The Frog Model on Z with Discrete Weibull Lifetimes and Random Parameter p

Abstract

We study the frog model on Z with particle wise discrete Weibull lifetimes. Each particle has an i.i.d. survival parameter π∈(0,1); conditionally on π=p, its lifetime satisfies \[ P( k π=p)=pkγ, k∈N0,γ>0. \] The law of π has right edge density \[ fπ(u)(1-u)β-1,L((1-u)-1) (u 1), \] with β>0 and L slowly varying; let η denote the common law of the i.i.d. initial occupation numbers \ηx\x∈Z. The survival parameter distribution strictly extends the Beta family, while the lifetime distribution extends the geometric case. We prove a sharp extinction and survival dichotomy with the γ-dependent threshold \[ βc:=12γ. \] If β>βc and E(η)<∞, the process becomes extinct almost surely; if β<βc and P(η=0)<1, it survives with positive probability. At the boundary β=βc we provide explicit criteria in terms of / of L(n2γ). The case γ=1 (geometric lifetimes) recovers the benchmark βc=12 and the critical refinements previously obtained for random geometric lifetimes.