LIMIT CYCLES FROM A CUBIC REVERSIBLE SYSTEM VIA THE THIRD-ORDER AVERAGING METHOD

被引:0
|
作者
Peng, Linping [1 ]
Feng, Zhaosheng [2 ]
机构
[1] Beihang Univ, Minist Educ, Sch Math & Syst Sci, LIMB, Beijing 100191, Peoples R China
[2] Univ Texas Pan Amer, Dept Math, Edinburg, TX 78539 USA
来源
ELECTRONIC JOURNAL OF DIFFERENTIAL EQUATIONS | 2015年
基金
美国国家科学基金会;
关键词
Bifurcation; limit cycles; homogeneous perturbation; averaging method; cubic center; period annulus; HAMILTONIAN CENTERS; QUADRATIC CENTERS; PERTURBATIONS; BIFURCATION; SHAPE;
D O I
暂无
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
This article concerns the bifurcation of limit cycles from a cubic integrable and non-Hamiltonian system. By using the averaging theory of the first and second orders, we show that under any small cubic homogeneous perturbation, at most two limit cycles bifurcate from the period annulus of the unperturbed system, and this upper bound is sharp. By using the averaging theory of the third order, we show that two is also the maximal number of limit cycles emerging from the period annulus of the unperturbed system.
引用
收藏
页数:27
相关论文
共 50 条
  • [21] BIFURCATION OF LIMIT CYCLES FOR CUBIC REVERSIBLE SYSTEMS
    Shao, Yi
    Wu, Kuilin
    ELECTRONIC JOURNAL OF DIFFERENTIAL EQUATIONS, 2014,
  • [22] ON THE LIMIT CYCLES THAT CAN BIFURCATE FROM A UNIFORM ISOCHRONOUS CENTER VIA AVERAGING METHOD
    Rezaiki, Nabil
    Boulfoul, Amel
    MEMOIRS ON DIFFERENTIAL EQUATIONS AND MATHEMATICAL PHYSICS, 2024, 93 : 143 - 158
  • [23] THIRD-ORDER ELASTIC MODULI OF CUBIC CRYSTALS
    ELKIN, S
    ALTEROVITZ, S
    GERLICH, D
    JOURNAL OF THE ACOUSTICAL SOCIETY OF AMERICA, 1970, 47 (03): : 937 - +
  • [24] Reversible Limit Cycles for Linear Plus Cubic Homogeneous Polynomial Differential System
    Wang, Luping
    Zhao, Yulin
    QUALITATIVE THEORY OF DYNAMICAL SYSTEMS, 2025, 24 (02)
  • [25] Limit Cycles of A Cubic Kolmogorov System
    Li, Feng
    PROCEEDINGS OF THE 7TH CONFERENCE ON BIOLOGICAL DYNAMIC SYSTEM AND STABILITY OF DIFFERENTIAL EQUATION, VOLS I AND II, 2010, : 619 - 622
  • [26] Limit cycles of a cubic Kolmogorov system
    Lloyd, NG
    Pearson, JM
    Saez, E
    Szanto, I
    APPLIED MATHEMATICS LETTERS, 1996, 9 (01) : 15 - 18
  • [27] Bifurcations of limit cycles in a cubic system
    Zhang, TH
    Zang, H
    Han, MA
    CHAOS SOLITONS & FRACTALS, 2004, 20 (03) : 629 - 638
  • [28] A cubic system with thirteen limit cycles
    Li, Chengzhi
    Liu, Changjian
    Yang, Jiazhong
    JOURNAL OF DIFFERENTIAL EQUATIONS, 2009, 246 (09) : 3609 - 3619
  • [29] LIMIT CYCLES IN RELAY-TYPE THIRD-ORDER SAMPLED-DATA CONTROL SYSTEMS
    RAO, MVC
    RAO, PV
    INTERNATIONAL JOURNAL OF CONTROL, 1971, 13 (04) : 657 - &
  • [30] On a cubic system with eight limit cycles
    Ning, Shucheng
    Xia, Bican
    Zheng, Zhiming
    BULLETIN OF THE BELGIAN MATHEMATICAL SOCIETY-SIMON STEVIN, 2007, 14 (04) : 595 - 605
12345