The dynamics of a self-sustained electromechanical transducer is studied. The stability of the critical points is analyzed using the analytic Routh-Hurwitz criterion. Analytic oscillatory solutions are obtained in both the resonant and non-resonant cases. Chaotic behavior is observed using the Shilnikov theorem and from a direct numerical simulation of the equations of motion.

Issue Section:
Technical Papers
Keywords:
acoustic transducers, chaos, numerical analysis
Topics:
Chaos, Computer simulation, Dynamics (Mechanics), Equilibrium (Physics), Resonance, Stability, Transducers, Theorems (Mathematics), Equations of motion
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Copyright © 2001
 by ASME
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