Fluctuations of linear statistics for Gaussian perturbations of the lattice Zd

Abstract

We study the point process W in Rd obtained by adding an independent Gaussian vector to each point in Zd. Our main concern is the asymptotic size of fluctuations of the linear statistics in the large volume limit, defined as \[ N(h,R) = Σw∈ W h(wR), \] where h∈ (L1 L2)(Rd) is a test function and R ∞. We will also consider the stationary counter-part of the process W, obtained by adding to all perturbations a random vector which is uniformly distributed on [0,1]d and is independent of all the Gaussians. We focus on two main examples of interest, when the test function h is either smooth or is an indicator function of a convex set with a smooth boundary whose curvature does not vanish.