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Bifurcations of Limit Cycles in a Class of Near-Hamiltonian Polynomial Systems

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Abstract:

This article primarily focuses on the study of the limit cycle bifurcation problem of a class of near-Hamiltonian polynomial systems using Abel integral. First, by utilizing analytical techniques, approximate expansions of Abel integral are derived around the central singularity and in the vicinity of the heteroclinic loop, along with the calculated expressions for the coefficients. These results can be utilized to analyze the Hopf bifurcation or heteroclinic bifurcation of the perturbed system. Specifically, it is shown that the discussed near-Hamiltonian polynomial system can produce $[\frac{n+1}{4}]+[\frac{n-1}{4}]+1$ limit cycles near the central singularity and branch out $2[\frac{n+1}{4}]+[\frac{n-1}{4}]$ limit cycles near the heteroclinic loop.

Key words: Near-Hamiltonian system, Limit cycle, Abel integral, Heteroclinic loop bicurcation

CLC Number:

O175.1

Xun Gu,Yanqin Xiong. Bifurcations of Limit Cycles in a Class of Near-Hamiltonian Polynomial Systems[J].Acta mathematica scientia,Series A, 2025, 45(2): 604-618.

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[1]	Arnold V I. Loss of stability of self-oscillations close to resonance and versal deformations of equivariant vector fields. Funct Anal Appl, 1977, 11(2): 85-92
[2]	Chen L, Wang M S. The relative position and number of limit cycles of a quadratic differential system. Acta Math Sinica (Chin Ser), 1979, 22(6): 751-758
[3]	Han M. Bifurcation Theory of Limit Cycles. Beijing: Science Press, 2013
[4]	Han M, Yang J, Tarta A, Yang G. Limit cycles near homoclinic and heteroclinic loops. J Dynam Differential Equations, 2008, 20: 923-944
[5]	Hilbert D. Mathematical problems. Transl Bull Amer Math Soc, 1902, 8: 437-479
[6]	Li W, Llibre J, Zhang X. Melnikov functions for period annulus, nondegenerate centers, heteroclinic and homoclinic cycles. Pacific J Math, 2004, 213(1): 49-77
[7]	Liu C, Xiao D. The smallest upper bound on the number of zeros of Abelian integrals. J Differential Equations, 2020, 269: 3816-3852
[8]	Shi S. A concrete example of the existence of four limit cycles for plane quadratic systems. Sci Sinica, 1980, 23: 153-158
[9]	Tian Y, Han M, Xu F. Bifurcations of small limit cycles in Liénard systems with cubic restoring terms. J Differential Equations, 2019, 267: 1561-1580
[10]	Xiong Y, Han M. New lower bounds for the Hilbert number of polynomial systems of Liénard type. J Differential Equations, 2014, 257: 2565-2590
[11]	Xiong Y, Hu J. Double homoclinic bifurcations by perturbing a class of cubic Z $_2$ -equivariant polynomial systems with nilpotent singular points. Bull Sci Math, 2024, 190: 103377

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