As is the case for other logics, a number of complexity-related questions can be posed in the context of many-valued logic. Some of these, such as the complexity of the sets of satisfiable and valid formulas in various logics, are completely standard; others only make sense in a many-valued context. In this overview I concentrate on two kinds of complexity problems related to many-valued logic: first, I discuss the complexity of the membership problem in various languages, such as the satisfiable, respectively, the valid formulas in some well-known logics. Second, I discuss the size of representations of many-valued connectives and quantifiers, because this has a direct impact on the complexity of many kinds of deduction systems. I include ...
The problem to be studied for this thesis was that of whether the usual statement calculus is a suit...
AbstractA general approach to automated theorem proving for all first-order finite-valued logics tha...
In this paper a unified classification is proposed of the rules of inference of classical, modal and...
We survey complexity results concerning a family of propositional many-valued logics. In particular,...
Multivalued logics have a long tradition in the philosophy and logic literature that originates from...
Many-valued logics were developed as an attempt to handle philosophical doubts about the "law of exc...
In this article, we compare models for many-valued probabilistic reasoning from the point of view of...
The paper deals with the question of the applicability of systems of many-valued logics. Those syste...
2nd edition. Many-valued logics are those logics that have more than the two classical truth values,...
We present n-valued first-order logics with a purely probabilistic semantics. We then introduce a ne...
To every many-valued logic L we associate a logic LS obtained from L by the adding of a storage oper...
. We present many-valued disjunctive logic programs in which classical disjunctive logic program cla...
We present a method for testing the validity for any finite many-valued logic by using simple transf...
We introduce probabilistic many-valued logic programs in which the implication connective is interpr...
AbstractMcNaughton functions play the same role in Łukasiewicz logics as Boolean functions do in cla...
The problem to be studied for this thesis was that of whether the usual statement calculus is a suit...
AbstractA general approach to automated theorem proving for all first-order finite-valued logics tha...
In this paper a unified classification is proposed of the rules of inference of classical, modal and...
We survey complexity results concerning a family of propositional many-valued logics. In particular,...
Multivalued logics have a long tradition in the philosophy and logic literature that originates from...
Many-valued logics were developed as an attempt to handle philosophical doubts about the "law of exc...
In this article, we compare models for many-valued probabilistic reasoning from the point of view of...
The paper deals with the question of the applicability of systems of many-valued logics. Those syste...
2nd edition. Many-valued logics are those logics that have more than the two classical truth values,...
We present n-valued first-order logics with a purely probabilistic semantics. We then introduce a ne...
To every many-valued logic L we associate a logic LS obtained from L by the adding of a storage oper...
. We present many-valued disjunctive logic programs in which classical disjunctive logic program cla...
We present a method for testing the validity for any finite many-valued logic by using simple transf...
We introduce probabilistic many-valued logic programs in which the implication connective is interpr...
AbstractMcNaughton functions play the same role in Łukasiewicz logics as Boolean functions do in cla...
The problem to be studied for this thesis was that of whether the usual statement calculus is a suit...
AbstractA general approach to automated theorem proving for all first-order finite-valued logics tha...
In this paper a unified classification is proposed of the rules of inference of classical, modal and...