We study deterministic conditional rewrite systems, i.e. conditional rewrite systemswhere the extra variables are not totally free but 'input bounded'. If such a systemR is quasi-reductive then !R is decidable and terminating. We develop a critical paircriterion to prove confluence if R is quasi-reductive and strongly deterministic. In thiscase we prove that R is logical, i.e./!R==R holds. We apply our results to proveHorn clause programs to be uniquely terminating.This research was supported by the Deutsche Forschungsgemeinschaft, SFB 314, Project D
We study Higher-Order Rewrite Systems (HRSs) which extend term rewriting to -terms. HRSs can descri...
Modular properties of term rewriting systems, i.e. properties which are preserved under disjoint uni...
This survey describes methods for proving that systems of rewrite rules are terminating programs. We...
Algebraic specifications of abstract data types can often be viewed as systems of rewrite rules. He...
We investigate the modularity behaviour of termination and confluence properties of (join) condition...
We present a transformation from any conditional rewrite systems into non conditional ones and prov...
AbstractWe investigate the practically crucial property of operational termination of deterministic ...
Conditional equations arise naturally in the algebraic specification of data types. They also provid...
As it is well-known, the critical pair lemma enables a finite test for confluence of (finite) termin...
AbstractWe formally define and prove the correctness of a transformation from conditional rewrite sy...
AbstractAlgebraic specifications of abstract data types can often be viewed as systems of rewrite ru...
AbstractRecursion can be conveniently modeled with left-linear positive/negative-conditional term re...
Rewriting is a computational process in which one term is derived from another by replacing a subter...
. In this paper we initiate a study of polynomial-time reductions for some basic decision problems o...
We characterize conditional rewriting as satisfiability in a Herbrand-like model of terms where vari...
We study Higher-Order Rewrite Systems (HRSs) which extend term rewriting to -terms. HRSs can descri...
Modular properties of term rewriting systems, i.e. properties which are preserved under disjoint uni...
This survey describes methods for proving that systems of rewrite rules are terminating programs. We...
Algebraic specifications of abstract data types can often be viewed as systems of rewrite rules. He...
We investigate the modularity behaviour of termination and confluence properties of (join) condition...
We present a transformation from any conditional rewrite systems into non conditional ones and prov...
AbstractWe investigate the practically crucial property of operational termination of deterministic ...
Conditional equations arise naturally in the algebraic specification of data types. They also provid...
As it is well-known, the critical pair lemma enables a finite test for confluence of (finite) termin...
AbstractWe formally define and prove the correctness of a transformation from conditional rewrite sy...
AbstractAlgebraic specifications of abstract data types can often be viewed as systems of rewrite ru...
AbstractRecursion can be conveniently modeled with left-linear positive/negative-conditional term re...
Rewriting is a computational process in which one term is derived from another by replacing a subter...
. In this paper we initiate a study of polynomial-time reductions for some basic decision problems o...
We characterize conditional rewriting as satisfiability in a Herbrand-like model of terms where vari...
We study Higher-Order Rewrite Systems (HRSs) which extend term rewriting to -terms. HRSs can descri...
Modular properties of term rewriting systems, i.e. properties which are preserved under disjoint uni...
This survey describes methods for proving that systems of rewrite rules are terminating programs. We...