AbstractConsider a Wiener process W on a circle of circumference L. We prove the rather surprising result that the Laplace transform of the distribution of the first time, θL, when the Wiener process has visited every point of the circle can be solved in closed form using a continuous recurrence approach
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
In this thesis we research and introduce several properties of paths of a Wiener process. At first w...
Brosamler’s formula gives a probabilistic representation of the solution of the Neumann problem for ...
Consider a Wiener process W on a circle of circumference L. We prove the rather surprising result th...
AbstractThe infinite-dimensional Ornstein–Uhlenbeck process v is constructed from Brownian motion on...
In this article, we generalize Wiener\u27s existence result for one-dimensional Brownian motion by c...
Abstract The expected signature is an analogue of the Laplace transform for probability measures on...
The infinite-dimensional Ornstein-Uhlenbeck process v is constructed from Brownian motion on the inf...
AbstractLet Jωx(t) = x + ∝0t bω(s) ds, where bω is planar Brownian motion starting at 0. A Wiener-ty...
We consider the sequential testing of two simple hypotheses for the drift of a Brownian motion when ...
21 pagesInternational audienceWe give a method for computing the iterated Laplace transform of the s...
Alili LarbiNovikov AlexanderSchweizer MartinYor MarcFrom both theoretical and applied perspectives, ...
The Wiener process is the classical example of a mathematical model for Brownian movement. Wiener vi...
This monograph discusses the existence and regularity properties of local times associated to a cont...
This paper is a sequel to Kendall (1987), which explained how the Ito formula for the radial part of...
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
In this thesis we research and introduce several properties of paths of a Wiener process. At first w...
Brosamler’s formula gives a probabilistic representation of the solution of the Neumann problem for ...
Consider a Wiener process W on a circle of circumference L. We prove the rather surprising result th...
AbstractThe infinite-dimensional Ornstein–Uhlenbeck process v is constructed from Brownian motion on...
In this article, we generalize Wiener\u27s existence result for one-dimensional Brownian motion by c...
Abstract The expected signature is an analogue of the Laplace transform for probability measures on...
The infinite-dimensional Ornstein-Uhlenbeck process v is constructed from Brownian motion on the inf...
AbstractLet Jωx(t) = x + ∝0t bω(s) ds, where bω is planar Brownian motion starting at 0. A Wiener-ty...
We consider the sequential testing of two simple hypotheses for the drift of a Brownian motion when ...
21 pagesInternational audienceWe give a method for computing the iterated Laplace transform of the s...
Alili LarbiNovikov AlexanderSchweizer MartinYor MarcFrom both theoretical and applied perspectives, ...
The Wiener process is the classical example of a mathematical model for Brownian movement. Wiener vi...
This monograph discusses the existence and regularity properties of local times associated to a cont...
This paper is a sequel to Kendall (1987), which explained how the Ito formula for the radial part of...
Title: On Selected Geometric Properties of Brownian Motion Paths Author: Mgr. Ondřej Honzl E-mail Ad...
In this thesis we research and introduce several properties of paths of a Wiener process. At first w...
Brosamler’s formula gives a probabilistic representation of the solution of the Neumann problem for ...