On maxima and ladder processes for a dense class of Levy processes
Abstract
Consider the problem to explicitly calculate the law of the first passage time T(a) of a general Levy process Z above a positive level a. In this paper it is shown that the law of T(a) can be approximated arbitrarily closely by the laws of Tn(a), the corresponding first passages time for Xn, where (Xn)n is a sequence of Levy processes whose positive jumps follow a phase-type distribution. Subsequently, explicit expressions are derived for the laws of Tn(a) and the upward ladder process of Xn. The derivation is based on an embedding of Xn into a class of Markov additive processes and on the solution of the fundamental (matrix) Wiener-Hopf factorisation for this class. This Wiener-Hopf factorisation can be computed explicitly by solving iteratively a certain fixed point equation. It is shown that, typically, this iteration converges geometrically fast.
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