Bifurcation of limit cycles near equivariant compound cycles 被引量：1

Bifurcation of limit cycles near equivariant compound cycles

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摘要 In this paper we study some equivariant systems on the plane. We first give some criteria for the outer or inner stability of compound cycles of these systems. Then we investigate the number of limit cycles which appear near a compound cycle of a Hamiltonian equivariant system under equivariant perturbations. In the last part of the paper we present an application of our general theory to show that a Z3 equivariant system can have 13 limit cycles. In this paper we study some equivariant systems on the plane. We first give some criteria for the outer or inner stability of compound cycles of these systems. Then we investigate the number of limit cycles which appear near a compound cycle of a Hamiltonian equivariant system under equivariant perturbations. In the last part of the paper we present an application of our general theory to show that a Z 3 equivariant system can have 13 limit cycles.

作者 Mao-an HAN Tong-hua ZHANG Hong ZANG

机构地区 Department of Mathematics

出处《Science China Mathematics》 SCIE 2007年第4期503-514,共12页 中国科学：数学（英文版）

基金 The work was supported by the National Natural Science Foundation of China (Grant No. 10671127) Program for New Century Excellent Talents in University (Grant No. NCET-04-0388)

关键词 equivariant system STABILITY BIFURCATION limit cycle 34C05 34G10 58F11 equivariant system stability bifurcation limit cycle

分类号 O192 [理学—基础数学]

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参考文献2

1HAN Mao'an CHEN Xianfeng.Existence and bifurcation of integral manifolds with applications[J].Science China Mathematics,2005,48(7):940-957. 被引量：3
2SHUI Shuliang & ZHU Deming College of Mathematics and Physics, Zhejiang Normal University, Jinhua 321004, China,Department of Mathematics, East China Normal University, Shanghai 200062, China.Codimension 3 nonresonant bifurcations of homoclinic orbits with two inclination flips[J].Science China Mathematics,2005,48(2):248-260. 被引量：10

二级参考文献4

1Zhu Deming.Stability and Uniqueness of Periodic Orbits Produced During Homoclinic Bifurcation[J].Acta Mathematica Sinica,English Series,1995,11(3):267-277. 被引量：8
2Zhu Deming Department of Mathematics, East China Normal University. Shanghai 200062. China.Problems in Homoclinic Bifurcation with Higher Dimensions[J].Acta Mathematica Sinica,English Series,1998,14(3):341-352. 被引量：31
3JIN Yin Lai,ZHU De Ming Department of Mathematics. Linyi Teachers University. Shandong 276005. P. R. China Department of Mathematics. East China Normal University. Shanghai 200062. P. R. China Department of Mathematics. East China Normal University. Shanghai 200062. P. R. China.Bifurcations of Rough Heteroclinic Loops with Three Saddle Points[J].Acta Mathematica Sinica,English Series,2002,18(1):199-208. 被引量：14
4JINYINLAI,ZHUDEMINC.DEGENERATED HOMOCLINIC BIFURCATIONS WITH HIGHER DIMENSIONS[J].Chinese Annals of Mathematics,Series B,2000,21(2):201-210. 被引量：17

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1XU YanCong,ZHU DeMing,DENG GuiFeng.Codimension 2 reversible heteroclinic bifurcations with inclination flips[J].Science China Mathematics,2009,52(8):1801-1814.
2水树良,傅新楚.倾斜翻转同宿分支中的同宿轨与周期轨的共存性[J].上海大学学报（自然科学版）,2006,12(5):473-476.
3Shuliang SHUI,Deming ZHU.Codimension 3 Non-resonant Bifurcations of Rough Heteroclinic Loops with One Orbit Flip[J].Chinese Annals of Mathematics,Series B,2006,27(6):657-674. 被引量：1
4韩茂安,张同华,臧红.等变系统复眼环的极限环分支[J].中国科学（A辑）,2006,36(11):1267-1278. 被引量：1
5Zhiyong YE,Maoan HAN.Bifurcations of Invariant Tori and Subharmonic Solutions of Singularly Perturbed System[J].Chinese Annals of Mathematics,Series B,2007,28(2):135-148. 被引量：4
6张天四,朱德明.具有共振特征值的轨道翻转双同宿环分支[J].应用数学和力学,2007,28(11):1353-1362.
7邓桂丰,朱德明,徐衍聪.具有双轨道翻转性质的同宿分支[J].数学学报（中文版）,2009,52(1):33-46. 被引量：1
8徐衍聪,朱德明,邓桂丰.带有倾斜翻转的余维2反转异宿分支[J].中国科学（A辑）,2009,39(7):827-839.
9邓桂丰,刘福窑,路秋英,张伟鹏.一类3维反转系统中的异维环分支[J].数学年刊（A辑）,2013,34(4):401-414.
10邓桂丰,张伟鹏,路秋英.三维反转系统中余维2和3的异维环分支[J].数学学报（中文版）,2014,57(3):453-472. 被引量：1

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1李继彬,H.S.Y.Chan,K.W.Chung.Bifurcations of limit cycles in a Z_6-equivariant planar vector field of degree 5[J].Science China Mathematics,2002,45(7):817-826. 被引量：19
2赵育林,张芷芬,李伟固,李承治.Linear estimate of the number of zeros of Abelian integrals for quadratic centers having almost all their orbits formed by cubics[J].Science China Mathematics,2002,45(8):964-974. 被引量：16
3ZHAO LiQin,WANG Qi.Perturbations from a kind of quartic Hamiltonians under general cubic polynomials[J].Science China Mathematics,2009,52(3):427-442. 被引量：2
4韩茂安,叶彦谦,朱德明.Cyclicity of homoclinic loops and degenerate cubic Hamiltonians[J].Science China Mathematics,1999,42(6):605-617. 被引量：2
5JIANGQIBAO,HANMAOAN.MELNIKOV FUNCTIONS AND PERTURBATION OF A PLANAR HAMILTONIAN SYSTEM[J].Chinese Annals of Mathematics,Series B,1999,20(2):233-246. 被引量：9
6张芷芬,李承治.关于一类二次哈密尔顿系统在二次扰动下的极限环个数问题(英文)[J].数学进展,1997,26(5):445-460. 被引量：7
7韩茂安,叶彦谦.ON THE COEFFICIENTS APPEARING IN THE EXPANSION OF MELNIKOV FUNCTIONS IN HOMOCLINIC BIFURCATIONS[J].Annals of Differential Equations,1998,14(2):58-64. 被引量：4
8张平光.具有二个焦点的二次系统极限环的分布与个数[J].数学学报（中文版）,2001,44(1):37-44. 被引量：7
9王铎.An Introduction to the Normal Form Theory of Ordinary Differential Equations[J].数学进展,1990,19(1):38-71. 被引量：12
10Han Maoan (Department of Applied Mathematics,Shandong Mining Institute,Taian 271019,China).Bifurcation of Limit Cycles and the Cusp of Order n[J].Acta Mathematica Sinica,English Series,1997,13(1):64-75. 被引量：1

引证文献1

1李承治,李伟固.弱化希尔伯特第16问题及其研究现状[J].数学进展,2010,39(5):513-526. 被引量：17

二级引证文献17

1齐明辉,赵丽琴.一类具有双异宿环的五次哈密尔顿系统的极限环分支[J].北京师范大学学报（自然科学版）,2012,48(6):587-591.
2孙宪波.一类五次扰动Hamiltonian系统的Abel积分零点个数[J].数学学报（中文版）,2013,56(6):981-992. 被引量：1
3王娜,赵丽琴.一类三次哈密尔顿系统阿贝尔积分零点个数的估计[J].北京师范大学学报（自然科学版）,2014,50(3):234-238.
4赵丽琴.一类五次向量场在非对称扰动下Abel积分零点的个数[J].中国科学：数学,2017,47(1):227-240.
5张蓉蓉,李宝毅,张永康.一类平面分段光滑二次系统的极限环个数[J].天津师范大学学报（自然科学版）,2017,37(5):7-10. 被引量：3
6李时敏,陈挺,刘玉记,黎小丽.平面折射系统极限环的存在和唯一性[J].中国科学：数学,2021,51(4):605-614.
7朱红英,韦敏志,杨素敏,蒋曹清.一类四次扰动Liénard系统的极限环分支[J].数学物理学报（A辑）,2021,41(4):936-953. 被引量：2
8晏兵川,李宝毅,张永康.一类Bogdanov-Takens系统在分段多项式扰动下极限环个数的估计[J].天津师范大学学报（自然科学版）,2021,41(5):1-7. 被引量：1
9隋世友,徐伟骄.具有非Morsean点的二次可逆系统(r6)的极限环分支[J].数学学报（中文版）,2021,64(6):999-1004.
10何鸿锦,Jaume Llibre,肖冬梅.具有全局中心的平面多项式Hamilton系统[J].中国科学：数学,2022,52(6):617-628. 被引量：1

1Feng LI Yin Lai JIN.Center Conditions and Bifurcation of Limit Cycles at Nilpotent Critical Point in a Quintic Lyapunov System[J].Journal of Mathematical Research and Exposition,2011,31(5):937-945.
2Zhu, JH,Zhu, SM.Conditions for origin to be a center and the bifurcation of limit cycles in a class of cubic systems[J].Chinese Science Bulletin,1997,42(14):1157-1161.
3张祥.BIFURCATION OF LIMIT CYCLES FOR THE QUADRATIC DIFFERENTIAL SYSTEM (Ⅲ)l = n = 0[J].Acta Mathematicae Applicatae Sinica,1999,15(4):368-373.
4Han Maoan (Department of Applied Mathematics,Shandong Mining Institute,Taian 271019,China).Bifurcation of Limit Cycles and the Cusp of Order n[J].Acta Mathematica Sinica,English Series,1997,13(1):64-75. 被引量：1
5陈绍光.ANISOTROPY OF SPACE—THE CAUSE OF MAGNETISM OF ROTATING BODIES[J].Chinese Science Bulletin,1981,26(3):233-238.
6Xianping He,Jingjing Feng,Qinlong Wang.LIMIT CYCLES BIFURCATION FOR A CLASS OF DEGENERATE SINGULARITY[J].Annals of Differential Equations,2014,30(2):150-156.
7HuangWentao,LiuYirong.CENTER CONDITIONS AND BIFURCATION OF LIMIT CYCLES FOR A CLASS OF FIFTH DEGREE SYSTEMS[J].Applied Mathematics(A Journal of Chinese Universities),2004,19(2):167-177.
8HANMAOAN,BIPING.BIFURCATION OF LIMIT CYCLES FROM A DOUBLE HOMOCLINIC LOOP WITH A ROUGH SADDLE[J].Chinese Annals of Mathematics,Series B,2004,25(2):233-242. 被引量：3
9信息光学全息术与器件[J].中国光学,2004(5):50-52.
10冯贝叶.CONDITION OF CREATION OF LIMIT CYCLES FROM THE LOOP OF A SADDLE-POINT SEPARATRIX[J].Chinese Science Bulletin,1986,31(17).

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