Ordered logic is the theoretical foundation of the LOCO programing language [9] which combines the declarative elegance and power of logic programming with asvantages of object-oriented systems. Ordered logic is based on a partially ordered structure of logical theories or objects. Objects are entities that may contain positive as well as negative information represented by rules. The partial order allows for the definition of a preference structure on these objects and consequently also on the information they contain. The result is a simple yet powerful logic that models classical as well as non-monotonic inference mechanisms. The central issue of this paper is the definition of a universal fixpoint semantics for ordered logic progr...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
We consider rather general operators mapping valuations to (sets of) valuations in the context of th...
Abstract. We propose to regard a diagnostic system as an ordered logic theory, i.e. a partially orde...
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
van Gelder's alternating fixpoint theory has proven to be a very useful tool for unifying and charac...
AbstractPrevious researchers have proposed extensions of logic programming to deal with true negatio...
The variety of semantical approaches that have been invented for logic programs is quite broad, draw...
The different properties characterizing the operational behavior of logic programs can be organized ...
The question how knowledge can be represented by means of logic programs with negation has been a dr...
Abstract. Recently, notions of equivalence for Answer Set Programming have been studied intensively ...
The extended answer set semantics for logic programs allows for the defeat of rules to resolve cont...
Logic Programs with Ordered Disjunction (LPODs) extend classical logic programs with the capability ...
Ordered logic programming (OLP) is an elegant, yet powerful extension of logic programming with the ...
Abstract. The stable semantics has become a prime candidate for knowledge representation and reasoni...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
We consider rather general operators mapping valuations to (sets of) valuations in the context of th...
Abstract. We propose to regard a diagnostic system as an ordered logic theory, i.e. a partially orde...
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
van Gelder's alternating fixpoint theory has proven to be a very useful tool for unifying and charac...
AbstractPrevious researchers have proposed extensions of logic programming to deal with true negatio...
The variety of semantical approaches that have been invented for logic programs is quite broad, draw...
The different properties characterizing the operational behavior of logic programs can be organized ...
The question how knowledge can be represented by means of logic programs with negation has been a dr...
Abstract. Recently, notions of equivalence for Answer Set Programming have been studied intensively ...
The extended answer set semantics for logic programs allows for the defeat of rules to resolve cont...
Logic Programs with Ordered Disjunction (LPODs) extend classical logic programs with the capability ...
Ordered logic programming (OLP) is an elegant, yet powerful extension of logic programming with the ...
Abstract. The stable semantics has become a prime candidate for knowledge representation and reasoni...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
We consider rather general operators mapping valuations to (sets of) valuations in the context of th...