Central Limit Theorem for traces of the resolvents of half-heavy tailed Sample Covariance matrices
Abstract
We consider the spectrum of the Sample Covariance matrix AN:= XN XN*N, where XN is the P× N matrix with i.i.d. half-heavy tailed entries and PN y>0 (the entries of the matrix have variance, but do not have the fourth moment). We derive the Central Limit Theorem for the Stieltjes transform of the matrix AN and compute the covariance kernel. Apart from that, we derive the Central Limit Theorem for the Stieltjes transform of overlapping Sample Covariance matrices.
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