论文信息 - A perturbation approach for evaluating natural frequencies of moderately thick elliptic plates

A perturbation approach for evaluating natural frequencies of moderately thick elliptic plates

Natural frequencies for moderately thick elliptic plates are calculated by perturbing initial values corresponding to the Kirchhoff classical theory of plate bending. The proposed approach utilizes a universal algebraic equation for perturbed eigenvalues, previously derived by the authors. For elliptic plates of a small eccentricity, a dual procedure is developed to evaluate the sought for natural frequencies starting from those for a circular thin plate. A comparison with finite-element computations is presented. An importance of the perturbation techniques in question for interpreting of finite-element data is emphasized.

[1] Kenzo Sato. Free Flexural Vibrations of an Elliptical Plate with Edge Restrained Elastically , 1976 .

[2] G. D. Xistris,et al. Vibration of clamped elliptical plates using exact circular plate modes as shape functions in Rayleigh-Ritz method , 1994 .

[3] Yoshio Shibaoka. On the Transverse Vibration of an Elliptic Plate with Clamped Edge , 1956 .

[4] A higher-order boundary perturbation method for asymmetric dynamic problems in solids—I. General formulation , 1986 .

[5] R. Bhat,et al. Axisymmetric vibration of circular plates and its analog in elliptical plates using characteristic orthogonal polynomials , 1993 .

[6] J. Kaplunov,et al. Dynamics of Thin Walled Elastic Bodies , 1997 .

[7] R. D. Gregory,et al. On plate theories and Saint-Venant's principle , 1985 .

[8] Arthur W. Leissa,et al. Vibration of Plates , 2021, Solid Acoustic Waves and Vibration.

[9] R. Mcnitt. Free Vibration of a Damped Elliptical Plate , 1962 .

[10] Julius Kaplunov,et al. On Timoshenko-Reissner type theories of plates and shells , 1993 .