基于Volterra-Fredholm方程的四阶边值问题研究:数值处理

IF 1.1 4区工程技术 Q3 ENGINEERING, MULTIDISCIPLINARY

Inverse Problems in Science and Engineering Pub Date : 2021-07-22 DOI:10.1080/17415977.2021.1954178

J. Shokri, S. Pishbin

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引用次数: 1

摘要

本文研究了用Chebyshev基函数求解带边界条件的四阶微分方程的Tau方法的性能。将该方程转化为Volterra–Fredholm积分方程，研究了其解的存在性和唯一性。我们使用具有切比雪夫基函数的运算Tau矩阵表示来构造该问题的代数等价表示。该表示是一个特殊的半下三角系统，其解给出了向量解的分量。应用Gronwall不等式和广义Hardy不等式，讨论了Tau方法的收敛性分析和误差估计。误差分析表明，当源函数足够光滑时，数值误差呈指数衰减。举例说明了该方法的有效性和准确性。此外，还与现有结果进行了一些比较，使得在这种情况下，Tau方法获得的结果比所提出的方法更准确。

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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Study of fourth-order boundary value problem based on Volterra–Fredholm equation: numerical treatment

This paper presents a study of the performance of the Tau method using Chebyshev basis functions for solving fourth-order differential equation with boundary conditions. Existence and uniqueness of the solution of this equation are investigated transforming it into the Volterra–Fredholm integral equation. We use the operational Tau matrix representation with Chebyshev basis functions for constructing the algebraic equivalent representation of the problem.This representation is an special semi lower triangular system whose solution gives the components of the vector solution. Applying Gronwall’s and the generalized Hardy’s inequality, convergence analysis and error estimation of the Tau method are discussed. The error analysis indicates that the numerical errors decay exponentially when the source function are sufficiently smooth. Illustrative examples are given to represent the efficiency and the accuracy of the proposed method. Also, some comparisons are made with existing results such that the results obtained by Tau method are more accurate than the proposed methods in this case.

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来源期刊

Inverse Problems in Science and Engineering 工程技术-工程：综合

自引率

0.00%

发文量

审稿时长

6 months

期刊介绍： Inverse Problems in Science and Engineering provides an international forum for the discussion of conceptual ideas and methods for the practical solution of applied inverse problems. The Journal aims to address the needs of practising engineers, mathematicians and researchers and to serve as a focal point for the quick communication of ideas. Papers must provide several non-trivial examples of practical applications. Multidisciplinary applied papers are particularly welcome. Topics include: -Shape design: determination of shape, size and location of domains (shape identification or optimization in acoustics, aerodynamics, electromagnets, etc; detection of voids and cracks). -Material properties: determination of physical properties of media. -Boundary values/initial values: identification of the proper boundary conditions and/or initial conditions (tomographic problems involving X-rays, ultrasonics, optics, thermal sources etc; determination of thermal, stress/strain, electromagnetic, fluid flow etc. boundary conditions on inaccessible boundaries; determination of initial chemical composition, etc.). -Forces and sources: determination of the unknown external forces or inputs acting on a domain (structural dynamic modification and reconstruction) and internal concentrated and distributed sources/sinks (sources of heat, noise, electromagnetic radiation, etc.). -Governing equations: inference of analytic forms of partial and/or integral equations governing the variation of measured field quantities.