Reflected Brownian Motion in a wedge: sum-of-exponential absorption probability at the vertex and differential properties

Abstract

We study a Brownian motion with drift in a wedge of angle β which is obliquely reflected on each edge along angles and δ. We assume that the classical parameter α=δ+ - πβ is greater than 1 and we focus on transient cases where the process can either be absorbed at the vertex or escape to infinity. We show that α∈N* is a necessary and sufficient condition for the absorption probability, seen as a function of the starting point, to be written as a finite sum of terms of exponential product form. In such cases, we give expressions for the absorption probability and its Laplace transform. When α∈Z+πβZ we find explicit D-algebraic expression for the Laplace transform. Our results rely on Tutte's invariant method and on a recursive compensation approach.