First-passage time of a Brownian motion: two unexpected journeys

Abstract

The distribution of the first-passage time (FPT)Ta for a Brownian particle with drift μ subject to hitting an absorber at a level a>0 is well-known and given by its density γ(t) = a2 π t3 e-(a-μ t)22 t, t>0, which is normalized only if μ ≥ 0. This article demonstrates the existence of two additional diffusion process categories (one with one parameter and the other with two) that have the same first passage-time distributions when μ <0. For both, we identify the transition densities and thoroughly investigate the processes. A substantial implication is that the first-passage time distribution does not indicate whether the process originates from a drifted Brownian motion or from one of the new processes presented.