Strong XOR Lemma for Communication with Bounded Rounds

Abstract

In this paper, we prove a strong XOR lemma for bounded-round two-player randomized communication. For a function f:X× Y→\0,1\, the n-fold XOR function f n:Xn× Yn→\0,1\ maps n input pairs (X1,…,Xn,Y1,…,Yn) to the XOR of the n output bits f(X1,Y1) ·s f(Xn, Yn). We prove that if every r-round communication protocols that computes f with probability 2/3 uses at least C bits of communication, then any r-round protocol that computes f n with probability 1/2+(-O(n)) must use n· (r-O(r)· C-1) bits. When r is a constant and C is sufficiently large, this is (n· C) bits. It matches the communication cost and the success probability of the trivial protocol that computes the n bits f(Xi,Yi) independently and outputs their XOR, up to a constant factor in n. A similar XOR lemma has been proved for f whose communication lower bound can be obtained via bounding the discrepancy [Shaltiel'03]. By the equivalence between the discrepancy and the correlation with 2-bit communication protocols [Viola-Wigderson'08], our new XOR lemma implies the previous result.