Superpolynomial Length Lower Bounds for Tree-Like Semantic Proof Systems with Bounded Line Size

Abstract

We prove superpolynomial length lower bounds for the semantic tree-like Frege refutation system with bounded line size. Concretely, for any function n2- ≤ s(n) ≤ 2n1- we exhibit an explicit family A of n-variate CNF formulas A, each of size |A| s(n)1+, such that if A is chosen uniformly from A, then asymptotically almost surely any tree-like Frege refutation of A in line-size s(n) is of length super-polynomial in |A|. Our lower bounds apply also to tree-like degree-d threshold systems, for d ≈ (s(n)), that is, for d up to n1-. More generally, our lower bounds apply to the semantic version of these systems and to any semantic tree-like proof system where the number of distinct lines is bounded by (s(n)).