Three-dimensional vibration analysis of thick rectangular plates using Chebyshev polynomial and Ritz method

This paper describes a method for free vibration analysis of rectangular plates with any thicknesses, which range from thin, moderately thick to very thick plates. It utilises admissible functions comprising the Chebyshev polynomials multiplied by a boundary function. The analysis is based on a linear, small-strain, three-dimensional elasticity theory. The proposed technique yields very accurate natural frequencies and mode shapes of rectangular plates with arbitrary boundary conditions. A very simple and general programme has been compiled for the purpose. For a plate with geometric symmetry, the vibration modes can be classified into symmetric and antisymmetric ones in that direction. In such a case, the computational cost can be greatly reduced while maintaining the same level of accuracy. Convergence studies and comparison have been carried out taking square plates with four simply-supported edges as examples. It is shown that the present method enables rapid convergence, stable numerical operation and very high computational accuracy. Parametric investigations on the vibration behaviour of rectangular plates with four clamped edges have also been performed in detail, with respect to different thickness-side ratios, aspect ratios and Poissons ratios. These results may serve as benchmark solutions for validating approximate two-dimensional theories and new computational techniques in future. 2002 Elsevier Science Ltd. All rights reserved.

[1]  K. M. Liew,et al.  Free vibration studies on stress-free three-dimensional elastic solids , 1995 .

[2]  S. Srinivas,et al.  An exact analysis for vibration of simply-supported homogeneous and laminated thick rectangular plates , 1970 .

[3]  Ding Zhou,et al.  Vibrations of moderately thick rectangular plates in terms of a set of static Timoshenko beam functions , 2000 .

[4]  Raymond D. Mindlin,et al.  FLEXURAL VIBRATIONS OF RECTANGULAR PLATES , 1955 .

[5]  Arthur W. Leissa,et al.  On the three‐dimensional vibrations of the cantilevered rectangular parallelepiped , 1983 .

[6]  Charles W. Bert,et al.  Three-dimensional elasticity solutions for free vibrations of rectangular plates by the differential quadrature method , 1998 .

[7]  K. M. Liew,et al.  Three-dimensional vibration of rectangular plates : Variance of simple support conditions and influence of in-plane inertia , 1994 .

[8]  Y. Cheung,et al.  Free vibration of thick, layered rectangular plates by a finite layer method , 1972 .

[9]  F. Au,et al.  Three-dimensional vibration analysis of a torus with circular cross section. , 2002, The Journal of the Acoustical Society of America.

[10]  Arthur W. Leissa,et al.  THREE-DIMENSIONAL VIBRATIONS OF THICK CIRCULAR AND ANNULAR PLATES , 1998 .

[11]  L. Fox,et al.  Chebyshev polynomials in numerical analysis , 1970 .

[12]  K. Liew,et al.  Vibration of open cylindrical shells: A three-dimensional elasticity approach , 1998 .

[13]  J. R. Hutchinson,et al.  Vibration of a Free Rectangular Parallelepiped , 1983 .

[14]  Free Vibration of the Rectangular Parallelepiped , 1970 .

[15]  W. H. Wittrick Analytical, three-dimensional elasticity solutions to some plate problems, and some observations on Mindlin's plate theory , 1987 .

[16]  A. Leissa,et al.  Comparisons of vibration frequencies for rods and beams from one‐dimensional and three‐dimensional analyses , 1995 .

[17]  Y. K. Cheung,et al.  Three-dimensional vibration analysis of cantilevered and completely free isosceles triangular plates , 2002 .

[18]  C. Lim Three-dimensional vibration analysis of a cantilevered parallelepiped: Exact and approximate solutions , 1999 .

[19]  Jae-Hoon Kang,et al.  Three-Dimensional Vibration Analysis of Thick Shells of Revolution , 1999 .

[20]  K. Liew,et al.  Numerical aspects for free vibration of thick plates part I: Formulation and verification , 1998 .

[21]  Arthur W. Leissa,et al.  The free vibration of rectangular plates , 1973 .

[22]  K. M. Liew,et al.  A continuum three-dimensional vibration analysis of thick rectangular plates , 1993 .

[23]  K. M. Liew,et al.  Three-Dimensional Vibration Analysis of Rectangular Plates Based on Differential Quadrature Method , 1999 .