Linear Eigenvalue Statistics of $XX^\prime$ matrices (2305.02808v1)

Abstract: This article focuses on the fluctuations of linear eigenvalue statistics of $T_{n\times p}T'{n\times p}$, where $T{n\times p}$ is an $n\times p$ Toeplitz matrix with real, complex or time-dependent entries. We show that as $n \rightarrow \infty$ and $p/n \rightarrow \lambda \in (0, \infty)$, the linear eigenvalue statistics of these matrices for polynomial test functions converge in distribution to Gaussian random variables. We also discuss the linear eigenvalue statistics of $H_{n\times p}H'{n\times p}$, when $H{n\times p}$ is an $n\times p$ Hankel matrix. As a result of our studies, we also derive in-probability limit and a central limit theorem type result for Schettan norm of rectangular Toeplitz matrices. To establish the results, we use method of moments.