Minimax optimal submatrix detection: Sharp non-asymptotic rates

Abstract

Given an observation Y ∈ Rd1× d2 from the model Y = X + E where X is constant and E has i.i.d. N(0,1) entries, we consider the problem of detecting a planted submatrix in the mean matrix X. Specifically, we aim to distinguish the null hypothesis X = 0 from the alternative hypothesis in which X is non-zero only on a submatrix of size s1 × s2 with elevated entries bounded below by μ>0. We establish a minimax lower bound characterizing how large μ must be to ensure that the two hypotheses are distinguishable with high probability. Furthermore, we derive novel minimax-optimal tests achieving the lower bound, and describe extensions of these tests that are adaptive to unknown sparsity levels s1 and s2. In contrast with previous work, which required restrictive assumptions on s1,s2, d1 and d2, our non-asymptotic upper and lower bounds match for any configuration of these parameters.