A first order phase transition in the threshold-θ 2 contact process on random r-regular graphs and r-trees

Abstract

We consider the discrete-time threshold-θ 2 contact process on a random r-regular graph on n vertices. In this process, a vertex with at least θ occupied neighbors at time t will be occupied at time t+1 with probability p, and vacant otherwise. We show that if θ 2 and r θ+2, ε1 is small and p is at least p1(ε1), then starting from all vertices occupied the fraction of occupied vertices stays above 1-2ε1 up to time (γ1(r)n) with probability at least 1 - (-γ1(r)n). In the other direction, we show that for p2 < 1 there is an ε2(p2)>0 so that if p p2 and the number of occupied vertices in the initial configuration is at most ε2(p2)n, then with high probability all vertices are vacant at time C2(p2) (n). These two conclusions imply that on the random r-regular graph there cannot be a quasi-stationary distribution with density of occupied vertices between 0 and ε2(p1), and allow us to conclude that the process on the r-tree has a first order phase transition.