On the rate of convergence in the CLT for LSS of large-dimensional sample covariance matrices

Abstract

This paper investigates the rate of convergence for the central limit theorem of linear spectral statistic (LSS) associated with large-dimensional sample covariance matrices. We consider matrices of the form Bn=1n Tp1/2 Xn Xn* Tp1/2, where Xn= (xi j ) is a p × n matrix whose entries are independent and identically distributed (i.i.d.) real or complex variables, and T p is a p× p nonrandom Hermitian nonnegative definite matrix with its spectral norm uniformly bounded in p. Employing Stein's method, we establish that if the entries xij satisfy E|xij|10<∞ and the ratio of the dimension to sample size p/n y>0 as n∞, then the convergence rate of the normalized LSS of Bn to the standard normal distribution, measured in the Kolmogorov-Smirnov distance, is O(n-1/2+) for any fixed >0.