CLT for fluctuations of linear statistics in the Sine-beta process

Abstract

We prove, for any β >0, a central limit theorem for the fluctuations of linear statistics in the Sine-β process, which is the infinite volume limit of the random microscopic behavior in the bulk of one-dimensional log-gases at inverse temperature β. If φ is a compactly supported test function of class C4, and C is a random point configuration distributed according to Sine-β, the integral of φ(· / ) against the random fluctuation dC - dx, converges in law, as goes to infinity, to a centered normal random variable whose standard deviation is proportional to the Sobolev H1/2 norm of φ on the real line. The proof relies on the DLR equations for Sine-β established by Dereudre-Hardy-Ma\"ida and the author, the Laplace transform trick introduced by Johansson, and a transportation method previously used for β-ensembles at macroscopic scale.