Fast barycentric rational interpolations for complex functions with some singularities

IF 1.4 2区 数学 Q1 MATHEMATICS Calcolo Pub Date : 2023-11-15 DOI:10.1007/s10092-023-00550-4
Shunfeng Yang, Shuhuang Xiang
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Abstract

Based on Cauchy’s integral formula and conformal maps, this paper presents a new method for constructing barycentric rational interpolation formulae for complex functions, which may contain singularities such as poles, branch cuts, or essential singularities. The resulting interpolations are pole-free, exponentially convergent, and numerically stable, requiring only \({\mathcal {O}}(N)\) operations. Inspired by the logarithm equilibrium potential, we introduce a Möbius transform to concentrate nodes to the vicinity of singularity to get a spectacular improvement on approximation quality. A thorough convergence analysis is provided, alongside numerous numerical examples that illustrate the theoretical results and demonstrate the accuracy and efficiency of the methodology. Meanwhile, the paper also discusses some applications of the method including the numerical solutions of boundary value problems and the zero locations of holomorphic functions.

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具有奇异点的复函数的快速质心有理插值
在柯西积分公式和保角映射的基础上,提出了一种构造含有极点、分支、本质奇异点等奇异点的复函数质心有理插值公式的新方法。所得到的插值是无极点的,指数收敛的,数值稳定的,只需要\({\mathcal {O}}(N)\)操作。受对数平衡势的启发,我们引入Möbius变换将节点集中到奇点附近,从而显著提高了近似质量。提供了一个彻底的收敛分析,以及许多数值例子来说明理论结果,并证明了该方法的准确性和效率。同时,本文还讨论了该方法的一些应用,包括边值问题的数值解和全纯函数的零点。
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来源期刊
Calcolo
Calcolo 数学-数学
CiteScore
2.40
自引率
11.80%
发文量
36
审稿时长
>12 weeks
期刊介绍: Calcolo is a quarterly of the Italian National Research Council, under the direction of the Institute for Informatics and Telematics in Pisa. Calcolo publishes original contributions in English on Numerical Analysis and its Applications, and on the Theory of Computation. The main focus of the journal is on Numerical Linear Algebra, Approximation Theory and its Applications, Numerical Solution of Differential and Integral Equations, Computational Complexity, Algorithmics, Mathematical Aspects of Computer Science, Optimization Theory. Expository papers will also appear from time to time as an introduction to emerging topics in one of the above mentioned fields. There will be a "Report" section, with abstracts of PhD Theses, news and reports from conferences and book reviews. All submissions will be carefully refereed.
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