Gaussian Mean Testing Made Simple

Abstract

We study the following fundamental hypothesis testing problem, which we term Gaussian mean testing. Given i.i.d. samples from a distribution p on Rd, the task is to distinguish, with high probability, between the following cases: (i) p is the standard Gaussian distribution, N(0,Id), and (ii) p is a Gaussian N(μ,) for some unknown covariance and mean μ ∈ Rd satisfying \|μ\|2 ≥ ε. Recent work gave an algorithm for this testing problem with the optimal sample complexity of (d/ε2). Both the previous algorithm and its analysis are quite complicated. Here we give an extremely simple algorithm for Gaussian mean testing with a one-page analysis. Our algorithm is sample optimal and runs in sample linear time.