Almost sharp covariance and Wishart-type matrix estimation

Abstract

Let X1,..., Xn ∈ Rd be independent Gaussian random vectors with independent entries and variance profile (bij)i ∈ [d],j ∈ [n]. A major question in the study of covariance estimation is to give precise control on the deviation of Σj ∈ [n]XjXjT-E XjXjT. We show that under mild conditions, we have align* E \|Σj ∈ [n]XjXjT-E XjXjT\| i ∈ [d](Σj ∈ [n]Σl ∈ [d]bij2blj2)1/2+j ∈ [n]Σi ∈ [d]bij2+error. align* The error is quantifiable, and we often capture the 4th-moment dependency already presented in the literature for some examples. The proofs are based on the moment method and a careful analysis of the structure of the shapes that matter. We also provide examples showing improvement over the past works and matching lower bounds.