Fourteen Limit Cycles in a Seven-Degree Nilpotent System

Wentao Huang; Ting Chen; Tianlong Gu

doi:10.1155/2013/398609

Abstract and Applied Analysis (Jan 2013)

Fourteen Limit Cycles in a Seven-Degree Nilpotent System

Wentao Huang,
Ting Chen,
Tianlong Gu

Affiliations

Wentao Huang: Guangxi Key Laboratory of Trusted Software, School of Computing Science and Mathematics, Guilin University of Electronic Technology, Guilin 541004, China
Ting Chen: Guangxi Key Laboratory of Trusted Software, School of Computing Science and Mathematics, Guilin University of Electronic Technology, Guilin 541004, China
Tianlong Gu: Guangxi Key Laboratory of Trusted Software, School of Computing Science and Mathematics, Guilin University of Electronic Technology, Guilin 541004, China

DOI: https://doi.org/10.1155/2013/398609
Journal volume & issue: Vol. 2013

Abstract

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Center conditions and the bifurcation of limit cycles for a seven-degree polynomial differential system in which the origin is a nilpotent critical point are studied. Using the computer algebra system Mathematica, the first 14 quasi-Lyapunov constants of the origin are obtained, and then the conditions for the origin to be a center and the 14th-order fine focus are derived, respectively. Finally, we prove that the system has 14 limit cycles bifurcated from the origin under a small perturbation. As far as we know, this is the first example of a seven-degree system with 14 limit cycles bifurcated from a nilpotent critical point.

Published in Abstract and Applied Analysis

ISSN: 1085-3375 (Print); 1687-0409 (Online)
Publisher: Wiley
Country of publisher: United Kingdom
LCC subjects: Science: Mathematics
Website: https://onlinelibrary.wiley.com/journal/4058

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