Forced Harmonic Vibration of an Asymmetric Duffing Oscillator
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Data
2011-03-03
Autores
Kovacic, Ivana
Brennan, Michael J. [UNESP]
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Resumo
Two nonlinear asymmetric systems are described in this chapter. The first is a pure cubic nonlinear oscillator with a constant and a harmonic force acting on it, associated with a vibration isolator. The second is a hanging cable which the asymmetry is caused by gravity. Both of these systems have a single-well potential. The equations of motion can be written in such a way that they include a quadratic and cubic nonlinearity, and only a harmonic forcing term. Different analytical and numerical approaches are used to study and illustrate the rich dynamics of the systems. © 2011 John Wiley & Sons, Ltd. All rights reserved.
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Asymmetry, Chaos, Hysteresis, Period-doubling bifurcation, Saddle-node bifurcation, Single-well potential
Como citar
The Duffing Equation: Nonlinear Oscillators and their Behaviour, p. 277-322.