Analysis of period-doubling and chaos of a non-symmetric oscillator with piecewise-linearity
Analysis of period-doubling and chaos of a non-symmetric oscillator with piecewise-linearity
This paper presents an analysis of the dynamical behaviour of a non-symmetric oscillator with piecewise-linearity. The Chen–Langford (C–L) method is used to obtain the averaged system of the oscillator. Using this method, the local bifurcation and the stability of the steady-state solutions are studied. A Runge–Kutta method, Poincaré map and the largest Lyapunov’s exponent are used to detect the complex dynamical phenomena of the system. It is found that the system with piecewise-linearity exhibits periodic oscillations, period-doubling, period-3 solution and then chaos. When chaos is found, it is detected by examining the phase plane, bifurcation diagram and the largest Lyapunov’s exponent. The results obtained in this paper show that the vibration system with piecewise-linearity do exhibit quite similar dynamical behaviour to the discrete system given by the logistic map.
1917-1927
Cao, Q.
f1f67041-4813-43e7-94ce-ff9052f60443
Xu, L.
5802ae7f-4a22-4308-a6d8-8d8ae171553d
Djidjeli, K.
94ac4002-4170-495b-a443-74fde3b92998
Price, W.G.
b7888f47-e3fc-46f4-9fb9-7839052ff17c
Twizell, E.H.
46b3dc67-c9d6-414d-a8cf-19c0c0911935
2001
Cao, Q.
f1f67041-4813-43e7-94ce-ff9052f60443
Xu, L.
5802ae7f-4a22-4308-a6d8-8d8ae171553d
Djidjeli, K.
94ac4002-4170-495b-a443-74fde3b92998
Price, W.G.
b7888f47-e3fc-46f4-9fb9-7839052ff17c
Twizell, E.H.
46b3dc67-c9d6-414d-a8cf-19c0c0911935
Cao, Q., Xu, L., Djidjeli, K., Price, W.G. and Twizell, E.H.
(2001)
Analysis of period-doubling and chaos of a non-symmetric oscillator with piecewise-linearity.
Chaos, Solitons & Fractals, 12 (10), .
(doi:10.1016/S0960-0779(00)00155-7).
Abstract
This paper presents an analysis of the dynamical behaviour of a non-symmetric oscillator with piecewise-linearity. The Chen–Langford (C–L) method is used to obtain the averaged system of the oscillator. Using this method, the local bifurcation and the stability of the steady-state solutions are studied. A Runge–Kutta method, Poincaré map and the largest Lyapunov’s exponent are used to detect the complex dynamical phenomena of the system. It is found that the system with piecewise-linearity exhibits periodic oscillations, period-doubling, period-3 solution and then chaos. When chaos is found, it is detected by examining the phase plane, bifurcation diagram and the largest Lyapunov’s exponent. The results obtained in this paper show that the vibration system with piecewise-linearity do exhibit quite similar dynamical behaviour to the discrete system given by the logistic map.
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cao_01.pdf
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Published date: 2001
Identifiers
Local EPrints ID: 22789
URI: http://eprints.soton.ac.uk/id/eprint/22789
ISSN: 0960-0779
PURE UUID: 600ff7f8-3b4a-4350-ac11-431d0551803f
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Date deposited: 23 Mar 2006
Last modified: 15 Mar 2024 06:40
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Author:
Q. Cao
Author:
L. Xu
Author:
E.H. Twizell
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