Small and Large Time Stability of the Time taken for a L\'evy Process to Cross Curved Boundaries

Abstract

This paper is concerned with the small time behaviour of a L\'evy process X. In particular, we investigate the stabilities of the times, (r) and (r), at which X, started with X0=0, first leaves the space-time regions \(t,y)∈2: y rtb, t 0\ (one-sided exit), or \(t,y)∈2: |y| rtb, t 0\ (two-sided exit), 0 b<1, as r 0. Thus essentially we determine whether or not these passage times behave like deterministic functions in the sense of different modes of convergence; specifically convergence in probability, almost surely and in Lp. In many instances these are seen to be equivalent to relative stability of the process X itself. The analogous large time problem is also discussed.