Expected number of real roots of random trigonometric polynomials

Abstract

We investigate the asymptotics of the expected number of real roots of random trigonometric polynomials Xn(t)=u+1nΣk=1n (Ak(kt)+Bk(kt)), t∈ [0,2π], u∈R whose coefficients Ak, Bk, k∈N, are independent identically distributed random variables with zero mean and unit variance. If Nn[a, b] denotes the number of real roots of Xn in an interval [a,b]⊂eq [0,2π], we prove that n→∞ E Nn[a,b]n=b-aπ3 e-u22.