A discontinuous phase transition in the threshold-θ ≥ 2 contact process on random graphs

Abstract

We study the discrete-time threshold-θ ≥ 2 contact process on random graphs of general degrees. For random graphs with a given degree distribution μ, we show that if μ is lower bounded by θ+2 and has finite kth moments for all k>0, then the discrete-time threshold-θ contact process on the random graph exhibits a discontinuous phase transition in the emergence of metastability, thus answering a question of Chatterjee and Durrett cd13. To be specific, we establish that (i) for any large enough infection probability p>p1, the process started from the all-infected state w.h.p. survives for e(n)-time, maintaining a large density of infection; (ii) for any p<1, if the initial density is smaller than (p)>0, then it dies out in O( n)-time w.h.p.. We also explain some extensions to more general random graphs, including the Erdos-R\'enyi graphs. Moreover, we prove that the threshold-θ contact process on a random (θ+1)-regular graph dies out in time nO(1) w.h.p..