Analysis of chaotic instabilities in a rotating body with internal energy dissipation
Contribuinte(s) |
Leon O. Chua |
---|---|
Data(s) |
01/01/2006
|
Resumo |
Melnikov's method is used to analytically predict the onset of chaotic instability in a rotating body with internal energy dissipation. The model has been found to exhibit chaotic instability when a harmonic disturbance torque is applied to the system for a range of forcing amplitude and frequency. Such a model may be considered to be representative of the dynamical behavior of a number of physical systems such as a spinning spacecraft. In spacecraft, disturbance torques may arise under malfunction of the control system, from an unbalanced rotor, from vibrations in appendages or from orbital variations. Chaotic instabilities arising from such disturbances could introduce uncertainties and irregularities into the motion of the multibody system and consequently could have disastrous effects on its intended operation. A comprehensive stability analysis is performed and regions of nonlinear behavior are identified. Subsequently, the closed form analytical solution for the unperturbed system is obtained in order to identify homoclinic orbits. Melnikov's method is then applied on the system once transformed into Hamiltonian form. The resulting analytical criterion for the onset of chaotic instability is obtained in terms of critical system parameters. The sufficient criterion is shown to be a useful predictor of the phenomenon via comparisons with numerical results. Finally, for the purposes of providing a complete, self-contained investigation of this fundamental system, the control of chaotic instability is demonstated using Lyapunov's method. |
Identificador | |
Idioma(s) |
eng |
Publicador |
World Scientific Publishing Co. Pte. Ltd. |
Palavras-Chave | #Mathematics, Interdisciplinary Applications #Multidisciplinary Sciences #Chaos #Melnikov #Spacecraft #Lyapunov #Bifurcations #Circumferential Nutational Damper #Spinning Spacecraft #Motion #Satellite #Gyrostat #System #C1 #291899 Interdisciplinary Engineering not elsewhere classified #780102 Physical sciences |
Tipo |
Journal Article |