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Functional CLT for general sample covariance matrices

Statistics Theory 2026-03-16 v1 Probability Statistics Theory

Abstract

This paper studies the central limit theorems (CLTs) for linear spectral statistics (LSSs) of general sample covariance matrices, when the test functions belong to C3C^3, the class of functions with continuous third order derivatives. We consider matrices of the form Bn=(1/n)Tp1/2XnXnTp1/2,B_n=(1/n)T_p^{1/2}X_nX_n^{*}T_p^{1/2}, where Xn=(xij)X_n= (x_{i j} ) is a p×np \times n matrix whose entries are independent and identically distributed (i.i.d.) real or complex random variables, and TpT_p is a p×pp\times p nonrandom Hermitian nonnegative definite matrix with its spectral norm uniformly bounded in pp. By using Bernstein polynomial approximation, we show that, under Exij8<\mathbb{E}|x_{ij}|^{8}<\infty, the centered LSSs of BnB_n have Gaussian limits. Under the stronger Exij10<\mathbb{E}|x_{ij}|^{10}<\infty, we further establish convergence rates O(n1/2+κ)O(n^{-1/2+\kappa}) in Kolmogorov--Smirnov O(n1/2+κ)O(n^{-1/2+\kappa}), for any fixed κ>0\kappa>0.

Keywords

Cite

@article{arxiv.2603.12780,
  title  = {Functional CLT for general sample covariance matrices},
  author = {Jian Cui and Zhijun Liu and Jiang Hu and Zhidong Bai},
  journal= {arXiv preprint arXiv:2603.12780},
  year   = {2026}
}
R2 v1 2026-07-01T11:18:06.940Z