| (2+1)维KD方程的扰动非行波双孤子和周期解 |
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| 引用本文: | 康晓蓉,鲜大权.(2+1)维KD方程的扰动非行波双孤子和周期解[J].四川大学学报(自然科学版),2017,54(3):477-481. |
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| 作者姓名: | 康晓蓉 鲜大权 |
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| 作者单位: | 西南科技大学,西南科技大学 |
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| 基金项目: | 西华师范大学四川省教育发展研究中心基金(CJF15014);国家自然科学基金(11202175);国家自然科学青年基金(12zg2103). |
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| 摘 要: | 应用退耦变换和Lie对称群方法,将(2+1)维KD方程的约化成了(1+1)维非线性PDE。通过广义同宿测试法获得了该方程新的扰动非行波双孤子解及其动力学临界点和参数极限情况下的非行波有理函数奇解。运用二维平面动力系统的Hamilton函数讨论了对称约化方程在波变换下的周期解存在性,并用正切函数拟设法得到了该周期解的显式精确表达,相应获得了KD方程的扰动非行波周期解析解。
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| 关 键 词: | (2+1)维KD方程 Lie对称约化 扰动非行波双孤子 Hamilton函数 扰动非行波周期解 |
| 收稿时间: | 2016/10/28 0:00:00 |
| 修稿时间: | 2017/1/3 0:00:00 |
The Perturbed Non-traveling Wave Double Solitary and Periodic Solutions for (2+1)-D KD Equation |
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| KANG Xiao-Rong and XIAN Da-Quan.The Perturbed Non-traveling Wave Double Solitary and Periodic Solutions for (2+1)-D KD Equation[J].Journal of Sichuan University (Natural Science Edition),2017,54(3):477-481. |
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| Authors: | KANG Xiao-Rong and XIAN Da-Quan |
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| Institution: | Southwest University of Science and Technology |
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| Abstract: | Based on the decoupling transformation and the Lie point symmetry group method, the (2+1)-D KD equation is reduced to the (1+1)-D nonlinear PDE. By extended homoclinic test approach, new perturbed non-traveling wave double solitary solutions of the (2+1)-D KD equation are obtained. Also, the dynamic critical point and the non-traveling wave rational function singular solutions in the limitation of parameters are derived. Applying the Hamilton function in 2-D planar dynamical system, we discuss the existence of the periodic solutions for the symmetrical and reduced equation with the wave transformation. Moreover, some periodic solutions are derived by the Tan-function test method, and the perturbed non-traveling wave periodic solutions for the (2+1)-D KD equation are shown. |
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