We introduce and study the natural counterpart of the Dunkl Markov processes in a negatively curved setting. We give a semimartingale decomposition of the radial part, and some properties of the jumps. We prove also a law of large numbers, a central limit theorem, and the convergence of the normalized process to the Dunkl process. Eventually we describe the asymptotic behavior of the infinite loop as it was done by Anker, Bougerol and Jeulin in the symmetric spaces setting in \cite{ABJ}
The work consists of two parts. In the first part which is concerned with random walks, we construc...
The object of this thesis are jump-type Markov processes. On the one hand, we study random flights o...
AbstractThis paper considers a Markov branching process modified to allow decrements which occur ran...
We introduce and study the natural counterpart of the Dunkl Markov processes in a negatively curved ...
Abstract. This survey may be considered as a continuation of the one written by M. Rösler on the th...
AbstractDunkl operators are parameterized differential-difference operators on RNthat are related to...
In this note we obtain two different types of skew-product representations of the multidimensional D...
Abstract. We interest in radial Dunkl processes associated with dihedral systems. We write down the ...
Abstract. This paper is essentially concerned with the study of the radial Dunkl process associated ...
Original manuscript August 14, 2012Consider an N-dimensional Markov chain obtained from N one-dimens...
We introduce the analogue of Dunkl processes in the case of an affine root system of type $\widetild...
33 pagesWe begin with the study of some properties of the radial Dunkl process associated to a reduc...
The Thoma cone is an infinite-dimensional locally compact space, which is closely related to the spa...
Cette thèse est consacrée à l'étude de certaines propriétés d'exemples de classes de processus déter...
The aim of this work is to study the long time behavior of a branching particle model. More precisel...
The work consists of two parts. In the first part which is concerned with random walks, we construc...
The object of this thesis are jump-type Markov processes. On the one hand, we study random flights o...
AbstractThis paper considers a Markov branching process modified to allow decrements which occur ran...
We introduce and study the natural counterpart of the Dunkl Markov processes in a negatively curved ...
Abstract. This survey may be considered as a continuation of the one written by M. Rösler on the th...
AbstractDunkl operators are parameterized differential-difference operators on RNthat are related to...
In this note we obtain two different types of skew-product representations of the multidimensional D...
Abstract. We interest in radial Dunkl processes associated with dihedral systems. We write down the ...
Abstract. This paper is essentially concerned with the study of the radial Dunkl process associated ...
Original manuscript August 14, 2012Consider an N-dimensional Markov chain obtained from N one-dimens...
We introduce the analogue of Dunkl processes in the case of an affine root system of type $\widetild...
33 pagesWe begin with the study of some properties of the radial Dunkl process associated to a reduc...
The Thoma cone is an infinite-dimensional locally compact space, which is closely related to the spa...
Cette thèse est consacrée à l'étude de certaines propriétés d'exemples de classes de processus déter...
The aim of this work is to study the long time behavior of a branching particle model. More precisel...
The work consists of two parts. In the first part which is concerned with random walks, we construc...
The object of this thesis are jump-type Markov processes. On the one hand, we study random flights o...
AbstractThis paper considers a Markov branching process modified to allow decrements which occur ran...