Piezoelectric Shells pp 63-114 | Cite as
Common Piezoelectric Continua and Active Piezoelectric Structures
Chapter
Abstract
In this chapter, a simple reduction procedure is developed to apply the generic piezoelectric shell theories to other common piezoelectric continua, such as shells of revolutions, spheres, cylindrical shells, plates, etc (Tzou and Zhong, 1990). Note that the generic piezoelectric thin shell theory is used as the fundamental theory in the later derivations and analyses. Equations of motion of corresponding thin elastic shells can be easily derived by eliminating all electromechanical coupling terms in the piezoelectric shell equations.
Keywords
Cylindrical Shell Piezoelectric Plate Transverse Electric Field Velocity Feedback Feedback Voltage
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References
- Soedel, W., 1981, Vibrations of Shells and Plates, Dekker, New York. Thomson, W.T., 1981, Theory of Vibration with Applications, Prentice—Hall, Englewood Cliffs, N.J.Google Scholar
- Tiersten, H.F., 1969, Linear Piezoelectric Plate Vibrations, Plenum Press, New York.Google Scholar
- Tzou, H.S. and Pandita, S., 1987, “A Multi—Purpose Dynamic and Tactile Sensor for Robot Manipulators,” (with Pandita, S.), Journal of Robotic Systems, Vol.(4. 6 ), pp. 719 - 741, 1987.CrossRefGoogle Scholar
- Tzou, H.S., 1989, “Integrated Distributed Sensing and Active Vibration Suppression of Flexible Manipulators using Distributed Piezoelectrics,” Journal of Robotic Systems, Vol.(6), No. 6, pp. 745 - 767, December 1989.CrossRefGoogle Scholar
- Tzou, H.S., 1992, “A New Distributed Sensation and Control Theory for ”Intelligent“ Shells,” Journal of Sound and Vibration, Vol. 152, No. 3, pp. 335 - 350, March 1992.CrossRefGoogle Scholar
- Tzou, H.S. and Zhong, J.P., 1990, “Electromechanical Dynamics of Piezoelectric Shell Distributed Systems, Part-1–2,” Robotics Research-1990, ASME—DSC—Vol.26, pp.207–211, 1990 ASME Winter Annual Meetings, Dallas, Texas, Nov. 25–30, 1990; “Electromechanics and Vibrations of Piezoelectric Shell Distributed Systems,” ASME Journal of Dynamic Systems, Measurements, and Control, 1993.Google Scholar
- Tzou, H.S. and Zhong, J.P., 1991a, “Adaptive Piezoelectric Shell Structures: Theory and Experiments,” AIAA/ASME/ASCE/AHA/ASC 32nd Structures, Structural Dynamics and Materials Conference, pp.2290–2296, Paper No. AIAA-91–1238—CP, Baltimore, Maryland, April 8–10, 1991. Mechanical Systems and Signal Processing, Vol.(7), No.(3), May 1993.Google Scholar
- Tzou, H.S. and Zhong, J.P., 1991b, Control of Piezoelectric Cylindrical Shells via Distributed In—Plane Membrane Forces, Controls for Aerospace Systems, DSC—Vol.35, pp.15–20, Distributed Control of Flexible Structures, Aerospace Panel, Dynamic Systems and Control Division, 1991 ASME WAM, Atlanta, GA, December 1–6, 1991.Google Scholar
- Tzou, H.S. and Zhong, J.P., 1991c, “Theory on Hexagonal Symmetrical Piezoelectric Thick Shells Applied to Smart Structures,” Structural Vibration and Acoustics, Edrs. Huang, Tzou, et al., ASME—DE—Vol.34, pp.7–15, Symposium on Intelligent Structural Systems, 1991 ASME 13th Biennial Conference on Mechanical Vibration and Noise, Miami, Florida, September 22–25, 1991.Google Scholar
- Zhong, J.P., 1991, A Study of Piezoelectric Shell Dynamics Applied to Distributed Structural Identification and Control, Ph.D. Thesis, Department of Mechanical Engineering, University of Kentucky, Lexington, KY.Google Scholar
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© Springer Science+Business Media Dordrecht 1993