Tight bounds on the randomized communication complexity of symmetric XOR functions in one-way and SMP models

Abstract

We study the communication complexity of symmetric XOR functions, namely functions f: \0,1\n × \0,1\n → \0,1\ that can be formulated as f(x,y)=D(|x y|) for some predicate D: \0,1,...,n\ → \0,1\, where |x y| is the Hamming weight of the bitwise XOR of x and y. We give a public-coin randomized protocol in the Simultaneous Message Passing (SMP) model, with the communication cost matching the known lower bound for the quantum and two-way model up to a logarithm factor. As a corollary, this closes a quadratic gap between quantum lower bound and randomized upper bound for the one-way model, answering an open question raised in Shi and Zhang SZ09.