Excursions of a spectrally negative L\'evy process from a two-point set

Abstract

Let a∈ (0,∞). For a spectrally negative L\'evy process X with infinite variation paths the resolvent of the process killed on hitting the two-point set V=\-a,a\ is identified. When further X has no diffusion component the Laplace transforms of the entrance laws of the excursion measures of X from V are determined. This is then applied to establishing the Laplace transform of the amount of time that elapses between the last visit of X to a given point x, before hitting some other point y>x, and the hitting time of y. All the expressions are explicit and tractable in the standard fluctuation quantities associated to X.