Sharp Bounds for Generalized Uniformity Testing

Abstract

We study the problem of generalized uniformity testing BC17 of a discrete probability distribution: Given samples from a probability distribution p over an unknown discrete domain , we want to distinguish, with probability at least 2/3, between the case that p is uniform on some subset of versus ε-far, in total variation distance, from any such uniform distribution. We establish tight bounds on the sample complexity of generalized uniformity testing. In more detail, we present a computationally efficient tester whose sample complexity is optimal, up to constant factors, and a matching information-theoretic lower bound. Specifically, we show that the sample complexity of generalized uniformity testing is (1/(ε4/3\|p\|3) + 1/(ε2 \|p\|2) ).