A boundary value problem for the KdV equation: Comparison of finite-difference and Chebyshev methods

Jan Ole Skogestad; Henrik Kalisch

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A boundary value problem for the KdV equation: Comparison of finite-difference and Chebyshev methods

机译：KdV方程的边值问题：有限差分法和Chebyshev方法的比较

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Solutions of a boundary value problem for the Korteweg-de Vries equation are approximated numerically using a finite-difference method, and a collocation method based on Chebyshev polynomials. The performance of the two methods is compared using exact solutions that are exponentially small at the boundaries. The Chebyshev method is found to be more efficient.

机译：使用有限差分法和基于Chebyshev多项式的搭配方法，对Korteweg-de Vries方程的边值问题的解进行数值逼近。使用精确的解决方案比较了这两种方法的性能，这些解决方案在边界处呈指数形式减小。发现切比雪夫方法更有效。

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来源
《Mathematics and computers in simulation》 |2009年第1期|151-163|共13页
作者
Jan Ole Skogestad; Henrik Kalisch;
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作者单位

Department of Mathematics, University of Bergen, Johannes Brunsgate 12, 5008 Bergen, Norway;

Department of Mathematics, University of Bergen, Johannes Brunsgate 12, 5008 Bergen, Norway;

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原文格式 PDF
正文语种 eng
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关键词
KdV equation; boundary-value problem; finite-difference method; chebyshev method;

机译：KdV方程;边值问题;有限差分法切比雪夫方法;
入库时间 2022-08-18 03:29:16

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2. Solving the Maxwell Equations by the Chebyshev Method: A One-Step Finite-Difference Time-Domain Algorithm [J] . Hans De Raedt, Kristel Michielsen, J. Sebastiaan Kole, IEEE Transactions on Antennas and Propagation . 2003,第11期

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3. A numerical study for the KdV and the good Boussinesq equations using Fourier Chebyshev tau meshless method [J] . Wenting Shao, Xionghua Wu Numerical algorithms . 2014,第3期

机译：傅立叶Chebyshev tau无网格法对KdV和良好Boussinesq方程的数值研究。
4. Generalized Kaup—Kupershmidt Solitons, Static Solitons andBoundary Generated Solitons — Solutions of the KdV andHigher Order KdV Equations [C] . G.I. Burde International Conference on Numerical Analysis and Applied Mathematics . 2010

机译：广义Kaup-kupershmidt孤子，静态孤子和孤立的孤子 - KDV和高阶KDV方程的解决方案
5. Numerical boundary conditions for the fourth-order accurate finite-difference time-domain solution of Maxwell's equations. [D] . Hwang, Kyu-Pyung. 2002

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6. Implicit finite-difference schemes, based on the Rosenbrock method, for nonlinear Schrödinger equation with artificial boundary conditions [O] . Vyacheslav A. Trofimov, Evgeny M. Trykin 2012

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8. A Finite-Difference Method Solution of Non-Similar, Equilibrium and Non-Equilibrium Air, Boundary Layer Equations with Laminar and Turbulent Viscosity Models. Part I. analysis [R] . Gould, H. E., Galowin, L. S. 1965

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A boundary value problem for the KdV equation: Comparison of finite-difference and Chebyshev methods

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