Minimax rate of convergence and the performance of ERM in phase recovery

Abstract

We study the performance of Empirical Risk Minimization in noisy phase retrieval problems, indexed by subsets of n and relative to subgaussian sampling; that is, when the given data is yi=∈rai,x02+wi for a subgaussian random vector a, independent noise w and a fixed but unknown x0 that belongs to a given subset of n. We show that ERM produces x whose Euclidean distance to either x0 or -x0 depends on the gaussian mean-width of the indexing set and on the signal-to-noise ratio of the problem. The bound coincides with the one for linear regression when \|x0\|2 is of the order of a constant. In addition, we obtain a minimax lower bound for the problem and identify sets for which ERM is a minimax procedure. As examples, we study the class of d-sparse vectors in n and the unit ball in 1n.