二维Fisher-KPP方程的显式Richardson外推法
The Explicit Richardson Extrapolation Method for Two-Dimensional Fisher-KPP Equation
DOI: 10.12677/PM.2021.119183, PDF,    国家自然科学基金支持
作者: 李志君:南昌航空大学,数学与信息科学学院,江西 南昌
关键词: Fisher-KPP方程显式差分格式收敛性Richardson外推法Fisher-KPP Equation Explicit Difference Scheme Convergence Richardson Extrapolation Method
摘要: 本文研究二维Fisher-Kolmogorov-Petrovsky-Piscounov (Fisher-KPP)方程的显式差分格式,运用能量分析法证明了在满足r =τ/h2≤1/4时,差分格式的解是有界的,且在无穷范数意义下有O(τ+h2)的收敛阶。然后,通过发展一类Richardson外推法,在无穷范数意义下得到了收敛阶为O(τ2+h4)的外推解。最后,数值结果验证了格式的有效性和理论结果的正确性。
Abstract: In this paper, an explicit difference scheme is investigated for two-dimensional Fisher-KPP equation. Under the condition of r =τ/h2≤1/4, the boundedness of the solution of the difference scheme is proven using the energy analysis method. It is proved that it has a convergence order of O(τ+h2) in maximum norm. Then by developing a class of Richardson extrapolation method, the extrapola-tion solution with convergence order of O(τ2+h4) in maximum norm is obtained. Finally, numeri-cal results confirm the efficiency of the schemes and the correctness of theoretical results.
文章引用:李志君. 二维Fisher-KPP方程的显式Richardson外推法[J]. 理论数学, 2021, 11(9): 1649-1656. https://doi.org/10.12677/PM.2021.119183

参考文献

[1] Fisher, R.A. (1937) The Wave of Advance of Advantageous Genes. Annals of Human Genetics, 7, 355-369. [Google Scholar] [CrossRef
[2] Kolmogorov, A.N., Petrovskii, I.G. and Piscounov, N.S. (1937) Tude de l’équation de la diffusion avec croissance de la quantité de matiére et son application a un probléme biologique.
[3] Tyson, J.J. and Brazhnik, P.K. (2000) On Travelling Wave Solutions of Fisher’s Equation in Two Spatial Dimensions. SIAM Journal on Applied Mathematics, 60, 371-391. [Google Scholar] [CrossRef
[4] Canosa, J. (2010) On a Nonlinear Diffusion Equation Describ-ing Population Growth. Ibm Journal of Research & Development, 17, 307-313. [Google Scholar] [CrossRef
[5] Kawahara, T. and Tanaka, M. (1983) Interactions of Travelling Fronts: An Exact Solution of a Nonlinear Diffusion Equation. Physics Letters A, 97, 311-314. [Google Scholar] [CrossRef
[6] Wazwaz, A.M. and Gorguis, A. (2004) An Analytic Study of Fisher’s Equation by Using Adomian Decomposition Method. Applied Mathematics & Computation, 154, 609-620. [Google Scholar] [CrossRef
[7] Olmos, D. and Shizgal, B.D. (2006) A Pseudospectral Method of Solution of Fisher’s Equation. Journal of Computational and Applied Mathematics, 193, 219-242. [Google Scholar] [CrossRef
[8] Tang, S. and Weber, R.O. (1991) Numerical Study of Fisher’s Equation by a Petrov-Galerkin Finite Element Method. The ANZIAM Journal, 33, 27-38. [Google Scholar] [CrossRef
[9] Gorgulu, M.Z. and Dag, I. (2018) Exponential B-splines Galerkin Method for the Numerical Solution of the Fisher’s Equation. Iranian Journal of Science and Technology, Transactions A: Science, 42, 2189-2198. [Google Scholar] [CrossRef
[10] 陈景良, 邓定文. 非线性延迟波动方程的两类差分格式[J]. 理论数学, 2020, 10(5): 508-517. [Google Scholar] [CrossRef
[11] 何丽, 王希, 胡劲松. 广义BBM-KdV方程的一个守恒C-N差分格式[J]. 理论数学, 2021, 11(4): 428-435. [Google Scholar] [CrossRef
[12] 杨欣童. 对双曲型方程两种差分格式方法的比较研究[J]. 理论数学, 2021, 11(2): 261-270. [Google Scholar] [CrossRef
[13] 林学好. 非线性薛定谔方程的差分格式[J]. 理论数学, 2021, 11(4): 496-502. [Google Scholar] [CrossRef
[14] Macías-Díaz, J.E. and Puri, A. (2012) An Explicit Positivi-ty-Preserving Finite-Difference Scheme for the Classical Fisher-Kolmogorov-Petrovsky-Piscounov Equation. Applied Mathematics & Computation, 218, 5829-5837. [Google Scholar] [CrossRef
[15] Chandraker, V., Awasthi, A. and Jayaraj, S. (2015) A Numerical Treatment of Fisher Equation. Procedia Engineering, 127, 1256-1262. [Google Scholar] [CrossRef
[16] Izadi, M. (2020) A Second-Order Accurate Finite-Difference Scheme for the Classical Fisher-Kolmogorov-Petrovsky- Piscounov Equation. Journal of Information and Optimization Sciences, 42, 1-18. [Google Scholar] [CrossRef
[17] Chandraker, V., Awasthi, A. and Jayaraj, S. (2018) Implicit Numerical Techniques for Fisher Equation. Journal of Information and Optimization Sciences, 39, 1-13. [Google Scholar] [CrossRef
[18] 孙志忠. 偏微分方程数值解法[M]. 北京: 科学出版社, 2012: 71-136.

为你推荐