International audienceWell-founded fixed points have been used in several areas of knowledge representation and reasoning and in particular to give semantics to logic programs involving negation. They are an important ingredient of approximation fixed point theory. We study the logical properties of the (parametric) well-founded fixed point operation. We show that the operation satisfies several, but not all of the standard equational properties of fixed point operations described by the axioms of iteration theories
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
There is a vibrant (but minority) community among philosophical logicians seeking to resolve the par...
In the field of knowledge representation and reasoning, many different logics are developed. Often, ...
International audienceWe study the logical properties of the (parametric) well-founded fixed point o...
© 2015 Cambridge University Press. Recent advances in knowledge compilation introduced techniques to...
We develop a fixed-point extension of quantitative equational logic and give semantics in one-bounde...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...
ABSTRACT. Michael Kremer defines fixed-point logics of truth based on Saul Kripke’s fixed point sema...
Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators which gen...
We prove the following completeness theorem: If the fixed point operation over a category is defined...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
AbstractWe prove the following completeness theorem: If the fixed point operation over a category is...
AbstractFrom a declarative programming point of view, Manna and Shamir's optimal fixedpoint semantic...
AbstractThe alternating fixpoint of a logic program with negation is defined constructively. The und...
All known structures involving a constructively obtainable fixed point (or it-eration) operation sat...
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
There is a vibrant (but minority) community among philosophical logicians seeking to resolve the par...
In the field of knowledge representation and reasoning, many different logics are developed. Often, ...
International audienceWe study the logical properties of the (parametric) well-founded fixed point o...
© 2015 Cambridge University Press. Recent advances in knowledge compilation introduced techniques to...
We develop a fixed-point extension of quantitative equational logic and give semantics in one-bounde...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...
ABSTRACT. Michael Kremer defines fixed-point logics of truth based on Saul Kripke’s fixed point sema...
Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators which gen...
We prove the following completeness theorem: If the fixed point operation over a category is defined...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
AbstractWe prove the following completeness theorem: If the fixed point operation over a category is...
AbstractFrom a declarative programming point of view, Manna and Shamir's optimal fixedpoint semantic...
AbstractThe alternating fixpoint of a logic program with negation is defined constructively. The und...
All known structures involving a constructively obtainable fixed point (or it-eration) operation sat...
AbstractThe variety of semantical approaches that have been invented for logic programs is quite bro...
There is a vibrant (but minority) community among philosophical logicians seeking to resolve the par...
In the field of knowledge representation and reasoning, many different logics are developed. Often, ...