AbstractIn this paper, we study linear CNF formulas generalizing linear hypergraphs under combinatorial and complexity theoretical aspects w.r.t. SAT. We establish NP-completeness of SAT for the unrestricted linear formula class, and we show the equivalence of NP-completeness of restricted uniform linear formula classes w.r.t. SAT and the existence of unsatisfiable uniform linear witness formulas. On that basis we prove NP-completeness of SAT for uniform linear classes in a resolution-based manner by constructing large-sized formulas. Interested in small witness formulas, we exhibit some combinatorial features of linear hypergraphs closely related to latin squares and finite projective planes helping to construct rather dense, and significa...
Finding a satisfying assignment for a $k$-CNF formula $(k \geq 3)$, assuming such exists, is a notor...
In the first part of this work (FSTTCS’10) we have shown that the satisfiability of CNF formulas wit...
AbstractMethods for partitioning large propositional formulas are investigated, with the goal of pro...
In this paper, we study {em linear} CNF formulas generalizing linear hypergraphs under combinatorial...
AbstractIn this paper, we study linear CNF formulas generalizing linear hypergraphs under combinator...
XSAT and NAE-SAT are important variants of the propositional satisfiability problem (SAT). Both are ...
We call a CNF formula {em linear} if any two clauses have at most one variable in common. We show t...
The Boolean conjunctive normal form (CNF) satisfiability problem, called SAT for short, gets as inpu...
We study the propositional satisfiability problem (SAT) on classes of CNF formulas (formulas in Conj...
We show that the Satisfiability (SAT) problem for CNF formulas with ββ-acyclic hypergraphs can be so...
Proposing a fibre view on propositional clause sets, we investigate satisfiability testing for sever...
Recognition of minimal unsatisfiable CNF formulas (unsatisfiable CNF formulas which become satisfiab...
We propose a new perspective on propositional clause sets and on that basis we investigate (new) pol...
In the first part of this work (FSTTCS’10) we have shown that the satisfiability of CNF formulas wit...
AbstractRecognition of minimal unsatisfiable CNF formulas (unsatisfiable CNF formulas which become s...
Finding a satisfying assignment for a $k$-CNF formula $(k \geq 3)$, assuming such exists, is a notor...
In the first part of this work (FSTTCS’10) we have shown that the satisfiability of CNF formulas wit...
AbstractMethods for partitioning large propositional formulas are investigated, with the goal of pro...
In this paper, we study {em linear} CNF formulas generalizing linear hypergraphs under combinatorial...
AbstractIn this paper, we study linear CNF formulas generalizing linear hypergraphs under combinator...
XSAT and NAE-SAT are important variants of the propositional satisfiability problem (SAT). Both are ...
We call a CNF formula {em linear} if any two clauses have at most one variable in common. We show t...
The Boolean conjunctive normal form (CNF) satisfiability problem, called SAT for short, gets as inpu...
We study the propositional satisfiability problem (SAT) on classes of CNF formulas (formulas in Conj...
We show that the Satisfiability (SAT) problem for CNF formulas with ββ-acyclic hypergraphs can be so...
Proposing a fibre view on propositional clause sets, we investigate satisfiability testing for sever...
Recognition of minimal unsatisfiable CNF formulas (unsatisfiable CNF formulas which become satisfiab...
We propose a new perspective on propositional clause sets and on that basis we investigate (new) pol...
In the first part of this work (FSTTCS’10) we have shown that the satisfiability of CNF formulas wit...
AbstractRecognition of minimal unsatisfiable CNF formulas (unsatisfiable CNF formulas which become s...
Finding a satisfying assignment for a $k$-CNF formula $(k \geq 3)$, assuming such exists, is a notor...
In the first part of this work (FSTTCS’10) we have shown that the satisfiability of CNF formulas wit...
AbstractMethods for partitioning large propositional formulas are investigated, with the goal of pro...