On the concentration of the number of solutions of random satisfiability formulas

Abstract

Let Z(F) be the number of solutions of a random k-satisfiability formula F with n variables and clause density α. Assume that the probability that F is unsatisfiable is O(1/(n)1+) for >0. We show that (possibly excluding a countable set of `exceptional' α's) the number of solutions concentrate in the logarithmic scale, i.e., there exists a non-random function φ(α) such that, for any δ>0, (1/n) Z(F)∈ [φ-δ,φ+δ] with high probability. In particular, the assumption holds for all α<1, which proves the above concentration claim in the whole satisfiability regime of random 2-SAT. We also extend these results to a broad class of constraint satisfaction problems. The proof is based on an interpolation technique from spin-glass theory, and on an application of Friedgut's theorem on sharp thresholds for graph properties.