Sparre-Andersen identity and the last passage time
arXiv:1501.04542
Abstract
It is shown that the celebrated result of Sparre Andersen for random walks and Lévy processes has intriguing consequences when the last time of the process in $(-\infty,0]$, say $Ï$, is added to the picture. In the case of no positive jumps this leads to six random times, all of which have the same distribution - the uniform distribution on $[0,Ï]$. Surprisingly, this result does not appear in the literature, even though it is based on some classical observations concerning exchangeable increments.