24 pagesInternational audienceConsider a negatively drifted one dimensional Brownian motion starting at positive initial position, its first hitting time to 0 has the inverse Gaussian law. Moreover, conditionally on this hitting time, the Brownian motion up to that time has the law of a 3- dimensional Bessel bridge. In this paper, we give a generalization of this result to a family of Brownian motions with interacting drifts, indexed by the vertices of a conductance network. The hitting times are equal in law to the inverse of a random potential that appears in the analysis of a self-interacting process called the Vertex Reinforced Jump Process ([17, 18]). These Brownian motions with interacting drifts have remarkable properties with respec...
We consider the model of random evolution on the real line consisting in a Brownian motion perturbed...
Abstract. We study Markov processes where the “time ” parameter is replaced by paths in a directed g...
In this work, Brownian motions on metric graphs are defined as right continuous, strong Markov proc...
24 pagesInternational audienceConsider a negatively drifted one dimensional Brownian motion starting...
His document concerns reinforced random processes, in particular the VRJP (vertex-reinforced jump pr...
We introduce a non-reversible generalization of the Vertex-Reinforced Jump Process (VRJP), which we ...
Cette thèse porte sur les processus aléatoires renforcés, en particulier le VRJP (processus de saut ...
Reinforced random walks are processes whose future behavior is influenced by their history. A reinfo...
37 pagesInternational audienceThis paper concerns the Vertex reinforced jump process (VRJP), the Edg...
A token located at some vertex v of a connected, undirected graph G on n vertices is said to be taki...
We study the asymptotic behaviour of the martingale (ψ n (o)) n∈N associated with the Vertex Reinfor...
We consider two skew Brownian motions, driven by the same Brownian motion, with different startingpo...
Abstract. We study systems of Brownian particles on the real line, which interact by splitting the l...
We consider the model of random evolution on the real line consisting in a Brownian motion perturbed...
Abstract. Edge-reinforced random walk (ERRW), introduced by Coppersmith and Diaconis in 1986 [5], is...
We consider the model of random evolution on the real line consisting in a Brownian motion perturbed...
Abstract. We study Markov processes where the “time ” parameter is replaced by paths in a directed g...
In this work, Brownian motions on metric graphs are defined as right continuous, strong Markov proc...
24 pagesInternational audienceConsider a negatively drifted one dimensional Brownian motion starting...
His document concerns reinforced random processes, in particular the VRJP (vertex-reinforced jump pr...
We introduce a non-reversible generalization of the Vertex-Reinforced Jump Process (VRJP), which we ...
Cette thèse porte sur les processus aléatoires renforcés, en particulier le VRJP (processus de saut ...
Reinforced random walks are processes whose future behavior is influenced by their history. A reinfo...
37 pagesInternational audienceThis paper concerns the Vertex reinforced jump process (VRJP), the Edg...
A token located at some vertex v of a connected, undirected graph G on n vertices is said to be taki...
We study the asymptotic behaviour of the martingale (ψ n (o)) n∈N associated with the Vertex Reinfor...
We consider two skew Brownian motions, driven by the same Brownian motion, with different startingpo...
Abstract. We study systems of Brownian particles on the real line, which interact by splitting the l...
We consider the model of random evolution on the real line consisting in a Brownian motion perturbed...
Abstract. Edge-reinforced random walk (ERRW), introduced by Coppersmith and Diaconis in 1986 [5], is...
We consider the model of random evolution on the real line consisting in a Brownian motion perturbed...
Abstract. We study Markov processes where the “time ” parameter is replaced by paths in a directed g...
In this work, Brownian motions on metric graphs are defined as right continuous, strong Markov proc...