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Time-frequency representations of Lamb waves
1.R. D. Mindlin, “Waves and vibrations in isotropic elastic plates,” in Structural Mechanics, edited by J. N. Goodier and N. J. Hoff (Pergamon, New York, 1960).
2.D. Alleyne and P. Cawley, “A two-dimensional Fourier transform method for measurement of propagating multimode signals,” J. Acoust. Soc. Am. 89, 1159–1168 (1991).
3.C. Eisenhardt, L. J. Jacobs, and J. Qu, “Application of laser ultrasonics to develop dispersion curves for elastic plates,” J. Appl. Mech. 66, 1043–1045 (1999).
4.W. H. Prosser, M. D. Seale, and B. T. Smith, “Time-frequency analysis of the dispersion of Lamb modes,” J. Acoust. Soc. Am. 105, 2669–2676 (1999).
5.Y. Hayashi, S. Ogawa, H. Cho, and M. Takemoto, “Noncontact estimation of thickness and elastic properties of metallic foils by wavelet transform of laser-generated Lamb waves,” Nondestr. Test. Eval. 32, 21–27 (1999).
6.S. Holland, T. Kosel, R. Weaver, and W. Sachse, “Determination of plate source, detector separation from one signal,” Ultrasonics 38, 620–623 (2000).
7.M. Niethammer, L. J. Jacobs, J. Qu, and J. Jarzynski, “Time-frequency representation of Lamb waves using the reassigned spectrogram,” J. Acoust. Soc. Am. 107, L19–L24 (2000).
8.L. Cohen, Time-Frequency Analysis (Prentice-Hall, Englewood Cliffs, NJ, 1995).
9.S. Mallat, A Wavelet Tour of Signal Processing (Academic, New York, 1998).
10.M. Niethammer, “Application of Time-Frequency Representations to Characterize Ultrasonic Signals,” M.S. thesis, Georgia Institute of Technology, Atlanta, 1999.
11.S. D. Meyers, B. G. Kelly, and J. J. OBrien, “An introduction to wavelet analysis in oceanography and meterology: With application to the dispersion of Yanai waves,” Mon. Weather Rev. 121, 2858–2866 (1993).
12.D. Casasent and R. Shenoy, “New Gabor wavelets with shift-invariance for improved time-frequency analysis and signal detection,” in Proc. SPIE 2762, Wavelet Applications III, edited by H. Szu, 244–255 (1996).
13.L. Cohen, “A Primer on Time-Frequency Analysis,” in Time-Frequency Signal Analysis, edited by B. Boashash (Longman Chesire, 1992), pp. 3–42.
14.N. E. Huang, Z. Shen, and S. R. Long, “A new view of nonlinear water waves: The Hilbert spectrum,” Annu. Rev. Fluid Mech. 31, 417–457 (1999).
15.N. E. Huang, Z. Shen, S. R. Long, M. C. Wu, H. H. Shih, Q. Zheng, N.-C. Yen, C. C. Tung, and H. H. Liu, “The empirical mode decomposition and the Hilbert spectrum for nonlinear and non-stationary time series analysis,” Proc. R. Soc. London, Ser. A 454, 903–995 (1998).
16.L. Cohen, “Time-frequency distributions—A review,” Proc. IEEE 77, 941–981 (1989).
17.K. Kodera, R. Gendrin, and C. de Villedary, “Analysis of time-varying signals with small BT values,” IEEE Trans. Acoust., Speech, Signal Process. 26, 64–76 (1978).
18.F. Auger and P. Flandrin, “Improving the readability of time-frequency and time-scale representations by the reassignment method,” IEEE Trans. Signal Process. 43, 1068–1089 (1995).
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