Analysis of oscillations in quasi-conservative strongly nonlinear oscillator systems

Author

Savov, V.N. ; Georgiev, Zh.D. ; Todorov, T.G.

Author_Institution

Dept. of Theor. Electr. Eng., Tech. Univ. of Sofia, Bulgaria

Volume

50

Issue

12

fYear

2003

Firstpage

1585

Lastpage

1588

Abstract

The oscillations in a perturbed Duffing oscillator have been analyzed. The oscillations are regarded as limit cycles in a perturbed Hamiltonian system under polynomial perturbation of the sixth degree and analyzed by using the Melnikov function. It has been proved that there exists a polynomial perturbation depending on the zeros of the Melnikov function so that the system considered can have either two simple limit cycles, or one limit cycle of multiplicity 2, or one simple limit cycle.

Keywords

circuit oscillations; circuit simulation; elliptic equations; limit cycles; nonlinear network analysis; oscillators; perturbation techniques; Hamiltonian system; Melnikov function zeros; elliptic functions; limit cycles; nonlinear oscillations; oscillation analysis; perturbed Duffing oscillator; polynomial perturbation; quasi-conservative oscillator systems; strongly nonlinear oscillator systems; Bifurcation; Circuits; Limit-cycles; Nonlinear equations; Oscillators; Polynomials; Shape; Stability analysis;

fLanguage

English

Journal_Title

Circuits and Systems I: Fundamental Theory and Applications, IEEE Transactions on

Publisher

ieee

ISSN

1057-7122

Type

jour

DOI

10.1109/TCSI.2003.819831

Filename

1257466