We consider Markov chains in the context of iterated random functions and show the existence and uniqueness of an invariant distribution under a local contraction condition combined with a drift condition, extending results of Diaconis and Freedman. From these we deduce various other topological stability properties of the chains. Our conditions are typically satisfied by, for example, queueing and storage models where the global Lipschitz condition used by Diaconis and Freedman normally fails
International audienceIt is known that, in the dependent case, partial sums processes which are elem...
We study the long run behaviour of interactive Markov chains on infinite product spaces. The behavio...
We study Markov chains generated by iterated Lipschitz functions systems with possibly place depende...
We consider Markov chains in the context of iterated random functions and show the existence and uni...
In this paper we extend the results of Meyn and Tweedie (1992b) from discrete-time parameter to cont...
We prove two propositions with conditions that a system, which is described by a transient Markov ch...
In this paper we connect various topological and probabilistic forms of stability for discrete-time ...
We study the long run behaviour of interactive Markov chains on in nite product spaces. The behaviou...
We give an example of place-dependent random iterations with two affine contractions on the unit int...
This thesis consists of four papers. In paper 1, we prove central limit theorems for Markov chains u...
We consider finite-state Markov chains driven by stationary ergodic invertible processes representin...
We consider iterated function schemes that contract on average with place-dependent probabilities. W...
Given an infinitesimal perturbation of a discrete-time finite Markov chain, we seek the states that ...
types We review the concept of topological recurrence for weak Feller Markov chains on compact state...
Let {X(n), n=0,1,2,...} denote a Markov chain on a general state space and let f be a nonnegative fu...
International audienceIt is known that, in the dependent case, partial sums processes which are elem...
We study the long run behaviour of interactive Markov chains on infinite product spaces. The behavio...
We study Markov chains generated by iterated Lipschitz functions systems with possibly place depende...
We consider Markov chains in the context of iterated random functions and show the existence and uni...
In this paper we extend the results of Meyn and Tweedie (1992b) from discrete-time parameter to cont...
We prove two propositions with conditions that a system, which is described by a transient Markov ch...
In this paper we connect various topological and probabilistic forms of stability for discrete-time ...
We study the long run behaviour of interactive Markov chains on in nite product spaces. The behaviou...
We give an example of place-dependent random iterations with two affine contractions on the unit int...
This thesis consists of four papers. In paper 1, we prove central limit theorems for Markov chains u...
We consider finite-state Markov chains driven by stationary ergodic invertible processes representin...
We consider iterated function schemes that contract on average with place-dependent probabilities. W...
Given an infinitesimal perturbation of a discrete-time finite Markov chain, we seek the states that ...
types We review the concept of topological recurrence for weak Feller Markov chains on compact state...
Let {X(n), n=0,1,2,...} denote a Markov chain on a general state space and let f be a nonnegative fu...
International audienceIt is known that, in the dependent case, partial sums processes which are elem...
We study the long run behaviour of interactive Markov chains on infinite product spaces. The behavio...
We study Markov chains generated by iterated Lipschitz functions systems with possibly place depende...