Title :
On the maximum satisfiability of random formulas
Author :
Achlioptas, Dimitris ; Naor, Assaf ; Peres, Yuval
Author_Institution :
Microsoft Res., Redmond, WA, USA
Abstract :
Maximum satisfiability is a canonical NP-complete problem that appears empirically hard for random instances. At the same time, it is rapidly becoming a canonical problem for statistical physics. In both of these realms, evaluating new ideas relies crucially on knowing the maximum number of clauses one can typically satisfy in a random k-CNF formula. In this paper we give asymptotically tight estimates for this quantity. Our result gives very tight bounds for the fraction of satisfiable clauses in a random k-CNF. In particular, for k > 2 it improves upon all previously known such bound.
Keywords :
Boolean functions; computability; computational complexity; probability; random processes; Boolean CNF formula; NP-complete problem; asymptotically tight estimates; canonical problem; maximum clauses; maximum satisfiability; random formulas; random instances; random k-CNF formula; satisfiable clauses; statistical physics; tight bounds; Benchmark testing; Computer science; Glass; H infinity control; Mathematics; NP-complete problem; Operations research; Physics; Stationary state; Statistics;
Conference_Titel :
Foundations of Computer Science, 2003. Proceedings. 44th Annual IEEE Symposium on
Print_ISBN :
0-7695-2040-5
DOI :
10.1109/SFCS.2003.1238210
