AbstractAlgebraic specifications of abstract data types can often be viewed as systems of rewrite rules. Here we consider rewrite rules with conditions, such as they arise, e.g., from algebraic specifications with positive conditional equations. The conditional term rewriting systems thus obtained which we will study, are based upon the well-known class of left-linear, non-ambiguous TRSs. A large part of the theory for such TRSs can be generalized to the conditional case. Our approach is non-hierarchical: the conditions are to be evaluated in the same rewriting system. We prove confluence results and termination results for some well-known reduction strategies
We prove the correctness of a transformation from conditional rewrite systems (CTRS) into non condit...
Level-confluence is an important property of conditional term rewriting systems that allow extra var...
AbstractSystem S is a calculus providing the basic abstractions of term rewriting: matching and buil...
Algebraic specifications of abstract data types can often be viewed as systems of rewrite rules. He...
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...
In the field of conditional term rewriting systems, the reduction of a given term involves recursive...
AbstractThe confluence of untyped λ-calculus with unconditional rewriting is now well un- derstood. ...
AbstractRecursion can be conveniently modeled with left-linear positive/negative-conditional term re...
We show that processes defined by equational identities together with conditional rewrite rules in P...
Abstract. The confluence of untyped λ-calculus with unconditional re-writing has already been studie...
Conditional equations arise naturally in the algebraic specification of data types. They also provid...
The confluence of untyped λ-calculus with unconditional rewriting is now well un-derstood. In this p...
The confluence of untyped #-calculus with unconditional rewriting has already been studied in vario...
AbstractWe formally define and prove the correctness of a transformation from conditional rewrite sy...
We prove the correctness of a transformation from conditional rewrite systems (CTRS) into non condit...
Level-confluence is an important property of conditional term rewriting systems that allow extra var...
AbstractSystem S is a calculus providing the basic abstractions of term rewriting: matching and buil...
Algebraic specifications of abstract data types can often be viewed as systems of rewrite rules. He...
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...
In the field of conditional term rewriting systems, the reduction of a given term involves recursive...
AbstractThe confluence of untyped λ-calculus with unconditional rewriting is now well un- derstood. ...
AbstractRecursion can be conveniently modeled with left-linear positive/negative-conditional term re...
We show that processes defined by equational identities together with conditional rewrite rules in P...
Abstract. The confluence of untyped λ-calculus with unconditional re-writing has already been studie...
Conditional equations arise naturally in the algebraic specification of data types. They also provid...
The confluence of untyped λ-calculus with unconditional rewriting is now well un-derstood. In this p...
The confluence of untyped #-calculus with unconditional rewriting has already been studied in vario...
AbstractWe formally define and prove the correctness of a transformation from conditional rewrite sy...
We prove the correctness of a transformation from conditional rewrite systems (CTRS) into non condit...
Level-confluence is an important property of conditional term rewriting systems that allow extra var...
AbstractSystem S is a calculus providing the basic abstractions of term rewriting: matching and buil...