On the first passage time density of a continuous Martingale over a moving boundary

Abstract

In this paper we derive the density of the first time T that a continuous martingale M with non-random quadratic variation <M>·:=∫0· h2(u)du hits a moving boundary f which is twice continuously differentiable, and f'/h∈C2[0,∞). Thus, this work is an extension to case in which M is in fact a one-dimensional standard Brownian motion B, as studied in Hernandez-del-Valle (2007).