AbstractComplete logic programs augmented with the domain-closure axiom are proposed as the reference theory for logic programming with negation as failure. An inference rule corresponding to “proof by case analysis” is proved correct within this framework. As a major consequence, the completeness results for SLD resolution and negation as failure still hold. An interesting outcome is that some novel operational properties of SLD resolution can be proved
AbstractA general logic program is a set of rules that have both positive and negative subgoals. We ...
AbstractAlmost all constraint logic programming systems include negation, yet nowhere has a sound op...
We propose a new negation rule for logic programming which derives existentially closed negative lit...
AbstractComplete logic programs augmented with the domain-closure axiom are proposed as the referenc...
Providing a clean procedural semantics of the Negation As Failure rule in Logic Programming has been...
AbstractThe notions of acyclicity and acceptability fail to characterize termination of general logi...
D Various semantics for logic programs with negation are described in terms of a dualized program to...
We prove the completeness of extended SLDNF-resolution for the new class of "-programs with res...
Various semantics for logic programs with negation are described in terms of a dualized program toge...
We give a direct proof of the following theorem: if a goal Gσ is a logical consequence of the partia...
AbstractClark's program completion offers an intuitive first-order semantics for logic programs. Unf...
Abstract goes here. 1 Introduction Let us recall that a logic program is a set of clauses of the f...
AbstractWe prove the completeness of SLDNF resolution and negation as failure for stratified, normal...
The focus of the research is the semantics of logic programming. Concepts in the currently used sem...
The proof theory of logic programming has been given by the SLDNF-resolution which has been proven c...
AbstractA general logic program is a set of rules that have both positive and negative subgoals. We ...
AbstractAlmost all constraint logic programming systems include negation, yet nowhere has a sound op...
We propose a new negation rule for logic programming which derives existentially closed negative lit...
AbstractComplete logic programs augmented with the domain-closure axiom are proposed as the referenc...
Providing a clean procedural semantics of the Negation As Failure rule in Logic Programming has been...
AbstractThe notions of acyclicity and acceptability fail to characterize termination of general logi...
D Various semantics for logic programs with negation are described in terms of a dualized program to...
We prove the completeness of extended SLDNF-resolution for the new class of "-programs with res...
Various semantics for logic programs with negation are described in terms of a dualized program toge...
We give a direct proof of the following theorem: if a goal Gσ is a logical consequence of the partia...
AbstractClark's program completion offers an intuitive first-order semantics for logic programs. Unf...
Abstract goes here. 1 Introduction Let us recall that a logic program is a set of clauses of the f...
AbstractWe prove the completeness of SLDNF resolution and negation as failure for stratified, normal...
The focus of the research is the semantics of logic programming. Concepts in the currently used sem...
The proof theory of logic programming has been given by the SLDNF-resolution which has been proven c...
AbstractA general logic program is a set of rules that have both positive and negative subgoals. We ...
AbstractAlmost all constraint logic programming systems include negation, yet nowhere has a sound op...
We propose a new negation rule for logic programming which derives existentially closed negative lit...