Proof of the satisfiability conjecture for large k

Abstract

We establish the satisfiability threshold for random k-SAT for all k k0, with k0 an absolute constant. That is, there exists a limiting density α*(k) such that a random k-SAT formula of clause density α is with high probability satisfiable for α<α*, and unsatisfiable for α>α*. We show that the threshold α*(k) is given explicitly by the one-step replica symmetry breaking prediction from statistical physics. The proof develops a new analytic method for moment calculations on random graphs, mapping a high-dimensional optimization problem to a more tractable problem of analyzing tree recursions. We believe that our method may apply to a range of random CSPs in the 1-RSB universality class.