High order finite difference method for time-space fractional differential equations with Caputo and Riemann-Liouville derivatives

Vong Seakweng; Lyu Pin; Chen Xu; Lei Siu-Long

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High order finite difference method for time-space fractional differential equations with Caputo and Riemann-Liouville derivatives

机译：Caputo和Riemann-Liouville导数的时空分数阶微分方程的高阶有限差分方法

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We consider high order finite difference methods for two-dimensional fractional differential equations with temporal Caputo and spatial Riemann-Liouville derivatives in this paper. We propose a scheme and show that it converges with second order in time and fourth order in space. The accuracy of our proposed method can be improved by Richardson extrapolation. Approximate solution is obtained by the generalized minimal residual (GMRES) method. A preconditioner is proposed to improve the efficiency for the implementation of the GMRES method.

机译：本文考虑具有时间Caputo和空间Riemann-Liouville导数的二维分数阶微分方程的高阶有限差分方法。我们提出了一个方案，并证明了它在时间上收敛于二阶并且在空间上收敛于四阶。我们提出的方法的准确性可以通过Richardson外推来提高。通过广义最小残差（GMRES）方法获得近似解。提出了一个预处理器，以提高GMRES方法的执行效率。

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来源
《Numerical algorithms》 |2016年第1期|共16页
作者
Vong Seakweng; Lyu Pin; Chen Xu; Lei Siu-Long;
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正文语种 eng
中图分类数学;
关键词
Two-dimensional fractional differential equation; High order difference scheme; Discrete energy method; Preconditioned GMRES method;

机译：二维分数阶微分方程;高阶差分格式;离散能量方法;预处理GMRES方法;

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1. High order finite difference method for time-space fractional differential equations with Caputo and Riemann-Liouville derivatives [J] . Vong Seakweng, Lyu Pin, Chen Xu, Numerical algorithms . 2016,第1期

机译：Caputo和Riemann-Liouville导数的时空分数阶微分方程的高阶有限差分方法
2. COMPACT FINITE DIFFERENCES METHOD AND CAPUTO FRACTIONAL DERIVATIVE DEFINITION FOR LINEAR FRACTIONAL SCHRODINGER EQUATIONS [J] . Neslihan Er, Hikmet Caglar, Nazan Caglar International journal of numerical methods and applications . 2018,第1期

机译：线性分数阶Schrodinger方程的紧凑有限差分法和Caputo分数阶导数定义
3. Stability analysis of nonlinear fractional differential equations with Caputo and Riemann-Liouville derivatives [J] . Khan Aziz, Syam Muhammed I., Zada Akbar, European Physical Journal Plus . 2018,第7期

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4. The fractional Chebyshev collocation method for the numerical solution of fractional differential equations with Riemann-Liouville derivatives [C] . Arman Dabiri, Laya Karimi Annual American Control Conference . 2019

机译：Riemann-Liouville导数分数阶微分方程数值解的分数切比雪夫搭配方法
5. Algorithm Analysis, Code Analysis, Code Vectorization, and Code Parallelization of a Fast Finite Difference Method for Space Fractional Diffusion Equations in Three Space Dimensions. [D] . Swartz, Matthew. 2015

机译：快速有限差分方法在三个空间维度上的空间分式扩散方程的算法分析，代码分析，代码矢量化和代码并行化。
6. Finite Difference Method for Time-Space Fractional Advection–Diffusion Equations with Riesz Derivative [O] . Sadia Arshad, Dumitru Baleanu, Jianfei Huang, 2018

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7. Existence of positive solutions for differential equations involving Riemann-Liouville and Caputo fractional derivatives [O] . 2018

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High order finite difference method for time-space fractional differential equations with Caputo and Riemann-Liouville derivatives

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