紧致有限差分方法求解全离散波动方程
Compact Finite Difference Method for Solving Fully Discrete Wave Equations
DOI: 10.12677/pm.2024.145204, PDF,    科研立项经费支持
作者: 安文静*, 龙 艳:新疆应用职业技术学院师范教育系,新疆 奎屯
关键词: 波动方程紧致有限差分法稳定性误差估计Wave Equation Compact Finite Difference Method Stability Error Estimate
摘要: 本文针对整数阶波动方程,给出了一种基于紧致有限差分方法的隐式全离散格式。该格式在时间方向采用中心差分格式来离散,在空间方向采用紧致中心差商的权平均来离散。离散格式的稳定性分析及误差估计表明,该离散格式在时间方向达到二阶收敛,空间方向达到四阶收敛。并且通过数值实验证明该离散格式的收敛阶为O(τ2h4)。
Abstract: This article proposes an implicit fully discrete scheme based on the compact finite difference method for integer order wave equations. This discretization scheme uses a central difference scheme for discretization in the temporal direction and a compact central difference quotient weighted average for discretization in the spatial direction. The stability analysis and error estimation of the discrete format indicate that it achieves second-order convergence in the temporal direction and fourth-order convergence in the spatial direction. And numerical experiments have shown that the convergence order of the discrete format isO(τ2h4).
文章引用:安文静, 龙艳. 紧致有限差分方法求解全离散波动方程[J]. 理论数学, 2024, 14(5): 509-518. https://doi.org/10.12677/pm.2024.145204

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