一类非线性双曲型发展方程的孤子解

冯依虎; 陈贤峰; 莫嘉琪

doi:10.3879/j.issn.1000-0887.2015.10.007

一类非线性双曲型发展方程的孤子解

doi: 10.3879/j.issn.1000-0887.2015.10.007

¹亳州师范高等专科学校电子与信息工程系, 安徽亳州 236800;²上海交通大学数学系, 上海 200240;³安徽师范大学数学系, 安徽芜湖 241003

基金项目: 国家自然科学基金(11371248)；安徽省教育厅自然科学课题(KJ2015A347;KJ2013B153)

详细信息

作者简介:
冯依虎（1982—），男，安徽潜山人，副教授，硕士(E-mail: fengyihubzsz@163.com);莫嘉琪(1937—)，男，浙江德清人，教授(通讯作者. E-mail: mojiaqi@mail.ahnu.edu.cn).

中图分类号: O175.29
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出版历程
- 收稿日期: 2015-05-25
- 修回日期: 2015-06-04
- 刊出日期: 2015-10-15

The Soliton Solutions to a Class of Nonlinear Hyperbolic Evolution Equations

¹Department of Electronics and Information Engineering,Bozhou Teachers College, Bozhou, Anhui 236800, P.R.China;²Department of Mathematics, Shanghai Jiao Tong University,Shanghai 200240, P.R.China;³Department of Mathemtics, Anhui Normal University,Wuhu, Anhui 241003, P.R.China

Funds: The National Natural Science Foundation of China(11371248)

摘要

摘要: 研究了一类非线性发展方程.首先在无扰动情形下，利用待定函数和泛函同伦映射方法得到了非扰动发展方程的孤子精确解和扰动方程的任意次近似行波孤子解.接着引入一个同伦映射，并选取初始近似函数,再用同伦映射理论,依次求出非线性双曲型发展扰动方程孤子解的各次近似解析解.再利用摄动理论举例说明了用该方法得到的近似解析解的有效性和各次近似解的近似度.最后,简述了用同伦映射方法得到的近似解的意义,指出了用上述方法得到的各次近似解具有便于求解、精度高等优点.
- 孤子解 /
- 扰动 /
- 非线性双曲型方程
Abstract: A class of nonlinear evolution equations were investigated. With the undetermined functions and functional homotopic mapping methods, the exact solitary solution to the non-disturbed evolution equation and the arbitrary order approximate travelling wave solitary solution to the disturbed evolution equation were obtained. A homotopic mapping was introduced, and an initial approximate function was chosen to find out successively the arbitrary order solitary approximate analytic solutions to the nonlinear hyperbolic evolution equation based on the homotopic mapping theory. With the perturbation method, the examples illustrated the validity and approximation degree of the arbitrary order approximate solutions. A discussion shows the practicability and high accuracy of the approximate solutions obtained with the proposed homotopic mapping method.
- soliton solution /
- disturbed /
- nonlinear hyperbolic equation

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