Shrinkage Estimation of Functions of Large Noisy Symmetric Matrices

Abstract

We study the problem of estimating functions of a large symmetric matrix An when we only have access to a noisy estimate An=An+σ Zn/n. We are interested in the case that Zn is a Wigner ensemble and suggest an algorithm based on nonlinear shrinkage of the eigenvalues of An. As an intermediate step we explain how recovery of the spectrum of An is possible using only the spectrum of An. Our algorithm has important applications, for example, in solving high-dimensional noisy systems of equations or symmetric matrix denoising. Throughout our analysis we rely on tools from random matrix theory.

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