On the Probability of Conjunctions of Stationary Gaussian Processes

Abstract

Let \Xi(t),t0\, 1 i n be independent centered stationary Gaussian processes with unit variance and almost surely continuous sample paths. For given positive constants u,T, define the set of conjunctions C[0,T],u:=\t∈ [0,T]: 1 i n Xi(t) u\. Motivated by some applications in brain mapping and digital communication systems, we obtain exact asymptotic expansion of P(C[0,T],u =) as u∞. Moreover, we establish the Berman sojourn limit theorem for the random process \1 i n Xi(t), t0\ and derive the tail asymptotics of the supremum of each order statistics process.