A distributional equality for suprema of spectrally positive L\'evy processes
Abstract
Let Y be a spectrally positive L\'evy process with E Y1<0, C an independent subordinator with finite expectation, and X=Y+C. A curious distributional equality proved in Huzak et al., Ann. Appl. Probab. 14 (2004) 1278--1397, states that if E X1<0, then 0 t <∞Yt and the supremum of X just before the first time its new supremum is reached by a jump of C have the same distribution. In this paper we give an alternative proof of an extension of this result and offer an explanation why it is true.
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