Lower Bounds for Weighted Chebyshev and Orthogonal Polynomials

arXiv - MATH - Classical Analysis and ODEs Pub Date : 2024-08-21 DOI:arxiv-2408.11496

Gökalp Alpan, Maxim Zinchenko

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Abstract

We derive optimal asymptotic and non-asymptotic lower bounds on the Widom factors for weighted Chebyshev and orthogonal polynomials on compact subsets of the real line. In the Chebyshev case we extend the optimal non-asymptotic lower bound previously known only in a handful of examples to regular compact sets and a large class weights. Using the non-asymptotic lower bound, we extend Widom's asymptotic lower bound for weights bounded away from zero to a large class of weights with zeros including weights with strong zeros and infinitely many zeros. As an application of the asymptotic lower bound we extend Bernstein's 1931 asymptotics result for weighted Chebyshev polynomials on an interval to arbitrary Riemann integrable weights with finitely many zeros and to some continuous weights with infinitely many zeros. In the case of orthogonal polynomials, we derive optimal asymptotic and non-asymptotic lower bound on arbitrary regular compact sets for a large class of weights in the non-asymptotic case and for arbitrary Szeg\H{o} class weights in the asymptotic case, extending previously known bounds on finite gap and Parreau--Widom sets.

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加权切比雪夫多项式和正交多项式的下限值

我们推导了实线紧凑子集上的加权切比雪夫多项式和正交多项式的 Widomfactors 的最优渐近和非渐近下限。在切比雪夫情况下，我们将以前仅在少数例子中已知的最优非渐近下界扩展到规则紧凑集和一大类权重。利用非渐近下界，我们将威登的权重离零有界的渐近下界扩展到一大类有零的权重，包括有强零和无限多零的权重。作为渐近下界的应用，我们将伯恩斯坦 1931 年关于区间上加权切比雪夫多项式的渐近结果推广到具有有限多个零点的任意黎曼可积分权重和具有无限多个零点的某些连续权重。在正交多项式的情况下，我们在非渐近情况下为一大类权重推导出了任意规则紧凑集上的最优渐近和非渐近下界，在渐近情况下为任意Szeg\H{o}类权重推导出了最优渐近和非渐近下界，扩展了先前已知的有限间隙集和Parreau--Widom集上的下界。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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arXiv - MATH - Classical Analysis and ODEs

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