The number of real zeros of elliptic polynomials

Abstract

Let Nn(a, b) denote the number of real zeros of Gaussian elliptic polynomials of degree n on the interval (a, b), where a and b may vary with n. We obtain a precise formula for the variance of Nn(a, b) and utilize this expression to derive an asymptotic expansion for large values of n. Furthermore, we provide sharp estimates for the cumulants and central moments of Nn(a, b). These estimates are instrumental in establishing sufficient conditions on the interval (a, b) for Nn(a, b) to satisfy both a central limit theorem and a strong law of large numbers. In the second part of the paper, we extend our analysis to nondegenerate Gaussian analytic functions, including well-known examples such as the Gaussian Weyl series and Weyl polynomials.