New asymptotics for the mean number of zeros of random trigonometric polynomials with strongly dependent Gaussian coefficients

Abstract

We consider random trigonometric polynomials of the form \[ fn(t):=1n Σk=1nak (k t)+bk (k t), \] where (ak)k≥ 1 and (bk)k≥ 1 are two independent stationary Gaussian processes with the same correlation function : k (kα), with α≥ 0. We show that the asymptotics of the expected number of real zeros differ from the universal one 23, holding in the case of independent or weakly dependent coefficients. More precisely, for all >0, for all ∈ (2,2], there exists α ≥ 0 and n≥ 1 large enough such that |E[N(fn,[0,2π])]n-|≤ , where N(fn,[0,2π]) denotes the number of real zeros of the function fn in the interval [0,2π]. Therefore, this result provides the first example where the expected number of real zeros do not converge as n goes to infinity by exhibiting a whole range of possible limits ranging from 2 to 2.