Large deviation principle for the maximal eigenvalue of inhomogeneous Erdos-R\'enyi random graphs

Abstract

We consider an inhomogeneous Erdos-R\'enyi random graph GN with vertex set [N] = \1,…,N\ for which the pair of vertices i,j ∈ [N], i≠ j, is connected by an edge with probability r(iN,jN), independently of other pairs of vertices. Here, r\,[0,1]2 (0,1) is a symmetric function that plays the role of a reference graphon. Let λN be the maximal eigenvalue of the adjacency matrix of GN. It is known that λN/N satisfies a large deviation principle as N ∞. The associated rate function r is given by a variational formula that involves the rate function Ir of a large deviation principle on graphon space. We analyse this variational formula in order to identify the properties of r, specially when the reference graphon is of rank 1.