Classification of the centers and isochronicity for a class of quartic polynomial differential systems

Li Feng; Liu Yirong

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Classification of the centers and isochronicity for a class of quartic polynomial differential systems

机译：一类四次多项式微分系统的中心分类和等时性

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摘要

In this paper, the conditions of center and isochronous center at the origin for a class of planar quartic differential systems are studied. At first, a constructive theorem of singular point quantities is presented, which plays an important role in simplifying periodic constants. The sufficient and necessary conditions for the origin of the systems being a center are obtained. Then a complete classification of the sufficient and necessary conditions are given for the origin of the systems being an isochronous center.

机译：本文研究了一类平面四次微分系统的原点中心和等时中心的条件。首先，提出了奇异点数量的构造性定理，该定理在简化周期常数中起重要作用。获得了以系统为中心的充分必要条件。然后，给出了等时系统原点的充分必要条件的完整分类。

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《Communications in Nonlinear Science and Numerical Simulation》 |2012年第6期|p.2270-2291|共22页
作者
Li Feng; Liu Yirong;
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作者单位

School of Science, Linyi University, Linyi 276005, Shandong, PR China,School of Mathematical Science and Computing Technology, Central South University, Changsha 410075, Hunan, PR China;

School of Mathematical Science and Computing Technology, Central South University, Changsha 410075, Hunan, PR China;

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正文语种 eng
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关键词
center; focus; lyapunov constant; isochronous center;

机译：中央;焦点;lyapunov常数等时中心;

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Classification of the centers and isochronicity for a class of quartic polynomial differential systems

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