Uniformity Testing over Hypergrids with Subcube Conditioning

Abstract

We give an algorithm for testing uniformity of distributions supported on hypergrids [m1] × ·s × [mn], which makes O(poly(m)n/ε2) many queries to a subcube conditional sampling oracle with m=i mi. When m is a constant, our algorithm is nearly optimal and strengthens the algorithm of [CCK+21] which has the same query complexity but works for hypercubes \ 1\n only. A key technical contribution behind the analysis of our algorithm is a proof of a robust version of Pisier's inequality for functions over hypergrids using Fourier analysis.