The criterion for uniqueness of quasi-stationary distributions of Markov processes and their domain of attraction problem

Abstract

We consider a Markov process X(t) on the nonnegative integers E= S \0\, where S=\1,2,...\ is an irreducible class and 0 is an absorbing state. In this paper, we investigate conditions under which the quasi-stationary distribution for X(t) exists and is unique, and any initial distribution supported in S is in the domain of attraction of this quasi-stationary distribution. We further find five conditions which are equivalent to that the extinction time is uniformly bounded. As a consequence, we prove the van Doorn's conjecture in VD2012. And we can greatly improve theorem 1 in VD2012.