AbstractWe study different types of limit behavior of infinite dimension discrete time nonhomogeneous Markov chains. We show that the geometric structure of the set of those Markov chains which have asymptotically stationary density depends on the considered topologies. We generalize and correct some results from Ganikhodjaev et al. (2006) [3]
The discrete and continuous parameter forms of the mean ergodic theorem conclude that as N --> [infi...
The focus of the thesis is the convergence of irreducible aperiodic homoge- neous Markov chains with...
AbstractA necessary and sufficient condition for a finite ergodic homogeneous Markov chain to conver...
. Inspired by the recent work of Daubechies and Lagarias on a set of matrices with convergent infini...
AbstractWe study the asymptotic behavior of a nonhomogeneous semi-Markov system (population) in disc...
International audienceConsider an irreducible, aperiodic and positive recurrent discrete time Markov...
Ankara : Department of Mathematics and Institute of Engineering and Sciences of Bilkent University, ...
AbstractA strongly ergodic non-homogeneous Markov chain is considered in the paper. As an analog of ...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...
Consider an irreducible, aperiodic and positive recurrent discrete time Markov chain (Xn...
In this paper, we use a geometric viewpoint to prove several of the fundamental theo...
In this paper we find nonasymptotic exponential upper bounds for the deviation in the ergodic theore...
In this paper we give, in a more general context than previous studies, sufficient conditions for we...
textabstractThis paper studies two properties of the set of Markov chains induced by the determinist...
We study a fairly general class of time-homogeneous stochastic evolutions driven by noises that are ...
The discrete and continuous parameter forms of the mean ergodic theorem conclude that as N --> [infi...
The focus of the thesis is the convergence of irreducible aperiodic homoge- neous Markov chains with...
AbstractA necessary and sufficient condition for a finite ergodic homogeneous Markov chain to conver...
. Inspired by the recent work of Daubechies and Lagarias on a set of matrices with convergent infini...
AbstractWe study the asymptotic behavior of a nonhomogeneous semi-Markov system (population) in disc...
International audienceConsider an irreducible, aperiodic and positive recurrent discrete time Markov...
Ankara : Department of Mathematics and Institute of Engineering and Sciences of Bilkent University, ...
AbstractA strongly ergodic non-homogeneous Markov chain is considered in the paper. As an analog of ...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...
Consider an irreducible, aperiodic and positive recurrent discrete time Markov chain (Xn...
In this paper, we use a geometric viewpoint to prove several of the fundamental theo...
In this paper we find nonasymptotic exponential upper bounds for the deviation in the ergodic theore...
In this paper we give, in a more general context than previous studies, sufficient conditions for we...
textabstractThis paper studies two properties of the set of Markov chains induced by the determinist...
We study a fairly general class of time-homogeneous stochastic evolutions driven by noises that are ...
The discrete and continuous parameter forms of the mean ergodic theorem conclude that as N --> [infi...
The focus of the thesis is the convergence of irreducible aperiodic homoge- neous Markov chains with...
AbstractA necessary and sufficient condition for a finite ergodic homogeneous Markov chain to conver...
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