Shunsuke Kaji, Muneya Matsui
Published 2023-03-15Version 1
We study a first passage time of a L\'evy process over a positive constant level. In the spectrally negative case we give conditions for absolutely continuity of the distributions of the first passage times. The tail asymptotics of their densities are also clarified, where the asymptotics depend on tail behaviour of the corresponding L\'evy measures. We apply our results to the mathematical finance, in particular, the credit default swap pricing.
Comments: 16 pages, presented at the annual workshop "Infinitely divisible processes and related topics" held in Dec. 2022
On moments of downwards passage times for spectrally negative Lévy processes
First passage times of Lévy processes over a one-sided moving boundary
Karhunen-Loeve expansions of Levy processes
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