The distribution of the zeroes of random trigonometric polynomials

Abstract

We study the asymptotic distribution of the number ZN of zeros of random trigonometric polynomials of degree N as N∞. It is known that as N grows to infinity, the expected number of the zeros is asymptotic to 23· N. The asymptotic form of the variance was predicted by Bogomolny, Bohigas and Leboeuf to be cN for some c>0. We prove that ZN- ZNcN converges to the standard Gaussian. In addition, we find that the analogous result is applicable for the number of zeros in short intervals.