Stochastic Persistence

Abstract

Let (Xt)t ≥ 0 be a continuous time Markov process on some metric space M, leaving invariant a closed subset M0 ⊂ M, called the extinction set. We give general conditions ensuring either "Stochastic persistence" (Part I) : Limit points of the occupation measure are invariant probabilities over M+ = M M0; or "Extinction" (Part II) : Xt → M0 a.s. In the persistence case we also discuss conditions ensuring the a.s convergence (respectively exponential convergence in total variation) of the occupation measure (respectively the distribution) of (Xt) toward a unique probability on M+. These results extend and generalize previous results obtained for various stochastic models in population dynamics, given by stochastic differential equations, random differential equations, or pure jump processes.