Simplified method for solving problems of vibrating plates of doubly connected arbitrary shape, part I: Derivation of the frequency equation
- 22 February 1981
- journal article
- Published by Elsevier in Journal of Sound and Vibration
- Vol. 74 (4) , 543-551
- https://doi.org/10.1016/0022-460x(81)90418-1
Abstract
No abstract availableKeywords
This publication has 18 references indexed in Scilit:
- Vibration analysis of plates of arbitrary shape—A new approachJournal of Sound and Vibration, 1979
- Vibration Analysis of Circular Plates With Eccentric HoleJournal of Applied Mechanics, 1978
- Vibration of simply-supported plates of arbitrary shape carrying concentrated masses and subjected to a hydrostatic state of in-plane stressesJournal of Sound and Vibration, 1977
- Fundamental frequency of vibration of clamped plates of arbitrary shape subjected to a hydrostatic state of in-plane stressJournal of Sound and Vibration, 1976
- Simplified approach to the vibration analysis of elastic plates due to sonic boomJournal of Sound and Vibration, 1976
- Application of Conformal Mapping and Variational Method to the Study of Natural Frequencies of Polygonal PlatesThe Journal of the Acoustical Society of America, 1971
- Discussion: “The Eigenvalue Problem for Two-Dimensional Regions With Irregular Boundaries” (Roberts, S. B., 1967, ASME J. Appl. Mech., 34, pp. 618–622)Journal of Applied Mechanics, 1968
- Application of Complex-Variable Theory to the Determination of the Fundamental Frequency of Vibrating PlatesThe Journal of the Acoustical Society of America, 1967
- The free flexural vibrations of triangular, rhombic and parallelogram plates and some analogiesInternational Journal of Mechanical Sciences, 1965
- The Bending, Buckling, and Flexural Vibration of Simply Supported Polygonal Plates by Point-MatchingJournal of Applied Mechanics, 1961