Eigenvibrations in trapped-energy contoured piezoelectric resonators with a one-sided arbitrarily oriented elliptical convexity

Shmaliy, O.Yu.

doi:10.1016/j.ijsolstr.2006.04.002

Cited by 3 publications

(1 citation statement)

References 12 publications

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“…This scalar equation is simple and accurate, and has been widely used in theoretical analysis of quartz resonators, e.g. [6][7][8][9][10][11][12][13][14][15][16][17][18][19]. In this paper the scalar equation [5] for transversely varying thickness modes in doubly-rotated quartz resonators referred to the coordinate system in which no mixed derivatives occur is applied in the analysis of the steady-state vibrations of contoured resonators with beveled cylindrical edges.…”

Section: Introductionmentioning

confidence: 99%

Effects of free edge on the vibration characteristics of a contoured, beveled quartz resonator

Yang

Tiersten

2014

International Journal of Applied Electromagnetics and Mechanics

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The equation for transversely varying thickness modes in doubly-rotated quartz resonators is applied in the analysis of the vibrations of contoured resonators with beveled cylindrical edges. The treatment in this work differs from that of earlier work in that the dominant condition at the edge of the resonator is satisfied and the approximation made earlier in the beveled annulus is not made here where the solution is exact. A procedure for the analytical determination of the required diameter for a good resonator is identified and calculated results are compared with those of the earlier work.

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Section: Introductionmentioning

confidence: 99%

Effects of free edge on the vibration characteristics of a contoured, beveled quartz resonator

Yang

Tiersten

2014

International Journal of Applied Electromagnetics and Mechanics

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Scalar Differential Equations for Transversely Varying Thickness Modes in Doubly Rotated Quartz Crystal Sensors

Yang

Kosinski

et al. 2018

IEEE Sens. Lett.

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Variational formulation of the Stevens-Tiersten equation and application in the analysis of rectangular trapped-energy quartz resonators

Shi

Fan

Zhao

et al. 2014

The Journal of the Acoustical Society of America

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The two-dimensional scalar differential equation for transversely varying thickness modes in quartz crystal resonators operating with thickness-shear modes is formulated into variational form for trapped-energy resonators with both electroded and unelectroded regions. A theoretical analysis of rectangular trapped-energy resonators of singly rotated quartz is performed using the Ritz method based on the variational formulation. Free vibration resonant frequencies and modes are obtained. The results show the existence of trapped modes under the electrodes. The effects of various geometric and physical parameters on the trapped modes are examined. It is also found that the classical frequency prediction given by Tiersten and Smythe from an approximate analysis using the scalar differential equation has an inaccuracy on the order of 100 ppm for the fundamental mode, significant in resonator design.

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Eigenvibrations in trapped-energy contoured piezoelectric resonators with a one-sided arbitrarily oriented elliptical convexity

Cited by 3 publications

References 12 publications

Effects of free edge on the vibration characteristics of a contoured, beveled quartz resonator

Effects of free edge on the vibration characteristics of a contoured, beveled quartz resonator

Scalar Differential Equations for Transversely Varying Thickness Modes in Doubly Rotated Quartz Crystal Sensors

Variational formulation of the Stevens-Tiersten equation and application in the analysis of rectangular trapped-energy quartz resonators

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