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arxiv: 2305.10751 · v2 · pith:5UNRFCUXnew · submitted 2023-05-18 · 🧮 math.PR

Brownian snails with removal die out in one dimension

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keywords infectedparticlebrownianalphadimensionlambdaparticlesremoval
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Brownian snails with removal is a spatial epidemic model defined as follows. Initially, a homogeneous Poisson process of susceptible particles on $\mathbb R^d$ with intensity $\lambda>0$ is deposited and a single infected one is added at the origin. Each particle performs an independent standard Brownian motion. Each susceptible particle is infected immediately when it is within distance 1 from an infected particle. Each infected particle is removed at rate $\alpha>0$, and removed particles remain such forever. Answering a question of Grimmett and Li, we prove that in one dimension, for all values of $\lambda$ and $\alpha$, the infection almost surely dies out.

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