Bifurcation of limit cycles from a quintic center via the second order averaging method

Linping Peng; Zhaosheng Feng

doi:10.1142/S0218127415500479

Bifurcation of limit cycles from a quintic center via the second order averaging method

Linping Peng
, Zhaosheng Feng^*

^*此作品的通讯作者

数学科学学院

University of Texas-Pan American

科研成果: 期刊稿件 › 文章 › 同行评审

6 引用（Scopus）

摘要

This paper is concerned with the bifurcation of limit cycles from a quintic system with one center. By using the averaging theory, we show that under any small quintic homogeneous perturbations, up to order 1 in ε, at most three limit cycles bifurcate from periodic orbits of the considered system, and this upper bound can be reached. Up to order 2 in ε, at most seven limit cycles emerge from periodic orbits of the unperturbed one.

源语言	英语
文章编号	1550047
期刊	International Journal of Bifurcation and Chaos
卷	25
期	3
DOI	https://doi.org/10.1142/S0218127415500479
出版状态	已出版 - 25 3月 2015

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abstract = "This paper is concerned with the bifurcation of limit cycles from a quintic system with one center. By using the averaging theory, we show that under any small quintic homogeneous perturbations, up to order 1 in ε, at most three limit cycles bifurcate from periodic orbits of the considered system, and this upper bound can be reached. Up to order 2 in ε, at most seven limit cycles emerge from periodic orbits of the unperturbed one.",

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N2 - This paper is concerned with the bifurcation of limit cycles from a quintic system with one center. By using the averaging theory, we show that under any small quintic homogeneous perturbations, up to order 1 in ε, at most three limit cycles bifurcate from periodic orbits of the considered system, and this upper bound can be reached. Up to order 2 in ε, at most seven limit cycles emerge from periodic orbits of the unperturbed one.

AB - This paper is concerned with the bifurcation of limit cycles from a quintic system with one center. By using the averaging theory, we show that under any small quintic homogeneous perturbations, up to order 1 in ε, at most three limit cycles bifurcate from periodic orbits of the considered system, and this upper bound can be reached. Up to order 2 in ε, at most seven limit cycles emerge from periodic orbits of the unperturbed one.

KW - The averaging method

KW - bifurcation

KW - homogeneous perturbation

KW - limit cycle

KW - period annulus

KW - quintic system

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Bifurcation of limit cycles from a quintic center via the second order averaging method

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