Survival of one dimensional renewal contact process

Abstract

The renewal contact process, introduced in 2019 by Fontes, Marchetti, Mountford, and Vares, extends the Harris contact process in Zd by allowing the possible cure times to be determined according to independent renewal processes (with some interarrival distribution μ) and keeping the transmission times determined according to independent exponential times with a fixed rate λ. We investigate sufficient conditions on μ to have a process with a finite critical value λc for any spatial dimension d ≥ 1. In particular, we show that λc is finite when μ is continuous with bounded support or when μ is absolutely continuous and has a decreasing hazard rate.