Add to ORKGAn important property of term rewriting systems is termination: the guarantee that every rewrite sequence is finite. This thesis is concerned with orderings used for proving termination, in particular the Knuth-Bendix and polynomial orderings. First, two methods for generating termination orderings are enhanced. The Knuth-Bendix ordering algorithm incrementally generates numeric and symbolic constraints that are sufficient for the termination of the rewrite system being constructed. The KB ordering algorithm requires an efficient linear constraint solver that detects the nature of degeneracy in the solution space, and for this a revised method of complete description is presented that eliminates the space redundancy that crippled previous i...
In this paper we describe a new class of orderings—associative path orderings—for proving terminatio...
In the first part this paper gives an order-theoretic analysis of the multiset ordering, the recursi...
A termination problem can be transformed into a set of polynomial constraints. Up to now, several ap...
More and more, term rewriting systems are applied in computer science aswell as in mathematics. They...
Orderings on polynomial interpretations of operators represent a powerful technique for proving thet...
Multiset orderings are a key ingredient in certain termination techniques like the recursive path or...
Multiset orderings are a key ingredient in certain termination techniques like the recursive path or...
AbstractThis paper extends the termination proof techniques based on rewrite orderings to a higher-o...
In this expository paper, a comprehensive study of multiset orderings, nested multiset orderings and...
AbstractMethods of proving that a term-rewriting system terminates are presented. They are based on ...
AbstractWe present techniques to prove termination and innermost termination of term rewriting syste...
This survey describes methods for proving that systems of rewrite rules are terminating programs. We...
International audienceIn this paper, the problem of termination of rewriting in order-sorted algebra...
Two kinds of orderings are widely used in term rewriting and theorem proving, namely recursive path ...
In this paper we describe a new class of orderings—associative path orderings—for proving terminatio...
In this paper we describe a new class of orderings—associative path orderings—for proving terminatio...
In the first part this paper gives an order-theoretic analysis of the multiset ordering, the recursi...
A termination problem can be transformed into a set of polynomial constraints. Up to now, several ap...
More and more, term rewriting systems are applied in computer science aswell as in mathematics. They...
Orderings on polynomial interpretations of operators represent a powerful technique for proving thet...
Multiset orderings are a key ingredient in certain termination techniques like the recursive path or...
Multiset orderings are a key ingredient in certain termination techniques like the recursive path or...
AbstractThis paper extends the termination proof techniques based on rewrite orderings to a higher-o...
In this expository paper, a comprehensive study of multiset orderings, nested multiset orderings and...
AbstractMethods of proving that a term-rewriting system terminates are presented. They are based on ...
AbstractWe present techniques to prove termination and innermost termination of term rewriting syste...
This survey describes methods for proving that systems of rewrite rules are terminating programs. We...
International audienceIn this paper, the problem of termination of rewriting in order-sorted algebra...
Two kinds of orderings are widely used in term rewriting and theorem proving, namely recursive path ...
In this paper we describe a new class of orderings—associative path orderings—for proving terminatio...
In this paper we describe a new class of orderings—associative path orderings—for proving terminatio...
In the first part this paper gives an order-theoretic analysis of the multiset ordering, the recursi...
A termination problem can be transformed into a set of polynomial constraints. Up to now, several ap...