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The Frog Model on $\mathbb{Z}$ with General Random Survival Parameter

Probability 2025-12-12 v1

Abstract

We study the frog model on Z\mathbb{Z} with particle-wise random geometric lifetimes: each particle has a survival parameter π(0,1)\pi\in(0,1) sampled i.i.d., whose density near 11 satisfies fπ(u)(1u)β1L((1u)1)f_\pi(u)\sim (1-u)^{\beta-1}L\big((1-u)^{-1}\big) with β>0\beta>0, and LL slowly varying. This strictly extends the Beta(α,β)\mathrm{Beta}(\alpha,\beta) case. Let η\eta denote the common law of the i.i.d.\ initial number of particles {ηx}xZ\{\eta_x\}_{x\in\mathbb{Z}}. Using a percolation comparison and sharp one-particle displacement tails, we obtain a universal threshold at β=12\beta=\tfrac12. If β>12\beta>\tfrac12 and E(η)<E(\eta)<\infty, extinction occurs almost surely. If β<12\beta<\tfrac12 and P(η=0)<1\mathbb{P}(\eta=0)<1, survival has positive probability. At the boundary β=12\beta=\tfrac12 we give sharp criteria: extinction if E(η)<E(\eta)<\infty and 8lim supnL(n2)<1/E(η)8\,\limsup_{n\to\infty}L(n^2)<1/E(\eta); survival if P(η=0)<1\mathbb{P}(\eta=0)<1 and 2lim infnL(n2)>1/E(η)\sqrt{2}\,\liminf_{n\to\infty}L(n^2)>1/E(\eta). These results recover the Carvalho-Machado threshold for Beta laws and show that only the exponent β\beta governs the phase transition, while LL impacts the critical regime.

Keywords

Cite

@article{arxiv.2512.10171,
  title  = {The Frog Model on $\mathbb{Z}$ with General Random Survival Parameter},
  author = {Gustavo O. Carvalho and Fábio P. Machado and J. Hermenegildo R. González},
  journal= {arXiv preprint arXiv:2512.10171},
  year   = {2025}
}

Comments

20 pages

R2 v1 2026-07-01T08:19:44.266Z