A sharp transition in zero overcrowding and undercrowding probabilities for Stationary Gaussian Processes
Abstract
We study the probability that a real stationary Gaussian process has at least η T zeros in [0,T] (overcrowding), or at most this number (undercrowding). We show that if the spectral measure of the process is supported on [B,A], overcrowding probability transitions from exponential decay to Gaussian decay at η=Aπ, while undercrowding probability undergoes the reverse transition at η=Bπ.
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