Real zeros of random analytic functions associated with geometries of constant curvature

Abstract

Let 0, 1, … be i.i.d. random variables with zero mean and unit variance. We study the following four families of random analytic functions: Σk=0n nk k zk (spherical polynomials), Σk=0∞ nkk! k zk (flat random analytic function), Σk=0∞ n+k-1 k k zk (hyperbolic random analytic functions), Σk=0n nkk! k zk (Weyl polynomials). We compute explicitly the limiting mean density of real zeroes of these random functions. More precisely, we provide a formula for n∞ n-1/2 ENn[a,b], where Nn[a, b] is the number of zeroes in the interval [a,b].