Extremes of stationary Gasussian storage models
Abstract
For the stationary storage process \Q(t), t0\, with Q(t)= s t(X(s)-X(t)-c(s-t)β), where \X(t),t 0\ is a centered Gaussian process with stationary increments, c>0 and β>0 is chosen such that Q(t) is finite a.s., we derive exact asymptotics of P(t∈ [0,Tu] Q(t)>u) and P(∈ft∈ [0,Tu] Q(t)>u), as u→∞. As a by-product we find conditions under which strong Piterbarg property holds.
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