-D and R-D, where the rules D
c(a(a(x1))) |
→ |
c(b(a(x1))) |
(3) |
are deleted.
1.2.1 Closure Under Flat Contexts
Using the flat contexts
{c(☐), b(☐), a(☐)}
We obtain the transformed TRS
c(c(a(a(x1)))) |
→ |
c(c(b(a(x1)))) |
(11) |
b(c(a(a(x1)))) |
→ |
b(c(b(a(x1)))) |
(16) |
a(c(a(a(x1)))) |
→ |
a(c(b(a(x1)))) |
(21) |
c(b(a(b(x1)))) |
→ |
c(b(b(c(x1)))) |
(10) |
c(b(a(a(x1)))) |
→ |
c(a(b(c(x1)))) |
(12) |
c(b(b(c(x1)))) |
→ |
c(a(a(c(x1)))) |
(13) |
c(a(c(c(x1)))) |
→ |
c(b(a(c(x1)))) |
(14) |
b(b(a(b(x1)))) |
→ |
b(b(b(c(x1)))) |
(15) |
b(b(a(a(x1)))) |
→ |
b(a(b(c(x1)))) |
(17) |
b(b(b(c(x1)))) |
→ |
b(a(a(c(x1)))) |
(18) |
b(a(c(c(x1)))) |
→ |
b(b(a(c(x1)))) |
(19) |
a(b(a(b(x1)))) |
→ |
a(b(b(c(x1)))) |
(20) |
a(b(a(a(x1)))) |
→ |
a(a(b(c(x1)))) |
(22) |
a(b(b(c(x1)))) |
→ |
a(a(a(c(x1)))) |
(23) |
a(a(c(c(x1)))) |
→ |
a(b(a(c(x1)))) |
(24) |
1.2.1.1 Closure Under Flat Contexts
Using the flat contexts
{c(☐), b(☐), a(☐)}
We obtain the transformed TRS
c(c(c(a(a(x1))))) |
→ |
c(c(c(b(a(x1))))) |
(79) |
c(b(c(a(a(x1))))) |
→ |
c(b(c(b(a(x1))))) |
(80) |
c(a(c(a(a(x1))))) |
→ |
c(a(c(b(a(x1))))) |
(81) |
b(c(c(a(a(x1))))) |
→ |
b(c(c(b(a(x1))))) |
(82) |
b(b(c(a(a(x1))))) |
→ |
b(b(c(b(a(x1))))) |
(83) |
b(a(c(a(a(x1))))) |
→ |
b(a(c(b(a(x1))))) |
(84) |
a(c(c(a(a(x1))))) |
→ |
a(c(c(b(a(x1))))) |
(85) |
a(b(c(a(a(x1))))) |
→ |
a(b(c(b(a(x1))))) |
(86) |
a(a(c(a(a(x1))))) |
→ |
a(a(c(b(a(x1))))) |
(87) |
c(c(b(a(b(x1))))) |
→ |
c(c(b(b(c(x1))))) |
(88) |
c(c(b(a(a(x1))))) |
→ |
c(c(a(b(c(x1))))) |
(89) |
c(c(b(b(c(x1))))) |
→ |
c(c(a(a(c(x1))))) |
(90) |
c(c(a(c(c(x1))))) |
→ |
c(c(b(a(c(x1))))) |
(91) |
c(b(b(a(b(x1))))) |
→ |
c(b(b(b(c(x1))))) |
(92) |
c(b(b(a(a(x1))))) |
→ |
c(b(a(b(c(x1))))) |
(93) |
c(b(b(b(c(x1))))) |
→ |
c(b(a(a(c(x1))))) |
(94) |
c(b(a(c(c(x1))))) |
→ |
c(b(b(a(c(x1))))) |
(95) |
c(a(b(a(b(x1))))) |
→ |
c(a(b(b(c(x1))))) |
(96) |
c(a(b(a(a(x1))))) |
→ |
c(a(a(b(c(x1))))) |
(97) |
c(a(b(b(c(x1))))) |
→ |
c(a(a(a(c(x1))))) |
(98) |
c(a(a(c(c(x1))))) |
→ |
c(a(b(a(c(x1))))) |
(99) |
b(c(b(a(b(x1))))) |
→ |
b(c(b(b(c(x1))))) |
(100) |
b(c(b(a(a(x1))))) |
→ |
b(c(a(b(c(x1))))) |
(101) |
b(c(b(b(c(x1))))) |
→ |
b(c(a(a(c(x1))))) |
(102) |
b(c(a(c(c(x1))))) |
→ |
b(c(b(a(c(x1))))) |
(103) |
b(b(b(a(b(x1))))) |
→ |
b(b(b(b(c(x1))))) |
(104) |
b(b(b(a(a(x1))))) |
→ |
b(b(a(b(c(x1))))) |
(105) |
b(b(b(b(c(x1))))) |
→ |
b(b(a(a(c(x1))))) |
(106) |
b(b(a(c(c(x1))))) |
→ |
b(b(b(a(c(x1))))) |
(107) |
b(a(b(a(b(x1))))) |
→ |
b(a(b(b(c(x1))))) |
(108) |
b(a(b(a(a(x1))))) |
→ |
b(a(a(b(c(x1))))) |
(109) |
b(a(b(b(c(x1))))) |
→ |
b(a(a(a(c(x1))))) |
(110) |
b(a(a(c(c(x1))))) |
→ |
b(a(b(a(c(x1))))) |
(111) |
a(c(b(a(b(x1))))) |
→ |
a(c(b(b(c(x1))))) |
(112) |
a(c(b(a(a(x1))))) |
→ |
a(c(a(b(c(x1))))) |
(113) |
a(c(b(b(c(x1))))) |
→ |
a(c(a(a(c(x1))))) |
(114) |
a(c(a(c(c(x1))))) |
→ |
a(c(b(a(c(x1))))) |
(115) |
a(b(b(a(b(x1))))) |
→ |
a(b(b(b(c(x1))))) |
(116) |
a(b(b(a(a(x1))))) |
→ |
a(b(a(b(c(x1))))) |
(117) |
a(b(b(b(c(x1))))) |
→ |
a(b(a(a(c(x1))))) |
(118) |
a(b(a(c(c(x1))))) |
→ |
a(b(b(a(c(x1))))) |
(119) |
a(a(b(a(b(x1))))) |
→ |
a(a(b(b(c(x1))))) |
(120) |
a(a(b(a(a(x1))))) |
→ |
a(a(a(b(c(x1))))) |
(121) |
a(a(b(b(c(x1))))) |
→ |
a(a(a(a(c(x1))))) |
(122) |
a(a(a(c(c(x1))))) |
→ |
a(a(b(a(c(x1))))) |
(123) |
1.2.1.1.1 Semantic Labeling
The following interpretations form a
model
of the rules.
As carrier we take the set
{0,...,8}.
Symbols are labeled by the interpretation of their arguments using the interpretations
(modulo 9):
[c(x1)] |
= |
3x1 + 0 |
[b(x1)] |
= |
3x1 + 1 |
[a(x1)] |
= |
3x1 + 2 |
We obtain the labeled TRS
There are 405 ruless (increase limit for explicit display).
1.2.1.1.1.1 Rule Removal
Using the
matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1
[c0(x1)] |
= |
x1 +
|
[c3(x1)] |
= |
x1 +
|
[c6(x1)] |
= |
x1 +
|
[c1(x1)] |
= |
x1 +
|
[c4(x1)] |
= |
x1 +
|
[c7(x1)] |
= |
x1 +
|
[c2(x1)] |
= |
x1 +
|
[c5(x1)] |
= |
x1 +
|
[c8(x1)] |
= |
x1 +
|
[b0(x1)] |
= |
x1 +
|
[b3(x1)] |
= |
x1 +
|
[b6(x1)] |
= |
x1 +
|
[b1(x1)] |
= |
x1 +
|
[b4(x1)] |
= |
x1 +
|
[b7(x1)] |
= |
x1 +
|
[b2(x1)] |
= |
x1 +
|
[b5(x1)] |
= |
x1 +
|
[b8(x1)] |
= |
x1 +
|
[a0(x1)] |
= |
x1 +
|
[a3(x1)] |
= |
x1 +
|
[a6(x1)] |
= |
x1 +
|
[a1(x1)] |
= |
x1 +
|
[a4(x1)] |
= |
x1 +
|
[a7(x1)] |
= |
x1 +
|
[a2(x1)] |
= |
x1 +
|
[a5(x1)] |
= |
x1 +
|
[a8(x1)] |
= |
x1 +
|
all of the following rules can be deleted.
There are 351 ruless (increase limit for explicit display).
1.2.1.1.1.1.1 R is empty
There are no rules in the TRS. Hence, it is terminating.
1.2.2 Closure Under Flat Contexts
Using the flat contexts
{c(☐), b(☐), a(☐)}
We obtain the transformed TRS
c(b(a(b(x1)))) |
→ |
c(b(b(c(x1)))) |
(10) |
c(b(a(a(x1)))) |
→ |
c(a(b(c(x1)))) |
(12) |
c(b(b(c(x1)))) |
→ |
c(a(a(c(x1)))) |
(13) |
c(a(c(c(x1)))) |
→ |
c(b(a(c(x1)))) |
(14) |
b(b(a(b(x1)))) |
→ |
b(b(b(c(x1)))) |
(15) |
b(b(a(a(x1)))) |
→ |
b(a(b(c(x1)))) |
(17) |
b(b(b(c(x1)))) |
→ |
b(a(a(c(x1)))) |
(18) |
b(a(c(c(x1)))) |
→ |
b(b(a(c(x1)))) |
(19) |
a(b(a(b(x1)))) |
→ |
a(b(b(c(x1)))) |
(20) |
a(b(a(a(x1)))) |
→ |
a(a(b(c(x1)))) |
(22) |
a(b(b(c(x1)))) |
→ |
a(a(a(c(x1)))) |
(23) |
a(a(c(c(x1)))) |
→ |
a(b(a(c(x1)))) |
(24) |
1.2.2.1 Semantic Labeling
The following interpretations form a
model
of the rules.
As carrier we take the set
{0,1,2}.
Symbols are labeled by the interpretation of their arguments using the interpretations
(modulo 3):
[c(x1)] |
= |
3x1 + 0 |
[b(x1)] |
= |
3x1 + 1 |
[a(x1)] |
= |
3x1 + 2 |
We obtain the labeled TRS
b1(b2(a1(b1(x1)))) |
→ |
b1(b1(b0(c1(x1)))) |
(42) |
b1(b2(a1(b2(x1)))) |
→ |
b1(b1(b0(c2(x1)))) |
(41) |
b1(b2(a1(b0(x1)))) |
→ |
b1(b1(b0(c0(x1)))) |
(40) |
a1(b2(a1(b1(x1)))) |
→ |
a1(b1(b0(c1(x1)))) |
(39) |
a1(b2(a1(b2(x1)))) |
→ |
a1(b1(b0(c2(x1)))) |
(38) |
a1(b2(a1(b0(x1)))) |
→ |
a1(b1(b0(c0(x1)))) |
(37) |
c1(b2(a1(b1(x1)))) |
→ |
c1(b1(b0(c1(x1)))) |
(36) |
c1(b2(a1(b2(x1)))) |
→ |
c1(b1(b0(c2(x1)))) |
(35) |
c1(b2(a1(b0(x1)))) |
→ |
c1(b1(b0(c0(x1)))) |
(34) |
b1(b2(a2(a1(x1)))) |
→ |
b2(a1(b0(c1(x1)))) |
(60) |
b1(b2(a2(a2(x1)))) |
→ |
b2(a1(b0(c2(x1)))) |
(59) |
b1(b2(a2(a0(x1)))) |
→ |
b2(a1(b0(c0(x1)))) |
(58) |
a1(b2(a2(a1(x1)))) |
→ |
a2(a1(b0(c1(x1)))) |
(57) |
a1(b2(a2(a2(x1)))) |
→ |
a2(a1(b0(c2(x1)))) |
(56) |
a1(b2(a2(a0(x1)))) |
→ |
a2(a1(b0(c0(x1)))) |
(55) |
c1(b2(a2(a1(x1)))) |
→ |
c2(a1(b0(c1(x1)))) |
(54) |
c1(b2(a2(a2(x1)))) |
→ |
c2(a1(b0(c2(x1)))) |
(53) |
c1(b2(a2(a0(x1)))) |
→ |
c2(a1(b0(c0(x1)))) |
(52) |
b1(b1(b0(c1(x1)))) |
→ |
b2(a2(a0(c1(x1)))) |
(69) |
b1(b1(b0(c2(x1)))) |
→ |
b2(a2(a0(c2(x1)))) |
(68) |
b1(b1(b0(c0(x1)))) |
→ |
b2(a2(a0(c0(x1)))) |
(67) |
a1(b1(b0(c1(x1)))) |
→ |
a2(a2(a0(c1(x1)))) |
(66) |
a1(b1(b0(c2(x1)))) |
→ |
a2(a2(a0(c2(x1)))) |
(65) |
a1(b1(b0(c0(x1)))) |
→ |
a2(a2(a0(c0(x1)))) |
(64) |
c1(b1(b0(c1(x1)))) |
→ |
c2(a2(a0(c1(x1)))) |
(63) |
c1(b1(b0(c2(x1)))) |
→ |
c2(a2(a0(c2(x1)))) |
(62) |
c1(b1(b0(c0(x1)))) |
→ |
c2(a2(a0(c0(x1)))) |
(61) |
b2(a0(c0(c1(x1)))) |
→ |
b1(b2(a0(c1(x1)))) |
(78) |
b2(a0(c0(c2(x1)))) |
→ |
b1(b2(a0(c2(x1)))) |
(77) |
b2(a0(c0(c0(x1)))) |
→ |
b1(b2(a0(c0(x1)))) |
(76) |
a2(a0(c0(c1(x1)))) |
→ |
a1(b2(a0(c1(x1)))) |
(75) |
a2(a0(c0(c2(x1)))) |
→ |
a1(b2(a0(c2(x1)))) |
(74) |
a2(a0(c0(c0(x1)))) |
→ |
a1(b2(a0(c0(x1)))) |
(73) |
c2(a0(c0(c1(x1)))) |
→ |
c1(b2(a0(c1(x1)))) |
(72) |
c2(a0(c0(c2(x1)))) |
→ |
c1(b2(a0(c2(x1)))) |
(71) |
c2(a0(c0(c0(x1)))) |
→ |
c1(b2(a0(c0(x1)))) |
(70) |
1.2.2.1.1 Rule Removal
Using the
matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1
[c0(x1)] |
= |
x1 +
|
[c1(x1)] |
= |
x1 +
|
[c2(x1)] |
= |
x1 +
|
[b0(x1)] |
= |
x1 +
|
[b1(x1)] |
= |
x1 +
|
[b2(x1)] |
= |
x1 +
|
[a0(x1)] |
= |
x1 +
|
[a1(x1)] |
= |
x1 +
|
[a2(x1)] |
= |
x1 +
|
all of the following rules can be deleted.
b1(b2(a1(b1(x1)))) |
→ |
b1(b1(b0(c1(x1)))) |
(42) |
b1(b2(a1(b2(x1)))) |
→ |
b1(b1(b0(c2(x1)))) |
(41) |
a1(b2(a1(b1(x1)))) |
→ |
a1(b1(b0(c1(x1)))) |
(39) |
a1(b2(a1(b2(x1)))) |
→ |
a1(b1(b0(c2(x1)))) |
(38) |
c1(b2(a1(b1(x1)))) |
→ |
c1(b1(b0(c1(x1)))) |
(36) |
c1(b2(a1(b2(x1)))) |
→ |
c1(b1(b0(c2(x1)))) |
(35) |
b1(b2(a2(a1(x1)))) |
→ |
b2(a1(b0(c1(x1)))) |
(60) |
b1(b2(a2(a2(x1)))) |
→ |
b2(a1(b0(c2(x1)))) |
(59) |
a1(b2(a2(a1(x1)))) |
→ |
a2(a1(b0(c1(x1)))) |
(57) |
a1(b2(a2(a2(x1)))) |
→ |
a2(a1(b0(c2(x1)))) |
(56) |
c1(b2(a2(a1(x1)))) |
→ |
c2(a1(b0(c1(x1)))) |
(54) |
c1(b2(a2(a2(x1)))) |
→ |
c2(a1(b0(c2(x1)))) |
(53) |
1.2.2.1.1.1 String Reversal
Since only unary symbols occur, one can reverse all terms and obtains the TRS
b0(a1(b2(b1(x1)))) |
→ |
c0(b0(b1(b1(x1)))) |
(529) |
b0(a1(b2(a1(x1)))) |
→ |
c0(b0(b1(a1(x1)))) |
(530) |
b0(a1(b2(c1(x1)))) |
→ |
c0(b0(b1(c1(x1)))) |
(531) |
a0(a2(b2(b1(x1)))) |
→ |
c0(b0(a1(b2(x1)))) |
(532) |
a0(a2(b2(a1(x1)))) |
→ |
c0(b0(a1(a2(x1)))) |
(533) |
a0(a2(b2(c1(x1)))) |
→ |
c0(b0(a1(c2(x1)))) |
(534) |
c1(b0(b1(b1(x1)))) |
→ |
c1(a0(a2(b2(x1)))) |
(535) |
c2(b0(b1(b1(x1)))) |
→ |
c2(a0(a2(b2(x1)))) |
(536) |
c0(b0(b1(b1(x1)))) |
→ |
c0(a0(a2(b2(x1)))) |
(537) |
c1(b0(b1(a1(x1)))) |
→ |
c1(a0(a2(a2(x1)))) |
(538) |
c2(b0(b1(a1(x1)))) |
→ |
c2(a0(a2(a2(x1)))) |
(539) |
c0(b0(b1(a1(x1)))) |
→ |
c0(a0(a2(a2(x1)))) |
(540) |
c1(b0(b1(c1(x1)))) |
→ |
c1(a0(a2(c2(x1)))) |
(541) |
c2(b0(b1(c1(x1)))) |
→ |
c2(a0(a2(c2(x1)))) |
(542) |
c0(b0(b1(c1(x1)))) |
→ |
c0(a0(a2(c2(x1)))) |
(543) |
c1(c0(a0(b2(x1)))) |
→ |
c1(a0(b2(b1(x1)))) |
(544) |
c2(c0(a0(b2(x1)))) |
→ |
c2(a0(b2(b1(x1)))) |
(545) |
c0(c0(a0(b2(x1)))) |
→ |
c0(a0(b2(b1(x1)))) |
(546) |
c1(c0(a0(a2(x1)))) |
→ |
c1(a0(b2(a1(x1)))) |
(547) |
c2(c0(a0(a2(x1)))) |
→ |
c2(a0(b2(a1(x1)))) |
(548) |
c0(c0(a0(a2(x1)))) |
→ |
c0(a0(b2(a1(x1)))) |
(549) |
c1(c0(a0(c2(x1)))) |
→ |
c1(a0(b2(c1(x1)))) |
(550) |
c2(c0(a0(c2(x1)))) |
→ |
c2(a0(b2(c1(x1)))) |
(551) |
c0(c0(a0(c2(x1)))) |
→ |
c0(a0(b2(c1(x1)))) |
(552) |
1.2.2.1.1.1.1 Rule Removal
Using the
matrix interpretations of dimension 1 with strict dimension 1 over the naturals
[c0(x1)] |
= |
· x1 +
|
[c1(x1)] |
= |
· x1 +
|
[c2(x1)] |
= |
· x1 +
|
[b0(x1)] |
= |
· x1 +
|
[b1(x1)] |
= |
· x1 +
|
[b2(x1)] |
= |
· x1 +
|
[a0(x1)] |
= |
· x1 +
|
[a1(x1)] |
= |
· x1 +
|
[a2(x1)] |
= |
· x1 +
|
all of the following rules can be deleted.
a0(a2(b2(b1(x1)))) |
→ |
c0(b0(a1(b2(x1)))) |
(532) |
a0(a2(b2(a1(x1)))) |
→ |
c0(b0(a1(a2(x1)))) |
(533) |
a0(a2(b2(c1(x1)))) |
→ |
c0(b0(a1(c2(x1)))) |
(534) |
1.2.2.1.1.1.1.1 Rule Removal
Using the
matrix interpretations of dimension 1 with strict dimension 1 over the rationals with delta = 1
[c0(x1)] |
= |
x1 +
|
[c1(x1)] |
= |
x1 +
|
[c2(x1)] |
= |
x1 +
|
[b0(x1)] |
= |
x1 +
|
[b1(x1)] |
= |
x1 +
|
[b2(x1)] |
= |
x1 +
|
[a0(x1)] |
= |
x1 +
|
[a1(x1)] |
= |
x1 +
|
[a2(x1)] |
= |
x1 +
|
all of the following rules can be deleted.
b0(a1(b2(b1(x1)))) |
→ |
c0(b0(b1(b1(x1)))) |
(529) |
b0(a1(b2(a1(x1)))) |
→ |
c0(b0(b1(a1(x1)))) |
(530) |
b0(a1(b2(c1(x1)))) |
→ |
c0(b0(b1(c1(x1)))) |
(531) |
c1(b0(b1(b1(x1)))) |
→ |
c1(a0(a2(b2(x1)))) |
(535) |
c2(b0(b1(b1(x1)))) |
→ |
c2(a0(a2(b2(x1)))) |
(536) |
c0(b0(b1(b1(x1)))) |
→ |
c0(a0(a2(b2(x1)))) |
(537) |
c1(b0(b1(a1(x1)))) |
→ |
c1(a0(a2(a2(x1)))) |
(538) |
c2(b0(b1(a1(x1)))) |
→ |
c2(a0(a2(a2(x1)))) |
(539) |
c0(b0(b1(a1(x1)))) |
→ |
c0(a0(a2(a2(x1)))) |
(540) |
c1(b0(b1(c1(x1)))) |
→ |
c1(a0(a2(c2(x1)))) |
(541) |
c2(b0(b1(c1(x1)))) |
→ |
c2(a0(a2(c2(x1)))) |
(542) |
c0(b0(b1(c1(x1)))) |
→ |
c0(a0(a2(c2(x1)))) |
(543) |
c1(c0(a0(b2(x1)))) |
→ |
c1(a0(b2(b1(x1)))) |
(544) |
c2(c0(a0(b2(x1)))) |
→ |
c2(a0(b2(b1(x1)))) |
(545) |
c0(c0(a0(b2(x1)))) |
→ |
c0(a0(b2(b1(x1)))) |
(546) |
c1(c0(a0(a2(x1)))) |
→ |
c1(a0(b2(a1(x1)))) |
(547) |
c2(c0(a0(a2(x1)))) |
→ |
c2(a0(b2(a1(x1)))) |
(548) |
c0(c0(a0(a2(x1)))) |
→ |
c0(a0(b2(a1(x1)))) |
(549) |
c1(c0(a0(c2(x1)))) |
→ |
c1(a0(b2(c1(x1)))) |
(550) |
c2(c0(a0(c2(x1)))) |
→ |
c2(a0(b2(c1(x1)))) |
(551) |
c0(c0(a0(c2(x1)))) |
→ |
c0(a0(b2(c1(x1)))) |
(552) |
1.2.2.1.1.1.1.1.1 String Reversal
Since only unary symbols occur, one can reverse all terms and obtains the TRS
There are no rules.
1.2.2.1.1.1.1.1.1.1 R is empty
There are no rules in the TRS. Hence, it is terminating.