. For a string rewriting system, it is known that termination by a simplification ordering implies multiple recursive complexity. This theoretical upper bound is, however, far from having been reached by known examples of rewrite systems. All known methods used to establish termination by simplification yield a primitive recursive bound. Furthermore, the study of the order types of simplification orderings suggests that the recursive path ordering is, in a broad sense, a maximal simplification ordering. This would imply that simplifying string rewrite systems cannot go beyond primitive recursion. Contradicting this intuition, we construct here a simplifying string rewriting system whose complexity is not primitive recursive. This leads to ...
AbstractWe prove that string rewriting systems which reduce by Higman's lemma exhaust the multiply r...
AbstractIt is shown that a termination proof for a term rewriting system using a lexicographic path ...
Abstract. String rewriting can not only be applied on strings, but also on cycles and even on genera...
In this paper we investigate the concept of simple termination. A term rewriting system is called si...
AbstractIn this paper we investigate the concept of simple termination. A term rewriting system is c...
Various methods for proving the termination of term rewriting systems havebeen suggested. Most of th...
More and more, term rewriting systems are applied in computer science aswell as in mathematics. They...
AbstractWe study the derivational complexities of string rewriting systems. We discuss the following...
AbstractThe derivational complexity of a terminating rewrite system is a measure for the maximal len...
AbstractMethods of proving that a term-rewriting system terminates are presented. They are based on ...
AbstractIt is not known whether the termination problem is decidable for one-rule string-rewriting s...
Colloque avec actes et comité de lecture.In rewriting theory, termination of a rewrite system by Kru...
The recursive path ordering introduced by Dershowitz can prove the termination of term rewriting sys...
We characterize termination of one-rule string rewriting systems of the form 0 p 1 q ¿ 1 r 0 s for e...
The relationship between several simplification orderings is investigated: the path of subterms orde...
AbstractWe prove that string rewriting systems which reduce by Higman's lemma exhaust the multiply r...
AbstractIt is shown that a termination proof for a term rewriting system using a lexicographic path ...
Abstract. String rewriting can not only be applied on strings, but also on cycles and even on genera...
In this paper we investigate the concept of simple termination. A term rewriting system is called si...
AbstractIn this paper we investigate the concept of simple termination. A term rewriting system is c...
Various methods for proving the termination of term rewriting systems havebeen suggested. Most of th...
More and more, term rewriting systems are applied in computer science aswell as in mathematics. They...
AbstractWe study the derivational complexities of string rewriting systems. We discuss the following...
AbstractThe derivational complexity of a terminating rewrite system is a measure for the maximal len...
AbstractMethods of proving that a term-rewriting system terminates are presented. They are based on ...
AbstractIt is not known whether the termination problem is decidable for one-rule string-rewriting s...
Colloque avec actes et comité de lecture.In rewriting theory, termination of a rewrite system by Kru...
The recursive path ordering introduced by Dershowitz can prove the termination of term rewriting sys...
We characterize termination of one-rule string rewriting systems of the form 0 p 1 q ¿ 1 r 0 s for e...
The relationship between several simplification orderings is investigated: the path of subterms orde...
AbstractWe prove that string rewriting systems which reduce by Higman's lemma exhaust the multiply r...
AbstractIt is shown that a termination proof for a term rewriting system using a lexicographic path ...
Abstract. String rewriting can not only be applied on strings, but also on cycles and even on genera...