On the Limit Cycles Bifurcating from a Quadratic Reversible Center of Genus One

被引:3
|
作者
Peng, Linping [1 ]
Li, You [1 ]
机构
[1] Beihang Univ, Sch Math & Syst Sci, LIMB, Minist Educ, Beijing 100191, Peoples R China
来源
MEDITERRANEAN JOURNAL OF MATHEMATICS | 2014年 / 11卷 / 02期
关键词
Quadratic reversible system; genus one; period annulus; bifurcation of limit cycles; Abelian integral; UNBOUNDED HETEROCLINIC LOOPS; HAMILTONIAN-SYSTEMS; PERIOD ANNULI; INTEGRABLE SYSTEM; HOMOCLINIC LOOP; HILBERT PROBLEM; PERTURBATIONS; CYCLICITY; N=2;
D O I
10.1007/s00009-013-0325-6
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
The paper is concerned with the bifurcation of limit cycles in perturbations of a quadratic reversible system with a center of genus one. By studying the properties of the auxiliary curve and centroid curve defined by the Abelian integrals, we have proved that under small quadratic perturbations, at most two limit cycles arise from the period annulus surrounding the quadratic reversible center, and the bound is sharp. This partially verifies Conjecture 1 given in Gautier et al. (Discrete Contin Dyn Syst 25:511-535, 2009).
引用
收藏
页码:373 / 392
页数:20
相关论文
共 50 条
  • [21] QUADRATIC PERTURBATIONS OF A CLASS OF QUADRATIC REVERSIBLE SYSTEMS WITH ONE CENTER
    Liang, Haihua
    Zhao, Yulin
    DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS, 2010, 27 (01) : 325 - 335
  • [22] On the Number of Limit Cycles Bifurcating from a Compound Polycycle
    Sheng, Lijuan
    Han, Maoan
    Tian, Yun
    INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2020, 30 (07):
  • [23] The cyclicity of quadratic reversible systems with a center of genus one and non-Morsean point
    Zhao, Yulin
    Chen, Yanyan
    APPLIED MATHEMATICS AND COMPUTATION, 2014, 231 : 268 - 275
  • [24] The maximal number of limit cycles bifurcating from a Hamiltonian triangle in quadratic systems
    Xiong, Yanqin
    Han, Maoan
    Xiao, Dongmei
    JOURNAL OF DIFFERENTIAL EQUATIONS, 2021, 280 : 139 - 178
  • [25] FOUR LIMIT CYCLES FROM PERTURBING QUADRATIC INTEGRABLE SYSTEMS BY QUADRATIC POLYNOMIALS
    Yu, Pei
    Han, Maoan
    INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2012, 22 (10):
  • [26] The cyclicity of a class of quadratic reversible system of genus one
    Shao, Yi
    Zhao, Yulin
    CHAOS SOLITONS & FRACTALS, 2011, 44 (10) : 827 - 835
  • [27] The number of limit cycles bifurcating from the periodic orbits of an isochronous center
    Bey, Meryem
    Badi, Sabrina
    Fernane, Khairedine
    Makhlouf, Amar
    MATHEMATICAL METHODS IN THE APPLIED SCIENCES, 2019, 42 (03) : 821 - 829
  • [28] Limit cycles for a perturbation of a quadratic center with symmetry
    L. A. Cherkas
    Differential Equations, 2011, 47 : 1077 - 1087
  • [29] On the number of limit cycles bifurcating from a non-global degenerated center
    Gasull, Armengol
    Li, Chengzhi
    Liu, Changjian
    JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2007, 329 (01) : 268 - 280
  • [30] Cyclicity of a Family of Generic Reversible Quadratic Systems with One Center
    Wang, Jihua
    Dai, Yanfei
    INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2019, 29 (03):
12345