Applications of universality limits to zeros and reproducing kernels of orthogonal polynomials

Eli Levin, Doron S. Lubinsky

Research output: Contribution to journalArticlepeer-review

Abstract

We apply universality limits to asymptotics of spacing of zeros {} fenced(xkn) of orthogonal polynomials, for weights with compact support and for exponential weights. A typical result isunder(lim, n → ∞) fenced(xkn - xk + 1, n) over(K, ̃)n fenced(xkn, xkn) = 1under minimal hypotheses on the weight, with over(K, ̃)n denoting a normalized reproducing kernel. Moreover, for exponential weights, we derive asymptotics for the differentiated kernels:Knfenced(r, s) fenced(x, x) = underover(∑, k = 0, n - 1) pkfenced(r) fenced(x) pkfenced(s) fenced(x) .

Original languageEnglish
Pages (from-to)69-95
Number of pages27
JournalJournal of Approximation Theory
Volume150
Issue number1
DOIs
StatePublished - Jan 2008

Bibliographical note

Funding Information:
Research supported by NSF Grant DMS0400446 and US-Israel BSF Grant 2004353. ∗Corresponding author. E-mail addresses: [email protected] (E. Levin), [email protected] (D.S. Lubinsky).

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