Pickands constants play a crucial role in the asymptotic theory of Gaussian processes. They are commonly defined as the limits of a sequence of expectations involving fractional Brownian motions and, as such, their exact value is often unknown. Recently, Dieker and Yakir (Bernoulli, 20(3), 1600–1619, 2014) derived a novel representation of Pickands constant as a simple expected value that does not involve a limit operation. In this paper we show that the notion of Pickands constants and their corresponding Dieker–Yakir representations can be extended to a large class of stochastic processes, including general Gaussian and Lévy processes. We furthermore develop a link to extreme value theory and show that Pickands-type constants coincide wit...
Let Wi, i ∈ N{double struck}, be independent copies of a zero-mean Gaussian process {W(t), t ∈ R{dou...
Let {ξ(t)}t∈[0,h] be a stationary Gaussian process with covariance function r such that r(t) = 1 − C...
With motivation from Husler (Extremes 7:179-190, 2004) and Piterbarg (Extremes 7:161-177, 2004) in t...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
Abstract. This paper gives a new representation of Pickands ’ constants, which arise in the study of...
This paper gives a new representation of Pickands ’ constants, which arise in the study of extremes ...
AbstractPickands constants play an important role in the exact asymptotic of extreme values for Gaus...
The recent contribution Dieker & Mikosch (2015) [1] obtained important representations of max-st...
Abstrmt. Pickands constants appear in the asymptotic formulas for extremes of Gaussian processes. Th...
We consider a Gaussian stationary process with Pickands' conditions and evaluate an exact asymptotic...
13 pages, 3 figuresInternational audienceIn the theory of extreme values of Gaussian processes, many...
Let {X (t), t >= 0} be a stationary Gaussian process with zero-mean and unit variance. A deep res...
Let {X-i(t), t >= 0}, 1 <= i <= n be mutually independent centered Gaussian processes with ...
This paper considers extreme values attained by a centered, multidimensional Gaussian process X(t) =...
Let Wi, i ∈ N{double struck}, be independent copies of a zero-mean Gaussian process {W(t), t ∈ R{dou...
Let {ξ(t)}t∈[0,h] be a stationary Gaussian process with covariance function r such that r(t) = 1 − C...
With motivation from Husler (Extremes 7:179-190, 2004) and Piterbarg (Extremes 7:161-177, 2004) in t...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
Pickands constants play an important role in the exact asymptotic of extreme values for Gaussian sto...
Abstract. This paper gives a new representation of Pickands ’ constants, which arise in the study of...
This paper gives a new representation of Pickands ’ constants, which arise in the study of extremes ...
AbstractPickands constants play an important role in the exact asymptotic of extreme values for Gaus...
The recent contribution Dieker & Mikosch (2015) [1] obtained important representations of max-st...
Abstrmt. Pickands constants appear in the asymptotic formulas for extremes of Gaussian processes. Th...
We consider a Gaussian stationary process with Pickands' conditions and evaluate an exact asymptotic...
13 pages, 3 figuresInternational audienceIn the theory of extreme values of Gaussian processes, many...
Let {X (t), t >= 0} be a stationary Gaussian process with zero-mean and unit variance. A deep res...
Let {X-i(t), t >= 0}, 1 <= i <= n be mutually independent centered Gaussian processes with ...
This paper considers extreme values attained by a centered, multidimensional Gaussian process X(t) =...
Let Wi, i ∈ N{double struck}, be independent copies of a zero-mean Gaussian process {W(t), t ∈ R{dou...
Let {ξ(t)}t∈[0,h] be a stationary Gaussian process with covariance function r such that r(t) = 1 − C...
With motivation from Husler (Extremes 7:179-190, 2004) and Piterbarg (Extremes 7:161-177, 2004) in t...