A simple proof of local universality for roots of Kac polynomials

Abstract

Let fn be a random polynomial of degree n with i.i.d. mean-zero and finite variance random coefficients. It is well known that the roots of fn cluster uniformly around the unit circle as n grows large. We give a simple and self-contained proof of local universality for the correlation functions of the roots at the microscopic scale 1/n around a fixed point on the circle. While previous proofs of local universality were focused on studying the logarithmic potential of fn, we instead directly compare the scaled random polynomial to a limiting Gaussian analytic function, and establish convergence of correlations via a soft argument, using only basic complex analysis and an anti-concentration bound of Esseen.

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