Limit cycles under perturbations of a quadratic Hamiltonian system

By means of the averaging method of the first order, we introduce the maximum number of limit cycles which can be bifurcated from the periodic orbits of a Hamiltonian system. Besides, the perturbation has been used for a particular class of the polynomial differential systems.

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The number of limit cycles for a class of quintic Hamiltonian systems under quintic perturbations

Journal of the Australian Mathematical Society ◽

10.1017/s1446788700008466 ◽

2002 ◽

Vol 73 (1) ◽

pp. 37-54 ◽

Cited By ~ 7

Author(s):

Guowei Chen ◽

Yongbin Wu ◽

Xinan Yang

Keyword(s):

Hopf Bifurcation ◽

Hamiltonian System ◽

Hamiltonian Systems ◽

Limit Cycles ◽

Homoclinic Bifurcation

AbstractThe Hopf bifurcation and homoclinic bifurcation of the quintic Hamiltonian system is analyzed under quintic perturbations by using unfolding theory in this paper. We show that a quintic system can have at least 29 limit cycles.

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The Cyclicity of Period Annulus of Degenerate Quadratic Hamiltonian Systems with Polycycles S(2) or S(3) Under Perturbations of Piecewise Smooth Polynomials

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127420502302 ◽

2020 ◽

Vol 30 (15) ◽

pp. 2050230

Author(s):

Jiaxin Wang ◽

Liqin Zhao

Keyword(s):

Hamiltonian Systems ◽

Limit Cycles ◽

Upper Bounds ◽

Melnikov Function ◽

Piecewise Smooth ◽

Bifurcation Of Limit Cycles ◽

First Order ◽

Period Annulus ◽

Quadratic Hamiltonian

In this paper, by using Picard–Fuchs equations and Chebyshev criterion, we study the bifurcation of limit cycles for degenerate quadratic Hamilton systems with polycycles [Formula: see text] or [Formula: see text] under the perturbations of piecewise smooth polynomials with degree [Formula: see text]. Roughly speaking, for [Formula: see text], a polycycle [Formula: see text] is cyclically ordered collection of [Formula: see text] saddles together with orbits connecting them in specified order. The discontinuity is on the line [Formula: see text]. If the first order Melnikov function is not equal to zero identically, it is proved that the upper bounds of the number of limit cycles bifurcating from each of the period annuli with the boundary [Formula: see text] and [Formula: see text] are respectively [Formula: see text] and [Formula: see text] (taking into account the multiplicity).

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Limit Cycle Bifurcations from an Order-3 Nilpotent Center of Cubic Hamiltonian Systems Perturbed by Cubic Polynomials

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127420501266 ◽

2020 ◽

Vol 30 (09) ◽

pp. 2050126

Author(s):

Li Zhang ◽

Chenchen Wang ◽

Zhaoping Hu

Keyword(s):

Hamiltonian System ◽

Limit Cycle ◽

Hamiltonian Systems ◽

Limit Cycles ◽

Melnikov Function ◽

First Order ◽

Cubic Polynomials ◽

Nilpotent Center

From [Han et al., 2009a] we know that the highest order of the nilpotent center of cubic Hamiltonian system is [Formula: see text]. In this paper, perturbing the Hamiltonian system which has a nilpotent center of order [Formula: see text] at the origin by cubic polynomials, we study the number of limit cycles of the corresponding cubic near-Hamiltonian systems near the origin. We prove that we can find seven and at most seven limit cycles near the origin by the first-order Melnikov function.

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Exact quantum theory of a time-dependent bound quadratic Hamiltonian system

Physical Review A ◽

10.1103/physreva.48.2716 ◽

1993 ◽

Vol 48 (4) ◽

pp. 2716-2720 ◽

Cited By ~ 50

Author(s):

Kyu Hwang Yeon ◽

Kang Ku Lee ◽

Chung In Um ◽

Thomas F. George ◽

Lakshmi N. Pandey

Keyword(s):

Quantum Theory ◽

Hamiltonian System ◽

Time Dependent ◽

Exact Quantum ◽

Quadratic Hamiltonian

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Canonical and unitary transformation for a general time-dependent quadratic Hamiltonian system

10.1063/1.59946 ◽

2000 ◽

Author(s):

C. I. Um

Keyword(s):

Hamiltonian System ◽

Unitary Transformation ◽

Time Dependent ◽

Quadratic Hamiltonian ◽

General Time

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SMALL LIMIT CYCLES BIFURCATING FROM Z4-EQUIVARIANT NEAR-HAMILTONIAN SYSTEM OF DEGREES 9 AND 7

International Journal of Bifurcation and Chaos ◽

10.1142/s0218127412502720 ◽

2012 ◽

Vol 22 (11) ◽

pp. 1250272 ◽

Cited By ~ 2

Author(s):

XIANBO SUN ◽

JUNMIN YANG

Keyword(s):

Hopf Bifurcation ◽

Hamiltonian System ◽

Limit Cycles ◽

Bifurcation Theory

In this paper, we study the number and distribution of small limit cycles of some Z4-equivariant near-Hamiltonian system of degree 9. Using the methods of Hopf bifurcation theory, we find that this system can have 64 small limit cycles. The configuration of 64 small limit cycles of the system is also illustrated in Fig. 1. When we let some parameters be zero, then we find that there can be 40 small limit cycles in a seventh system.

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