In this paper we study fixpoints of operators on lattices and bilattices in a systematic and principled way. The key concept is that of an approximating operator, a monotone operator on the product bilattice, which gives approximate information on the original operator in an intuitive and well-defined way. With any given approximating operator our theory associates several different types of fixpoints, including the Kripke-Kleene fixpoint, stable fixpoints, and the well-founded fixpoint, and relates them to fixpoints of operators being approximated. Compared to our earlier work on approximation theory, the contribution of this paper is that we provide an alternative, more intuitive, and better motivated construction of the well-founded and ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators which gen...
Abstract. We introduce the class of bilattice-based annotated logic programs (BAPs). These programs ...
In this paper we study fixpoints of operators on lattices and bilattices in a systematic and princip...
In this paper we study fixpoints of operators on lattices and bilattices in a systematic and princip...
AbstractIn this paper we study fixpoints of operators on lattices and bilattices in a systematic and...
We present {\em Approximation theory}, an extension of Tarski's least fixpoint theory for nonmonoton...
We study xpoints of operators on lattices. To this end we introduce the notion of an approximation o...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
Approximation fixpoint theory (AFT) is an abstract and general algebraic framework for studying the ...
Approximation fixpoint theory (AFT) is an algebraical study of fixpoints of lattice operators. This ...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...
Using the notion of preconcept, we generalize Pawlak’s approximation operators from a one-dimensiona...
AbstractWe investigate various fixpoint operators in a semiring-based setting that models a general ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators which gen...
Abstract. We introduce the class of bilattice-based annotated logic programs (BAPs). These programs ...
In this paper we study fixpoints of operators on lattices and bilattices in a systematic and princip...
In this paper we study fixpoints of operators on lattices and bilattices in a systematic and princip...
AbstractIn this paper we study fixpoints of operators on lattices and bilattices in a systematic and...
We present {\em Approximation theory}, an extension of Tarski's least fixpoint theory for nonmonoton...
We study xpoints of operators on lattices. To this end we introduce the notion of an approximation o...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
Approximation fixpoint theory (AFT) is an abstract and general algebraic framework for studying the ...
Approximation fixpoint theory (AFT) is an algebraical study of fixpoints of lattice operators. This ...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...
Using the notion of preconcept, we generalize Pawlak’s approximation operators from a one-dimensiona...
AbstractWe investigate various fixpoint operators in a semiring-based setting that models a general ...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Algebraical fixpoint theory is an invaluable instrument for studying semantics of logics. For exampl...
Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators which gen...
Abstract. We introduce the class of bilattice-based annotated logic programs (BAPs). These programs ...