Calculating extinction probabilities for the birth and death chain in a random environment

Abstract

In a previous investigation (Torrez (1978)) conditions were given for extinction and instability of a stochastic process (Z_n) evolving in a random environment controlled by an irreducible Markov chain (Y_n) with state space 𝒴 The process (Y_n, Z_n) is Markovian with state space 𝒴 × {0,1, ···, N} where 𝒴 = {1,· ··,m} and the marginal process (Z_n) is a birth and death chain on {0,1,· ··,N}, with 0 and N made absorbing, when conditioned on a fixed sequence of environmental states of (Y_n). This paper provides bivariate finite difference methods for calculating (i) P(Z_n → 0) when this probability is not one; and (ii) the expected duration of the process Z_n. For (i), the cases when the transition probabilities of the (Y_n)-conditioned process (Z_n) are non-homogeneous and homogeneous are considered separately. Examples are given to illustrate these methods.