Weak convergence of CD kernels and applications
Abstract
We prove a general result on equality of the weak limits of the zero counting measure, dn, of orthogonal polynomials (defined by a measure dμ) and 1n Kn(x,x) dμ(x). By combining this with Mate--Nevai and Totik upper bounds on nλn(x), we prove some general results on ∫I 1n Kn(x,x) dμs 0 for the singular part of dμ and ∫I |E(x) - w(x)n Kn(x,x)| dx 0, where E is the density of the equilibrium measure and w(x) the density of dμ.
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