AbstractThe purpose of this paper is to present in a more or less self-contained way the chief facts about the local times t of one-dimensional Brownian motion due to P. Lévy, F. Knight, D. B. Ray, and Itô-McKean. The deepest part concerns the remarkable fact that for a class of stopping times m, such as passage times and independent exponential holding times, the local time t(m, x) is a diffusion relative to its spatial parameter x. The beautiful methods of D. Williams are employed here as being most in the manner of P. Lévy who began the whole thing. The intent is purely expository, and only the main features of the proofs are indicated. A familiarity with the most elementary facts about Brownian motion is assumed. The paper is dedicated ...
The asymptotic behavior of the local time of Brownian motion on the circle is investigated. For fixe...
International audienceWe study a model of diffusion in a brownian potential. This model was firstly ...
We construct a model of Brownian motion in Minkowski space. There are two aspects of the problem. Th...
AbstractThe purpose of this paper is to present in a more or less self-contained way the chief facts...
In this paper we study the local times of Brownian motion from the point of view of algorithmic rand...
AbstractWe study the random field of local time picked up over the entire life of a super-Brownian m...
In this thesis, we study the distributional properties of functionals of the Brownian motion. The th...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
This article is concerned with modulus of continuity of Brownian local times. Specifically, we focus...
AbstractIn this paper, we study the fractional smoothness of local times of general processes starti...
We study the local times of fractional Brownian motions for all temporal dimensions, N, spatial dime...
AbstractHere, we study the asymptotic behavior of the maximum local time L∗(t) of the diffusion in B...
AbstractWe characterize the upper and lower functions of a real-valued Wiener process normalized by ...
AbstractSuppose Sn is a mean zero, variance one random walk. Under suitable assumptions on the incre...
Estimates for the local and uniform moduli of continuity of the local time of the multifractional Br...
The asymptotic behavior of the local time of Brownian motion on the circle is investigated. For fixe...
International audienceWe study a model of diffusion in a brownian potential. This model was firstly ...
We construct a model of Brownian motion in Minkowski space. There are two aspects of the problem. Th...
AbstractThe purpose of this paper is to present in a more or less self-contained way the chief facts...
In this paper we study the local times of Brownian motion from the point of view of algorithmic rand...
AbstractWe study the random field of local time picked up over the entire life of a super-Brownian m...
In this thesis, we study the distributional properties of functionals of the Brownian motion. The th...
Brownian Motion is one of the most useful tools in the arsenal of stochastic models. This phenomenon...
This article is concerned with modulus of continuity of Brownian local times. Specifically, we focus...
AbstractIn this paper, we study the fractional smoothness of local times of general processes starti...
We study the local times of fractional Brownian motions for all temporal dimensions, N, spatial dime...
AbstractHere, we study the asymptotic behavior of the maximum local time L∗(t) of the diffusion in B...
AbstractWe characterize the upper and lower functions of a real-valued Wiener process normalized by ...
AbstractSuppose Sn is a mean zero, variance one random walk. Under suitable assumptions on the incre...
Estimates for the local and uniform moduli of continuity of the local time of the multifractional Br...
The asymptotic behavior of the local time of Brownian motion on the circle is investigated. For fixe...
International audienceWe study a model of diffusion in a brownian potential. This model was firstly ...
We construct a model of Brownian motion in Minkowski space. There are two aspects of the problem. Th...