On the area between a L\'evy process with secondary jump inputs and its reflected version
Abstract
We study the stochastic properties of the area under some function of the difference between (i) a spectrally positive L\'evy process Wtx that jumps to a level x>0 whenever it hits zero, and (ii) its reflected version Wt. Remarkably, even though the analysis of each of these areas is challenging, we succeed in attaining explicit expressions for their difference. The main result concerns the Laplace-Stieltjes transform of the integral Ax of (a function of) the distance between Wtx and Wt until Wtx hits zero. This result is extended in a number of directions, including the area between Ax and Ay and a Gaussian limit theorem. We conclude the paper with an inventory problem for which our results are particularly useful.
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