Chaos for a Microelectromechanical Oscillator Governed by the Nonlinear Mathieu Equation
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[1] E. Lorenz. Deterministic nonperiodic flow , 1963 .
[2] P. Holmes,et al. Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields , 1983, Applied Mathematical Sciences.
[3] S. Wiggins. Introduction to Applied Nonlinear Dynamical Systems and Chaos , 1989 .
[4] M. Lakshmanan,et al. Bifurcation and chaos in the double-well Duffing–van der Pol oscillator: Numerical and analytical studies , 1997, chao-dyn/9709013.
[5] Noel C. MacDonald,et al. Independent tuning of linear and nonlinear stiffness coefficients [actuators] , 1998 .
[6] L. Giarre,et al. Numerical analysis of complex dynamics in atomic force microscopes , 1998, Proceedings of the 1998 IEEE International Conference on Control Applications (Cat. No.98CH36104).
[7] N. C. MacDonald,et al. Five parametric resonances in a microelectromechanical system , 1998, Nature.
[8] N. C. MacDonald,et al. Chaos in MEMS, parameter estimation and its potential application , 1998 .
[9] M. Dahleh,et al. Melnikov-Based Dynamical Analysis of Microcantilevers in Scanning Probe Microscopy , 1999 .
[10] Murti V. Salapaka,et al. Dynamical analysis and control of microcantilevers , 1999, Autom..
[11] Randolph S. Zounes,et al. Subharmonic resonance in the non-linear Mathieu equation , 2002 .
[12] Wenhua Zhang,et al. Effect of cubic nonlinearity on auto-parametrically amplified resonant MEMS mass sensor , 2002 .
[13] Kimberly L. Turner,et al. Tuning the dynamic behavior of parametric resonance in a micromechanical oscillator , 2003 .
[14] A. Chatterjee,et al. Approximate Asymptotics for a Nonlinear Mathieu Equation Using Harmonic Balance Based Averaging , 2003 .
[15] Albert C. J. Luo,et al. Nonlinear dynamics of a micro-electro-mechanical system with time-varying capacitors , 2004 .
[16] Qiao Lin,et al. Simulation studies on nonlinear dynamics and chaos in a MEMS cantilever control system , 2004 .
[17] N. Aluru,et al. Complex oscillations and chaos in electrostatic microelectromechanical systems under superharmonic excitations. , 2005, Physical review letters.
[18] J. Moehlis,et al. Modeling of parametrically excited microelectromechanical oscillator dynamics with application to filtering , 2005, IEEE Sensors, 2005..
[19] Steven W. Shaw,et al. Parametrically Excited MEMS-Based Filters , 2005 .
[20] Steven W. Shaw,et al. Tunable Microelectromechanical Filters that Exploit Parametric Resonance , 2005 .
[21] Arvind Raman,et al. Chaos in atomic force microscopy. , 2006, Physical review letters.
[22] Kimberly L. Turner,et al. Electromechanically driven and sensed parametric resonance in silicon microcantilevers , 2006 .
[23] Jeff Moehlis,et al. Generalized parametric resonance in electrostatically actuated microelectromechanical oscillators , 2006 .
[24] R. Stark,et al. Chaos in dynamic atomic force microscopy , 2006, Nanotechnology.
[25] J. Moehlis,et al. Linear and Nonlinear Tuning of Parametrically Excited MEMS Oscillators , 2007, Journal of Microelectromechanical Systems.