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On the finiteness and tails of perpetuities under a Lamperti–Kiu MAP
Published online by Cambridge University Press: 22 November 2021
Abstract
Consider a Lamperti–Kiu Markov additive process 
$(J, \xi)$ on 
$\{+, -\}\times\mathbb R\cup \{-\infty\}$, where J is the modulating Markov chain component. First we study the finiteness of the exponential functional and then consider its moments and tail asymptotics under Cramér’s condition. In the strong subexponential case we determine the subexponential tails of the exponential functional under some further assumptions.
MSC classification
Primary:
60G18: Self-similar processes
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- Original Article
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- Copyright
- © The Author(s), 2021. Published by Cambridge University Press on behalf of Applied Probability Trust
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