Vibrations of tori with hollow elliptical cross-section from a three-dimensional theory

Natural frequencies of a toroidal shells of revolution with hollow elliptical cross-section are determined by the Ritz method from a three-dimensional (3-D) theory while traditional shell theories are mathematically two-dimensional (2-D). The Legendre polynomials, which are mathematically orthonomal...

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Bibliographic Details
Published in:Thin-walled structures 2016-11, Vol.108, p.381-390
Main Author: Kang, Jae-Hoon
Format: Article
Language:English
Subjects:
Convergence
Cross sections
Free vibration
Functions (mathematics)
Hollow elliptical cross-section
Kinetic energy
Legendre polynomial
Mathematical analysis
Polynomials
Ritz method
Thin walled shells
Three-dimensional analysis
Toroidal shell
Toroidal shells
Torus
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Summary:Natural frequencies of a toroidal shells of revolution with hollow elliptical cross-section are determined by the Ritz method from a three-dimensional (3-D) theory while traditional shell theories are mathematically two-dimensional (2-D). The Legendre polynomials, which are mathematically orthonomal, are used instead of ordinary algebraic polynomials as admissible functions. The present analysis is based upon the circular cylindrical coordinates while the toroidal coordinates have been used in general. Potential and kinetic energies of the torus are formulated, and upper bound values of the frequencies are obtained by minimizing the frequencies. Convergence to four-digit exactitude is demonstrated for the first five frequencies of the torus. Comparisons are made between the frequencies from the present 3-D method, a 2-D thin shell theory, and thin and thick ring theories. The present method is applicable to very thick toroidal shells as well as thin ones. •Natural frequencies of a toroidal shell with hollow elliptical cross-section are determined.•The present analysis is by the 3D Ritz method.•The Legendre polynomials are used as admissible functions.•Comparisons are made from the present 3-D method and other methods.
ISSN:0263-8231
1879-3223
DOI:10.1016/j.tws.2016.09.006