YES
We show the termination of the TRS R:
f(x,c(y)) -> f(x,s(f(y,y)))
f(s(x),y) -> f(x,s(c(y)))
-- SCC decomposition.
Consider the dependency pair problem (P, R), where P consists of
p1: f#(x,c(y)) -> f#(x,s(f(y,y)))
p2: f#(x,c(y)) -> f#(y,y)
p3: f#(s(x),y) -> f#(x,s(c(y)))
and R consists of:
r1: f(x,c(y)) -> f(x,s(f(y,y)))
r2: f(s(x),y) -> f(x,s(c(y)))
The estimated dependency graph contains the following SCCs:
{p2}
{p3}
-- Reduction pair.
Consider the dependency pair problem (P, R), where P consists of
p1: f#(x,c(y)) -> f#(y,y)
and R consists of:
r1: f(x,c(y)) -> f(x,s(f(y,y)))
r2: f(s(x),y) -> f(x,s(c(y)))
The set of usable rules consists of
(no rules)
Take the reduction pair:
lexicographic combination of reduction pairs:
1. lexicographic path order with precedence:
precedence:
c > f#
argument filter:
pi(f#) = [2]
pi(c) = [1]
2. lexicographic path order with precedence:
precedence:
c > f#
argument filter:
pi(f#) = 2
pi(c) = [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: f#(s(x),y) -> f#(x,s(c(y)))
and R consists of:
r1: f(x,c(y)) -> f(x,s(f(y,y)))
r2: f(s(x),y) -> f(x,s(c(y)))
The set of usable rules consists of
(no rules)
Take the reduction pair:
lexicographic combination of reduction pairs:
1. lexicographic path order with precedence:
precedence:
c > s > f#
argument filter:
pi(f#) = [1]
pi(s) = [1]
pi(c) = 1
2. lexicographic path order with precedence:
precedence:
c > s > f#
argument filter:
pi(f#) = 1
pi(s) = [1]
pi(c) = 1
The next rules are strictly ordered:
p1
We remove them from the problem. Then no dependency pair remains.