Delocalization transition for critical Erdos-R\'enyi graphs

Abstract

We analyse the eigenvectors of the adjacency matrix of a critical Erdos-R\'enyi graph G(N,d/N), where d is of order N. We show that its spectrum splits into two phases: a delocalized phase in the middle of the spectrum, where the eigenvectors are completely delocalized, and a semilocalized phase near the edges of the spectrum, where the eigenvectors are essentially localized on a small number of vertices. In the semilocalized phase the mass of an eigenvector is concentrated in a small number of disjoint balls centred around resonant vertices, in each of which it is a radial exponentially decaying function. The transition between the phases is sharp and is manifested in a discontinuity in the localization exponent γ( w) of an eigenvector w, defined through \| w\|∞ / \| w\|2 = N-γ( w). Our results remain valid throughout the optimal regime N d ≤ O( N).