Abstract
In the field of energy transmission in dynamical systems the Statistical Energy Analysis (S.E.A.) is, at present, the most acknowledged contribution. Based on the thermal exchange of mechanical energy, S.E.A. provides information on the stored and dissipated energy and on the transmitted power between coupled dynamic systems. In spite of the particular simplicity of this energetic formulation, the research of a solid theoretical basis of S.E.A. instances has required, and still imposes, a remarkable effort to the scientific community [1–6].
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References
Fahy, F.J., Yao De Yuan, Power flow between non-conservatively coupled oscillators, J. Sound and Vibration 114(1987), 1–11.
Woodhouse, J, An approach to the theoretical background of the statistical energy analysis applied to structural vibration, J. Acoust. Soc. of Amer., 69(1981), 1695–1709.
Maidanik, G., Dickey, J., Wave derivation of the energetics of driven coupled onedimensional dynamic systems, J. Sound and Vibration 139(1990), 31–42.
Keane, A.J., Price W.G., Energy flows between arbitrary configurations of conservatively-coupled multi-modal elastic subsystems, Proc. of the Royal Society of London, A 436(1992),537–568.
Langley, R.S., A general derivation of the statistical energy analysis equations for coupled dynamic systems, J. Sound and Vibration 135(1989), 499–508.
B. R. Mace, On the statistical energy analysis hypothesis of coupling power proportionality and some implications of its failure, J. Sound and Vibration 178(1994), 95–112.
D.J. Nefske, S.H. Sung, Power flow finite element analysis of dynamic systems: theory and application to beams’, Statistical Energy Analysis, American Society of Mechanical Engineers, NCA-3(1987),47–54.
Le Bot, A., Jezequel, L., Energy formulation for one dimensional problems, Proc. of the Institute of Acoustics 15(1993), 561–568.
Bouthier, O.M., Bernhard, R.J., Simple models of energetics of transversely vibrating plates, J. Sound and Vibration, 182(1995), 129–164.
Carcaterra, A., Sestieri, A., Energy density equations and power flow in structures’, J. Sound and Vibration 188(1995), 269–282.
Cremer, L., Heckl, M., Ungar, E.E., Structure-borne sound, Berlin, SpringerVerlag, 1988.
Morse, P.M., Ingard, K., Theoretical Acoustics, Mc Graw Hill Book Company, 1968.
A. Carcaterra, L. Adamo, Wave energy exchange in dynamical systems: a contribution to the solution of an open problem’, submitted to J. Sound and Vibration.
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© 1999 Springer Science+Business Media Dordrecht
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Carcaterra, A. (1999). Wavelength Scale Effects on Energy Propagation in Structures. In: Fahy, F.J., Price, W.G. (eds) IUTAM Symposium on Statistical Energy Analysis. Solid Mechanics and Its Applications, vol 67. Springer, Dordrecht. https://doi.org/10.1007/978-94-015-9173-7_2
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DOI: https://doi.org/10.1007/978-94-015-9173-7_2
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