Abelian Integrals and Limit Cycles

被引:53
作者
Li, Chengzhi [1 ]
机构
[1] Peking Univ, Sch Math Sci, Beijing 100871, Peoples R China
来源
QUALITATIVE THEORY OF DYNAMICAL SYSTEMS | 2012年 / 11卷 / 01期
关键词
Abelian integral; Limit cycle; Weak Hilbert's 16th problem; QUADRATIC REVERSIBLE-SYSTEMS; PERIOD ANNULUS; HILBERT PROBLEM; HAMILTONIAN-SYSTEMS; 16TH PROBLEM; CENTERS; PERTURBATIONS; NUMBER; CYCLICITY; ZEROS;
D O I
10.1007/s12346-011-0051-z
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
This survey paper is devoted to introducing some basic concepts and methods about the application of Abelian integral to study the number of limit cycles, especially to the weak Hilbert's 16th problem. We will introduce some recent results in this field.
引用
收藏
页码:111 / 128
页数:18
相关论文
共 91 条
[41]  
ILIEV ID, 1996, ADV DIFFERENTIAL EQU, V1, P689
[42]   BIFURCATIONS OF LIMIT CYCLES IN A REVERSIBLE QUADRATIC SYSTEM WITH A CENTER, A SADDLE AND TWO NODES [J].
Iliev, Iliya D. ;
Li, Chengzhi ;
Yu, Jiang .
COMMUNICATIONS ON PURE AND APPLIED ANALYSIS, 2010, 9 (03) :583-610
[43]   FINITENESS THEOREMS FOR LIMIT-CYCLES [J].
ILYASHENKO, YS .
RUSSIAN MATHEMATICAL SURVEYS, 1990, 45 (02) :129-203
[44]   REAL ANALYTIC VARIETIES WITH THE FINITENESS PROPERTY AND COMPLEX ABELIAN-INTEGRALS [J].
KHOVANSKII, AG .
FUNCTIONAL ANALYSIS AND ITS APPLICATIONS, 1984, 18 (02) :119-127
[45]   A NOTE ON A RESULT OF PETROV,G.S. ABOUT THE WEAKENED 16TH HILBERT PROBLEM [J].
LI, BY ;
ZHANG, ZF .
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 1995, 190 (02) :489-516
[46]  
Li C., 2004, J DYN DIFFER EQU, V16, P271
[47]  
Li C., 2010, Qual. Th. Dyn. Syst, V9, P235
[48]  
Li C., 1982, SCI SINICA A, V12, P1087
[49]  
[李承治 Li Chengzhi], 2010, [数学进展, Advances in Mathematics], V39, P513
[50]   The cyclicity of period annulus of a quadratic reversible Lotka-Volterra system [J].
Li, Chengzhi ;
Llibre, Jaume .
NONLINEARITY, 2009, 22 (12) :2971-2979
12345678910