On Schroedinger's equation, 3-dimensional bessel bridges, and passage time problems

Abstract

We obtain explicit solutions for the density T of the first-time T that a one-dimensional Brownian process B reaches the twice, continuously differentiable moving boundary f and such that f''(t)≥ 0 for all t∈ R+. We do so by finding the expected value of some functionals of a 3-dimensional Bessel bridge X and exploiting its relationship with first-passage time problems as pointed out by Kardaras (2007). It turns out that this problem is related to Schr\"odinger's equation with time-dependent linear potential, see Feng (2001).