Parisian quasi-stationary distributions for asymmetric L\'evy processes
Abstract
In recent years there has been some focus on quasi-stationary behaviour of an one-dimensional L\'evy process X, where we ask for the law P(Xt∈ dy | τ-0>t) for t∞ and τ0-=∈f\t≥ 0: Xt<0\. In this paper we address the same question for so-called Parisian ruin time τθ, that happens when process stays below zero longer than independent exponential random variable with intensity θ.
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