A class of diffusion processes with instantaneous reflection on the hyperplanes of an orthant is considered. In the case of constant drift and covariance coefficients, such diffusions arise as limits of properly normalized queue length processes in open queueing networks, under heavy traffic conditions. The directions of the reflection on each hyperplane determine the boundary data in an associated initial-boundary value problem with oblique derivatives for the corresponding Kolmogorov equation. This problem is studied in terms of single layer potentials with densities placed on the hyperplanes of the orthant, and is shown to be equivalent to solving a system of integral equations for those densities. The stochastic representation of the so...
A stochastic differential equation of Wiener-Poisson type is considered in a d-dimensional bounded r...
We consider reflected jump-diffusions in the orthant Rn + with time- and state-dependent drift, dif...
In this paper we establish a formula for the joint Laplace-Stieltjes transform of a reflected Lévy p...
A class of diffusion processes with instantaneous reflection on the hyperplanes of an orthant is con...
Let $X(t)$ be a time-homogeneous diffusion process with state-space $[0,+infty)$, where 0 is a ref...
We study multi-dimensional reflected processes, in particular reflected diffusions constrained to li...
International audienceWe consider an N-dimensional reflected process, modeling an infinite capacity ...
We analyze the transition probability density functions in the presence of a zero-flux condition in ...
Annals of Applied Probability, Vol. 2, pp 65–86 (1992) This paper is concerned with a class of multi...
AbstractSuitable conditions are given under which a diffusion process with a boundary condition rema...
In this thesis, asymptotic properties of two variants of one-dimensional diffusion processes, which ...
We introduce a unified framework for solving first passage times of time- homogeneous diffusion proc...
This paper is concerned with a class of multidimensional diffusion processes, variously known as ref...
Using a parametrix method, localization procedure and probabilistic arguments we construct the trans...
We study a finite system of diffusions on the half-line, absorbed when they hit zero, with a correla...
A stochastic differential equation of Wiener-Poisson type is considered in a d-dimensional bounded r...
We consider reflected jump-diffusions in the orthant Rn + with time- and state-dependent drift, dif...
In this paper we establish a formula for the joint Laplace-Stieltjes transform of a reflected Lévy p...
A class of diffusion processes with instantaneous reflection on the hyperplanes of an orthant is con...
Let $X(t)$ be a time-homogeneous diffusion process with state-space $[0,+infty)$, where 0 is a ref...
We study multi-dimensional reflected processes, in particular reflected diffusions constrained to li...
International audienceWe consider an N-dimensional reflected process, modeling an infinite capacity ...
We analyze the transition probability density functions in the presence of a zero-flux condition in ...
Annals of Applied Probability, Vol. 2, pp 65–86 (1992) This paper is concerned with a class of multi...
AbstractSuitable conditions are given under which a diffusion process with a boundary condition rema...
In this thesis, asymptotic properties of two variants of one-dimensional diffusion processes, which ...
We introduce a unified framework for solving first passage times of time- homogeneous diffusion proc...
This paper is concerned with a class of multidimensional diffusion processes, variously known as ref...
Using a parametrix method, localization procedure and probabilistic arguments we construct the trans...
We study a finite system of diffusions on the half-line, absorbed when they hit zero, with a correla...
A stochastic differential equation of Wiener-Poisson type is considered in a d-dimensional bounded r...
We consider reflected jump-diffusions in the orthant Rn + with time- and state-dependent drift, dif...
In this paper we establish a formula for the joint Laplace-Stieltjes transform of a reflected Lévy p...