Uniqueness of First Passage Time Distributions via Fredholm Integral Equations

Abstract

Let W be a standard Brownian motion with W0 = 0 and let b: R+ R be a continuous function with b(0) > 0. The first passage time (from below) is then defined as align* τ := ∈f \ t ≥ 0 Wt ≥ b(t) \. align* It is well-known that the distribution F of τ satisfies a set of Fredholm equations of the first kind, which is used, for example, as a starting point for numerical approaches. For this, it is fundamental that the Fredholm equations have a unique solution. In this article, we prove this in a general setting using analytical methods.