AbstractWe prove that if X = (Xn)nϵZ is a finite state space ergodic Markov chain, then for any natural number p, there exist ergodic non-Markovian processes Y = (Yn)nϵZ with positive entropy, such that for all integers n1, …, np, the joint distribution of Yn1, …, Ynp is identical to the joint distribution of Xn1, …, Xnp
Spring 1975 at the Technological University of Eindhoven a group of people studied the chapter on fi...
AbstractLet {Xn} be a ∅-irreducible Markov chain on an arbitrary space. Sufficient conditions are gi...
C. Mattingly The aim of this note is to present an elementary proof of a variation of Harris’ ergodi...
Ankara : Department of Mathematics and Institute of Engineering and Sciences of Bilkent University, ...
. Inspired by the recent work of Daubechies and Lagarias on a set of matrices with convergent infini...
We study a fairly general class of time-homogeneous stochastic evolutions driven by noises that are ...
AbstractIn this paper we present sufficient conditions for the Doeblin decomposition, and necessary ...
The central objective of a study Non-Homogeneous Markov Chains is the concept of weak and strong er...
with an enumerable state space. It is then important to know whether or not the chain is ergodic, i....
In this paper we study certain properties of Dobrushin's ergod- icity coe�cient for stochastic oper...
We use nonstandard analysis to significantly generalize the well-known Markov chain ergodic theorem ...
AbstractFor strongly ergodic discrete time Markov chains we discuss the possible limits as n→∞ of pr...
In this paper, we study the notion of the Dobrushin ergodicity coefficient for positive contraction...
In this paper we give, in a more general context than previous studies, sufficient conditions for we...
Abstract. In this paper, I will buildup the basic framework of Markov Chains over finite state space...
Spring 1975 at the Technological University of Eindhoven a group of people studied the chapter on fi...
AbstractLet {Xn} be a ∅-irreducible Markov chain on an arbitrary space. Sufficient conditions are gi...
C. Mattingly The aim of this note is to present an elementary proof of a variation of Harris’ ergodi...
Ankara : Department of Mathematics and Institute of Engineering and Sciences of Bilkent University, ...
. Inspired by the recent work of Daubechies and Lagarias on a set of matrices with convergent infini...
We study a fairly general class of time-homogeneous stochastic evolutions driven by noises that are ...
AbstractIn this paper we present sufficient conditions for the Doeblin decomposition, and necessary ...
The central objective of a study Non-Homogeneous Markov Chains is the concept of weak and strong er...
with an enumerable state space. It is then important to know whether or not the chain is ergodic, i....
In this paper we study certain properties of Dobrushin's ergod- icity coe�cient for stochastic oper...
We use nonstandard analysis to significantly generalize the well-known Markov chain ergodic theorem ...
AbstractFor strongly ergodic discrete time Markov chains we discuss the possible limits as n→∞ of pr...
In this paper, we study the notion of the Dobrushin ergodicity coefficient for positive contraction...
In this paper we give, in a more general context than previous studies, sufficient conditions for we...
Abstract. In this paper, I will buildup the basic framework of Markov Chains over finite state space...
Spring 1975 at the Technological University of Eindhoven a group of people studied the chapter on fi...
AbstractLet {Xn} be a ∅-irreducible Markov chain on an arbitrary space. Sufficient conditions are gi...
C. Mattingly The aim of this note is to present an elementary proof of a variation of Harris’ ergodi...
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