Tail Asymptotics of Supremum of Certain Gaussian Processes over Threshold Dependent Random Intervals
Abstract
Let \X(t),t0\ be a centered Gaussian process and let γ be a non-negative constant. In this paper we study the asymptotics of P\t∈ [0,T/uγ] X(t)>u\ as u∞, with T an independent of X non-negative random variable. As an application, we derive the asymptotics of finite-time ruin probability of time-changed fractional Brownian motion risk processes.
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