Central limit theorem for eigenvalue statistics of sample covariance matrix with random population
Abstract
Consider the sample covariance matrix 1/2XXT1/2 where X is an M× N random matrix with independent entries and is an M× M diagonal matrix. It is known that if is deterministic, then the fluctuation of Σif(λi) converges in distribution to a Gaussian distribution. Here \λi\ are eigenvalues of 1/2XXT1/2 and f is a good enough test function. In this paper we consider the case that is random and show that the fluctuation of 1 NΣif(λi) converges in distribution to a Gaussian distribution. This phenomenon implies that the randomness of decreases the correlation among \λi\.
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