Central limit theorem for partial linear eigenvalue statistics of Wigner matrices

TL;DR

This paper proves central limit theorems for partial linear eigenvalue statistics of Wigner matrices, showing Gaussian fluctuations under certain conditions and deriving convergence results for related partial sum processes.

Contribution

It establishes new CLTs for partial eigenvalue sums of Wigner matrices with four-moment matching to GUE, including in the bulk and for partial sum processes.

Findings

Gaussian fluctuations for eigenvalue sums in the bulk

Weak convergence of partial sum processes

Results hold under four-moment matching with GUE

Abstract

In this paper, we study the complex Wigner matrices $M_n=\frac{1}{\sqrt{n}}W_n$ whose eigenvalues are typically in the interval $[-2,2]$. Let $\lambda_1\leq \lambda_2...\leq\lambda_n$ be the ordered eigenvalues of $M_n$. Under the assumption of four matching moments with the Gaussian Unitary Ensemble(GUE), for test function $f$ 4-times continuously differentiable on an open interval including $[-2,2]$, we establish central limit theorems for two types of partial linear statistics of the eigenvalues. The first type is defined with a threshold $u$ in the bulk of the Wigner semicircle law as $\mathcal{A}_n[f; u]=\sum_{l=1}^nf(\lambda_l)\mathbf{1}_{\{\lambda_l\leq u\}}$. And the second one is $\mathcal{B}_n[f; k]=\sum_{l=1}^{k}f(\lambda_l)$ with positive integer $k=k_n$ such that $k/n\rightarrow y\in (0,1)$ as $n$ tends to infinity. Moreover, we derive a weak convergence result for a partial sum process constructed from $\mathcal{B}_n[f; \lfloor nt\rfloor]$.