DIVERGENCE OF RATIONAL APPROXIMANTS TO NON-ANALYTIC FUNCTIONS

被引：0

作者：

Blatt, Hans-Peter ^{[1
]}

机构：

[1] Katholische Univ Eichstaett Ingolstadt, Math Geog Fak, Lahrstuhl Math Angew Math, D-85071 Eichstatt, Germany

来源：

POTENTIAL THEORY AND STOCHASTICS IN ALBAC: AUREL CORNEA MEMORIAL VOLUME, CONFERENCE PROCEEDINGS | 2009年

关键词：

Rational approximation; rational interpolation; weighted Fekete points; harmonic majorants; Green's function;

D O I：

暂无

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

The convergence behaviour of best uniform rational approximations with numerator degree a and denominator degree m on [-1, 11 is investigated for nonanalytic functions if ray sequences in the lower half of the Walsh table are considered, i.e. for sequences {(n, m(n))}(n=1)(infinity) with n/m(n) - c is an element of (1-infinity| as n --> infinity. For f(x) = |x|(a), a is an element of R+ \2N, it is known that the best rational approximants diverge everywhere outside [-1,1]. We investigate the situation for more general functions f that are not analytic on [-1,1].

引用

页码：49 / 64

页数：16

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