Coupled KdV equations derived from two-layer fluids

S. Y. Lou; Bin Tong; Heng Chun Hu; Xiao Yan Tang

doi:10.1088/0305-4470/39/3/005

Coupled KdV equations derived from two-layer fluids

S. Y. Lou^*
, Bin Tong
, Heng Chun Hu
, Xiao Yan Tang

^*此作品的通讯作者

Shanghai Jiao Tong University
Ningbo University

科研成果: 期刊稿件 › 文章 › 同行评审

105 引用（Scopus）

摘要

Some types of coupled Korteweg de-Vries (KdV) equations are derived from a two-layer fluid system. In the derivation procedure, an unreasonable y-average trick (usually adopted in the literature) is removed. The derived models are classified by means of the Painlevé test. Three types of τ-function and multiple soliton solutions of the models are explicitly given via the exact solutions of the usual KdV equation. It is also discovered that a non-Painlevé integrable coupled KdV system can have multiple soliton solutions.

源语言	英语
页（从-至）	513-527
页数	15
期刊	Journal of Physics A: Mathematical and General
卷	39
期	3
DOI	https://doi.org/10.1088/0305-4470/39/3/005
出版状态	已出版 - 20 1月 2006
已对外发布	是

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AB - Some types of coupled Korteweg de-Vries (KdV) equations are derived from a two-layer fluid system. In the derivation procedure, an unreasonable y-average trick (usually adopted in the literature) is removed. The derived models are classified by means of the Painlevé test. Three types of τ-function and multiple soliton solutions of the models are explicitly given via the exact solutions of the usual KdV equation. It is also discovered that a non-Painlevé integrable coupled KdV system can have multiple soliton solutions.

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Coupled KdV equations derived from two-layer fluids

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