We introduce a fibrational semantics for many-valued logic programming, use it to define an SLD-resolution for annotation-free many valued logic programs as defined by Fitting, and prove a soundness and completeness result relating the two. We show that fibrational semantics corresponds with the traditional declarative (ground) semantics and deduce a soundness and completeness result for our SLD-resolution algorithm with respect to the ground semantics.</p
Coalgebra may be used to provide semantics for SLD-derivations, both finite and infinite. We first g...
AbstractClark's program completion offers an intuitive first-order semantics for logic programs. Unf...
International audienceA propositional logic program P may be identified with a $P_fP_f$-coalgebra on...
We introduce a fibrational semantics for many-valued logic programming, use it to define an SLD-reso...
International audienceWe introduce a fibrational semantics for many-valued logic programming, use it ...
The proof theory of logic programming has been given by the SLDNF-resolution which has been proven c...
We study strictly level-decreasing logic programs (sld-programs) as defined earlier by the present a...
In this paper we present the class of general logic programs which has a special kind of stratificat...
AbstractWe study the expressive of two semantics far deductive databases and logic programming: the ...
The paper defines a new declarative semantics for logic programs, which is based on interpretations ...
AbstractThis paper investigates the class of acyclic programs, programs with the usual hierarchical ...
AbstractSLDNF-resolution is a standard operational semantics for negation as (finite) failure. For s...
We consider propositional logic programs with negations. We define notions of constructive transform...
AbstractFor logic programs that compute infinite atoms, SLD-resolution is not complete with respect ...
Abstract. Large databases obtained by the data integration of different source databases can be inco...
Coalgebra may be used to provide semantics for SLD-derivations, both finite and infinite. We first g...
AbstractClark's program completion offers an intuitive first-order semantics for logic programs. Unf...
International audienceA propositional logic program P may be identified with a $P_fP_f$-coalgebra on...
We introduce a fibrational semantics for many-valued logic programming, use it to define an SLD-reso...
International audienceWe introduce a fibrational semantics for many-valued logic programming, use it ...
The proof theory of logic programming has been given by the SLDNF-resolution which has been proven c...
We study strictly level-decreasing logic programs (sld-programs) as defined earlier by the present a...
In this paper we present the class of general logic programs which has a special kind of stratificat...
AbstractWe study the expressive of two semantics far deductive databases and logic programming: the ...
The paper defines a new declarative semantics for logic programs, which is based on interpretations ...
AbstractThis paper investigates the class of acyclic programs, programs with the usual hierarchical ...
AbstractSLDNF-resolution is a standard operational semantics for negation as (finite) failure. For s...
We consider propositional logic programs with negations. We define notions of constructive transform...
AbstractFor logic programs that compute infinite atoms, SLD-resolution is not complete with respect ...
Abstract. Large databases obtained by the data integration of different source databases can be inco...
Coalgebra may be used to provide semantics for SLD-derivations, both finite and infinite. We first g...
AbstractClark's program completion offers an intuitive first-order semantics for logic programs. Unf...
International audienceA propositional logic program P may be identified with a $P_fP_f$-coalgebra on...