On the Maximum Satisfiability of Random Formulas
Abstract
Maximum satisfiability is a canonical NP-hard optimization problem that appears empirically hard for random instances. Let us say that a Conjunctive normal form (CNF) formula consisting of -clauses is -satisfiable if there exists a truth assignment satisfying of all clauses (observe that every -CNF is 0-satisfiable). Also, let denote a random -CNF on variables formed by selecting uniformly and independently out of all possible -clauses. It is easy to prove that for every and every in , there is such that if , then the probability that is -satisfiable tends to 0 as tends to infinity. We prove that there exists a sequence such that if then the probability that is -satisfiable tends to 1 as tends to infinity. The sequence tends to 0 exponentially fast in .
Keywords
Cite
@article{arxiv.math/0305151,
title = {On the Maximum Satisfiability of Random Formulas},
author = {Dimitris Achlioptas and Assaf Naor and Yuval Peres},
journal= {arXiv preprint arXiv:math/0305151},
year = {2007}
}