Thickness vibrations of a piezoelectric plate with dissipation

The three-dimensional (3-D) equations of linear piezoelectricity with quasi-electrostatic approximation are extended to include losses attributed to the acoustic viscosity and electrical conductivity. These equations are used to investigate effects of dissipation on the propagation of plane waves in an infinite solid and forced thickness vibrations in an infinite piezoelectric plate with general symmetry. For a harmonic plane wave propagating in an arbitrary direction in an unbounded solid, the complex eigenvalue problem is solved from which the effective elastic stiffness, viscosity, and conductivity are computed. For the forced thickness vibrations of an infinite plate, the complex coupling factor K*, input admittance Y are derived and an explicit, approximate expression for K* is obtained in terms of material properties. Effects of the viscosity and conductivity on the resonance frequency, modes, admittance, attenuation coefficient, dynamic time constant, coupling factor, and quality factor are calculated and examined for quartz and ceramic barium titanate plates.

[1]  P. Vigoureux Piezoelectricity An Introduction to the Theory and Applications of Electromechanical Phenomena in Crystals , 1947, Nature.

[2]  A. D. Ballato,et al.  Practical Consequences of Modal Parameter Control in Crystal Resonators , 1967 .

[3]  J. Richter,et al.  Anisotropic acoustic attenuation with new measurements for quartz at room temperatures , 1966, Proceedings of the Royal Society of London. Series A. Mathematical and Physical Sciences.

[4]  Arthur Ballato,et al.  Doubly Rotated Thickness Mode Plate Vibrators , 1977 .

[5]  D. Nkemzi The Rayleigh-Lamb dispersion equation for a viscoelastic plate , 1993 .

[6]  R. Bechmann,et al.  Elastic and Piezoelectric Constants of Alpha-Quartz , 1958 .

[7]  H. Tiersten,et al.  On the necessity of including electrical conductivity in the description of piezoelectric fracture in real materials , 1998, IEEE Transactions on Ultrasonics, Ferroelectrics and Frequency Control.

[8]  Pcy Lee,et al.  Piezoelectric wave dispersion curves for infinite anisotropic plates , 1993 .

[9]  Kichinosuke Tanaka,et al.  Harmonic Waves in a Linear Viscoelastic Plate , 1980 .

[10]  T. Yamada,et al.  Admittance of piezoelectric plates vibrating under the perpendicular field excitation , 1970 .

[11]  Don Berlincourt,et al.  3 – Piezoelectric and Piezomagnetic Materials and Their Function in Transducers , 1964 .

[12]  I. K. Senchenkov,et al.  Harmonic viscoelastic waves in a layer and in an infinite cylinder , 1986 .

[13]  Pcy Lee Electromagnetic radiation from an AT‐cut quartz plate under lateral‐field excitation , 1989 .

[14]  P. Buchen Plane Waves in Linear Viscoelastic Media , 1971 .

[15]  J. Swinburne Electromagnetic Theory , 1894, Nature.