Collocation Method Based on Bernoulli Polynomial and Shifted Chebychev for Solving the Bratu Equation

Journal of Applied and Computational Mathematics Pub Date : 2018-01-01 DOI:10.4172/2168-9679.1000407
M. El-Gamel, W. Adel, M. El-Azab
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引用次数: 11

Abstract

In this work, Bernoulli-collocation method is proposed for solving nonlinear Bratu's type equations. The operational matrix of derivative of Bernoulli is introduced. The matrix together with the collocation method are then utilized to reduce the problem into a system of nonlinear algebraic equations. Also, a reliable approach for solving this nonlinear system is discussed. Numerical results and comparisons with other existing methods provided in the literature are made. Citation: EL-Gamel M, Adel W, EL-Azab MS (2018) Collocation Method Based on Bernoulli Polynomial and Shifted Chebychev for Solving the Bratu Equation. J Appl Computat Math 7: 407. doi: 10.4172/2168-9679.1000407
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求解Bratu方程的基于Bernoulli多项式和移位Chebychev的配置方法
本文提出了求解非线性Bratu型方程的伯努利配点法。介绍了伯努利导数的运算矩阵。然后利用矩阵和配置法将问题简化为一个非线性代数方程组。讨论了求解该非线性系统的可靠方法。给出了数值结果,并与文献中提供的其他现有方法进行了比较。引用本文:EL-Gamel M, Adel W, EL-Azab MS(2018)基于Bernoulli多项式和移位Chebychev的Bratu方程求解方法。[J]计算机数学学报,第7卷第4节。doi: 10.4172 / 2168 - 9679.1000407
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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Journal of Applied and Computational Mathematics
Journal of Applied and Computational Mathematics
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