Local universality for real roots of random trigonometric polynomials

Abstract

Consider a random trigonometric polynomial Xn: R R of the form Xn(t) = Σk=1n ( k (kt) + ηk (kt)), where (1,η1),(2,η2),… are independent identically distributed bivariate real random vectors with zero mean and unit covariance matrix. Let (sn)n∈ N be any sequence of real numbers. We prove that as n∞, the number of real zeros of Xn in the interval [sn+a/n, sn+ b/n] converges in distribution to the number of zeros in the interval [a,b] of a stationary, zero-mean Gaussian process with correlation function ( t)/t. We also establish similar local universality results for the centered random vectors (k,ηk) having an arbitrary covariance matrix or belonging to the domain of attraction of a two-dimensional α-stable law.