In the field of conditional term rewriting systems, the reduction of a given term involves recursive reduction of the premises of the rule currently applied, which leads to intractability, In this paper, we introduce simplifying systems, that allow to control this recursivity. Our approach enables the extension of several results for non-conditional rewriting to the conditional fmmework. In particular, we obtain results about the correctness of evaluation procedures, unification in conditional theories, termination and confluence, together with Knuth-Bendix theorem proving methods. Finally, the extension of such results to fully general conditional systems is discussed
More and more, term rewriting systems are applied in computer science aswell as in mathematics. They...
An automatic and easy to implement transformation of conditional term rewrite systems into computati...
Conditional equations arise naturally in the algebraic specification of data types. They also provid...
In the field of conditional term rewriting systems, the reduction of a given term involves recursive...
AbstractAlgebraic specifications of abstract data types can often be viewed as systems of rewrite ru...
We study the combination of the following already known ideas for showing confluence ofunconditional...
Algebraic specifications of abstract data types can often be viewed as systems of rewrite rules. He...
AbstractWe formally define and prove the correctness of a transformation from conditional rewrite sy...
We characterize conditional rewriting as satisfiability in a Herbrand-like model of terms where vari...
AbstractMethods of proving that a term-rewriting system terminates are presented. They are based on ...
Contribution à un ouvrage.This chapter introduces term rewriting and some of its applications from d...
AbstractThe Knuth-Bendix completion algorithm is a procedure which generates confluent and terminati...
AbstractRecursion can be conveniently modeled with left-linear positive/negative-conditional term re...
Term rewriting systems are important for computability theory of abstract data types, for automatic ...
AbstractWe present techniques to prove termination and innermost termination of term rewriting syste...
More and more, term rewriting systems are applied in computer science aswell as in mathematics. They...
An automatic and easy to implement transformation of conditional term rewrite systems into computati...
Conditional equations arise naturally in the algebraic specification of data types. They also provid...
In the field of conditional term rewriting systems, the reduction of a given term involves recursive...
AbstractAlgebraic specifications of abstract data types can often be viewed as systems of rewrite ru...
We study the combination of the following already known ideas for showing confluence ofunconditional...
Algebraic specifications of abstract data types can often be viewed as systems of rewrite rules. He...
AbstractWe formally define and prove the correctness of a transformation from conditional rewrite sy...
We characterize conditional rewriting as satisfiability in a Herbrand-like model of terms where vari...
AbstractMethods of proving that a term-rewriting system terminates are presented. They are based on ...
Contribution à un ouvrage.This chapter introduces term rewriting and some of its applications from d...
AbstractThe Knuth-Bendix completion algorithm is a procedure which generates confluent and terminati...
AbstractRecursion can be conveniently modeled with left-linear positive/negative-conditional term re...
Term rewriting systems are important for computability theory of abstract data types, for automatic ...
AbstractWe present techniques to prove termination and innermost termination of term rewriting syste...
More and more, term rewriting systems are applied in computer science aswell as in mathematics. They...
An automatic and easy to implement transformation of conditional term rewrite systems into computati...
Conditional equations arise naturally in the algebraic specification of data types. They also provid...