Extinction time of the logistic process

Abstract

The logistic birth and death process is perhaps the simplest stochastic population model that has both density-dependent reproduction, and a phase transition, and a lot can be learned about the process by studying its extinction time, τn, as a function of system size n. A number of existing results describe the scaling of τn as n∞, for various choices of reproductive rate rn and initial population Xn(0) as a function of n. We collect and complete this picture, obtaining a complete classification of all sequences (rn) and (Xn(0)) for which there exist rescaling parameters (sn) and (tn) such that (τn-tn)/sn converges in distribution as n∞, and identifying the limits in each case.