基于移位Gegenbauer多项式的非线性时间分数型Burgers方程的有效配置方法

IF 0.6 Q3 MATHEMATICS Contemporary Mathematics Pub Date : 2023-10-07 DOI:10.37256/cm.4420233302
E. Magdy, W. M. Abd-Elhameed, Y. H. Youssri, G. M. Moatimid, A. G. Atta
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引用次数: 0

摘要

本文提出了求解非线性时间分数型Burgers方程(TFBE)的一种数值策略,得到了该方程的近似解。在此过程中,使用了搭配方法。所提出的数值近似应该是两组基函数乘积的二重和。本文给出了两个多项式集:一个修正的移位的Gegenbauer多项式集和一个移位的Gegenbauer多项式集。一些特定的整数和分数阶导数被明确地作为基函数的组合来应用所提出的配置过程。该方法将控制边值问题转化为一组非线性代数方程。牛顿法可用于求解所得到的非线性系统。最后对该方法的精度进行了分析。给出了各种实例,并与文献中的一些现有方法进行了比较,以证明所建议方法的可靠性。
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A Potent Collocation Approach Based on Shifted Gegenbauer Polynomials for Nonlinear Time Fractional Burgers’ Equations
This paper presents a numerical strategy for solving the nonlinear time fractional Burgers's equation (TFBE) to obtain approximate solutions of TFBE. During this procedure, the collocation approach is used. The proposed numerical approximations are supposed to be a double sum of the products of two sets of basis functions. The two sets of polynomials are presented here: a modified set of shifted Gegenbauer polynomials and a shifted Gegenbauer polynomial set. Some specific integers and fractional derivatives are explicitly given as a combination of basis functions to apply the proposed collocation procedure. This method transforms the governing boundary-value problem into a set of nonlinear algebraic equations. Newton's approach can be used to solve the resulting nonlinear system. An analysis of the precision of the proposed method is provided. Various examples are presented and compared to some existing methods in the literature to prove the reliability of the suggested approach.
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