AbstractLet (Xn) be a positive recurrent Harris chain on a general state space, with invariant probability measure π. We give necessary and sufficient conditions for the geometric convergence of λPnf towards its limit π(f), and show that when such convergence happens it is, in fact, uniform over f and in L1(π)-norm. As a corollary we obtain that, when (Xn) is geometrically ergodic, ∝ π(dx)‖Pn(x,·)-π‖ converges to zero geometrically fast. We also characterize the geometric ergodicity of (Xn) in terms of hitting time distributions. We show that here the so-called small sets act like individual points of a countable state space chain. We give a test function criterion for geometric ergodicity and apply it to random walks on the positive half l...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
"Random walks $S_{N}=(S_{n})_{n¥geqq 0}$ with stochastically bounded increments $X_{0},$ $X_{1},$ $¥...
International audienceThe recurrence and transience of persistent random walks built from variable l...
Let (Xn) be a positive recurrent Harris chain on a general state space, with invariant probability m...
AbstractLet (Xn) be a positive recurrent Harris chain on a general state space, with invariant proba...
We give computable bounds on the rate of convergence of the transition probabil-ities to the station...
AbstractWe derive sufficient conditions for ∝ λ (dx)‖Pn(x, ·) - π‖ to be of order o(ψ(n)-1), where P...
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...
Let {Xn; n ≥ 0} be a Harris-recurrent Markov chain on a general state space. It is shown that ...
In this paper, we give quantitative bounds on the $f$-total variation distance from convergence of a...
Abstract. We construct an irreducible ergodic Harris chain {Xn} from a diffusion {St} and barriers ρ...
International audienceLet $(X_n)_{n \in\mathbb{N}}$ be a $V$-geometrically ergodic Markov chain on a...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...
This article studies the convergence properties of trans-dimensional MCMC algorithms when the total ...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
"Random walks $S_{N}=(S_{n})_{n¥geqq 0}$ with stochastically bounded increments $X_{0},$ $X_{1},$ $¥...
International audienceThe recurrence and transience of persistent random walks built from variable l...
Let (Xn) be a positive recurrent Harris chain on a general state space, with invariant probability m...
AbstractLet (Xn) be a positive recurrent Harris chain on a general state space, with invariant proba...
We give computable bounds on the rate of convergence of the transition probabil-ities to the station...
AbstractWe derive sufficient conditions for ∝ λ (dx)‖Pn(x, ·) - π‖ to be of order o(ψ(n)-1), where P...
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...
Let {Xn; n ≥ 0} be a Harris-recurrent Markov chain on a general state space. It is shown that ...
In this paper, we give quantitative bounds on the $f$-total variation distance from convergence of a...
Abstract. We construct an irreducible ergodic Harris chain {Xn} from a diffusion {St} and barriers ρ...
International audienceLet $(X_n)_{n \in\mathbb{N}}$ be a $V$-geometrically ergodic Markov chain on a...
AbstractA notion of ergodicity is defined by analogy to homogeneous chains, and a necessary and suff...
This article studies the convergence properties of trans-dimensional MCMC algorithms when the total ...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
"Random walks $S_{N}=(S_{n})_{n¥geqq 0}$ with stochastically bounded increments $X_{0},$ $X_{1},$ $¥...
International audienceThe recurrence and transience of persistent random walks built from variable l...