用高斯乘法器对涉及导数的周期性非均匀采样进行修改

IF 1.4 2区 数学 Q1 MATHEMATICS
Calcolo Pub Date : 2024-09-13 DOI:10.1007/s10092-024-00589-x
Rashad M. Asharabi, Mustafa Q. Khirallah
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引用次数: 0

摘要

周期性非均匀采样序列涉及函数及其前 r 个导数的周期性采样,最初由 Nathan 提出(Inform Control 22: 172-182, 1973)。从那时起,在过去的几十年中,不同的作者在不同的背景下对这一采样序列进行了扩展。然而,由于其收敛速度较慢,周期性非均匀导数采样序列在近似理论中的应用一直受到限制。在本文中,我们通过加入高斯乘法器,对涉及导数的周期性非均匀采样进行了修改。这一修改大大提高了收敛速度,现在收敛速度呈指数阶。与原始序列相比,这是一个重大改进,原始序列的收敛速率为 \(O(N^{-1/p})\),其中 \(p>1\)。引入的修正依赖于复解析技术,适用于多种函数。具体来说,它适用于满足衰减条件的指数型全函数类,以及定义在水平条带上的解析函数类。为了验证所提出的理论分析,本文还进行了严格的数值实验。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

A modification of the periodic nonuniform sampling involving derivatives with a Gaussian multiplier

A modification of the periodic nonuniform sampling involving derivatives with a Gaussian multiplier

The periodic nonuniform sampling series, involving periodic samples of both the function and its first r derivatives, was initially introduced by Nathan (Inform Control 22: 172–182, 1973). Since then, various authors have extended this sampling series in different contexts over the past decades. However, the application of the periodic nonuniform derivative sampling series in approximation theory has been limited due to its slow convergence. In this article, we introduce a modification to the periodic nonuniform sampling involving derivatives by incorporating a Gaussian multiplier. This modification results in a significantly improved convergence rate, which now follows an exponential order. This is a significant improvement compared to the original series, which had a convergence rate of \(O(N^{-1/p})\) where \(p>1\). The introduced modification relies on a complex-analytic technique and is applicable to a wide range of functions. Specifically, it is suitable for the class of entire functions of exponential type that satisfy a decay condition, as well as for the class of analytic functions defined on a horizontal strip. To validate the presented theoretical analysis, the paper includes rigorous numerical experiments.

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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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