绿色弗雷德霍姆积分方程系统的超融合方案

IF 2.2 2区数学 Q1 MATHEMATICS, APPLIED Applied Numerical Mathematics Pub Date : 2024-09-11 DOI:10.1016/j.apnum.2024.09.009

Rakesh Kumar, Kapil Kant, B.V. Rathish Kumar

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引用次数: 0

摘要

本研究提出了一种以格林核函数为特征的第二类线性弗雷德霍姆积分方程系统的数值方案。其中包括引入基于分次多项式的 Galerkin 和迭代 Galerkin (IG) 方法来处理积分模型。对这些拟议方法的收敛性和误差进行了全面分析。首先，确定了 Galerkin 方法和迭代 Galerkin 方法解的存在性和唯一性。随后，利用函数分析工具和格林内核的有界属性推导出收敛阶次。Galerkin 方案的收敛阶数为 O(hα)。接着，建立了迭代 Galerkin（IG）方法的超收敛性。IG 方法的收敛阶数为 O(hα+α⁎)。大量的数值实验验证了理论结论。

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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Superconvergent scheme for a system of green Fredholm integral equations

In this study, a numerical scheme to a system of second-kind linear Fredholm integral equations featuring a Green's kernel function is proposed. This involves introducing Galerkin and iterated Galerkin (IG) methods based on piecewise polynomials to tackle the integral model. A thorough analysis of convergence and error for these proposed methods is carried out. Firstly, the existence and uniqueness of solutions for the Galerkin and iterated Galerkin methods are established. Later, the order of convergence is derived using tools from functional analysis and the boundedness property of Green's kernel. The Galerkin scheme has $O (h^{α})$ order of convergence. Next, the superconvergence of the iterated Galerkin (IG) method is established. The IG method exhibits $O (h^{α + α^{⁎}})$ order of convergence. Theoretical findings are validated through extensive numerical experiments.

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来源期刊

Applied Numerical Mathematics 数学-应用数学

CiteScore

5.60

自引率

7.10%

发文量

225

审稿时长

7.2 months

期刊介绍： The purpose of the journal is to provide a forum for the publication of high quality research and tutorial papers in computational mathematics. In addition to the traditional issues and problems in numerical analysis, the journal also publishes papers describing relevant applications in such fields as physics, fluid dynamics, engineering and other branches of applied science with a computational mathematics component. The journal strives to be flexible in the type of papers it publishes and their format. Equally desirable are: (i) Full papers, which should be complete and relatively self-contained original contributions with an introduction that can be understood by the broad computational mathematics community. Both rigorous and heuristic styles are acceptable. Of particular interest are papers about new areas of research, in which other than strictly mathematical arguments may be important in establishing a basis for further developments. (ii) Tutorial review papers, covering some of the important issues in Numerical Mathematics, Scientific Computing and their Applications. The journal will occasionally publish contributions which are larger than the usual format for regular papers. (iii) Short notes, which present specific new results and techniques in a brief communication.