讲师 硕士生导师
招生学科专业:
数学 -- 【招收硕士研究生】 -- 数学学院
性别:男
毕业院校:清华大学
学历:清华大学
学位:理学博士学位
所在单位:数学学院
办公地点:理学院530
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DOI码:10.4208/nmtma.OA-2021-0067
所属单位:数学学院
发表刊物:Numerical Mathematics: Theory, Methods and Applications
关键字:Artificial boundary conditions, time-fractional telegraph equation, finite difference scheme, fractional Cattaneo heat conduction law
摘要:In this paper, we study the numerical solution of the time-fractional telegraph equation on the unbounded domain. We first introduce the artificial boundaries Γ± to get a finite computational domain. On the artificial boundaries Γ±, we use the Laplace transform to construct the exact artificial boundary conditions (ABCs) to reduce the original problem to an initial-boundary value problem on a bounded domain. In addition, we propose a finite difference scheme based on the L1_2 formule for the Caputo fractional derivative in time direction and the central difference scheme for the spatial directional derivative to solve the reduced problem. In order to reduce the effect of unsmoothness of the solution at the initial moment, we use a fine mesh and low-order interpolation to discretize the solution near t = 0. Finally, some numerical results show the efficiency and reliability of the ABCs and validate our theoretical results.
备注:15 (2022), pp. 360-386
学科门类:理学
文献类型:J
卷号:15
期号:2
是否译文:否
发表时间:2022-03-23
收录刊物:SCI
通讯作者:黄忠亿