Journal of the Computational Structural Engineering Institute of Korea (한국전산구조공학회논문집)

Computational Structural Engineering Institute of Korea (한국전산구조공학회)
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Vibration Analysis of Thick Hyperboloidal Shells of Revolution from a Three-Dimensional Analysis

두꺼운 축대칭 쌍곡형 쉘의 3차원 진동해석

  • 심현주 (중앙대학교 공과대학 건축공학과) ;
  • 강재훈 (중앙대학교 공과대학 건축공학과)
  • Published : 2003.12.01
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Abstract

A three-dimensional (3-D) method of analysis is presented for determining the free vibration frequencies of thick, hyperboloidal shells of revolution. Unlike conventional shell theories, which are mathematically two-dimensional (2-D), the present method is based upon the 3-D dynamic equations of elasticity. Displacement components u/sub r/, u/sub θ/, u/sub z/ in the radial, circumferential, and axial directions, respectively, we taken to be sinusoidal in time, periodic in θ, and algebraic polynomials in the r and z directions. Potential(strain) and kinetic energies of the hyperboloidal shells are formulated, and the Ritz method is used to solve the eigenvalue problem, thus yielding upper bound values of the frequencies by minimizing the frequencies. As the degree of the polynomials is increased, frequencies converge to the exact values. Convergence to four digit exactitude is demonstrated for the first five frequencies of the hyperboloidal shells of revolution. Numerical results are tabulated for eighteen configurations of completely free hyperboloidal shells of revolution having two different shell thickness ratios, three variant axis ratios, and three types of shell height ratios. Poisson's ratio (ν) is fixed at 0.3. Comparisons we made among the frequencies for these hyperboloidal shells and ones which ate cylindrical or nearly cylindrical( small meridional curvature. ) The method is applicable to thin hyperboloidal shells, as well as thick and very thick ones.

두꺼운 축대칭 쌍곡형 쉘의 고유진동수를 결정하는 3차원 해석법이 제시되었다. 수학적으로 2차원적인 전통적인 쉘 이론과는 달리, 본 연구의 해석법은 3차원적인 동탄성방정식을 근간으로 하였다. 반경방향, 원주방향, 축방향으로의 변위성분인 u/sub r/, u/sub θ/, u/sub z/를 시간에 대해서는 정현적으로, θ에 대해서는 주기적으로, r과 z방향으로는 대수 다항식으로 표현하였다. 쌍곡형 쉘의 위치(변형률)에너지와 운동에너지를 정식화하고 리츠법을 사용하여 고유치문제를 해결하였으며, 진동수의 최소화과정을 통해 고유진동수를 엄밀해의 상위경계치로 구하였다. 대수 다항식의 차수가 증가하면 진동수는 엄밀해에 수렴하게 된다. 축대칭 쌍곡형 쉘의 하위 5개의 진동수에 대해서 유효숫자 4자리까지의 수렴성 연구가 이루어졌다. 쌍곡형 쉘의 서로 다른 2개의 두께 비, 3개 의 축비(axis ratio), 3개의 shv이 비를 가진 총 18개의 형상을 지닌 자유 경계의 축대칭 쌍곡형 쉘의 수치결과를 도표화하였다. 프와송 비( ν)는 0.3으로 고정하였다. 본 연구의 해석법은 매우 두꺼운 쉘 뿐만 아니라 얇은 쉘에도 적용이 가능하다.

Keywords

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