YES
We show the termination of the TRS R:
+(|0|(),y) -> y
+(s(x),y) -> s(+(x,y))
-(|0|(),y) -> |0|()
-(x,|0|()) -> x
-(s(x),s(y)) -> -(x,y)
-- SCC decomposition.
Consider the dependency pair problem (P, R), where P consists of
p1: +#(s(x),y) -> +#(x,y)
p2: -#(s(x),s(y)) -> -#(x,y)
and R consists of:
r1: +(|0|(),y) -> y
r2: +(s(x),y) -> s(+(x,y))
r3: -(|0|(),y) -> |0|()
r4: -(x,|0|()) -> x
r5: -(s(x),s(y)) -> -(x,y)
The estimated dependency graph contains the following SCCs:
{p1}
{p2}
-- Reduction pair.
Consider the dependency pair problem (P, R), where P consists of
p1: +#(s(x),y) -> +#(x,y)
and R consists of:
r1: +(|0|(),y) -> y
r2: +(s(x),y) -> s(+(x,y))
r3: -(|0|(),y) -> |0|()
r4: -(x,|0|()) -> x
r5: -(s(x),s(y)) -> -(x,y)
The set of usable rules consists of
(no rules)
Take the reduction pair:
lexicographic combination of reduction pairs:
1. matrix interpretations:
carrier: N^1
order: standard order
interpretations:
+#_A(x1,x2) = x1
s_A(x1) = x1 + 1
2. lexicographic path order with precedence:
precedence:
s > +#
argument filter:
pi(+#) = [1]
pi(s) = [1]
The next rules are strictly ordered:
p1
We remove them from the problem. Then no dependency pair remains.
-- Reduction pair.
Consider the dependency pair problem (P, R), where P consists of
p1: -#(s(x),s(y)) -> -#(x,y)
and R consists of:
r1: +(|0|(),y) -> y
r2: +(s(x),y) -> s(+(x,y))
r3: -(|0|(),y) -> |0|()
r4: -(x,|0|()) -> x
r5: -(s(x),s(y)) -> -(x,y)
The set of usable rules consists of
(no rules)
Take the reduction pair:
lexicographic combination of reduction pairs:
1. matrix interpretations:
carrier: N^1
order: standard order
interpretations:
-#_A(x1,x2) = x1 + x2
s_A(x1) = x1 + 1
2. lexicographic path order with precedence:
precedence:
s > -#
argument filter:
pi(-#) = []
pi(s) = []
The next rules are strictly ordered:
p1
We remove them from the problem. Then no dependency pair remains.