Piterbarg Theorems for Chi-processes with Trend
Abstract
Let n(t) = (Σi=1n Xi2(t))1/2,t0 be a chi-process with n degrees of freedom where Xi's are independent copies of some generic centered Gaussian process X. This paper derives the exact asymptotic behavior of Pt∈[0,T] n(t)>u as u ∞, where T is a given positive constant, and g(·) is some non-negative bounded measurable function. The case g(t)0 is investigated in numerous contributions by V.I. Piterbarg. Our novel asymptotic results for both stationary and non-stationary Xare referred to as Piterbarg theorems for chi-processes with trend.
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