Abstract
Transfer functions of multilayered piezodrives of nano- and micrometric movements are obtained for longitudinal and transverse piezoelectric effect, piezodrive characteristics are corrected using built-in piezo sensor. Correcting devices are chosen for providing high quality of control systems for deformation of multilayered piezodrives and required index of oscillation. Absolute stability conditions of control systems for deformation of multilayered piezodrives of nano- and micrometric movements for longitudinal and transverse piezoelectric effect are determined.
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References
V. L. Mironov, Basics of Scanning Probe Microscopy (Tekhnosfera, Moscow, 2004) [in Russian].
R. G. Dzhagupov and A. A. Erofeev, Piezoelectronic Devices of Computers and Automatic Control Systems. Reference Book (Politekhnika, St. Petersburg, 1994) [in Russian].
Physical Acoustics. Principles and Methods, vol. 1, part A, ed. by W. P. Mason (Academic Press, New York, 1964; Mir, Moscow, 1966).
S. M. Afonin, “Piezo Converters for Drives of Micrometric Movements,” Prib. Sist. Upr., No. 2, 41–42 (1998).
S. M. Afonin, “A Generalized Structural-Parametric Model of an Electromagnetoelastic Converter for Nano- and Micrometric Movement Control Systems: III. Transformation of Parametric Structural Circuits of an Electromagnetoelastic Converter for Nano- and Micrometric Movement Control Systems,” Izv. Ross. Akad. Nauk, Teor. Sist. Upr., No. 2, 158–166 (2006) [Comp. Syst. Sci. 45 (2), 317–325 (2006)].
S. M. Afonin, “Investigation of Static and Dynamic Characteristics of a Piezomotor for Nano- and Micrometric Movements,” Izv. Ross. Akad. Nauk, Teor. Sist. Upr., No. 5, 114–121 (2008) [Comp. Syst. Sci. 47 (5), 778–785 (2008)].
S. M. Afonin, “Absolute Stability Conditions for the Control System of Deformation of an Electromagnetoelastic Converter for Nano- and Micrometric Movements,” Izv. Ross. Akad. Nauk, Teor. Sist. Upr., No. 1, 120–126 (2008) [Comp. Syst. Sci. 47 (1), 111–117 (2008)].
B. N. Naumov, Theory of Nonlinear Automatic Systems: Frequency Methods (Nauka, Moscow, 1972) [in Russian].
B. N. Naumov, “Frequency Method of Absolute Stability and Quality of Nonlinear Systems and Systems with Time-Variable Parameters for Given and Random Impact”, in MultiVariable and Invariant Systems. Nonlinear and Discrete Systems, ed. V. A. Trapeznikov (Nauka, Moscow, 1968), 254–270 [in Russian].
N. E. Barabanov and V. A. Yakubovich, “Absolute Stability of Control Systems with One Hysteresis Nonlinearity,” Avtom. Telemekh., no. 12, 5–12 (1979).
V. A. Besekerskii and E. P. Popov, Theory of Automatic Control Systems (Professiya, Moscow, 2004) [in Russian].
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Original Russian Text © S.M. Afonin, 2011, published in Izvestiya Akademii Nauk. Teoriya i Sistemy Upravleniya, 2011, No. 1, pp. 84–95.
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Afonin, S.M. Correcting devices of control systems for deformation of multilayered piezodrives of nano- and micrometric movements. J. Comput. Syst. Sci. Int. 50, 81–92 (2011). https://doi.org/10.1134/S1064230711010023
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DOI: https://doi.org/10.1134/S1064230711010023