AbstractThis paper mainly studies quantitative possibility theory in the framework of domain. Using Sugeno's integral and the notion of module a duality theorem is obtained between the extended possibilistic powerdomain over a continuous domain X and the extended fuzzy predicates on X. This duality provides a reassuring link between the spaces of quantitative meaning and the corresponding Scott-topological space
Possibility theory is a new mathematical theory for the representation of uncertainty. It is related...
This paper studies the structure of qualitative capacities, that is, monotonic set-functions, when t...
New semantics for numerical values given to possibility measures are provided. For epistemic possibi...
We provide a domain-theoretic framework for possibility theory by studying possibility measures on t...
AbstractIn this paper, we survey some quantitative and qualitative approaches to uncertainty managem...
AbstractGiven a topological space X and a complete lattice L, we study the space of L-predicatesFL(X...
AbstractPossibilistic logic is a quantitative method for uncertainty reasoning that is closely relat...
AbstractIn this paper we present several fuzzy logics trying to capture different notions of necessi...
AbstractAn extension of the resolution principle was recently proposed by Dubois and Prade for logic...
AbstractAmple fields play an important role in possibility theory. Based on the ample fields in poss...
AbstractThe notion of conditional possibility derived from marginal possibility measures has receive...
In this paper we present several fuzzy logics trying to capture different notions of necessity (in t...
Based on possibility theory and multi-valued logic and taking inspiration from the seminal work in p...
AbstractThis paper presents a formal characterization of the major concepts and constructs of fuzzy ...
This paper proposes a concise overview of the role of possibility theory in logical approaches to re...
Possibility theory is a new mathematical theory for the representation of uncertainty. It is related...
This paper studies the structure of qualitative capacities, that is, monotonic set-functions, when t...
New semantics for numerical values given to possibility measures are provided. For epistemic possibi...
We provide a domain-theoretic framework for possibility theory by studying possibility measures on t...
AbstractIn this paper, we survey some quantitative and qualitative approaches to uncertainty managem...
AbstractGiven a topological space X and a complete lattice L, we study the space of L-predicatesFL(X...
AbstractPossibilistic logic is a quantitative method for uncertainty reasoning that is closely relat...
AbstractIn this paper we present several fuzzy logics trying to capture different notions of necessi...
AbstractAn extension of the resolution principle was recently proposed by Dubois and Prade for logic...
AbstractAmple fields play an important role in possibility theory. Based on the ample fields in poss...
AbstractThe notion of conditional possibility derived from marginal possibility measures has receive...
In this paper we present several fuzzy logics trying to capture different notions of necessity (in t...
Based on possibility theory and multi-valued logic and taking inspiration from the seminal work in p...
AbstractThis paper presents a formal characterization of the major concepts and constructs of fuzzy ...
This paper proposes a concise overview of the role of possibility theory in logical approaches to re...
Possibility theory is a new mathematical theory for the representation of uncertainty. It is related...
This paper studies the structure of qualitative capacities, that is, monotonic set-functions, when t...
New semantics for numerical values given to possibility measures are provided. For epistemic possibi...
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