The following paper addresses the applicability and the advantages of finite elements for the study of transmission and reflection of waves impinging upon beam junctions. It will be shown that it is possible to simulate travelling waves on general beams by using a wave-absorbing element at each end of the beam. The stiffness matrix of the wave-absorbing element is determined by the characteristic stiffness of the beam. A general procedure to identify the characteristic stiffness is given in the appendix. Next, by performing a direct frequency response analysis on the finite element model of the junction (including the wave-absorbing elements at either end), it is possible to calculate the energy absorbed by the wave-absorbing elements. Along with some additional calculations, one can easily deduce the energy transmission characteristics of the junction. The method will be explained in detail in the case of beam junction. The applicability, which is mainly situated in the higher frequency dynamic range, will be highlighted through some relevant examples. One of the main advantages of using finite elements is the possibility of evaluating the transmission characteristics of whatever junction, including all essential geometrical details, in a straightforward way.

1.
Cremer, L., Heckl, M., and Ungar, E. E., Structure Borne Sound, Springer Verlag, 1973.
2.
Heron, K. H., and De Langhe, K., “An Introduction to Statistical Energy Analysis,” Proceedings of the 17th International Seminar on Modal Analysis; Part III; Leuven, Belgium, 1992.
3.
Langley
R. S.
, and
Heron
K. H. 1
, “
Elastic Wave Transmission Through Plate/Beam Junctions
,”
Journal of Sound and Vibration
, Vol.
143
, No.
2
, 1990, pp.
241
253
.
4.
Zienkiewicz, O. C., and Taylor, R. L., The Finite Element Method, Fourth Edition, Volume 2, Solid and Fluid Mechanics Dynamics and Non-Linearity, 1991.
5.
5 Bath, K., and Wilson, E. L., Numerical Methods in Finite Element Analysis, Prentice-Hall, Inc., Englewood Cliffs, New Jersey, 1976.
6.
6 White, R. G., and Walker, J. G., Noise and Vibration, Chapter 9, Ellis Horwood Limited, 1982.
7.
Young, W. C., Roark’s Formulas for Stress and Strain, McGraw-Hill Book Company, 1989.
8.
Bouthier, O. M., and Bernhard, R. J., “Models of Space Averaged Energetics of Plates,” AIAA Journal, Vol. 30, No. 3, March 1992.
This content is only available via PDF.
You do not currently have access to this content.