Local limit approximations for Markov population processes

Abstract

The paper is concerned with the equilibrium distribution n of the n-th element in a sequence of continuous-time density dependent Markov processes on the integers. Under a (2+)-th moment condition on the jump distributions, we establish a bound of order O(n-(+1)/2 n) on the difference between the point probabilities of n and those of a translated Poisson distribution with the same variance. Except for the factor n, the result is as good as could be obtained in the simpler setting of sums of independent integer-valued random variables. Our arguments are based on the Stein-Chen method and coupling.