Testing Sumsets is Hard

A subset $S$ of the Boolean hypercube $\mathbb{F}_2^n$ is a *sumset* if $S = \{a + b : a, b\in A\}$ for some $A \subseteq \mathbb{F}_2^n$. Sumsets are central objects of study in additive combinatorics, featuring in several influential results. We prove a lower bound of $\Omega(2^{n/2})$ for the number of queries needed to test whether a Boolean function $f:\mathbb{F}_2^n \to \{0,1\}$ 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 {$2^{O(n/2)} \cdot \mathrm{poly}(n)$}-query algorithm for a smoothed analysis formulation of the sumset *refutation* problem.