Pickands-Piterbarg constants for self-similar Gaussian processes
Abstract
For a centered self-similar Gaussian process \Y(t):t∈[0,∞)\ and R0 we analyze asymptotic behaviour of \[ HYR(T) \; = \; E ( t ∈ [0,T] 2 Y(t) - (1+R) σY2(t) ), \] as T∞. We prove that HYR=T∞ HYR(T)∈(0,∞) for R>0 and \[HY=T∞ HY0(T)Tγ∈(0,∞)\] for suitably chosen γ>0. Additionally, we find bounds for HYR, R>0 and a surprising relation between HY and classical Pickands constants.
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