Real Zeros of Random Sums with I.I.D. Coefficients

Abstract

Let \fk\ be a sequence of entire functions that are real valued on the real-line. We study the expected number of real zeros of random sums of the form Pn(z)=Σk=0nηk fk(z), where \ηk\ are real valued i.i.d.~random variables. We establish a formula for the density function n for the expected number of real zeros of Pn. As a corollary, taking the random variables \ηk\ to be i.i.d.~standard Gaussian, appealing to Fourier inversion we recover the representation for the density function previously given by Vanderbei through means of a different proof. Placing the restrictions on the common characteristic function φ of \ηk\ that |φ(s)|≤ (1+as2)-q, with a>0 and q≥ 1, as well as that φ is three times differentiable with each the second and third derivatives being uniformly bounded, we achieve an upper bound on the density function n with explicit constants that depend only on the restrictions on φ. As an application we considered the limiting value of n when the spanning functions fk(z)=pk(z), k=0,1,…, n, where \pk\ are Bergman polynomials on the unit disk.