The Frog Model on Z with General Random Survival Parameter
Abstract
We study the frog model on Z with particle-wise random geometric lifetimes: each particle has a survival parameter π∈(0,1) sampled i.i.d., whose density near 1 satisfies fπ(u) (1-u)β-1L((1-u)-1) with β>0, and L slowly varying. This strictly extends the Beta(α,β) case. Let η denote the common law of the i.i.d.\ initial number of particles \ηx\x∈Z. Using a percolation comparison and sharp one-particle displacement tails, we obtain a universal threshold at β=12. If β>12 and E(η)<∞, extinction occurs almost surely. If β<12 and P(η=0)<1, survival has positive probability. At the boundary β=12 we give sharp criteria: extinction if E(η)<∞ and 8\,n∞L(n2)<1/E(η); survival if P(η=0)<1 and 2\,n∞L(n2)>1/E(η). These results recover the Carvalho-Machado threshold for Beta laws and show that only the exponent β governs the phase transition, while L impacts the critical regime.
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