Explicit formula for the supremum distribution of a spectrally negative stable process

Abstract

In this article we get simple explicit formulas for s≤ tX(s) where X is a spectrally positive or negative L\'evy process with infinite variation. As a consequence we derive a generalization of the well-known formula for the supremum distribution of Wiener process that is we obtain (s≤ tZα(s)≥ u)=α (Zα(t)≥ u) for u≥ 0 where Zα is a spectrally negative L\'evy process with 1<α≤ 2 which also stems from Kendall's identity for the first crossing time. Our proof uses a formula for the supremum distribution of a spectrally positive L\'evy process which follows easily from the elementary Seals formula.