Perturbations from a kind of quartic Hamiltonians under general cubic polynomials 被引量：2

Perturbations from a kind of quartic Hamiltonians under general cubic polynomials

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摘要 In this paper we investigate the perturbations from a kind of quartic Hamiltonians under general cubic polynomials. It is proved that the number of isolated zeros of the related abelian integrals around only one center is not more than 12 except the case of global center. It is also proved that there exists a cubic polynomial such that the disturbed vector field has at least 3 limit cycles while the corresponding vector field without perturbations belongs to the saddle loop case. In this paper we investigate the perturbations from a kind of quartic Hamiltonians under general cubic polynomials. It is proved that the number of isolated zeros of the related abelian integrals around only one center is not more than 12 except the case of global center. It is also proved that there exists a cubic polynomial such that the disturbed vector field has at least 3 limit cycles while the corresponding vector field without perturbations belongs to the saddle loop case.

作者 ZHAO LiQin WANG Qi

机构地区 School of Mathematical Sciences Department of Mathematics

出处《Science China Mathematics》 SCIE 2009年第3期427-442,共16页 中国科学：数学（英文版）

基金 supported by National Natural Science Foundation of China (Grant No. 10671020)

关键词 ABELIAN integral elliptic Hamiltonian HOMOCLINIC bifurcation abelian integral elliptic Hamiltonian homoclinic bifurcation 58F14 58F21 58F30 34C05

分类号 O175 [理学—基础数学]

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参考文献14

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Perturbations from a kind of quartic Hamiltonians under general cubic polynomials 被引量：2

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