第二类Volterra-Fredholm积分方程的c-配点法改进及其理论分析

IF 2.6 2区数学 Q1 MATHEMATICS, APPLIED

Journal of Computational and Applied Mathematics Pub Date : 2025-09-15 DOI:10.1016/j.cam.2025.117055

Tomoaki Okayama

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引用次数: 0

摘要

第二类Volterra-Fredholm积分方程的sinco -搭配方法由多个作者独立提出：Shamloo等人于2012年提出，Mesgarani和Mollapourasl于2013年提出。理论分析和数值实验表明，该方法可以达到根指数收敛。然而，它们的收敛性并没有得到严格的证明。本文对这些方法进行了改进，以方便实现，并给出了改进方法的收敛定理。对于相同的方程，John和Ogbonna在2016年提出了另一种since -搭配方法，该方法被认为是对Shamloo等人采用的变量变换的改进。它可能比以前的方法获得更高的速率，但其收敛性尚未得到证明。因此，本研究对其进行了改进，以方便实现，并为改进后的方法提供了收敛定理。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Improvement of Sinc-collocation methods for Volterra-Fredholm integral equations of the second kind and their theoretical analysis

Sinc-collocation methods for Volterra-Fredholm integral equations of the second kind were proposed independently by multiple authors: by Shamloo et al. in 2012 and by Mesgarani and Mollapourasl in 2013. Their theoretical analyses and numerical experiments suggest that the presented methods can attain root-exponential convergence. However, their convergence has not been strictly proved. This study improves these methods to facilitate implementation, and provides a convergence theorem for the improved method. For the same equations, another Sinc-collocation method was proposed in 2016 by John and Ogbonna, which is regarded as an improvement to the variable transformation employed by Shamloo et al. It may attain a higher rate than the previous methods, but its convergence has not yet been proved. Therefore, this study improves it to facilitate implementation, and provides a convergence theorem for the improved method.

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来源期刊

Journal of Computational and Applied Mathematics 数学-应用数学

CiteScore

5.40

自引率

4.20%

发文量

437

审稿时长

3.0 months

期刊介绍： The Journal of Computational and Applied Mathematics publishes original papers of high scientific value in all areas of computational and applied mathematics. The main interest of the Journal is in papers that describe and analyze new computational techniques for solving scientific or engineering problems. Also the improved analysis, including the effectiveness and applicability, of existing methods and algorithms is of importance. The computational efficiency (e.g. the convergence, stability, accuracy, ...) should be proved and illustrated by nontrivial numerical examples. Papers describing only variants of existing methods, without adding significant new computational properties are not of interest. The audience consists of: applied mathematicians, numerical analysts, computational scientists and engineers.