Higher order fluctuations of extremal eigenvalues of sparse random matrices

Abstract

We consider extremal eigenvalues of sparse random matrices, a class of random matrices including the adjacency matrices of Erdos-R\'enyi graphs G(N,p). Recently, it was shown that the leading order fluctuations of extremal eigenvalues are given by a single random variable associated with the total degree of the graph (Ann. Probab., 48(2):916-962, 2020; Probab. Theory Related Fields, 180:985-1056, 2021). We construct a sequence of random correction terms to capture higher (sub-leading) order fluctuations of extremal eigenvalues in the regime Nε < pN < N1/3-ε. Using these random correction terms, we prove a local law up to a shifted edge and recover the rigidity of extremal eigenvalues under some corrections for pN>Nε.