參考文獻 |
2. E. Wigner, ”On the quantum correction for thermodynamic equilibrium,” Phys. Rev., vol. 41, pp. 749- 759, 1932
3. L. Cohen, ”Generalized phase-space distribution function, ” Jour. Math. Phys., vol. 7, pp. 781- 786, 1966.
4. P. Flandrin, ”Some features of time-frequency representations of multicomponent signals,” Proc. IEEE 1981 Internat. Conf. Acoust. Speech Signal Processing (ICASSP-84), San Diego, C A, March 1984, pp. 41B4.1- 41B.4.4.
5. P. Flandrin, and W. Martin, ”Pseudo-Wigner estimators for the analysis of nonstationary processes,” Proc. IEEE Spectr. Est. Workshop II, Tampa, FL, pp. 181- 185, November 1983.
6. F. Hlawatsch, ”Duality and classification of bilinear time-frequency signal representations,” IEEE Trans. Signal Process, Vol. 39, No. 7, July 1991, pp. 1564- 1574
7. H. I. Choi and W. J. Williams, ”Improved time-frequency representation of multicomponent signals using exponential kernels,” IEEE Trans. On Acoust, Speech, Signal Processing, vol. 37, pp. 862- 871, 1989.
8. J. Jeong, and W. Williams, ”A new formulation of generalized discrete-time time-frequency distributions,” Proc. IEEE ICASSP-91, pp. 3189- 3192, 1991.
9. G. S. Cunningham and W. J. Williams. ”High-Resolution Signal Synthesis for Time-Frequency Distributions, ” Proc. IEEE ICASSP – 93, vol. 4, pp. 400- 403, 1993.
10. Y. Zho, L. E. Atlas and R. J. Marks, “The use of cone-shaped kernels for generalized time-frequency representations of nonstationary signals,” IEEE Trans. on Acoust., Speech, and Signal Processing, vol. 38, no. 7, pp. 1084- 1091, July 1990.
11. F. Hlawatsch; Manickam, Thulasinath G.; Urbanke, Rüdiger L.; Jones, William, “Smoothed pseudo-Wigner distribution, Choi-Williams distribution, and cone-kernel representation: Ambiguity-domain analysis and experimental comparison,” Signal Processing, vol. 43, pp. 149- 168, 1995.
12. M. C. Pan, “ Non-stationary Time-Frequency Analysis for Condition Monitoring of Mechanical Systems”, Doctoral Thesis of Katholieke University Leuven., 1996.
13. M. C. Pan, P. Sas and H. Van Brussel, “Non-stationary Time -Frequency Analysis for Machine Condition Monitoring”, Proceeding of 3rd IEEE Signal Processing Society International Symposium on Time-Frequency and Time-Scale Analysis, pp. 477- 480, 1996.
14. M. C. Pan,and P. Sas, ”Transient Analysis on Machinery Condition Monitoring,” Proceedings of 3rd International Conference on Signal Processing, pp. 1723- 1726, 1996.
15. N. Gache, P. Chevret, and V. Zimpfer, “Target classification near complex interfaces using time-frequency filters,” Proceedings of the 1998 IEEE International Conference on vol. 4 pp. 2433 –2436, 1998.
16. T. Brotherton, T. Pollard, R. Barton, A. Krieger, L. Marple, “Application of time-frequency and time-scale analysis to underwater acoustic transients” Proceedings of the IEEE-SP International Symposium on Time-Frequency and Time-Scale Analysis, pp. 513 –516, 1992.
17. L. Cohen, Time-Frequency Analysis, Prentice Hill Inc., 1995.
18. T. A. C. M. Classen and W. F. G.. Mecklenbräuker, “The Wigner distribution- A tool for time-frequency signal analysis- Part I: Continuous time signals,” Phillips Jour. Of Research., vol. 35(3), pp. 217- 250, 1980.
19. T. A. C. M. Classen and W. F. G.. Mecklenbräuker, “The Wigner distribution- A tool for time-frequency signal analysis- Part II: Discr- ete Time Signals, ” Phillips Jour. Of Research., vol. 35(4/5), pp. 276- 300,
20. T. A. C. M. Classen and W. F. G.. Mecklenbräuker, “The Wigner distribution- A tool for time-frequency signal analysis- Part III: Relation with other time-frequency signal transformations, ” Phillips Jour. Of Research., vol. 35(4/5), pp. 276- 300,
21. Cornelis P. Janse and J. M. Kaizer, “Time-frequency distributions of loudspeakers: the application of the Wigner distribution,” J. Audio Eng. Soc., vol. 31, no. 4 April 1983.
22. L. Cohen, “Time-Frequency Distributions- a Review,” Proceedings of the IEEE, vol. 77, no. 7, pp. 941- 981, July 1989.
23. H. I. Choi and W. J. Williams, “Improved time-frequency representation of multicomponent signals using exponential kernels,” IEEE Trans. On Acoust., Speech, Signal processing, vol. 37, pp. 862-871, 1989.
24. J. Jeong and W. J. Williams. “Alias-Free Generalized Discrete-Time Time-Frequency Distributions,” IEEE Trans. On Signal Processing, vol. 40, pp. 2757- 2765, 1992.
25. G. S. Cunningham and W. J. Williams. “High-Resolution Signal Synthesis for Time-Frequency Distributions,” Proc. IEEE ICASSP- 93, vol. 4, pp. 400- 403, 1993.
26. S. Oh and R. J. Marks, “Some properties of the generalized time frequency representation with cone-shaped kernel,” IEEE Trans. On Signal Processing, vol. 40, no. 7, pp. 1735- 1745, July 1992.
27. P. J. Loughlin, J. W. Pitton and L. E. Atlas, “Bilinear time-frequency representations: New insights and properties,” IEEE Trans. On Signal Processing, vol. 41, no. 2, pp. 750-767, Feb. 1993.
28. J. Jeong and W. J. Williams, “Kernel design for reduced interference distributions,” IEEE Trans. On Signal Processing, vol. 40, no.2, pp. 402- 412, Feb. 1992.
29. Steven M. Kay, Modern Spectral Estimation: Theory and Application, Prentice-Hall, Englewood Cliffs, New Jersey,1988.
30. John G.. Proakis, Dimitris G. Manolakis, Digital Signal Processing, 3rd Ed, Prentice Hill Inc., 1996.
31. B. Samimy, and G.. Rizzoni, “Mechanical signature analysis using time-frequency signal processing: application to internal combustion engine knock detection,” Proceedings of the IEEE, vol. 84 pp. 1330- 1343, Sept. 1996.
32. M. Chiollaz and B. Favre, “Engine noise characterization with Wigner-Ville time-frequency analysis,” Mechan. Syst. and Signal Process., vol. 7, pp. 375- 400, Sept. 1993.
33. 張閒達, 保錚, “非平穩信號分析與處理,” 國防工業出版社, 1998.
34. 林立義, “應用可適性時頻分佈函數實現非穩態訊號偵測,” 國立台灣海洋大學電機工程學系碩士論文, 1997.
35. 蕭子健, 周森益, 鄭博修, 林佩瑜, 黃欽章, “Labview分析篇,” 高立圖書有限公司, 2000.
36. 林士傑, “電動機車異音源之分析研究,” 國立中央大學機械工程研究所碩士論文, 2001.
37. 黃靖雄, “現代汽車引擎,” 全華科技圖書股份有限公司, 1998.
38. 肖國有, 屠慶平, “聲信號處理及其應用,” 西北工業大學出版社, 1994. |