International audienceConsider an irreducible, aperiodic and positive recurrent discrete time Markov chain (Xn, n ≥ 0) with invariant distribution µ. We shall investigate the long time behaviour of some functionals of the chain, in particular the additive functional Sn = n i=1 f (Xi) for a possibly non square integrable function f. To this end we shall link ergodic properties of the chain to mixing properties, extending known results in the continuous time case. We will then use existing results of convergence to stable distributions, obtained in [13, 21, 16, 4] for stationary mixing sequences. Contrary to the usual L 2 framework studied in [6], where weak forms of ergodicity are sufficient to ensure the validity of the Central Limit Theore...
This paper is intended to study the limit theorem of Markov chain function in the environment of sin...
AbstractWe consider a class of discrete parameter Markov processes on a complete separable metric sp...
We first give an extension of a theorem of Volkonskii and Rozanov characterizing the strictly statio...
International audienceConsider an irreducible, aperiodic and positive recurrent discrete time Markov...
Consider an irreducible, aperiodic and positive recurrent discrete time Markov chain (Xn...
Consider a Markov chain $\{X_n\}_{n\ge 0}$ with an ergodic probability measure $\pi$. Let $\Psi$ a f...
AbstractWe study different types of limit behavior of infinite dimension discrete time nonhomogeneou...
Abstract. Consider a Markov chain {Xn}n≥0 with an ergodic probability measure pi. Let Ψ be a functio...
Consider a Markov chain {Xn}n≥0 with an ergodic probability measure pi. Let Ψ be a function on the s...
AbstractFor finite Markov chains the eigenvalues of P can be used to characterize the chain and also...
Consider the partial sums {St} of a real-valued functional F(Φ(t)) of a Markov chain {Φ(0)} with val...
Let Xn be an irreducible aperiodic recurrent Markov chain with countable state space I and with the ...
communicated by I. Pinelis Abstract. For the distribution of a finite, homogeneous, continuous-time ...
This book shows how techniques from the perturbation theory of operators, applied to a quasi-compact...
International audienceWe revisit functional central limit theorems for additive functionals of ergod...
This paper is intended to study the limit theorem of Markov chain function in the environment of sin...
AbstractWe consider a class of discrete parameter Markov processes on a complete separable metric sp...
We first give an extension of a theorem of Volkonskii and Rozanov characterizing the strictly statio...
International audienceConsider an irreducible, aperiodic and positive recurrent discrete time Markov...
Consider an irreducible, aperiodic and positive recurrent discrete time Markov chain (Xn...
Consider a Markov chain $\{X_n\}_{n\ge 0}$ with an ergodic probability measure $\pi$. Let $\Psi$ a f...
AbstractWe study different types of limit behavior of infinite dimension discrete time nonhomogeneou...
Abstract. Consider a Markov chain {Xn}n≥0 with an ergodic probability measure pi. Let Ψ be a functio...
Consider a Markov chain {Xn}n≥0 with an ergodic probability measure pi. Let Ψ be a function on the s...
AbstractFor finite Markov chains the eigenvalues of P can be used to characterize the chain and also...
Consider the partial sums {St} of a real-valued functional F(Φ(t)) of a Markov chain {Φ(0)} with val...
Let Xn be an irreducible aperiodic recurrent Markov chain with countable state space I and with the ...
communicated by I. Pinelis Abstract. For the distribution of a finite, homogeneous, continuous-time ...
This book shows how techniques from the perturbation theory of operators, applied to a quasi-compact...
International audienceWe revisit functional central limit theorems for additive functionals of ergod...
This paper is intended to study the limit theorem of Markov chain function in the environment of sin...
AbstractWe consider a class of discrete parameter Markov processes on a complete separable metric sp...
We first give an extension of a theorem of Volkonskii and Rozanov characterizing the strictly statio...