AbstractThe class of generalized satisfiability problems, introduced in 1978 by Schaefer, presents a uniform way of studying the complexity of satisfiability problems with special conditions. The complexity of each decision and counting problem in this class depends on the involved logical relations. In 1979, Valiant defined the class #P, the class of functions definable as the number of accepting computations of a polynomial-time nondeterministic Turing machine. Clearly, all satisfiability counting problems belong to this class #P. We prove a Dichotomy Theorem for generalized satisfiability counting problems. That is, if all logical relations involved in a generalized satisfiability counting problem are affine then the number of satisfying...
Colloque avec actes et comité de lecture.The unique satisfiability problem, that asks whether there ...
The Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set of vari...
Schaefer (1978) introduced a generalized satisfiability problem SAT(S) and showed that, depending on...
AbstractThe class of generalized satisfiability problems, introduced in 1978 by Schaefer, presents a...
AbstractWe give a logic-based framework for defining counting problems and show that it exactly capt...
A dichotomy theorem for counting problems due to Creignou and Hermann states that or any nite set S ...
SIGLEAvailable at INIST (FR), Document Supply Service, under shelf-number : RP 12514 / INIST-CNRS - ...
AbstractA dichotomy theorem for a class of decision problems is a result asserting that certain prob...
AbstractWe present four polynomial space and exponential time algorithms for variants of the EXACT S...
The counting complexity classes are defined in terms of the number of accepting computation paths of...
We prove that the counting problems #1-in-3Sat, #Not-All-Equal 3Sat and #3-Colorability, whose decis...
Abstract. A dichotomy theorem for counting problems due to Creignou and Hermann states that or any f...
The complexity class Θ^P_2, which is the class of languages recognizable by deterministic Turing mac...
AbstractWe study the complexity of an infinite class of optimization satisfiability problems. Each p...
Following the approach of Hemaspaandra and Vollmer, we can define counting complexity classes #·C fo...
Colloque avec actes et comité de lecture.The unique satisfiability problem, that asks whether there ...
The Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set of vari...
Schaefer (1978) introduced a generalized satisfiability problem SAT(S) and showed that, depending on...
AbstractThe class of generalized satisfiability problems, introduced in 1978 by Schaefer, presents a...
AbstractWe give a logic-based framework for defining counting problems and show that it exactly capt...
A dichotomy theorem for counting problems due to Creignou and Hermann states that or any nite set S ...
SIGLEAvailable at INIST (FR), Document Supply Service, under shelf-number : RP 12514 / INIST-CNRS - ...
AbstractA dichotomy theorem for a class of decision problems is a result asserting that certain prob...
AbstractWe present four polynomial space and exponential time algorithms for variants of the EXACT S...
The counting complexity classes are defined in terms of the number of accepting computation paths of...
We prove that the counting problems #1-in-3Sat, #Not-All-Equal 3Sat and #3-Colorability, whose decis...
Abstract. A dichotomy theorem for counting problems due to Creignou and Hermann states that or any f...
The complexity class Θ^P_2, which is the class of languages recognizable by deterministic Turing mac...
AbstractWe study the complexity of an infinite class of optimization satisfiability problems. Each p...
Following the approach of Hemaspaandra and Vollmer, we can define counting complexity classes #·C fo...
Colloque avec actes et comité de lecture.The unique satisfiability problem, that asks whether there ...
The Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set of vari...
Schaefer (1978) introduced a generalized satisfiability problem SAT(S) and showed that, depending on...