Unsatisfiable CNF Formulas need many Conflicts
Discrete Mathematics
2010-09-07 v2
Abstract
A pair of clauses in a CNF formula constitutes a conflict if there is a variable that occurs positively in one clause and negatively in the other. A CNF formula without any conflicts is satisfiable. The Lovasz Local Lemma implies that a k-CNF formula is satisfiable if each clause conflicts with at most 2^k/e-1 clauses. It does not, however, give any good bound on how many conflicts an unsatisfiable formula has globally. We show here that every unsatisfiable k-CNF formula requires 2.69^k conflicts and there exist unsatisfiable k-CNF formulas with 3.51^k conflicts.
Cite
@article{arxiv.0806.1148,
title = {Unsatisfiable CNF Formulas need many Conflicts},
author = {Dominik Scheder and Philipp Zumstein},
journal= {arXiv preprint arXiv:0806.1148},
year = {2010}
}
Comments
new version; added an upper bound on the number of conflicts