One-dimensional reflected diffusions with two boundaries and an inverse first-hitting problem

Abstract

We study an inverse first-hitting problem for a one-dimensional, time-homogeneous diffusion X(t) reflected between two boundaries a and b, which starts from a random position η. Let a S b be a given threshold, such that P( η ∈ [a,S])=1, and F an assigned distribution function. The problem consists of finding the distribution of η such that the first-hitting time of X to S has distribution F. This is a generalization of the analogous problem for ordinary diffusions, i.e. without reflecting, previously considered by the author.