AbstractWe consider the parameterized problems of whether a given set of clauses can be refuted within k resolution steps, and whether a given set of clauses contains an unsatisfiable subset of size at most k. We show that both problems are complete for the class W[1], the first level of the W-hierarchy of fixed-parameter intractable problems. Our results remain true if restricted to 3-SAT instances and/or to various restricted versions of resolution including tree-like resolution, input resolution, and read-once resolution. Applying a metatheorem of Frick and Grohe, we show that, restricted to classes of sets of clauses of locally bounded treewidth, the considered problems are fixed-parameter tractable. For example, the problems are fixed-...
Abstract. Input Cover Number (denoted by ) is introduced as a met-ric for diÆculty of propositional ...
We study classes of propositional contradictions based on the Least Number Principle (LNP) in the re...
Having good algorithms to verify tautologies as efficiently as possible is of prime interest in diff...
AbstractWe consider the parameterized problems of whether a given set of clauses can be refuted with...
This paper discusses the topic of the minimum width of a regular resolutionrefutation of a set of cl...
The importance of width as a resource in resolution theorem proving has been emphasized in work of B...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
The width of a resolution proof is the maximal number of literals in any clause of the proof. The sp...
The width of a resolution proof is the maximal number of literals in any clause of the proof. The sp...
We introduce a new way to measure the space needed in resolution refutations of CNF formulas in prop...
We examine the proof-theoretic strength of parameterized tree-like resolution—a proof sys-tem for th...
AbstractWe introduce a new way to measure the space needed in resolution refutations of CNF formulas...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
The Width-Size Method for resolution was recently introduced by Ben-Sasson and Wigderson (BSW): Sho...
For any unsatisfiable CNF formula we give an exponential lower bound on the size of resolutionrefuta...
Abstract. Input Cover Number (denoted by ) is introduced as a met-ric for diÆculty of propositional ...
We study classes of propositional contradictions based on the Least Number Principle (LNP) in the re...
Having good algorithms to verify tautologies as efficiently as possible is of prime interest in diff...
AbstractWe consider the parameterized problems of whether a given set of clauses can be refuted with...
This paper discusses the topic of the minimum width of a regular resolutionrefutation of a set of cl...
The importance of width as a resource in resolution theorem proving has been emphasized in work of B...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
The width of a resolution proof is the maximal number of literals in any clause of the proof. The sp...
The width of a resolution proof is the maximal number of literals in any clause of the proof. The sp...
We introduce a new way to measure the space needed in resolution refutations of CNF formulas in prop...
We examine the proof-theoretic strength of parameterized tree-like resolution—a proof sys-tem for th...
AbstractWe introduce a new way to measure the space needed in resolution refutations of CNF formulas...
We propose a proof-theoretic approach for gaining evidence that certain parameterized problems are n...
The Width-Size Method for resolution was recently introduced by Ben-Sasson and Wigderson (BSW): Sho...
For any unsatisfiable CNF formula we give an exponential lower bound on the size of resolutionrefuta...
Abstract. Input Cover Number (denoted by ) is introduced as a met-ric for diÆculty of propositional ...
We study classes of propositional contradictions based on the Least Number Principle (LNP) in the re...
Having good algorithms to verify tautologies as efficiently as possible is of prime interest in diff...