Local Marchenko-Pastur Law at the Hard Edge of Sample Covariance Matrices
Abstract
Let XN be a N× N matrix whose entries are i.i.d. complex random variables with mean zero and variance 1N. We study the asymptotic spectral distribution of the eigenvalues of the covariance matrix XN*XN for N∞. We prove that the empirical density of eigenvalues in an interval [E,E+η] converges to the Marchenko-Pastur law locally on the optimal scale, N η /E ( N)b, and in any interval up to the hard edge, ( N)bN2 E ≤ 4-, for any >0. As a consequence, we show the complete delocalization of the eigenvectors.
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