Gaussian Waves and Edge Eigenvectors of Random Regular Graphs

Abstract

Backhausz and Szegedy (2019) demonstrated that the almost eigenvectors of random regular graphs converge to Gaussian waves with variance 0≤ σ2≤ 1. In this paper, we present an alternative proof of this result for the edge eigenvectors of random regular graphs, establishing that the variance must be σ2=1. Furthermore, we show that the eigenvalues and eigenvectors are asymptotically independent. Our approach introduces a simple framework linking the weak convergence of the imaginary part of the Green's function to the convergence of eigenvectors, which may be of independent interest.

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