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Journal of Scientific Computing

Erschienen in:

01.05.2014

Numerical Methods and Simulations for the Dynamics of One-Dimensional Zakharov–Rubenchik Equations

verfasst von: Xiaofei Zhao, Ziyi Li

Erschienen in: Journal of Scientific Computing | Ausgabe 2/2014

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Abstract

In this paper, we propose and study several accurate numerical methods for solving the one-dimensional Zakharov–Rubenchik equations (ZRE). We begin with a review on the important properties of the ZRE, including the solitary wave solutions and the various conservation laws. Then we propose a very efficient and accurate numerical method based on the time-splitting technique and the Fourier pseudo-spectral (TSFP) method. Next, we propose some conservative and non-conservative types of finite difference time domain methods, including a Crank–Nicolson finite difference method that conserves the mass and the energy of the system in the discrete level. Discrete conservation laws and numerical stability of all the proposed methods are analyzed. Comparisons between different methods in the efficiency, stability and accuracy are carried out, which identifies that the TSFP method is the most efficient and accurate numerical method among all the methods. Lastly, we apply the TSFP method to simulate and study the dynamics of the solitons in the ZRE numerically.

Vorheriger Artikel Variational Dynamics of Free Triple Junctions

Nächster Artikel Composite Spectral Method for Exterior Problems with Polygonal Obstacles

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Titel: Numerical Methods and Simulations for the Dynamics of One-Dimensional Zakharov–Rubenchik Equations
verfasst von: Xiaofei Zhao
Ziyi Li
Publikationsdatum: 01.05.2014
Verlag: Springer US
Erschienen in: Journal of Scientific Computing / Ausgabe 2/2014
Print ISSN: 0885-7474
Elektronische ISSN: 1573-7691
DOI: https://doi.org/10.1007/s10915-013-9768-y

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