We introduce a class of restrictions for the ordered paramodulation and superposition calculi (inspired by the {\em basic\/} strategy for narrowing), in which paramodulation inferences are forbidden at terms introduced by substitutions from previous inference steps. In addition we introduce restrictions based on term selection rules and redex orderings, which are general criteria for delimiting the terms which are available for inferences. These refinements are compatible with standard ordering restrictions and are complete without paramodulation into variables or using functional reflexivity axioms. We prove refutational completeness in the context of deletion rules, such as simplification by rewriting (demodulation) and subsumption, and o...
We present an associative-commutative paramodulation calculus that generalizes the associative-commu...
We have previously shown that strict superposition together with merging paramodulation is refutatio...
A west ordering is a well-founded (strict partial) ordering on terms that satisfies the subterm pro...
We introduce a class of restrictions for the ordered paramodulation and superposition calculi (inspi...
AbstractWe introduce a class of restrictions for the ordered paramodulation and superposition calcul...
We introduce a class of restrictions for the ordered paramodulation and superposition calculi (inspi...
We introduce a class of restrictions for the ordered paramodulation and \u000Asuperposition calculi ...
Automated state-of-the-art theorem provers are typically optimised for particular strategies, and th...
We design new inference systems for total orderings by applying rewrite techniques to chaining calcu...
Abstract For many years, all existing completeness results for Knuth-Bendix completion and ordered p...
We define a formalism of equality constraints and use it to prove the completeness of what we have c...
The most efficient techniques that have been developed to date for equality handling in first-order ...
We show that superposition, a restricted form of paramodulation, can be combined with specifically d...
AbstractWe present a modification to the paramodulation inference system, where semantic equality an...
International audienceWe present an inference system for clauses with ordering constraints, called S...
We present an associative-commutative paramodulation calculus that generalizes the associative-commu...
We have previously shown that strict superposition together with merging paramodulation is refutatio...
A west ordering is a well-founded (strict partial) ordering on terms that satisfies the subterm pro...
We introduce a class of restrictions for the ordered paramodulation and superposition calculi (inspi...
AbstractWe introduce a class of restrictions for the ordered paramodulation and superposition calcul...
We introduce a class of restrictions for the ordered paramodulation and superposition calculi (inspi...
We introduce a class of restrictions for the ordered paramodulation and \u000Asuperposition calculi ...
Automated state-of-the-art theorem provers are typically optimised for particular strategies, and th...
We design new inference systems for total orderings by applying rewrite techniques to chaining calcu...
Abstract For many years, all existing completeness results for Knuth-Bendix completion and ordered p...
We define a formalism of equality constraints and use it to prove the completeness of what we have c...
The most efficient techniques that have been developed to date for equality handling in first-order ...
We show that superposition, a restricted form of paramodulation, can be combined with specifically d...
AbstractWe present a modification to the paramodulation inference system, where semantic equality an...
International audienceWe present an inference system for clauses with ordering constraints, called S...
We present an associative-commutative paramodulation calculus that generalizes the associative-commu...
We have previously shown that strict superposition together with merging paramodulation is refutatio...
A west ordering is a well-founded (strict partial) ordering on terms that satisfies the subterm pro...