This paper addresses the problem of reconstructing a low-rank signal matrix observed with additive Gaussian noise. We first establish that, under mild assumptions, one can restrict attention to orthogonally equivariant reconstruction methods, which act only on the singular values of the observed matrix and do not affect its singular vectors. Using recent results in random matrix theory, we then propose a new reconstruction method that aims to reverse the effect of the noise on the singular value decomposition of the signal matrix. In conjunction with the proposed reconstruction method we also introduce a Kolmogorov–Smirnov based estimator of the noise variance

Nobel, Andrew B.

Shabalin, Andrey A.

In this paper we study the problem of reconstruction of a low-rank matrix observed with additive Gaussian noise. First we show that under mild assumptions (about the prior distribution of the sig-nal matrix) we can restrict our attention to reconstruction methods that are based on the singular value decomposition of the observed matrix and act only on its singular values (preserving the singular vectors). Then we determine the effect of noise on the SVD of low-rank matrices by building a connection between matrix reconstruction problem and spiked population model in random matrix theory. Based on this knowledge, we propose a new reconstruction method, called RMT, that is designed to reverse the effect of the noise on the singu-lar values of the signal matrix and adjust for its effect on the singular vectors. With an extensive simulation study we show that the pro-posed method outperform even oracle versions of both soft and hard thresholding methods and closely matches the performance of a gen-eral oracle scheme. 

Reconstruction of a low-rank matrix in the presence of Gaussian noise

Abstract

Similar works

Full text

Available Versions

CiteSeerX

Carolina Digital Repository