On hitting times for simple random walk on dense Erd\"os-R\'enyi random graphs

Abstract

Let G(N,p)=(V,E) be an Erd\"os-R\'enyi random graph and (Xn)n ∈ N be a simple random walk on it. We study the the order of magnitude of Σi ∈ V πihij where πi=di / 2|E| for di the number of neighbors of node i and hij the hitting time for (Xn)n ∈ N between nodes i and j, in a regime of p=p(N) such that G(N,p) is almost surely connected as N∞. Our main result is that Σi ∈ V πihij is almost surely of order N(1+o(1)) as N ∞, which coincides with previous results in the physics literature sood, though our techniques are based on large deviations bounds on the number of neighbors of a typical node and the number of edges in G(N,p) together with recent work on bounds on the spectrum of the (random) adjacency matrix of G(N,p).