We introduce and study counting propositional logic, an extension of propositional logic with counting quantifiers. This new kind of quantification makes it possible to express that the argument formula is true in a certain portion of all possible interpretations. We show that this logic, beyond admitting a satisfactory proof-theoretical treatment, can be related to computational complexity: the complexity of the underlying decision problem perfectly matches the appropriate level of Wagner's counting hierarchy
In this paper, we examine the computational complexity of various natural one-variable fragments of ...
This is the author's accepted versionFinal version available from Elsevier via the DOI in this recor...
AbstractWe give a logic-based framework for defining counting problems and show that it exactly capt...
We introduce and study counting propositional logic, an extension of propositional logic with counti...
Counting propositional logic was recently introduced in relation to randomized computation and shown...
Counting propositional logic was recently introduced in relation to randomized computation and shown...
We present quantitative logics with two-step semantics based on the framework of quantitative logics...
ii Consider the following variant of quantified propositional logic. A new, parallel extension rule ...
This paper considers the structure consisting of the set of all words over a given alphabet together...
The counting complexity classes are defined in terms of the number of accepting computation paths of...
Abstract. By introducing a parallel extension rule that is aware of inde-pendence of the introduced ...
We establish new, and surprisingly tight, connections between propositionalproof complexity and fini...
This paper considers the structure consisting of the set of all words over a given alphabet together...
Investigating Logics for Feasible Computation The most celebrated open problem in theoretical comput...
Abstract. The computational complexity of the provability problem in systems of modal proposi-tional...
In this paper, we examine the computational complexity of various natural one-variable fragments of ...
This is the author's accepted versionFinal version available from Elsevier via the DOI in this recor...
AbstractWe give a logic-based framework for defining counting problems and show that it exactly capt...
We introduce and study counting propositional logic, an extension of propositional logic with counti...
Counting propositional logic was recently introduced in relation to randomized computation and shown...
Counting propositional logic was recently introduced in relation to randomized computation and shown...
We present quantitative logics with two-step semantics based on the framework of quantitative logics...
ii Consider the following variant of quantified propositional logic. A new, parallel extension rule ...
This paper considers the structure consisting of the set of all words over a given alphabet together...
The counting complexity classes are defined in terms of the number of accepting computation paths of...
Abstract. By introducing a parallel extension rule that is aware of inde-pendence of the introduced ...
We establish new, and surprisingly tight, connections between propositionalproof complexity and fini...
This paper considers the structure consisting of the set of all words over a given alphabet together...
Investigating Logics for Feasible Computation The most celebrated open problem in theoretical comput...
Abstract. The computational complexity of the provability problem in systems of modal proposi-tional...
In this paper, we examine the computational complexity of various natural one-variable fragments of ...
This is the author's accepted versionFinal version available from Elsevier via the DOI in this recor...
AbstractWe give a logic-based framework for defining counting problems and show that it exactly capt...