An efficient method for fractional nonlinear differential equations by quasi‐Newton's method and simplified reproducing kernel method

Xu Minqiang; Niu Jing; Lin Yingzhen

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An efficient method for fractional nonlinear differential equations by quasi‐Newton's method and simplified reproducing kernel method

机译：Quasi-Newton方法分数非线性微分方程的一种有效方法，简化再现核法

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摘要

> An efficient method for nonlinear fractional differential equations is proposed in this paper. This method consists of 2 steps. First, we linearize the nonlinear operator equation by quasi‐Newton's method, which is based on Fréchet derivative . Then we solve the linear fractional differential equations by the simplified reproducing kernel method. The convergence of the quasi‐Newton's method is discussed for the general nonlinear case as well. Finally, some numerical examples are presented to illustrate accuracy, efficiency, and simplicity of the method.

机译： >一种有效的方法本文提出了非线性分数微分方程。此方法由2个步骤组成。首先，我们通过准牛顿的方法线性化非线性操作员方程，其基于fréchet衍生物。然后我们通过简化的再现内核方法解决线性分数微分方程。对一般非线性壳体讨论了准牛顿方法的收敛。最后，提出了一些数值示例以说明方法的准确性，效率和简单性。

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来源
《Mathematical Methods in the Applied Sciences》 |2018年第1期|共10页
作者
Xu Minqiang; Niu Jing; Lin Yingzhen;
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作者单位

School of Data and Computer ScienceSun Yat‐Sen UniversityGuangzhou 510006 China;

School of Mathematics and SciencesHarbin Normal UniversityHarbin 150025 China;

School of Science Zhuhai CampusBeijing Institute of TechnologyZhuhai 519085 China;

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原文格式 PDF
正文语种 eng
中图分类数学;
关键词
convergence analysis; fractional; nonlinear; quasi‐Newton's method; simplified reproducing kernel method;

机译：收敛分析;分数;非线性;准牛顿的方法;简化再现核方法;

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1. An efficient method for fractional nonlinear differential equations by quasi‐Newton's method and simplified reproducing kernel method [J] . Xu Minqiang, Niu Jing, Lin Yingzhen Mathematical Methods in the Applied Sciences . 2018,第1期

机译：Quasi-Newton方法分数非线性微分方程的一种有效方法，简化再现核法
2. A stable least residue method in reproducing kernel space for solving a nonlinear fractional integro-differential equation with a weakly singular kernel [J] . Hong Du, Zhong Chen, Tiejun Yang Applied numerical mathematics . 2020,第Nova期

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3. Using the iterative reproducing kernel method for solving a class of nonlinear fractional differential equations [J] . Wang Yu-Lan, Tian Dan, Bao Shu-Hong, International journal of computer mathematics . 2017,第9a12期

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4. Numerical Solution for Nonlinear Time-Fractional Partial Differential Equation With Variable Coefficient Using Reproducing Kernel Hibert Space Method [C] . Nourhane Attia, Djamila Seba, Abdelkader Nour International Conference on Mathematics and Information Technology . 2020

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7. Truncated Block Newton and quasi-Newton methods for sparse systems of nonlinear equations. Experiments on parallel platforms [O] . Giovanni Zilli, Luca Bergamaschi 1997

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8. Quasi-Newton Methods for Large Scale Nonlinear Equations and Constrained Optimization: Progress Report, July 1, 1987-June 30, 1988 [R] . Dennis, J. E. , Tapia, R. A. 1988

机译：大规模非线性方程的拟牛顿方法和约束优化：进展报告，1987年7月1日 - 1988年6月30日

An efficient method for fractional nonlinear differential equations by quasi‐Newton's method and simplified reproducing kernel method

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