Central limit theorem for linear spectral statistics of large dimensional separable sample covariance matrices
Abstract
Suppose that Xn=(xjk) is N× n whose elements are independent real variables with mean zero, variance 1 and the fourth moment equal to three. The separable sample covariance matrix is defined as Bn = 1NT2n1/2 Xn T1n Xn' T2n1/2 where T1n is a symmetric matrix and T2n1/2 is a symmetric square root of the nonnegative definite symmetric matrix T2n. Its linear spectral statistics (LSS) are shown to have Gaussian limits when n/N approaches a positive constant.
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