| 非线性系统的多线性分离变量法 |
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| 引用本文: | 唐晓艳.非线性系统的多线性分离变量法[J].宁波大学学报(理工版),2020,33(5):15-21. |
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| 作者姓名: | 唐晓艳 |
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| 作者单位: | 1.华东师范大学 数学科学学院, 上海 200241; 2.上海市核心数学与实践重点实验室, 上海 200241 |
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| 基金项目: | 国家自然科学基金;上海市核心数学与实践重点实验室基金 |
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| 摘 要: | 线性物理中两大普遍适用的傅立叶变换法和分离变量法都不能直接应用到非线性物理, 为此如何在非线性物理中建立相应的研究方法是众多物理学家和数学家们都非常关心的问题. 本文介绍了一种适用于非线性系统的分离变量法—–多线性分离变量法, 由其可以得到具有低维变量分离函数的多线性分离变量解. 特别地, 可积系统的多线性分离变量解通常包含有任意的低维变量分离函数.
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| 关 键 词: | 多线性分离变量法 多线性分离变量解 可积性 |
Multi-linear variable separation approaches for nonlinear systems |
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| TANG Xiaoyan,' target="_blank" rel="external">.Multi-linear variable separation approaches for nonlinear systems[J].Journal of Ningbo University(Natural Science and Engineering Edition),2020,33(5):15-21. |
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| Authors: | TANG Xiaoyan " target="_blank">' target="_blank" rel="external"> |
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| Institution: | 1.School of Mathematical Sciences, East China Normal University, Shanghai 200241, China; 2.Shanghai Key Laboratory of Pure Mathematics and Mathematical Practice, Shanghai 200241, China |
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| Abstract: | It is known that the Fourier transform method and the variable separation approach, commonly applicable in linear physics, cannot be directly applied to nonlinear physics. Therefore, how to establish corresponding methods in nonlinear physics is a problem addressed by many physicists and mathematicians. In this paper, a variable separation method is presented, in which the multi-linear variable separation approach is applied to nonlinear systems to obtain multi-linear separation variable solutions with low-dimensional variable separation functions. The proposed approach is especially effective for the common case in which the multi-linear separation variable solution of an integrable system contains some arbitrary low-dimensional variable separation functions. |
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| Keywords: | multi-linear variable separation approach multi-linear variable separation solution integrability |
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