Termination w.r.t. Q of the following Term Rewriting System could be proven:
Q restricted rewrite system:
The TRS R consists of the following rules:
f(x, a(a(b(b(y))))) → f(a(a(a(b(b(b(x)))))), y)
f(a(x), y) → f(x, a(y))
f(b(x), y) → f(x, b(y))
Q is empty.
↳ QTRS
↳ AAECC Innermost
Q restricted rewrite system:
The TRS R consists of the following rules:
f(x, a(a(b(b(y))))) → f(a(a(a(b(b(b(x)))))), y)
f(a(x), y) → f(x, a(y))
f(b(x), y) → f(x, b(y))
Q is empty.
We have applied [19,8] to switch to innermost. The TRS R 1 is none
The TRS R 2 is
f(x, a(a(b(b(y))))) → f(a(a(a(b(b(b(x)))))), y)
f(a(x), y) → f(x, a(y))
f(b(x), y) → f(x, b(y))
The signature Sigma is {f}
↳ QTRS
↳ AAECC Innermost
↳ QTRS
↳ DependencyPairsProof
Q restricted rewrite system:
The TRS R consists of the following rules:
f(x, a(a(b(b(y))))) → f(a(a(a(b(b(b(x)))))), y)
f(a(x), y) → f(x, a(y))
f(b(x), y) → f(x, b(y))
The set Q consists of the following terms:
f(x0, a(a(b(b(x1)))))
f(a(x0), x1)
f(b(x0), x1)
Using Dependency Pairs [1,15] we result in the following initial DP problem:
Q DP problem:
The TRS P consists of the following rules:
F(x, a(a(b(b(y))))) → F(a(a(a(b(b(b(x)))))), y)
F(a(x), y) → F(x, a(y))
F(b(x), y) → F(x, b(y))
The TRS R consists of the following rules:
f(x, a(a(b(b(y))))) → f(a(a(a(b(b(b(x)))))), y)
f(a(x), y) → f(x, a(y))
f(b(x), y) → f(x, b(y))
The set Q consists of the following terms:
f(x0, a(a(b(b(x1)))))
f(a(x0), x1)
f(b(x0), x1)
We have to consider all minimal (P,Q,R)-chains.
↳ QTRS
↳ AAECC Innermost
↳ QTRS
↳ DependencyPairsProof
↳ QDP
↳ UsableRulesProof
Q DP problem:
The TRS P consists of the following rules:
F(x, a(a(b(b(y))))) → F(a(a(a(b(b(b(x)))))), y)
F(a(x), y) → F(x, a(y))
F(b(x), y) → F(x, b(y))
The TRS R consists of the following rules:
f(x, a(a(b(b(y))))) → f(a(a(a(b(b(b(x)))))), y)
f(a(x), y) → f(x, a(y))
f(b(x), y) → f(x, b(y))
The set Q consists of the following terms:
f(x0, a(a(b(b(x1)))))
f(a(x0), x1)
f(b(x0), x1)
We have to consider all minimal (P,Q,R)-chains.
As all Q-normal forms are R-normal forms we are in the innermost case. Hence, by the usable rules processor [15] we can delete all non-usable rules [17] from R.
↳ QTRS
↳ AAECC Innermost
↳ QTRS
↳ DependencyPairsProof
↳ QDP
↳ UsableRulesProof
↳ QDP
↳ QReductionProof
Q DP problem:
The TRS P consists of the following rules:
F(x, a(a(b(b(y))))) → F(a(a(a(b(b(b(x)))))), y)
F(a(x), y) → F(x, a(y))
F(b(x), y) → F(x, b(y))
R is empty.
The set Q consists of the following terms:
f(x0, a(a(b(b(x1)))))
f(a(x0), x1)
f(b(x0), x1)
We have to consider all minimal (P,Q,R)-chains.
We deleted the following terms from Q as each root-symbol of these terms does neither occur in P nor in R.
f(x0, a(a(b(b(x1)))))
f(a(x0), x1)
f(b(x0), x1)
↳ QTRS
↳ AAECC Innermost
↳ QTRS
↳ DependencyPairsProof
↳ QDP
↳ UsableRulesProof
↳ QDP
↳ QReductionProof
↳ QDP
↳ QDPToSRSProof
Q DP problem:
The TRS P consists of the following rules:
F(x, a(a(b(b(y))))) → F(a(a(a(b(b(b(x)))))), y)
F(a(x), y) → F(x, a(y))
F(b(x), y) → F(x, b(y))
R is empty.
Q is empty.
We have to consider all minimal (P,Q,R)-chains.
The finiteness of this DP problem is implied by strong termination of a SRS due to [12].
↳ QTRS
↳ AAECC Innermost
↳ QTRS
↳ DependencyPairsProof
↳ QDP
↳ UsableRulesProof
↳ QDP
↳ QReductionProof
↳ QDP
↳ QDPToSRSProof
↳ QTRS
↳ DependencyPairsProof
Q restricted rewrite system:
The TRS R consists of the following rules:
a(a(b(b(x)))) → b(b(b(a(a(a(x))))))
Q is empty.
Using Dependency Pairs [1,15] we result in the following initial DP problem:
Q DP problem:
The TRS P consists of the following rules:
A(a(b(b(x)))) → A(a(x))
A(a(b(b(x)))) → A(x)
A(a(b(b(x)))) → A(a(a(x)))
The TRS R consists of the following rules:
a(a(b(b(x)))) → b(b(b(a(a(a(x))))))
Q is empty.
We have to consider all minimal (P,Q,R)-chains.
↳ QTRS
↳ AAECC Innermost
↳ QTRS
↳ DependencyPairsProof
↳ QDP
↳ UsableRulesProof
↳ QDP
↳ QReductionProof
↳ QDP
↳ QDPToSRSProof
↳ QTRS
↳ DependencyPairsProof
↳ QDP
↳ MNOCProof
Q DP problem:
The TRS P consists of the following rules:
A(a(b(b(x)))) → A(a(x))
A(a(b(b(x)))) → A(x)
A(a(b(b(x)))) → A(a(a(x)))
The TRS R consists of the following rules:
a(a(b(b(x)))) → b(b(b(a(a(a(x))))))
Q is empty.
We have to consider all minimal (P,Q,R)-chains.
We use the modular non-overlap check [15] to enlarge Q to all left-hand sides of R.
↳ QTRS
↳ AAECC Innermost
↳ QTRS
↳ DependencyPairsProof
↳ QDP
↳ UsableRulesProof
↳ QDP
↳ QReductionProof
↳ QDP
↳ QDPToSRSProof
↳ QTRS
↳ DependencyPairsProof
↳ QDP
↳ MNOCProof
↳ QDP
↳ RFCMatchBoundsDPProof
Q DP problem:
The TRS P consists of the following rules:
A(a(b(b(x)))) → A(a(x))
A(a(b(b(x)))) → A(x)
A(a(b(b(x)))) → A(a(a(x)))
The TRS R consists of the following rules:
a(a(b(b(x)))) → b(b(b(a(a(a(x))))))
The set Q consists of the following terms:
a(a(b(b(x0))))
We have to consider all minimal (P,Q,R)-chains.
Finiteness of the DP problem can be shown by a matchbound of 8.
As the DP problem is minimal we only have to initialize the certificate graph by the rules of P:
A(a(b(b(x)))) → A(a(x))
A(a(b(b(x)))) → A(x)
A(a(b(b(x)))) → A(a(a(x)))
To find matches we regarded all rules of R and P:
a(a(b(b(x)))) → b(b(b(a(a(a(x))))))
A(a(b(b(x)))) → A(a(x))
A(a(b(b(x)))) → A(x)
A(a(b(b(x)))) → A(a(a(x)))
The certificate found is represented by the following graph.
The certificate consists of the following enumerated nodes:
44, 45, 46, 48, 49, 47, 51, 50, 53, 54, 52, 56, 55, 58, 59, 57, 61, 60, 63, 64, 62, 66, 65, 71, 70, 69, 68, 67, 73, 74, 72, 76, 75, 81, 80, 79, 78, 77, 86, 85, 84, 83, 82, 91, 90, 89, 88, 87, 96, 95, 94, 93, 92, 101, 100, 99, 98, 97, 106, 105, 104, 103, 102, 111, 110, 109, 108, 107, 116, 115, 114, 113, 112, 121, 120, 119, 118, 117, 126, 125, 124, 123, 122, 131, 130, 129, 128, 127, 133, 134, 132, 136, 135, 141, 140, 139, 138, 137, 146, 145, 144, 143, 142, 151, 150, 149, 148, 147, 153, 154, 152, 156, 155
Node 44 is start node and node 45 is final node.
Those nodes are connect through the following edges:
- 44 to 46 labelled A_1(0)
- 44 to 45 labelled A_1(0), A_1(1)
- 44 to 51 labelled A_1(1)
- 44 to 50 labelled A_1(1)
- 44 to 48 labelled A_1(1), A_1(2)
- 44 to 56 labelled A_1(2)
- 44 to 55 labelled A_1(2)
- 44 to 52 labelled A_1(2), A_1(1)
- 44 to 53 labelled A_1(2), A_1(3)
- 44 to 54 labelled A_1(2), A_1(1), A_1(3)
- 44 to 61 labelled A_1(3)
- 44 to 60 labelled A_1(3)
- 44 to 58 labelled A_1(2), A_1(3)
- 44 to 66 labelled A_1(3)
- 44 to 65 labelled A_1(3)
- 44 to 71 labelled A_1(4)
- 44 to 63 labelled A_1(4), A_1(3)
- 44 to 70 labelled A_1(4)
- 44 to 76 labelled A_1(3)
- 44 to 75 labelled A_1(3)
- 44 to 72 labelled A_1(3)
- 44 to 73 labelled A_1(2), A_1(3), A_1(4)
- 44 to 67 labelled A_1(3), A_1(4)
- 44 to 81 labelled A_1(4)
- 44 to 80 labelled A_1(4)
- 44 to 74 labelled A_1(4), A_1(3)
- 44 to 86 labelled A_1(5)
- 44 to 69 labelled A_1(5), A_1(4), A_1(3)
- 44 to 85 labelled A_1(5)
- 44 to 91 labelled A_1(4)
- 44 to 68 labelled A_1(4), A_1(5)
- 44 to 90 labelled A_1(4)
- 44 to 87 labelled A_1(4)
- 44 to 89 labelled A_1(5)
- 44 to 96 labelled A_1(6)
- 44 to 83 labelled A_1(6), A_1(5), A_1(4)
- 44 to 95 labelled A_1(6)
- 44 to 88 labelled A_1(5), A_1(4)
- 44 to 92 labelled A_1(5), A_1(6)
- 44 to 101 labelled A_1(6)
- 44 to 100 labelled A_1(6)
- 44 to 106 labelled A_1(5)
- 44 to 82 labelled A_1(5)
- 44 to 105 labelled A_1(5)
- 44 to 94 labelled A_1(6), A_1(7)
- 44 to 111 labelled A_1(7)
- 44 to 110 labelled A_1(7)
- 44 to 116 labelled A_1(6)
- 44 to 84 labelled A_1(6)
- 44 to 115 labelled A_1(6)
- 44 to 103 labelled A_1(5), A_1(6)
- 44 to 78 labelled A_1(4), A_1(5)
- 44 to 121 labelled A_1(6)
- 44 to 98 labelled A_1(6), A_1(7)
- 44 to 120 labelled A_1(6)
- 44 to 126 labelled A_1(7)
- 44 to 125 labelled A_1(7)
- 44 to 93 labelled A_1(6), A_1(7)
- 44 to 131 labelled A_1(7)
- 44 to 130 labelled A_1(7)
- 44 to 136 labelled A_1(8)
- 44 to 123 labelled A_1(8), A_1(7)
- 44 to 135 labelled A_1(8)
- 44 to 141 labelled A_1(7)
- 44 to 140 labelled A_1(7)
- 44 to 146 labelled A_1(7)
- 44 to 118 labelled A_1(7)
- 44 to 145 labelled A_1(7)
- 44 to 151 labelled A_1(7)
- 44 to 137 labelled A_1(7)
- 44 to 150 labelled A_1(7)
- 44 to 156 labelled A_1(8)
- 44 to 139 labelled A_1(8)
- 44 to 155 labelled A_1(8)
- 45 to 45 labelled #_1(0), a_1(0)
- 45 to 47 labelled b_1(1)
- 45 to 48 labelled a_1(1)
- 45 to 52 labelled a_1(1)
- 46 to 45 labelled a_1(0)
- 46 to 47 labelled b_1(1)
- 48 to 49 labelled b_1(1)
- 48 to 73 labelled a_1(2)
- 49 to 50 labelled a_1(1)
- 49 to 52 labelled b_1(2)
- 47 to 48 labelled b_1(1)
- 51 to 45 labelled a_1(1)
- 51 to 47 labelled b_1(1)
- 51 to 48 labelled a_1(1)
- 51 to 52 labelled a_1(1), b_1(2)
- 51 to 54 labelled a_1(1)
- 50 to 51 labelled a_1(1)
- 50 to 47 labelled b_1(1)
- 50 to 52 labelled b_1(2)
- 53 to 54 labelled b_1(2)
- 53 to 72 labelled a_1(3)
- 53 to 73 labelled a_1(3)
- 53 to 67 labelled a_1(3)
- 54 to 55 labelled a_1(2)
- 54 to 72 labelled b_1(3)
- 52 to 53 labelled b_1(2)
- 56 to 48 labelled a_1(2)
- 56 to 52 labelled a_1(2)
- 56 to 53 labelled a_1(2)
- 56 to 54 labelled a_1(2)
- 56 to 58 labelled a_1(2)
- 56 to 62 labelled b_1(3)
- 56 to 73 labelled a_1(2)
- 55 to 56 labelled a_1(2)
- 55 to 52 labelled b_1(2)
- 55 to 57 labelled b_1(3)
- 58 to 59 labelled b_1(3)
- 59 to 60 labelled a_1(3)
- 59 to 67 labelled b_1(4)
- 57 to 58 labelled b_1(3)
- 61 to 54 labelled a_1(3)
- 61 to 62 labelled b_1(3)
- 61 to 72 labelled a_1(3)
- 61 to 73 labelled a_1(3)
- 61 to 67 labelled a_1(3)
- 60 to 61 labelled a_1(3)
- 60 to 67 labelled b_1(4)
- 63 to 64 labelled b_1(3)
- 64 to 65 labelled a_1(3)
- 64 to 87 labelled b_1(4)
- 64 to 67 labelled b_1(4)
- 62 to 63 labelled b_1(3)
- 66 to 58 labelled a_1(3)
- 66 to 53 labelled a_1(3)
- 66 to 74 labelled a_1(3)
- 66 to 67 labelled b_1(4)
- 66 to 69 labelled a_1(3)
- 66 to 87 labelled b_1(4)
- 65 to 66 labelled a_1(3)
- 65 to 57 labelled b_1(3)
- 65 to 77 labelled b_1(4)
- 65 to 67 labelled b_1(4)
- 71 to 63 labelled a_1(4)
- 71 to 73 labelled a_1(4)
- 71 to 74 labelled a_1(4)
- 71 to 69 labelled a_1(4)
- 71 to 87 labelled a_1(4), b_1(4)
- 71 to 82 labelled b_1(5)
- 71 to 83 labelled a_1(4)
- 71 to 88 labelled a_1(4)
- 70 to 71 labelled a_1(4)
- 70 to 67 labelled b_1(4)
- 70 to 82 labelled b_1(5)
- 70 to 77 labelled b_1(4)
- 69 to 70 labelled a_1(4)
- 69 to 82 labelled b_1(5)
- 68 to 69 labelled b_1(4)
- 67 to 68 labelled b_1(4)
- 73 to 74 labelled b_1(3)
- 74 to 75 labelled a_1(3)
- 72 to 73 labelled b_1(3)
- 76 to 63 labelled a_1(3)
- 75 to 76 labelled a_1(3)
- 75 to 67 labelled b_1(4)
- 75 to 77 labelled b_1(4)
- 81 to 67 labelled a_1(4)
- 80 to 81 labelled a_1(4)
- 80 to 82 labelled b_1(5)
- 79 to 80 labelled a_1(4)
- 78 to 79 labelled b_1(4)
- 77 to 78 labelled b_1(4)
- 86 to 69 labelled a_1(5)
- 86 to 68 labelled a_1(5)
- 86 to 82 labelled b_1(5)
- 86 to 89 labelled a_1(5)
- 86 to 83 labelled a_1(5)
- 86 to 88 labelled a_1(5)
- 86 to 92 labelled a_1(5)
- 86 to 103 labelled a_1(5)
- 86 to 78 labelled a_1(5)
- 85 to 86 labelled a_1(5)
- 85 to 97 labelled b_1(6)
- 85 to 102 labelled b_1(5)
- 85 to 92 labelled b_1(6)
- 84 to 85 labelled a_1(5)
- 84 to 92 labelled b_1(6)
- 83 to 84 labelled b_1(5)
- 82 to 83 labelled b_1(5)
- 91 to 68 labelled a_1(4)
- 91 to 78 labelled a_1(4)
- 90 to 91 labelled a_1(4)
- 90 to 102 labelled b_1(5)
- 89 to 90 labelled a_1(4)
- 88 to 89 labelled b_1(4)
- 87 to 88 labelled b_1(4)
- 96 to 83 labelled a_1(6)
- 95 to 96 labelled a_1(6)
- 95 to 97 labelled b_1(6)
- 94 to 95 labelled a_1(6)
- 93 to 94 labelled b_1(6)
- 92 to 93 labelled b_1(6)
- 101 to 92 labelled a_1(6)
- 101 to 94 labelled a_1(6)
- 101 to 122 labelled b_1(7)
- 100 to 101 labelled a_1(6)
- 100 to 107 labelled b_1(7)
- 99 to 100 labelled a_1(6)
- 99 to 137 labelled b_1(7)
- 98 to 99 labelled b_1(6)
- 97 to 98 labelled b_1(6)
- 106 to 82 labelled a_1(5)
- 105 to 106 labelled a_1(5)
- 105 to 112 labelled b_1(6)
- 104 to 105 labelled a_1(5)
- 103 to 104 labelled b_1(5)
- 102 to 103 labelled b_1(5)
- 111 to 94 labelled a_1(7)
- 111 to 122 labelled b_1(7)
- 110 to 111 labelled a_1(7)
- 109 to 110 labelled a_1(7)
- 109 to 132 labelled b_1(8)
- 108 to 109 labelled b_1(7)
- 107 to 108 labelled b_1(7)
- 116 to 84 labelled a_1(6)
- 116 to 117 labelled b_1(6)
- 115 to 116 labelled a_1(6)
- 115 to 127 labelled b_1(7)
- 114 to 115 labelled a_1(6)
- 114 to 142 labelled b_1(7)
- 113 to 114 labelled b_1(6)
- 112 to 113 labelled b_1(6)
- 121 to 98 labelled a_1(6)
- 121 to 93 labelled a_1(6)
- 121 to 103 labelled a_1(6)
- 120 to 121 labelled a_1(6)
- 120 to 147 labelled b_1(7)
- 119 to 120 labelled a_1(6)
- 118 to 119 labelled b_1(6)
- 117 to 118 labelled b_1(6)
- 126 to 98 labelled a_1(7)
- 125 to 126 labelled a_1(7)
- 125 to 147 labelled b_1(7)
- 124 to 125 labelled a_1(7)
- 123 to 124 labelled b_1(7)
- 122 to 123 labelled b_1(7)
- 131 to 93 labelled a_1(7)
- 130 to 131 labelled a_1(7)
- 129 to 130 labelled a_1(7)
- 128 to 129 labelled b_1(7)
- 127 to 128 labelled b_1(7)
- 133 to 134 labelled b_1(8)
- 134 to 135 labelled a_1(8)
- 132 to 133 labelled b_1(8)
- 136 to 123 labelled a_1(8)
- 135 to 136 labelled a_1(8)
- 141 to 123 labelled a_1(7)
- 140 to 141 labelled a_1(7)
- 139 to 140 labelled a_1(7)
- 138 to 139 labelled b_1(7)
- 137 to 138 labelled b_1(7)
- 146 to 118 labelled a_1(7)
- 145 to 146 labelled a_1(7)
- 144 to 145 labelled a_1(7)
- 143 to 144 labelled b_1(7)
- 142 to 143 labelled b_1(7)
- 151 to 137 labelled a_1(7)
- 150 to 151 labelled a_1(7)
- 150 to 152 labelled b_1(8)
- 149 to 150 labelled a_1(7)
- 148 to 149 labelled b_1(7)
- 147 to 148 labelled b_1(7)
- 153 to 154 labelled b_1(8)
- 154 to 155 labelled a_1(8)
- 152 to 153 labelled b_1(8)
- 156 to 139 labelled a_1(8)
- 155 to 156 labelled a_1(8)