Almost everywhere divergence of spherical harmonic expansions and equivalence of summation methods

Chen Xianghong; Fan Dashan; Zhang Juan

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Almost everywhere divergence of spherical harmonic expansions and equivalence of summation methods

机译：几乎到处各地的球形谐波扩张和求和方法的等同性

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摘要

We show that there exists an integrable function on the n-sphere (n >= 2), whose Cesaro (C, (n - 1)/2) means with respect to the spherical harmonic expansion diverge unboundedly almost everywhere. This extends results of Stein (1961) for flat tori and complements the work of Taibleson (1985) for spheres. We also study relations among Cesaro, Riesz, and Buchner-Riesz means.

机译：我们表明，在N-Sphere（n> = 2）上存在可积分功能，其CESARO（C，（N-1）/ 2）几乎无处不在的球形谐波膨胀散发。这延长了斯坦因（1961）的扁平花束的结果，并补充了Taible（1985）的球形的工作。我们还研究CESARO，RIESZ和BUCHNER-RIESZ的关系。

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《Revista matematica iberoamericana》 |2020年第4期|共16页
作者
Chen Xianghong; Fan Dashan; Zhang Juan;
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作者单位

Sun Yat Sen Univ Sch Math Guangzhou 510275 Peoples R China;

Univ Wisconsin Dept Math Sci Milwaukee WI 53211 USA;

Beijing Forestry Univ Sch Math Sci Beijing 100083 Peoples R China;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
Cesaro means; Riesz means; spherical harmonic expansion; almost everywhere divergence;

机译：Cesaro意味着;Riesz意味着;球形谐波膨胀;几乎无处不在的分歧;

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专利

1. Almost everywhere divergence of spherical harmonic expansions and equivalence of summation methods [J] . Chen Xianghong, Fan Dashan, Zhang Juan Revista matematica iberoamericana . 2020,第4期

机译：几乎到处各地的球形谐波扩张和求和方法的等同性
2. Divergence of Cesàro means of spherical h-harmonic expansions [J] . Heng Zhou Journal of Approximation Theory . 2007,第2期

机译：Cesàro球面h调和展开的散度
3. ALMOST EVERYWHERE DIVERGENCE OF A SUMMATION METHOD FOR WAVELET EXPANSIONS [J] . G. G. Gevorkian, A. A. Stepanian Journal of Contemporary Mathematical Analysis . 2004,第2期

机译：小波展开求和法的几乎所有分度
4. A Galerkin method for the arbitrary order expansion in momentum space of the Boltzmann equation using spherical harmonics [C] . Rahmat, K., White, . 1994

机译：球谐函数用于玻尔兹曼方程动量空间中任意阶展开的Galerkin方法
5. A Collection of Fast Algorithms for Scalar and Vector-Valued Data on Irregular Domains: Spherical Harmonic Analysis, Divergence-Free/Curl-Free Radial Basis Functions, and Implicit Surface Reconstruction [D] . Drake, Kathryn Primrose. 2020

机译：关于不规则结构域上的标量和矢量值数据的快速算法的集合：球面谐波分析，无差异/无卷曲的径向基函数，隐含表面重建
6. A review of recent advances in the spherical harmonics expansion method for semiconductor device simulation [O] . K. Rupp, C. Jungemann, S.-M. Hong, -1

机译：球形谐波扩展方法在半导体器件仿真中的最新进展综述
7. Summation by parts methods for the spherical harmonic decomposition of the wave equation in arbitrary dimensions [O] . Gundlach, Carsten, Martin-Garcia, Jose M., Garfinkle, David 2013

机译：用球面谐波分解的零件方法求和任意维度的波动方程
8. Computation of Spherical Harmonics and Approximation by Spherical Harmonic Expansions [R] . Freeden, W. 1985

机译：球谐函数的球谐函数计算及近似

Almost everywhere divergence of spherical harmonic expansions and equivalence of summation methods

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