A high-order difference scheme for the fractional sub-diffusion equation

Hao Zhao-peng; Lin Guang; Sun Zhi-zhong

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A high-order difference scheme for the fractional sub-diffusion equation

机译：分数次扩散方程的高阶差分格式

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摘要

Based on the Lubich's high-order operators, a second-order temporal finite-difference method is considered for the fractional sub-diffusion equation. It has been proved that the finite-difference scheme is unconditionally stable and convergent in L-2 norm by the energy method in both one- and two-dimensional cases. The rate of convergence is order of two in temporal direction under the initial value satisfying some suitable conditions. Some numerical examples are given to confirm the theoretical results.

机译：基于Lubich的高阶算子，分数阶子扩散方程考虑了二阶时间有限差分方法。在一维和二维情况下，通过能量方法证明了有限差分方案在L-2范式中是无条件稳定的并且收敛。在满足一些合适条件的初始值下，收敛速度在时间方向上为二阶。给出一些数值算例，以验证理论结果。

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来源
《International journal of computer mathematics 》 |2017年第4期| 405-426| 共22页
作者
Hao Zhao-peng; Lin Guang; Sun Zhi-zhong;
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作者单位

Southeast Univ, Dept Math, Nanjing 210096, Jiangsu, Peoples R China;

Purdue Univ, Dept Math, W Lafayette, IN 47907 USA|Purdue Univ, Sch Mech Engn, W Lafayette, IN 47907 USA;

Southeast Univ, Dept Math, Nanjing 210096, Jiangsu, Peoples R China;

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正文语种 eng
中图分类
关键词
fractional derivative; multi-term; Lubich's operator; difference scheme; compact; convergence; 35R11; 65M06; 65M12; 65M15;

机译：分数阶导数多项式Lubich算子差分格式紧凑收敛35R11;65M06;65M12;65M15;

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A high-order difference scheme for the fractional sub-diffusion equation

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