Stabilization of Parametric Vibrations of a Nonlinear Continuous System |
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Authors: | Tylikowski A |
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Institution: | (1) Department of Automobiles and Heavy Machinery Engineering, Warsaw, University of Technology, Narbutta 84, 02-524 Warsaw, Poland |
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Abstract: | The purpose of the present paper is to solve an active control problem of nonlinear continuous system parametric vibrations excited by the fluctuating force. The problem is solved using the concept of distributed piezoelectric sensors and actuators with a sufficiently large value of velocity feedback. The direct Liapunov method is proposed to establish criteria for the almost sure stochastic stability of the unperturbed (trivial) solution of the shell with closed-loop control. The distributed control is realized by the piezoelectric sensor and actuator, with the changing widths, glued to the upper and lower shell surface. The relation between the stabilization of nonlinear problem and a linearized one is examined. The fluctuating axial force is modeled by the physically realizable ergodic process. The rate velocity feedback is applied to stabilize the shell parametric vibrations. |
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Keywords: | Piezoelectric sensors and actuators Parametric vibrations Stochastic dynamics Continuous systems |
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