A Continuous-Time Mirror Descent Approach to Sparse Phase Retrieval
Abstract
We analyze continuous-time mirror descent applied to sparse phase retrieval, which is the problem of recovering sparse signals from a set of magnitude-only measurements. We apply mirror descent to the unconstrained empirical risk minimization problem (batch setting), using the square loss and square measurements. We provide a convergence analysis of the algorithm in this non-convex setting and prove that, with the hypentropy mirror map, mirror descent recovers any -sparse vector with minimum (in modulus) non-zero entry on the order of from Gaussian measurements, modulo logarithmic terms. This yields a simple algorithm which, unlike most existing approaches to sparse phase retrieval, adapts to the sparsity level, without including thresholding steps or adding regularization terms. Our results also provide a principled theoretical understanding for Hadamard Wirtinger flow [58], as Euclidean gradient descent applied to the empirical risk problem with Hadamard parametrization can be recovered as a first-order approximation to mirror descent in discrete time.
Keywords
Cite
@article{arxiv.2010.10168,
title = {A Continuous-Time Mirror Descent Approach to Sparse Phase Retrieval},
author = {Fan Wu and Patrick Rebeschini},
journal= {arXiv preprint arXiv:2010.10168},
year = {2020}
}