Ray-Knight Theorems for Spectrally Negative L\'evy Processes

Abstract

In this paper, we study the law of the local time processes (LTx(X),x∈ R) associated to a spectrally negative L\'evy process X, in the cases T=τa+, the first passage time of X above a>0 and T=τ(c), the first time it accumulates c units of local time at zero. We describe the branching structure of local times and Poissonian constructions of them using excursion theory. The presence of jumps for X creates a type of excursions which can contribute simultaneously to local times of levels above and below a given reference point. This fact introduces dependency on local times, causing them to be non-Markovian. Nonetheless, the overshoots and undershoots of excursions will be useful to analyze this dependency. In both cases, local times are infinitely divisible and we give a description of the corresponding L\'evy measures in terms of excursion measures. These are hence analogues in the spectrally negative L\'evy case of the first and second Ray-Knight theorems, originally stated for the Brownian motion.