In [Prz91], Przymusinski introduced the partial (or 3-valued) stable model semantics which extends the (2-valued) stable model semantics defined originally by Gelfond and Lifschitz [GL88]. In this paper we describe a procedure to compute the collection of all partial stable models of an extended disjunctive logic program. This procedure consists in transforming an extended disjunctive logic program into a constrained disjunctive program free of negation-by-default whose set of 2-valued minimal models corresponds to the set of partial stable models of the original program. (Also cross-referenced as UMIACS-TR-95-49
In this paper, we introduce new semantics (that we call D3-WFS-DCOMP) and compare it with the stable...
In this paper, we introduce new semantics (that we call D3-WFS-DCOMP) and compare it with the stable...
AbstractThis paper investigates the expressive power and complexity of partial model semantics for d...
We define a simple logical semantics based on minimal models in / Lukasiewicz's 3-valued logic,...
AbstractThere are three most prominent semantics defined for certain subclasses of disjunctive logic...
AbstractWe show that two recently presented proposals for the semantics of normal logic programs, na...
We introduce 3-valued stable models which are a natural generalization of standard (2-valued) stable...
AbstractStable generated models for extended generalized logic programs with two kinds of negation p...
AbstractDisjunctive logic programs have become a powerful tool in knowledge representation and commo...
We present a general definition of stable models for generalized logic programs which a: subsumes th...
For a general logic program, a set of n + 1 logic values is considered and an undened value denoted ...
AbstractUnderstanding the stable model semantics is an important topic in logic programming and nonm...
We report our research on semantics for normal/disjunctive programs. One of the most well known sema...
In analogy to the Davis--Putnam procedure we develop a new procedure for computing stable models of ...
In analogy to the Davis-Putnam procedure we develop a new procedure for computing stable models of p...
In this paper, we introduce new semantics (that we call D3-WFS-DCOMP) and compare it with the stable...
In this paper, we introduce new semantics (that we call D3-WFS-DCOMP) and compare it with the stable...
AbstractThis paper investigates the expressive power and complexity of partial model semantics for d...
We define a simple logical semantics based on minimal models in / Lukasiewicz's 3-valued logic,...
AbstractThere are three most prominent semantics defined for certain subclasses of disjunctive logic...
AbstractWe show that two recently presented proposals for the semantics of normal logic programs, na...
We introduce 3-valued stable models which are a natural generalization of standard (2-valued) stable...
AbstractStable generated models for extended generalized logic programs with two kinds of negation p...
AbstractDisjunctive logic programs have become a powerful tool in knowledge representation and commo...
We present a general definition of stable models for generalized logic programs which a: subsumes th...
For a general logic program, a set of n + 1 logic values is considered and an undened value denoted ...
AbstractUnderstanding the stable model semantics is an important topic in logic programming and nonm...
We report our research on semantics for normal/disjunctive programs. One of the most well known sema...
In analogy to the Davis--Putnam procedure we develop a new procedure for computing stable models of ...
In analogy to the Davis-Putnam procedure we develop a new procedure for computing stable models of p...
In this paper, we introduce new semantics (that we call D3-WFS-DCOMP) and compare it with the stable...
In this paper, we introduce new semantics (that we call D3-WFS-DCOMP) and compare it with the stable...
AbstractThis paper investigates the expressive power and complexity of partial model semantics for d...