Zeros of smooth stationary Gaussian processes

Abstract

Let f:R R be a stationary centered Gaussian process. For any R>0, let R denote the counting measure of \x ∈ R f(Rx)=0\. In this paper, we study the large R asymptotic distribution of R. Under suitable assumptions on the regularity of f and the decay of its correlation function at infinity, we derive the asymptotics as R +∞ of the central moments of the linear statistics of R. In particular, we derive an asymptotics of order Rp2 for the p-th central moment of the number of zeros of f in [0,R]. As an application, we derive a functional Law of Large Numbers and a functional Central Limit Theorem for the random measures~R. More precisely, after a proper rescaling, R converges almost surely towards the Lebesgue measure in weak-* sense. Moreover, the fluctuation of R around its mean converges in distribution towards the standard Gaussian White Noise. The proof of our moments estimates relies on a careful study of the k-point function of the zero point process of~f, for any k ≥ 2. Our analysis yields two results of independent interest. First, we derive an equivalent of this k-point function near any point of the large diagonal in~Rk, thus quantifying the short-range repulsion between zeros of f. Second, we prove a clustering property which quantifies the long-range decorrelation between zeros of f.