Inner Product and Set Disjointness: Beyond Logarithmically Many Parties

Abstract

A basic goal in complexity theory is to understand the communication complexity of number-on-the-forehead problems f(\0,1\n)k\0,1\ with k n parties. We study the problems of inner product and set disjointness and determine their randomized communication complexity for every k≥ n, showing in both cases that (1+ n/1+k/ n) bits are necessary and sufficient. In particular, these problems admit constant-cost protocols if and only if the number of parties is k≥ nε for some constant ε>0.