Approximation fixpoint theory (AFT) is an algebraical study of fixpoints of lattice operators. This theory induces all major semantics of logic programming, autoepistemic logic, default logic and abstract argumentation frameworks and unifies these formalisms. Recently, AFT was extended with the notion of a grounded fixpoint. This type of fixpoint formalises common intuitions from various application domains of AFT. The study of groundedness was limited to exact lattice points; in this paper, we extend it to the bilattice: for an approximator A of O, we define A-groundedness. We show that all partial A-stable fixpoints are A-grounded and that the A-well-founded fixpoint is uniquely characterised as the least precise A-grounded fixpoint. We ...
Abstract. We introduce the fixpoint definitions, which is a reformula-tion of fixpoint logic constru...
© 2017 Elsevier B.V. Active integrity constraints (AICs) constitute a formalism to associate with a ...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...
Approximation fixpoint theory (AFT) is an algebraical study of fixpoints of lattice operators. This ...
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...
In the field of knowledge representation and reasoning, many different logics are developed. Often, ...
In various domains of logic, researchers have made use of a similar intuition: that facts (or models...
In the field of knowledge representation and reasoning, many different logics are developed. Often, ...
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...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
We present {\em Approximation theory}, an extension of Tarski's least fixpoint theory for nonmonoton...
Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotonefunction over a complete...
Approximation fixpoint theory (AFT) is an abstract and general algebraic framework for studying the ...
Abstract. We introduce the fixpoint definitions, which is a reformula-tion of fixpoint logic constru...
© 2017 Elsevier B.V. Active integrity constraints (AICs) constitute a formalism to associate with a ...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...
Approximation fixpoint theory (AFT) is an algebraical study of fixpoints of lattice operators. This ...
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...
In the field of knowledge representation and reasoning, many different logics are developed. Often, ...
In various domains of logic, researchers have made use of a similar intuition: that facts (or models...
In the field of knowledge representation and reasoning, many different logics are developed. Often, ...
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...
Approximation Fixpoint Theory was developed as a fixpoint theory of lattice operators that provides ...
We present {\em Approximation theory}, an extension of Tarski's least fixpoint theory for nonmonoton...
Knaster-Tarski's theorem, characterising the greatest fixpoint of a monotonefunction over a complete...
Approximation fixpoint theory (AFT) is an abstract and general algebraic framework for studying the ...
Abstract. We introduce the fixpoint definitions, which is a reformula-tion of fixpoint logic constru...
© 2017 Elsevier B.V. Active integrity constraints (AICs) constitute a formalism to associate with a ...
Abstract. Approximation theory is a fixpoint theory of general (monotone and non-monotone) operators...