YES
Confluence Proof
Confluence Proof
by Hakusan
Input
The rewrite relation of the following TRS is considered.
W(B(x)) |
→ |
W(x) |
B(I(x)) |
→ |
J(x) |
W(I(x)) |
→ |
W(J(x)) |
Proof
1 Compositional Parallel Critical Pair Systems
All parallel critical pairs of the TRS R are joinable by R.
This can be seen as follows:
The parallel critical pairs can be joined as follows. Here,
↔ is always chosen as an appropriate rewrite relation which
is automatically inferred by the certifier.
-
The critical peak s = W(J(x1_1)) {1}←W(B(I(x1_1)))→ε W(I(x1_1)) = t can be joined as follows.
s
↔
t
The TRS C is chosen as:
There are no rules.
Consequently, PCPS(R,C) is included in the following TRS P where
steps are used to show that certain pairs are C-convertible.
W(B(I(x1_1))) |
→ |
W(J(x1_1)) |
W(B(I(x1_1))) |
→ |
W(I(x1_1)) |
Relative termination of P / R is proven as follows.
1.1 Rule Removal
Using the
recursive path order with the following precedence and status
prec(J) |
= |
0 |
|
stat(J) |
= |
lex
|
prec(W) |
= |
0 |
|
stat(W) |
= |
lex
|
prec(B) |
= |
0 |
|
stat(B) |
= |
lex
|
prec(I) |
= |
0 |
|
stat(I) |
= |
lex
|
all rules of R could be removed.
Moreover,
the
rule
remains in S.
1.1.1 R is empty
There are no rules in the TRS R. Hence, R/S is relative terminating.
Confluence of C is proven as follows.
1.2 (Weakly) Orthogonal
Confluence is proven since the TRS is (weakly) orthogonal.
Tool configuration
Hakusan