A dichotomy theorem for counting problems due to Creignou and Hermann states that or any nite set S of logical relations, the counting problem #SAT(S) is either in FP, or #P-complete. In the present paper we show a dichotomy theorem for polynomial evaluation. That is, we show that for a given set S, either there exists a VNP-complete family of polynomials associated to S, or the associated families of polynomials are all in VP. We give a concise characterization of the sets S that give rise to "easy" and "hard" polynomials. We also prove that several problems which were known to be #P-complete under Turing reductions only are in fact #P-complete under many-one reductions
AbstractWe determine the computational complexity of approximately counting the total weight of vari...
AbstractWe consider the average-case complexity of some otherwise undecidable or open Diophantine pr...
AbstractThe class of generalized satisfiability problems, introduced in 1978 by Schaefer, presents a...
A dichotomy theorem for counting problems due to Creignou and Hermann states that or any nite set S ...
Abstract. A dichotomy theorem for counting problems due to Creignou and Hermann states that or any f...
AbstractThe Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set...
Bulatov (2008) and Dyer and Richerby (2010) have established the following dichotomy for the countin...
The Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set of vari...
The Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set of vari...
Bulatov [Proceedings of the 35th International Colloquium on Automata, Languages and Programming (Pa...
Arithmetic complexity is the study of the required ressources for computing poynomials using only ar...
In Valiant developed an algebraic analogue of the theory of NP-completeness for computations of po...
In 1979 Valiant showed that the complexity class VP_e of families with polynomially bounded formula ...
One fundamental question in the context of the geometric complexity theory approach to the VP vs. VN...
AbstractValiant developed a nonuniform algebraic analogue of the theory of NP-completeness for compu...
AbstractWe determine the computational complexity of approximately counting the total weight of vari...
AbstractWe consider the average-case complexity of some otherwise undecidable or open Diophantine pr...
AbstractThe class of generalized satisfiability problems, introduced in 1978 by Schaefer, presents a...
A dichotomy theorem for counting problems due to Creignou and Hermann states that or any nite set S ...
Abstract. A dichotomy theorem for counting problems due to Creignou and Hermann states that or any f...
AbstractThe Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set...
Bulatov (2008) and Dyer and Richerby (2010) have established the following dichotomy for the countin...
The Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set of vari...
The Counting Constraint Satisfaction Problem (#CSP) can be expressed as follows: given a set of vari...
Bulatov [Proceedings of the 35th International Colloquium on Automata, Languages and Programming (Pa...
Arithmetic complexity is the study of the required ressources for computing poynomials using only ar...
In Valiant developed an algebraic analogue of the theory of NP-completeness for computations of po...
In 1979 Valiant showed that the complexity class VP_e of families with polynomially bounded formula ...
One fundamental question in the context of the geometric complexity theory approach to the VP vs. VN...
AbstractValiant developed a nonuniform algebraic analogue of the theory of NP-completeness for compu...
AbstractWe determine the computational complexity of approximately counting the total weight of vari...
AbstractWe consider the average-case complexity of some otherwise undecidable or open Diophantine pr...
AbstractThe class of generalized satisfiability problems, introduced in 1978 by Schaefer, presents a...