First passage upwards for state dependent-killed spectrally negative L\'evy processes

Abstract

For a spectrally negative L\'evy process (snLp) X, killed according to a rate that is a function ω of its position, we analyse the exit probability of the one-sided upwards-passage problem. When ω is strictly positive, this problem is related to the determination of the Laplace transform of the first passage time upwards for X that has been time-changed by the inverse of the additive functional ∫0· ω(Xu)du. In particular our findings thus shed extra light on related results concerning first passage times upwards (downwards) of spectrally negative positive self-similar Markov processes (continuous state branching processes).