CLT for Generalized Linear Spectral Statistics of High-dimensional Sample Covariance Matrices and Applications

In this paper, we introduce the $\mathbf{G}$eneralized $\mathbf{L}$inear $\mathbf{S}$pectral $\mathbf{S}$tatistics (GLSS) of a high-dimensional sample covariance matrix $\mathbf{S}_n$, denoted as $\operatorname{tr}f(\mathbf{S}_n)\mathbf{B}_n$, which effectively captures distinct spectral properties of $\mathbf{S}_n$ by involving an ancillary matrix $\mathbf{B}_n$ and a test function $f$. The joint asymptotic normality of GLSS associated with different test functions is established under weak assumptions on $\mathbf{B}_n$ and the underlying distribution, when the dimension $n$ and sample size $N$ are comparable. Specifically, we allow the rank of $\mathbf{B}_n$ to diverge with $n$. The convergence rate of GLSS is determined by $\sqrt{{N}/{\operatorname{rank}(\mathbf{B}_n)}}$. As a natural application, we propose a novel approach based on GLSS for hypothesis testing on eigenspaces of spiked covariance matrices. The theoretical accuracy of the results established for GLSS and the advantages of the newly suggested testing procedure are demonstrated through various numerical studies.