Distributed PCP Theorems for Hardness of Approximation in P

Abstract

We present a new distributed model of probabilistically checkable proofs (PCP). A satisfying assignment x ∈ \0,1\n to a CNF formula is shared between two parties, where Alice knows x1, …, xn/2, Bob knows xn/2+1,…,xn, and both parties know . The goal is to have Alice and Bob jointly write a PCP that x satisfies , while exchanging little or no information. Unfortunately, this model as-is does not allow for nontrivial query complexity. Instead, we focus on a non-deterministic variant, where the players are helped by Merlin, a third party who knows all of x. Using our framework, we obtain, for the first time, PCP-like reductions from the Strong Exponential Time Hypothesis (SETH) to approximation problems in P. In particular, under SETH we show that there are no truly-subquadratic approximation algorithms for Bichromatic Maximum Inner Product over 0,1-vectors, Bichromatic LCS Closest Pair over permutations, Approximate Regular Expression Matching, and Diameter in Product Metric. All our inapproximability factors are nearly-tight. In particular, for the first two problems we obtain nearly-polynomial factors of 2( n)1-o(1); only (1+o(1))-factor lower bounds (under SETH) were known before.