On rate of convergence for universality limits

Abstract

Given a probability measure μ on the unit circle T, consider the reproducing kernel kμ,n(z1, z2) in the space of polynomials of degree at most n-1 with the L2(μ)-inner product. Let u, v ∈ C. It is known that under mild assumptions on μ near ζ ∈ T, the ratio kμ,n(ζ eu/n, ζ ev/n)/kμ,n(ζ, ζ) converges to a universal limit S(u, v) as n ∞. We give an estimate for the rate of this convergence for measures μ with finite logarithmic integral.