Extremes of multidimensional Gaussian processes
Abstract
This paper considers extreme values attained by a centered, multidimensional Gaussian process X(t)= (X1(t),…,Xn(t)) minus drift d(t)=(d1(t),…,dn(t)), on an arbitrary set T. Under mild regularity conditions, we establish the asymptotics of \[ P(∃t∈ T:i=1n\Xi(t)-di(t)>qiu\),\] for positive thresholds qi>0, i=1,…,n, and u∞. Our findings generalize and extend previously known results for the single-dimensional and two-dimensional cases. A number of examples illustrate the theory.
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