Frog model on Z with random survival parameter

Abstract

We study the frog model on \( Z \) with geometric lifetimes, introducing a random survival parameter. Active and inactive particles are placed at the vertices of \( Z \). The lifetime of each active particle follows a geometric random variable with parameter \( 1-p \), where \( p \) is randomly sampled from a distribution \( π \). Each active particle performs a simple random walk on \( Z \) until it dies, activating any inactive particles it encounters along its path. In contrast to the usual case where \( p \) is fixed, we show that there exist non-trivial distributions \( π \) for which the model survives with positive probability. More specifically, for π Beta(α,β), we establish the existence of a critical value \( β=0.5 \), that separates almost sure extinction from survival with positive probability. Furthermore, we show that the model is recurrent whenever it survives with positive probability.

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