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Linear Eigenvalue Statistics of $XX^\prime$ matrices

Probability 2024-02-22 v1

Abstract

This article focuses on the fluctuations of linear eigenvalue statistics of Tn×pTn×pT_{n\times p}T'_{n\times p}, where Tn×pT_{n\times p} is an n×pn\times p Toeplitz matrix with real, complex or time-dependent entries. We show that as nn \rightarrow \infty and p/nλ(0,)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 Hn×pHn×pH_{n\times p}H'_{n\times p}, when Hn×pH_{n\times p} is an n×pn\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.

Keywords

Cite

@article{arxiv.2305.02808,
  title  = {Linear Eigenvalue Statistics of $XX^\prime$ matrices},
  author = {Kiran Kumar A. S and Shambhu Nath Maurya and Koushik Saha},
  journal= {arXiv preprint arXiv:2305.02808},
  year   = {2024}
}

Comments

30 pages

R2 v1 2026-06-28T10:25:38.378Z