# I. Introduction he electromagnetoelastic actuator for piezoelectric, piezomagnetic, electrostriction, magnetostriction effects is used for the precise adjustment in the nanomechanics, the nanotechnology, the adaptive optics [1 ?32]. The piezoactuator on the inverse piezoeffect is serves for the actuation of mechanisms or the management, converts the electrical signals into the displacement and the force [1 ?8]. The piezoactuator for the nanomechanics is provided the displacement from nanometers to tens of micrometers, a force to 1000 N. The piezoactuator is used in the nanomechanics and the nanotechnology for the scanning tunneling microscopes, the scanning force microscopes and the atomic force microscopes [14 ?32]. In the present paper the generalized structuralparametric model and the generalized parametric structural schematic diagram of the electromagnetoelastic actuator are constructed by solving the equation of the electromagnetolasticity, the wave equation with the Laplace transform, the boundary conditions on loaded working surfaces of the actuator, the strains along the coordinate axes. The transfer functions and the parametric structural schematic diagrams of the piezoactuator are obtained from the generalized structural-parametric model. In [6,7] was determined the solution of the wave equation of the piezoactuator. In the [14 ?16, 30] were obtained the structural-parametric models, the schematic diagrams for simple piezoactuator and this models were transformed to the structural-parametric model of the electromagnetoelastic actuator. The structural-model of the electroelastic actuator was determined in contrast electrical equivalent circuit for calculation of piezoelectric transmitter and receiver [9 ?12]. In [8,27] was used the transfer functions of the piezoactuator for the decision problem absolute stability conditions for a system controlling the deformation of the electromagnetoelastic actuator. The elastic compliances and the mechanical and adjusting characteristics of the piezoactuator were found in [18, 21 ? 23, 28, 29] for calculation its transfer functions and the structuralparametric models. The structural-parametric model of the multilayer and compound piezoactuator was determined in [18?20]. In this paper is solving the problem of building the generalized structural parametric model and the generalized parametric structural schematic diagram of the electromagnetoelastic actuator for using the equation of electromagnetoelasticity. # II. Structural-Parametric Model The general structural-parametric model and the parametric structural schematic diagram of the electromagnetoelastic actuator are obtained. In the electroelastic actuator are presented six stress components 1 T , 2 T , 3 T , 4 T , 5 T , 6 T , the components 1 T ? 3 T are related to extension-compression stresses, 4 T ? 6 T to shear stresses. For the electroelastic actuator its deformation corresponds to stressed state. In piezoceramics PZT the matrix state equations [12,14] connected the electric and elastic variables have the form two equations, then the first equation describes the direct piezoelectric effect, the second -the inverse piezoelectric effect E ? dT D T + = (1) E d T s S t E + = (2) where D is the column matrix of electric induction; S is the column matrix of relative deformations; T is the column matrix of mechanical stresses; E is the column matrix of electric field strength; E s is the elastic compliance matrix for const = E ; T ? is the matrix of dielectric constants for const = T ; t d is the transposed matrix of the piezoelectric modules. The piezoactuator (piezoplate) has the following properties: ? is the thickness, h is the height, b is the T Global Journal of Researches in Engineering width, respectively { b h l , , ? = the length of the piezoactuator for the longitudinal, transverse and shift piezoeffects. The direction of the polarization axis ?, i.e., the direction along which polarization was performed, is usually taken as the direction of axis 3. The equation of the inverse piezoeffect for controlling voltage [6,12] has the form ( ) ( ) t , x T s t d S j ij m mi i ? + ? = (3) ( ) x t , x S i ? ? ? = , ( ) ( ) ( ) ? = = ? t U t E t m m where i S is the relative displacement of the cross section of the piezoactuator along axis i, ( ) for the piezoactuator is respectively, the thickness, the height, the width for the longitudinal, transverse, shift piezoeffects. t For calculation of actuator is used the wave equation [6,7,12,14] for the wave propagation in a long line with damping but without distortions. After Laplace transform is obtained the linear ordinary second-order differential equation with the parameter p, whereupon the original problem for the partial differential hyperbolic equation of type using the Laplace transform is reduced to the simpler problem [6,13] for the linear ordinary differential equation , ? is the damping coefficient of the wave, ? is the control parameter: E is the electric field strength for the voltage control, D is the electrical induction for the current control, H is the magnet field strength. From (3), ( 4), the boundary conditions on loaded surfaces, the strains along the axes the system of equations for the generalized structural-parametric model and the generalized parametric structural schematic diagram Figure 1 of the actuator are determined ( ) ( ) ( ) ( ) ( ) ( ) ( ) [ ] ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? + ? ? ? ? ? ? ? ? ? = ? ? p p l l p d p F p M p m mi ij 2 1 1 2 1 1 ch sh 1 1 (6) ( ) ( ) ( ) ( ) ( ) ( ) ( ) [ ] ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? + ? ? ? ? ? ? ? ? ? = ? ? p p l l p d p F p M p m mi ij 1 2 # III. Matrix Transfer Function The matrix transfer function of the electromagnetoelastic actuator for the nanomedicine and the nanotechnology is deduced from its structuralparametric model (6) in the following form ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) ( ) ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? = ? ? ? ? ? ? ? ? ? ? p F p F p p W p W p W p W p W p+ ? = ? = ? ? ? ? ? (8) ( ) ( ) ( ) 2 1 1 0 31 0 21 0 0 2 lim M M M hU d p U p pW p + ? = ? = ? ? ? ? ? (9) For the piezoactuator from PZT under the transverse piezoeffect at 1 M m << , 2 M m << , 10 31 10 5 2 ? ? = . d m/V, 20 = ? h , 30 = U V, 2 1 = M kg, 8 2 = M kg the static displacements of the faces are determined ( ) 120 ? 1 = ? nm, ( ) 30 ? 2 = ? nm, ( ) ( ) 150 ? ? 2 1 = ? + ? nm. For the approximation of the hyperbolic cotangent by two terms of the power series in transfer function (7) the following expressions of the transfer function of the piezoactuator is obtained for the elasticinertial load at ? ? 1 M , 2 M m << under the transverse piezoeffect ( )( ) ( ) ( )) p T p T ( C C h d p U p p W t t t E e 1 2 1 2 2 11 31 2 + ? + + ? = ? =(10) ( ) E e t C C M T 11 2 + = , ( ) ? ? ? ? ? ? + ? = ? E e E E t C C M c C h( ) ( ) ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? ? + ? ? ? ? ? ? ? = ? # IV. Results and Discussions The structural-parametric model and parametric structural schematic diagrams of the voltage-controlled piezoactuator for the longitudinal, transverse and shift piezoeffects are determined from the generalized structural-parametric model of the electromagnetoelastic actuator with the replacement of the following parameters. { 1 3 3 E , E , E m = ? , { 15 31 33 d , d , d d mi = , { E E E ij s , s , s s 55 11 33 = ? , { b , h , l ? = The generalized structural-parametric model, the generalized parametric structural schematic diagram and the matrix transfer function of the electromagnetoelastic actuator are obtained from the solutions of the equation of the electromagnetoelasticity, the Laplace transform and the linear ordinary differential equation of the second order. From the generalized matrix transfer function of the electromagnetoelastic actuator after algebraic transformations are constructed the matrix transfer function of the piezoactuator for the longitudinal, transverse and shift piezoeffects. # V. Conclusions The generalized structural-parametric model, the generalized parametric structural schematic diagram, the matrix transfer function of the electromagnetoelastic actuator for the nanomechanics are obtained. The structural-parametric model, the matrix transfer function and the parametric structural schematic diagram of the piezoactuator for the transverse, longitudinal, shift piezoeffects are obtained from the generalized structural-parametric model of the electromagnetoelastic actuator. From the solution of the equation of the electromagnetolasticity, the wave equation with the Laplace transform and the deformations along the axes the generalized structuralparametric model and the generalized parametric structural schematic diagram of the electromagnetoelastic actuator are constructed for the control systems in the nanomechanics. The deformations of the actuator are described by using the matrix transfer function of the electromagnetoelastic actuator. ![m ? is the control parameter along axis m, mi d is the coefficient of the electromagnetolasticity (for example the piezomodule), ( ) t E m is the electric field strength along axis m, ( ) t U is the voltage between the electrodes of actuator, ? ij s is the elastic compliance for const = the mechanical stress along axis j and i, j = 1, 2, ? , 6; m = 1, 2, 3. The main size { b h l , , ? =](image-2.png "") © 2018 Global JournalsElectromagnetelastic Actuator for Nanomechanics * JSchultz JUeda HAsada 2017 382 Oxford Cellular Actuators. Butterworth-Heinemann Publisher * Piezoelectric actuator and ultrasonic motors KUchino 1997. 1997 Kluwer Academic Publisher 347 Boston, MA * Static and dynamic analysis of a flex tensional transducer with an axial piezoelectric actuation, engineering structures JPrzybylski 10.1016/j.engstruct.2014.11.025 2015 84 * large effectivestrain piezoelectric actuators using nested cellular architecture with exponential strain amplification mechanisms JUeda TSecord HHAsada 2010 * 10.1109/TMECH.2009.2034973 doi: 10.1 109/ TMECH.2009.2034973 IEEE/ASME Transactions on Mechatronics 15 5 * Driving high voltage piezoelectric actuators in microrobotic applications MKarpelson G-YWei RJWood 10.1016/j.sna.2011.11.035 Sensors and Actuators A: Physical 176 2012 * Solution of the wave equation for the control of an elecromagnetoelastic transduser SMAfonin doi: 10.11 34/ S1064562406020402 Doklady mathematics 73 2 2006 * Structural parametric model of a piezoelectric nanodisplacement transduser SMAfonin 2008 * doi: 10.1134/ S10 28335808030063 Doklady physics 53 3 * Stability of strain control systems of nano-and micro displacement piezotransducers SMAfonin doi: 10. 31 03/ S0025654414020095 Mechanics of solids 49 2 2014 * Diagnosis of carbonation induced corrosion initiation and progressionin reinforced concrete structures using piezo-impedance transducers VTalakokula SBhalla RJBall CRBowen GLPesce RKurchania BBhattacharjee AGupta KPaine 10.1016/j.sna.2016.02.033 Sensors and Actuators A: Physical 242 2016 * Equivalent circuit modeling of piezoelectric energy harvesters YYang Tan Journal of intelligent material systems and structures 20 18 2009 * Piezoelectricity: An introduction to the theory and applications of electromechancial phenomena in crystals WGCady 1946 McGraw-Hill Book Company 806 New York, London * Part A. Methods and Devices New York Academic Press 1964 1 * Handbook of Differential Equations DZwillinger 1989 Academic Press 673 Boston * Structural-parametric model and transfer functions of electroelastic actuator for nanoand micro displacement SMAfonin Piezoelectrics and Nanomaterials: Fundamentals, Developments and Applications. Ed. Parinov IA. Nova Science New York 2015 * Structural-parametric model electromagnetoelastic actuator nano-and micro displacement for precision engineering SMAfonin Precision Engineering. Engineering and Technology 3 6 2016 * Structural-parametric models and transfer functions of electromagnetoelastic actuators nano-and micro displacement for mechatronic systems SMAfonin 10.11648/j.ijtam.20160202.15 International Journal of Theoretical and Applied Mathematics 2 2 2016 * Parametric structural diagram of a piezoelectric converter SMAfonin Mechanics of solids 37 6 2002 * Deformation, fracture, and mechanical characteristics of a compound piezoelectric transducer SMAfonin Mechanics of solids 38 6 2003 * Parametric block diagram and transfer functions of a composite piezoelectric transducer SMAfonin Mechanics of solids 39 4 2004 * Generalized parametric structural model of a compound elecromagnetoelastic transduser SMAfonin doi: 10. 1134/1.1881716 Doklady physics 50 2 2005 * Design static and dynamic characteristics of a piezoelectric nanomicrotransducers SMAfonin 10.3103/S0025654410010152 Mechanics of solids 45 1 2010 * Electro mechanical deformation and transformation of the energy of a nano-scale piezomotor SMAfonin doi: 10.3103 /S1068798X11070033 Russian engineering research 31 7 2011 * Electroelasticity problems for multilayer nano-and micro motors SMAfonin doi: 10.3 103/ S1068798X11090036 Russian engineering research 31 9 2011 * Nano-and micro-scale piezomotors SMAfonin 10.3103/S1068798X12060032 Russian engineering research 32 7-8 2012 * Optimal control of a multilayer submicromanipulator with a longitudinal piezo effect SMAfonin 10.3103/S1068798X15120035 Russian engineering research 35 12 2015 * Block diagrams of a multilayer piezoelectric motor for nanomicrodisplacements based on the transverse piezoeffect SMAfonin doi: 10.113 4/S1064230715020021 Journal of computer and systems sciences international 54 3 2015 * Absolute stability conditions for a system controlling the deformation of an elecromagnetoelastic transduser SMAfonin 10.1134/S106 Doklady mathematics 74 3 2406060391 2006 * Elastic compliances and mechanical and adjusting characteristics of composite piezoelectric transducers SMAfonin 10.3103/S0025654407010062 Mechanics of solids 42 1 2007 * Static and dynamic characteristics of a multy-layer electroelastic solid SMAfonin 10.3103/S0025654409060119 Mechanics of solids 44 6 2009 * Structural-parametric model electromagnetoelastic actuator nanodisplacement for mechatronics SMAfonin 10.12691/ijp-5-1-27 International Journal of Physics 5 1 2017 * Calif. 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