Journal of Qujing Normal University ›› 2022, Vol. 41 ›› Issue (3): 8-11.

Previous Articles     Next Articles

Limit Cycles for a Class of Perturbed Seventh Order Hamiltonian Systems

ZHANG Jingtao, YU Qiuli, HONG Xiaochun   

  1. School of Statistics and Mathematics, Yunnan University of Finance and Economics, Kunming Yunnan 650221, China
  • Received:2022-03-21 Online:2022-05-26 Published:2022-06-02

PDF (PC)

237

Abstract: The limit cycles of a class of seventh order hyperelliptic Hamiltonian systems with nilpotent singular points under the perturbation of seventh degree polynomial are studied to find that the system has three limit cycles in the unbounded ring domain, and the specific positions of these limit cycles are simulated by using the detection function and numerical simulation method.

Key words: Limit cycle, Hamiltonian system, Abelian integral, detection function

CLC Number: