Motivated by questions related to a fragmentation process which has been studied by Aldous, Pitman, and Bertoin, we use the continuous-time ballot theorem to establish some results regarding the lengths of the excursions of Brownian motion and related processes. We show that the distribution of the lengths of the excursions below the maximum for Brownian motion conditioned to first hit [lambda]>0 at time t is not affected by conditioning the Brownian motion to stay below a line segment from (0,c) to (t,[lambda]). We extend a result of Bertoin by showing that the length of the first excursion below the maximum for a negative Brownian excursion plus drift is a size-biased pick from all of the excursion lengths, and we describe the law of a ne...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study a dyadic branching Brownian motion on the real line with absorption at 0, drift µ ∈ R and s...
AbstractMotivated by questions related to a fragmentation process which has been studied by Aldous, ...
Let (B s , s≥ 0) be a standard Brownian motion and T 1 its first passage time at level 1. For every ...
Suppose that (Xt ) t ≥0 is a one-dimensional Brownian motion with negative drift -μ. It is possible ...
This thesis is composed of six chapters, which mainly deals with embedding continuous paths in Brown...
AbstractWe penalise Brownian motion by a function of its one-sided supremum considered up to the las...
We derive, the joint probability density of the maximum), ( mtMP M and the time at which this maximu...
AbstractThe local time of a Brownian motion can be constructed from its excursions. The normalised e...
We study a scaled version of a two-parameter Brownian penalization model introduced by Roynette-Vall...
This monograph discusses the existence and regularity properties of local times associated to a cont...
International audienceWe study a model of diffusion in a brownian potential. This model was firstly ...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
AbstractExtending a path decomposition which is known to hold both for Brownian motion and random wa...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study a dyadic branching Brownian motion on the real line with absorption at 0, drift µ ∈ R and s...
AbstractMotivated by questions related to a fragmentation process which has been studied by Aldous, ...
Let (B s , s≥ 0) be a standard Brownian motion and T 1 its first passage time at level 1. For every ...
Suppose that (Xt ) t ≥0 is a one-dimensional Brownian motion with negative drift -μ. It is possible ...
This thesis is composed of six chapters, which mainly deals with embedding continuous paths in Brown...
AbstractWe penalise Brownian motion by a function of its one-sided supremum considered up to the las...
We derive, the joint probability density of the maximum), ( mtMP M and the time at which this maximu...
AbstractThe local time of a Brownian motion can be constructed from its excursions. The normalised e...
We study a scaled version of a two-parameter Brownian penalization model introduced by Roynette-Vall...
This monograph discusses the existence and regularity properties of local times associated to a cont...
International audienceWe study a model of diffusion in a brownian potential. This model was firstly ...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
AbstractExtending a path decomposition which is known to hold both for Brownian motion and random wa...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study the convergence of the M/G/1 processor-sharing, queue length process in the heavy traffic r...
We study a dyadic branching Brownian motion on the real line with absorption at 0, drift µ ∈ R and s...