Asymptotic behaviour in the set of nonhomogeneous chains of stochastic operators (Q2870837)

The present paper is a continuation of the same author's earlier work [Linear Algebra Appl. 434, No. 6, 1475--1488 (2011; Zbl 1213.60120)] in which she studied several mixing properties of non-homogeneous Markov chains. In this paper, the author considers the same chains with continual state space. Mainly, it is considered uniform asymptotic stability, almost uniformly asymptotical stability and strong asymptotic stability. Here, nonhomogeneous chains of stochastic operators act on \(L_1(X,\mu)\). The main results concern geometric properties of the mentioned chains. The proofs make use of the Baire category theorem. It is established that the geometric structure of the set of those stochastic operators which have asymptotically stationary density differs, depending on the considered topologies.