AbstractThe SLDNF resolution (SLD resolution with negation as failure) is often restricted to yield a safe rule, that is, negation as failure rule is adopted only in the case that the selected negative literal in each goal should be in ground. In this paper we investigate extensions of goals in SLDNF resolutions with the case of selecting non-ground negative literals. Since Shepherdson's proposal is thought of as most general [16, 18] we formally show how the success and failure sets by Sherpherdson's SLDNFS resolution are related with a fixpoint semantics, which is generalized to be concerned with atom sets involving the variables
AbstractWe introduce global SLS-resolution, a procedural semantics for well-founded negation as defi...
We consider propositional logic programs with negations. We define notions of constructive transform...
The proof theory of logic programming has been given by the SLDNF-resolution which has been proven c...
AbstractThe SLDNF resolution (SLD resolution with negation as failure) is often restricted to yield ...
We give a direct proof of the following theorem: if a goal Gσ is a logical consequence of the partia...
We consider a mode of an n-ary predicate symbol with respect to a logic program, which meets the aim...
AbstractSLDNF-resolution is a standard operational semantics for negation as (finite) failure. For s...
We propose a new, "top-down" definition of SLDNF-resolution which retains the spirit of th...
Providing a clean procedural semantics of the Negation As Failure rule in Logic Programming has been...
AbstractWe prove the completeness of SLDNF resolution and negation as failure for stratified, normal...
We propose a new negation rule for logic programming which derives existentially closed negative lit...
AbstractWe present a fixpoint semantics for disjunctive logic programs. We extend the concept of the...
AbstractWe propose a new negation rule for logic programming which derives existentially closed nega...
We introduce global SLS-resolution, a procedural semantics for well-founded negation as defined by V...
We introduce global SLS-resolution, a procedural semantics for well-founded negation as defined by V...
AbstractWe introduce global SLS-resolution, a procedural semantics for well-founded negation as defi...
We consider propositional logic programs with negations. We define notions of constructive transform...
The proof theory of logic programming has been given by the SLDNF-resolution which has been proven c...
AbstractThe SLDNF resolution (SLD resolution with negation as failure) is often restricted to yield ...
We give a direct proof of the following theorem: if a goal Gσ is a logical consequence of the partia...
We consider a mode of an n-ary predicate symbol with respect to a logic program, which meets the aim...
AbstractSLDNF-resolution is a standard operational semantics for negation as (finite) failure. For s...
We propose a new, "top-down" definition of SLDNF-resolution which retains the spirit of th...
Providing a clean procedural semantics of the Negation As Failure rule in Logic Programming has been...
AbstractWe prove the completeness of SLDNF resolution and negation as failure for stratified, normal...
We propose a new negation rule for logic programming which derives existentially closed negative lit...
AbstractWe present a fixpoint semantics for disjunctive logic programs. We extend the concept of the...
AbstractWe propose a new negation rule for logic programming which derives existentially closed nega...
We introduce global SLS-resolution, a procedural semantics for well-founded negation as defined by V...
We introduce global SLS-resolution, a procedural semantics for well-founded negation as defined by V...
AbstractWe introduce global SLS-resolution, a procedural semantics for well-founded negation as defi...
We consider propositional logic programs with negations. We define notions of constructive transform...
The proof theory of logic programming has been given by the SLDNF-resolution which has been proven c...