Sample covariance matrices of heavy-tailed distributions
Abstract
Let p>2, B≥ 1, N≥ n and let X be a centered n-dimensional random vector with the identity covariance matrix such that a∈ Sn-1 E| X,a|p≤ B. Further, let X1,X2,…,XN be independent copies of X, and N:=1NΣi=1N Xi XiT be the sample covariance matrix. We prove that K-1\|N-In\|2 2≤1Ni≤ N\|Xi\|2 +(nN)1-2/p4Nn+(nN)1-2/(p,4) with probability at least 1-1n, where K>0 depends only on B and p. In particular, for all p>4 we obtain a quantitative Bai-Yin type theorem.
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