一类非光滑对称三次系统的全局分支

数学物理学报 ›› 2015, Vol. 35 ›› Issue (1): 83-96.

一类非光滑对称三次系统的全局分支

尚德生, 张耀明

山东理工大学理学院, 淄博 255049

收稿日期:2013-06-08 修回日期:2014-05-06 出版日期:2015-02-25 发布日期:2015-02-25
基金资助:
山东省自然科学基金重点项目(Zr2010AZ003)资助

Global Bifurcation of A Symmetric Cubic System

SHANG De-Sheng, ZHANG Yao-Ming

School of Science, Shandong University of Technology,
Shandong Zibo 255049

Received:2013-06-08 Revised:2014-05-06 Online:2015-02-25 Published:2015-02-25

摘要/Abstract

摘要：

该文对一类对称三次 Hamilton 系统在非光滑对称摄动下产生的极限环数目进行研究.通过多参数摄动理论和定性分析方法,
得到这类在非光滑摄动下的三次系统可以存在至少$\!19$个极限环.

关键词: 摄动, 非光滑三次系统, 同宿轨, 极限环

Abstract:

The number of limit cycles of a class of symmetric cubic near-Hamiltonian system under symmetric non-smooth perturbations are investigated in this paper. At least 19 limit cycles are found in this class of perturbed non-smooth cubic system by using the method of multi-parameter perturbation theory and qualitative analysis.

Key words: Perturbation, Non-smooth cubic system, Homoclinic loop, Limit cycle

中图分类号:

34C05

尚德生, 张耀明. 一类非光滑对称三次系统的全局分支[J]. 数学物理学报, 2015, 35(1): 83-96.

SHANG De-Sheng, ZHANG Yao-Ming. Global Bifurcation of A Symmetric Cubic System[J]. Acta mathematica scientia,Series A, 2015, 35(1): 83-96.

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