Space proof complexity for random 3-CNFs

Abstract

We investigate the space complexity of refuting 3-CNFs in Resolution and algebraic systems. We prove that every Polynomial Calculus with Resolution refutation of a random 3-CNF φ in n variables requires, with high probability, (n) distinct monomials to be kept simultaneously in memory. The same construction also proves that every Resolution refutation φ requires, with high probability, (n) clauses each of width (n) to be kept at the same time in memory. This gives a (n2) lower bound for the total space needed in Resolution to refute φ. These results are best possible (up to a constant factor). The main technical innovation is a variant of Hall's Lemma. We show that in bipartite graphs G with bipartition (L,R) and left-degree at most 3, L can be covered by certain families of disjoint paths, called VW-matchings, provided that L expands in R by a factor of (2-ε), for ε < 1/23.