Optimal Prediction of the Last-Passage Time of a Transient Diffusion

Abstract

We identify the integrable stopping time τ* with minimal L1-distance to the last-passage time γz to a given level z>0, for an arbitrary non-negative time-homogeneous transient diffusion X. We demonstrate that τ* is in fact the first time that X assumes a value outside a half-open interval [0,r*). The upper boundary r*>z of this interval is characterised either as the solution for a one-dimensional optimisation problem, or as part of the solution for a free-boundary problem. A number of concrete examples illustrate the result.