27 pagesInternational audienceWe extend the Dirichlet principle to non-reversible Markov processes on countable state spaces. We present two variational formulas for the solution of the Poisson equation or, equivalently, for the capacity between two disjoint sets. As an application we prove some recurrence theorems. In particular, we show the recurrence of two-dimensional cycle random walks under a second moment condition on the winding numbers
The analysis of non-reversible Markov chains is of great theoretical and applied interest. In this t...
For an irreducible symmetric Markov process on a (not necessarily compact) state space associated wi...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
27 pagesInternational audienceWe extend the Dirichlet principle to non-reversible Markov processes o...
In this paper we prove a version of the Berman\tire Konsowa principle for reversible Markov jump pr...
International audienceIn this paper, we investigate the properties of recurrent planar Markov random...
We use Dirichlet form methods to construct and analyse a general class of reversible Markov processe...
AbstractIn [1] and more recently in [2], Chapters III and VII, Spitzer constructs potentials for a p...
Random recurrence relations are stochastic difference equations, which define recursively a sequence...
We consider several random walk related problems in this thesis. In the first part, we study a Marko...
AbstractThis paper deals with characterizations for the distributional regeneration of general Marko...
International audienceThe recurrence and transience of persistent random walks built from variable l...
The recurrence features of persistent random walks built from variable length Markov chains are inve...
We study a Markov chain on Undefined control sequence \RP, where Undefined control sequence \RP is t...
Let {Xn; n ≥ 0} be a Harris-recurrent Markov chain on a general state space. It is shown that ...
The analysis of non-reversible Markov chains is of great theoretical and applied interest. In this t...
For an irreducible symmetric Markov process on a (not necessarily compact) state space associated wi...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...
27 pagesInternational audienceWe extend the Dirichlet principle to non-reversible Markov processes o...
In this paper we prove a version of the Berman\tire Konsowa principle for reversible Markov jump pr...
International audienceIn this paper, we investigate the properties of recurrent planar Markov random...
We use Dirichlet form methods to construct and analyse a general class of reversible Markov processe...
AbstractIn [1] and more recently in [2], Chapters III and VII, Spitzer constructs potentials for a p...
Random recurrence relations are stochastic difference equations, which define recursively a sequence...
We consider several random walk related problems in this thesis. In the first part, we study a Marko...
AbstractThis paper deals with characterizations for the distributional regeneration of general Marko...
International audienceThe recurrence and transience of persistent random walks built from variable l...
The recurrence features of persistent random walks built from variable length Markov chains are inve...
We study a Markov chain on Undefined control sequence \RP, where Undefined control sequence \RP is t...
Let {Xn; n ≥ 0} be a Harris-recurrent Markov chain on a general state space. It is shown that ...
The analysis of non-reversible Markov chains is of great theoretical and applied interest. In this t...
For an irreducible symmetric Markov process on a (not necessarily compact) state space associated wi...
AbstractLet (S, £) be a measurable space with countably generated σ-field £ and (Mn, Xn)n⩾0 a Markov...