A new computational method for structural vibrations in the medium-frequency range
Abstract
In the paper a new approach for the computation of slightly damped elastic structural vibrations over the medium frequency range is proposed. The effective quantities (deformation energy, vibrational intensity, etc ... ) are evaluated after resolution of a small system of equations that does not in any way result from a fine "finite element" discretisation of the structure.
Keywords
References
[1] V.D. Belov, S.A. Ryback, B.D. Tartakovski. Propagation of vibrational energy in absorbing structures. Journal of Soviet Physics Acoustics, 23(2): 115- 119, 19,7.[2] L.E. Buvailo, A.V. Ionov. Application of the finite-element method to the investigation of the vibroacoustical characteristics of structures at high audio frequencies. Journal of the Soviet Physics Acoustics, 26(4): 277- 279, 1980.
[3] J.L.Guyader, C. Boisson, C. Lesueur. Energy transmission in finite coupled plates, Part I: theory. Journal of Sound and Vibration, 81(1): 81- 92, 1982.
[4] C. Hochard, P. Ladevèze, L. Proslier. A simplified analysis of elastic structures. Eur. J. Mech. A/ Solids, 12(4): 509- 535, 1993.
[5] M.N. Ichchou, A. Le Bot, L. Jézéquel. Energy model of one-dimensional, multipropagative systems. Journal of Sound and Vibration, 201(5): 535-554, 1997.
Published
Apr 3, 2023
How to Cite
LADEVÈZE, Pierre; ARNAUD, Lionel.
A new computational method for structural vibrations in the medium-frequency range.
Computer Assisted Methods in Engineering and Science, [S.l.], v. 7, n. 2, p. 219-226, apr. 2023.
ISSN 2956-5839.
Available at: <https://cames.ippt.gov.pl/index.php/cames/article/view/1252>. Date accessed: 13 nov. 2024.
Issue
Section
Articles
This work is licensed under a Creative Commons Attribution 4.0 International License.