Asymptotics of Chebyshev Rational Functions with Respect to Subsets of the Real Line

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS ACS Applied Bio Materials Pub Date : 2024-03-09 DOI:10.1007/s00365-023-09670-0
Benjamin Eichinger, Milivoje Lukić, Giorgio Young
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Abstract

There is a vast theory of Chebyshev and residual polynomials and their asymptotic behavior. The former ones maximize the leading coefficient and the latter ones maximize the point evaluation with respect to an \(L^\infty \) norm. We study Chebyshev and residual extremal problems for rational functions with real poles with respect to subsets of \(\overline{{{\mathbb {R}}}}\). We prove root asymptotics under fairly general assumptions on the sequence of poles. Moreover, we prove Szegő–Widom asymptotics for sets which are regular for the Dirichlet problem and obey the Parreau–Widom and DCT conditions.

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切比雪夫有理函数相对于实线子集的渐近性
关于切比雪夫多项式和残差多项式及其渐近行为有大量理论。前者最大化前导系数,后者最大化关于 \(L^\infty \) 准则的点评估。我们研究了关于 \(\overline{{\mathbb {R}}}}\)子集的、具有实极点的有理函数的切比雪夫和残差极值问题。我们在极点序列的一般假设下证明了根渐近性。此外,我们还证明了迪里夏特问题正则集合的 Szegő-Widom 渐近线,这些集合服从 Parreau-Widom 和 DCT 条件。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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