Testing Sumsets is Hard

Abstract

A subset S of the Boolean hypercube F2n is a sumset if S = \a + b : a, b∈ A\ for some A ⊂eq F2n. Sumsets are central objects of study in additive combinatorics, featuring in several influential results. We prove a lower bound of (2n/2) for the number of queries needed to test whether a Boolean function f:F2n \0,1\ is the indicator function of a sumset. Our lower bound for testing sumsets follows from sharp bounds on the related problem of shift testing, which may be of independent interest. We also give a near-optimal 2n/2 · poly(n)-query algorithm for a smoothed analysis formulation of the sumset refutation problem.