Application of a fourth-order compact ADI method to solve a two-dimensional linear hyperbolic equation

Dingwen Deng; Chengjian Zhang

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Application of a fourth-order compact ADI method to solve a two-dimensional linear hyperbolic equation

机译：四阶紧致ADI方法在求解二维线性双曲方程中的应用

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In this paper, a compact alternating direction implicit method is developed for solving a linear hyperbolic equation with constant coefficients. Its stability criterion is determined by using von Neumann method. It is shown through a discrete energy method that this method can attain fourth-order accuracy in both time and space with respect to H~1- and L~2-norms provided the stability condition is fulfilled. Its solvability is also analysed in detail. Numerical results confirm the convergence orders and efficiency of our algorithm.

机译：本文提出了一种紧凑的交替方向隐式方法，用于求解具有恒定系数的线性双曲方程。其稳定性判据采用冯·诺依曼法确定。通过离散能量方法表明，只要满足稳定性条件，该方法相对于H〜1-和L〜2-范数在时间和空间上都可以达到四阶精度。还对其溶解性进行了详细分析。数值结果证实了算法的收敛阶数和效率。

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来源
《International journal of computer mathematics》 |2013年第2期|273-291|共19页
作者
Dingwen Deng; Chengjian Zhang;
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作者单位

School of Mathematics and Statistics, Huazhong University of Science and Technology, Wuhan 430074, China,College of Mathematics and Information Science, Nanchang Hangkong University, Nanchang 330063, China;

School of Mathematics and Statistics, Huazhong University of Science and Technology, Wuhan 430074, China;

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原文格式 PDF
正文语种 eng
中图分类
关键词
hyperbolic equation; compact finite difference scheme; ADI method; stability; convergence; solvability;

机译：双曲方程紧致有限差分格式;ADI法;稳定性;收敛;可溶性;

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Application of a fourth-order compact ADI method to solve a two-dimensional linear hyperbolic equation

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