求解分数弱奇异二维偏 Volterra 积分方程的 Boubaker 运算矩阵法

IF 2.4 3区数学 Q1 MATHEMATICS Journal of Applied Mathematics and Computing Pub Date : 2024-05-25 DOI:10.1007/s12190-024-02138-9

A. A. Khajehnasiri, A. Ebadian

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引用次数: 0

摘要

本文旨在提出一种基于运算矩阵方法的新技术，利用数值方法求解分式弱奇异二维偏伏特拉积分方程（FWS2DPVIE）。在该技术中，布贝克多项式被用来创建运算矩阵。该技术包括两个主要阶段。第一步，利用布贝克多项式生成运算矩阵，帮助将问题转化为代数方程系统。第二步，对代数方程进行数值求解。结果表明，建议的技术优于同类技术，显示了其优越性。

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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Boubaker operational matrix method for solving fractional weakly singular two-dimensional partial Volterra integral equation

The aim of the present paper is to suggest a novel technique based on the operational matrix approach for solving a fractional weakly singular two-dimensional partial Volterra integral equation (FWS2DPVIE) using numerical methods. In this technique, Boubaker polynomials are used to create operational matrices. The technique consists of two major phases. In the first step, Boubaker polynomials are employed to generate operational matrices, which help in transforming the problems into systems of algebraic equations. In the second step, the algebraic equations are numerically solved.The suggested technique is also compared with existing approaches. The results show that the suggested technique outperforms its counterparts, demonstrating its superiority.

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来源期刊

Journal of Applied Mathematics and Computing Mathematics-Computational Mathematics

CiteScore

4.20

自引率

4.50%

发文量

131

期刊介绍： JAMC is a broad based journal covering all branches of computational or applied mathematics with special encouragement to researchers in theoretical computer science and mathematical computing. Major areas, such as numerical analysis, discrete optimization, linear and nonlinear programming, theory of computation, control theory, theory of algorithms, computational logic, applied combinatorics, coding theory, cryptograhics, fuzzy theory with applications, differential equations with applications are all included. A large variety of scientific problems also necessarily involve Algebra, Analysis, Geometry, Probability and Statistics and so on. The journal welcomes research papers in all branches of mathematics which have some bearing on the application to scientific problems, including papers in the areas of Actuarial Science, Mathematical Biology, Mathematical Economics and Finance.