Bifurcation of Limit Cycles for Two Differential Systems

Author

Hong, Xiao-Chun

Volume

5

fYear

2009

fDate

14-16 Aug. 2009

Firstpage

455

Lastpage

459

Abstract

Bifurcation of limit cycles for two differential systems is investigated using both qualitative analysis and numerical exploration. The investigation is based on detection functions which are particularly effective for the perturbed differential systems. The study reveals that each of the two systems has 3 limit cycles using detection function approach. By using method of numerical simulation, the distributed orderliness of the 3 limit cycles is observed and their nicety places are determined. The study also indicates that each of the 3 limit cycles passes the corresponding nicety point. The results presented here are helpful for further investigating the Hilbert´s 16th problem.

Keywords

bifurcation; limit cycles; numerical analysis; polynomials; Hilbert 16th problem; bifurcation; detection function approach; limit cycles; numerical exploration; numerical simulation method; qualitative analysis; the perturbed differential systems; Bifurcation; Helium; Information analysis; Information science; Limit-cycles; Mathematics; Numerical simulation; Orbits; Polynomials; detection function; limit cycle; numerical exploration; qualitative analysis;

fLanguage

English

Publisher

ieee

Conference_Titel

Natural Computation, 2009. ICNC '09. Fifth International Conference on

Conference_Location

Tianjin

Print_ISBN

978-0-7695-3736-8

Type

conf

DOI

10.1109/ICNC.2009.651

Filename

5365967