Tail asymptotics for the supremum of an infinitely divisible field with convolution equivalent Lévy measure

Anders Rønn-Nielsen; Eva B. Vedel Jensen

doi:10.1017/jpr.2015.22

Tail asymptotics for the supremum of an infinitely divisible field with convolution equivalent Lévy measure

Anders Rønn-Nielsen, Eva B. Vedel Jensen

Department of Mathematical Sciences

4 Citations (Scopus)

Abstract

We consider a continuous, infinitely divisible random field in Rd given as an integral of a kernel function with respect to a Levy basis with convolution equivalent Levy measure. For a large class of such random fields we compute the asymptotic probability that the supremum of the field exceeds the level x as x → ∞. Our main result is that the asymptotic probability is equivalent to the right tail of the underlying Levy measure.

Original language	English
Journal	Journal of Applied Probability
Volume	53
Issue number	1
Pages (from-to)	244-261.
ISSN	0021-9002
DOIs	https://doi.org/10.1017/jpr.2015.22
Publication status	Published - Mar 2016

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https://projecteuclid.org/euclid.jap/1457470572

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title = "Tail asymptotics for the supremum of an infinitely divisible field with convolution equivalent L{\'e}vy measure",

abstract = "We consider a continuous, infinitely divisible random field in Rd given as an integral of a kernel function with respect to a Levy basis with convolution equivalent Levy measure. For a large class of such random fields we compute the asymptotic probability that the supremum of the field exceeds the level x as x → ∞. Our main result is that the asymptotic probability is equivalent to the right tail of the underlying Levy measure.",

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AU - Rønn-Nielsen, Anders

AU - Jensen, Eva B. Vedel

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N2 - We consider a continuous, infinitely divisible random field in Rd given as an integral of a kernel function with respect to a Levy basis with convolution equivalent Levy measure. For a large class of such random fields we compute the asymptotic probability that the supremum of the field exceeds the level x as x → ∞. Our main result is that the asymptotic probability is equivalent to the right tail of the underlying Levy measure.

AB - We consider a continuous, infinitely divisible random field in Rd given as an integral of a kernel function with respect to a Levy basis with convolution equivalent Levy measure. For a large class of such random fields we compute the asymptotic probability that the supremum of the field exceeds the level x as x → ∞. Our main result is that the asymptotic probability is equivalent to the right tail of the underlying Levy measure.

U2 - 10.1017/jpr.2015.22

DO - 10.1017/jpr.2015.22

M3 - Journal article

SN - 0021-9002

VL - 53

SP - 244-261.

JO - Journal of Applied Probability

JF - Journal of Applied Probability

IS - 1

ER -

Tail asymptotics for the supremum of an infinitely divisible field with convolution equivalent Lévy measure

Abstract

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