Title of article
Extremal behavior of regularly varying stochastic processes
Author/Authors
Hult، نويسنده , , Henrik and Lindskog، نويسنده , , Filip، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2005
Pages
26
From page
249
To page
274
Abstract
We study a formulation of regular variation for multivariate stochastic processes on the unit interval with sample paths that are almost surely right-continuous with left limits and we provide necessary and sufficient conditions for such stochastic processes to be regularly varying. A version of the Continuous Mapping Theorem is proved that enables the derivation of the tail behavior of rather general mappings of the regularly varying stochastic process. For a wide class of Markov processes with increments satisfying a condition of weak dependence in the tails we obtain simplified sufficient conditions for regular variation. For such processes we show that the possible regular variation limit measures concentrate on step functions with one step, from which we conclude that the extremal behavior of such processes is due to one big jump or an extreme starting point. By combining this result with the Continuous Mapping Theorem, we are able to give explicit results on the tail behavior of various vectors of functionals acting on such processes. Finally, using the Continuous Mapping Theorem we derive the tail behavior of filtered regularly varying Lévy processes.
Keywords
Regular variation , Markov processes , Extreme values , Functional limit theorem
Journal title
Stochastic Processes and their Applications
Serial Year
2005
Journal title
Stochastic Processes and their Applications
Record number
1577552
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