On the extinction phase of the contact process with an asymptomatic state

Abstract

The contact process with an asymptomatic state, introduced in [Belhadji, Lanchier and Mercer, Stochastic Process. Appl., 176:104417, 2024], is a natural variant of the basic contact process that distinguishes between asymptomatic (state 1) and symptomatic (state 2) individuals. Infected individuals infect their healthy neighbors at rate λ1 when asymptomatic and at rate λ2 when symptomatic. Newly infected individuals are always asymptomatic and become symptomatic at rate γ, and infected individuals recover at rate one regardless of whether they are asymptomatic or symptomatic. Belhadji, Lanchier and Mercer proved that, in the mean-field approximation, there is an epidemic if and only if λ1 + γ λ2 > 1 + γ, showing in particular that, for all γ > 0, there is an epidemic for λ2 sufficiently large. In contrast, comparing the process with a subcritical Galton-Watson branching process, they proved for the spatial model that, if γ < 1 / (4d - 1) and λ1 = 0, then there is no epidemic even in the limiting case λ2 = ∞. In this paper, we prove an exponential decay of the progeny of the Galton-Watson branching process, and use a block construction and a perturbation argument, to extend the extinction phase of the process to λ1 > 0 small.

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