In this paper, we consider uniformly mean ergodic and uniformly asymptotical stable Markov operators on ordered Banach spaces. In terms of the ergodicity coefficient, we show the equivalence of uniform and weak mean ergodicities of Markov operators. This result allowed us to establish a category theorem for uniformly mean ergodic Markov operators. Furthermore, using properties of the ergodicity coefficient, we develop the perturbation theory for uniformly asymptotical stable Markov chains in the abstract scheme.WoSScopu
. Inspired by the recent work of Daubechies and Lagarias on a set of matrices with convergent infini...
International audienceThis book concerns discrete-time homogeneous Markov chains that admit an invar...
In this paper we study certain properties of Dobrushin's ergodicity coe�cient for stochastic operat...
It is known that Dobrushin's ergodicity coefficient is one of the effective tools in the investigati...
It is known that the Dobrushin’s ergodicity coefficient is one of the effective tools to study the b...
In the present work, we define such an ergodicity coefficient of a positive mapping defined on orde...
Dobrushin’s ergodicity coefficient is one of the effective tools for the investigations of limiting ...
communicated by I. Pinelis Abstract. For the distribution of a finite, homogeneous, continuous-time ...
textabstractThis paper studies two properties of the set of Markov chains induced by the determinist...
AbstractLet {Xn} be a ∅-irreducible Markov chain on an arbitrary space. Sufficient conditions are gi...
In this paper, we study strong and uniform ergodicity of nonlinear polynomial Markov operators on th...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...
AbstractThis paper is devoted to perturbation analysis of denumerable Markov chains. Bounds are prov...
This thesis deals with Markov operators and semigroups. A Markov operator is a positive linear opera...
Let T be a power-bounded linear operator in a real Banach space X. We study the equality (*) $(I-T...
. Inspired by the recent work of Daubechies and Lagarias on a set of matrices with convergent infini...
International audienceThis book concerns discrete-time homogeneous Markov chains that admit an invar...
In this paper we study certain properties of Dobrushin's ergodicity coe�cient for stochastic operat...
It is known that Dobrushin's ergodicity coefficient is one of the effective tools in the investigati...
It is known that the Dobrushin’s ergodicity coefficient is one of the effective tools to study the b...
In the present work, we define such an ergodicity coefficient of a positive mapping defined on orde...
Dobrushin’s ergodicity coefficient is one of the effective tools for the investigations of limiting ...
communicated by I. Pinelis Abstract. For the distribution of a finite, homogeneous, continuous-time ...
textabstractThis paper studies two properties of the set of Markov chains induced by the determinist...
AbstractLet {Xn} be a ∅-irreducible Markov chain on an arbitrary space. Sufficient conditions are gi...
In this paper, we study strong and uniform ergodicity of nonlinear polynomial Markov operators on th...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...
AbstractThis paper is devoted to perturbation analysis of denumerable Markov chains. Bounds are prov...
This thesis deals with Markov operators and semigroups. A Markov operator is a positive linear opera...
Let T be a power-bounded linear operator in a real Banach space X. We study the equality (*) $(I-T...
. Inspired by the recent work of Daubechies and Lagarias on a set of matrices with convergent infini...
International audienceThis book concerns discrete-time homogeneous Markov chains that admit an invar...
In this paper we study certain properties of Dobrushin's ergodicity coe�cient for stochastic operat...