Exceptional times of the critical dynamical Erdos-R\'enyi graph

Abstract

In this paper we introduce a network model which evolves in time, and study its largest connected component. We consider a process of graphs (Gt:t∈ [0,1]), where initially we start with a critical Erdos-R\'enyi graph ER(n, 1/n), and then evolve forwards in time by resampling each edge independently at rate 1. We show that the size of the largest connected component that appears during the time interval [0, 1] is of order n2/3 log1/3 n with high probability. This is in contrast to the largest component in the static critical Erdos-R\'enyi graph, which is of order n2/3.