The Frog Model on Z with Random Discrete Weibull Lifetimes and Biased Nearest-Neighbour Random Walks

Abstract

We study the frog model on Z with particle-wise random discrete Weibull lifetimes and biased nearest-neighbour random walks. Each particle has an independent survival parameter π∈(0,1). Conditionally on π=p, its lifetime Ξ satisfies P(Ξ k π=p)=pkγ, \, k∈N0, where γ>0. The distribution of π is assumed to have right-edge density fπ(u) (1-u)β-1 L(11-u), \, u1, where β>0 and L:(0,∞)(0,∞) is a slowly varying function at infinity. The main step is to estimate the tail of the maximal displacement of a single particle before death. If τn denotes the time needed by the underlying walk to reach distance n, then P(D* n)= E[G(τn)], \, G(k):= P(Ξ k). Since G(k) Γ(β)k-γβL(kγ), and the biased nearest-neighbour random walk has linear hitting-time scale, the off-critical threshold is βc=1/γ. If β>βc and the initial number of particles per site has finite mean, the model dies out almost surely. If β<βc and the initial configuration is not almost surely empty, the model survives with positive probability in the direction of the drift.