Survival and extinction of epidemics on random graphs with general degrees

Abstract

In this paper, we establish the necessary and sufficient criterion for the contact process on Galton-Watson trees (resp. random graphs) to exhibit the phase of extinction (resp. short survival). We prove that the survival threshold λ1 for a Galton-Watson tree is strictly positive if and only if its offspring distribution has an exponential tail, i.e., E ec<∞ for some c>0, settling a conjecture by Huang and Durrett [12]. On the random graph with degree distribution μ, we show that if μ has an exponential tail, then for small enough λ the contact process with the all-infected initial condition survives for n1+o(1)-time w.h.p. (short survival), while for large enough λ it runs over e(n)-time w.h.p. (long survival). When μ is subexponential, we prove that the contact process w.h.p. displays long survival for any fixed λ>0.