Steady state bifurcation of a periodically excited system under delayed feedback controls |
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Authors: | A.Y.T. Leung Zhongjin Guo Alan Myers |
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Affiliation: | 1. School of Engineering, Western Sydney University, Locked Bag 1797, Penrith, NSW, 2751, Australia;2. Institute of Geotechnical Engineering, School of Civil Engineering and Architecture, East China Jiao Tong University, Nanchang, 330013, Jiangxi, PR China;3. School of Aeronautics and Astronautics, Shanghai Jiao Tong University, Shanghai 200240, PR China;4. School of Ocean and Civil Engineering, Shanghai Jiao Tong University, Shanghai 200240, PR China;5. Department of Architecture and Civil Engineering, City University of Hong Kong, Kowloon, Hong Kong SAR, PR China |
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Abstract: | This paper investigates the steady state bifurcation of a periodically excited system subject to time-delayed feedback controls by the combined method of residue harmonic balance and polynomial homotopy continuation. Three kinds of delayed feedback controls are considered to examine the effects of different delayed feedback controls and delay time on the steady state response. By means of polynomial homotopy continuation, all the possible steady state solutions corresponding the third-order superharmonic and second-subharmonic responses are derived analytically, i.e. without numerical integration. It is found that the delayed feedback changes the bifurcating curves qualitatively and possibly eliminates the saddle-node bifurcation during resonant. The delayed position-velocity coupling and the delayed velocity feedback controls can destabilize the steady state responses. Coexisting periodic solutions, period-doubling bifurcation and even chaos are found in these control systems. The neighborhood of the periodic solutions is verified numerically in the phase portraits. The various effects of time delay on the steady state response are investigated. Many new phenomena are observed. |
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