Persistence of Gaussian stationary processes: A spectral perspective

Naomi Feldheim; Ohad Feldheim; Shahaf Nitzan

doi:10.1214/20-AOP1470

Abstract

We study the persistence probability of a centered stationary Gaussian process on $\mathbb{Z}$ or $\mathbb{R}$ , that is, its probability to remain positive for a long time. We describe the delicate interplay between this probability and the behavior of the spectral measure of the process near zero and infinity.

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Naomi Feldheim. Ohad Feldheim. Shahaf Nitzan. "Persistence of Gaussian stationary processes: A spectral perspective." Ann. Probab. 49 (3) 1067 - 1096, May 2021. https://doi.org/10.1214/20-AOP1470

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Received: 1 October 2019; Revised: 1 July 2020; Published: May 2021

First available in Project Euclid: 7 April 2021

Digital Object Identifier: 10.1214/20-AOP1470

Subjects:

Primary: 42A38 , 60G10 , 60G15

Keywords: Chebyshev polynomials , gap probability , Gaussian process , one-sided barrier , Persistence , spectral measure , stationary process

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