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FrFT and Time-Frequency Distribution 分數傅立葉轉換與時頻分析 Guo-Cyuan Guo 郭國銓 指導教授 :Jian Jiun Ding 丁建均 Institute of Communications Engineering National Taiwan University Feb., 2008
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DISP LAB 2 Outline Introduction FrFT & LCT Time-Frequency Distribution Applications DFrFT Acoustics & Music Signals Conclusions and Future works Reference
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DISP LAB 3 Outline Introduction FrFT & LCT Time-Frequency Distribution Applications DFrFT Acoustics & Music Signals Conclusions and Future works Reference
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DISP LAB 4 Introduction Fourier Transform(18-th century): Fractional Fourier Transform (FrFT): 1980 Victor Namias (Quantum mechanics) 1994 Almeida (Signal Processing) Ozaktas (Optics) LCT 1970 matrix optics— Fresnel transform Mathematics
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DISP LAB 5 Introduction FTFrFTLCT
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DISP LAB 6 Outline Introduction FrFT & LCT Time-Frequency Distribution Applications DFrFT Acoustics & Music Signals Conclusions and Future works Reference
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DISP LAB 7 Fractional Fourier Transform FT 0.1 FT ?
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DISP LAB 8 FrFT & Linear Canonical Transform Definition:
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DISP LAB 9 FrFT (cont’)
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DISP LAB 10 Outline Introduction FrFT & LCT Time-Frequency Distribution Applications DFrFT Acoustics & Music Signals Conclusions and Future works Reference
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DISP LAB 11 Time-Frequency Distribution Short Time Fourier Transform(STFT) Gabor transform Wigner Distribution(WD)
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DISP LAB 12 T-F Distribution(cont’) Input: GaborWDF
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DISP LAB 13 T-F Distribution(cont’) GaborWDFGabor-Wigner
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DISP LAB 14 Outline Introduction FrFT & LCT Time-Frequency Distribution Applications DFrFT Acoustics & Music Signals Conclusions and Future works Reference
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DISP LAB 15 Filter Design
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DISP LAB 16 Filter Design(cont’) u v u v u v u v u v u v
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DISP LAB 17 Fourier Optics output planeinput plane output planeinput plane
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DISP LAB 18 Fourier Optics(cont’) Through free space: output plane input plane
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DISP LAB 19 Fourier Optics(cont’) Through thin lens output plane input plane
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DISP LAB 20 Fourier Optics(cont’) Through the gradient-index medium (GRIN) d
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DISP LAB 21 Fourier Optics(cont’) output planeinput plane
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DISP LAB 22 Outline Introduction FrFT & LCT Time-Frequency Distribution Applications DFrFT Acoustics & Music Signals Conclusions and Future works Reference
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DISP LAB 23 DFrFT Definition1: Definition2:
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DISP LAB 24 DFrFT Definition3:
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DISP LAB 25 DFrFT
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DISP LAB 26 Outline Introduction FrFT & LCT Time-Frequency Distribution Applications DFrFT Acoustics & Music Signals Conclusions and Future works Reference
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DISP LAB 27 Pronounce Pulmonary alveolus Resonant cavityvoice Random sequence generator voiced Periodic pulse train generator unvoiced x[n] Vocal Tract Model G
![DISP LAB 27 Pronounce Pulmonary alveolus Resonant cavityvoice Random sequence generator voiced Periodic pulse train generator unvoiced x[n] Vocal Tract Model G](http://images.slideplayer.com/26/8391085/slides/slide_27.jpg "DISP LAB 27 Pronounce Pulmonary alveolus Resonant cavityvoice Random sequence generator voiced Periodic pulse train generator unvoiced x[n] Vocal Tract Model G")
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DISP LAB 28 Hearing Frequency …… Weighting Bark Scale
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DISP LAB 29 Masking Effect Sound Pressure Level Frequency Masking signal Masked signals Unmasked signal Hearing threshold Masking threshold
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DISP LAB 30 MFCC Speech signal x(n) Pre-emphasis Window DFT Mel filter bank DCT Energy Derivatives MFCC
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DISP LAB 31 Music Sim.
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DISP LAB 32 Music Sim.
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DISP LAB 33 Problems The computation problem Real time Resolution Harmonics
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DISP LAB 34 Acoustics Signals ㄞㄟㄠㄡ
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DISP LAB 35 Problems Computation Resolution Frame decision Correlation
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DISP LAB 36 Outline Introduction FrFT & LCT Time-Frequency Distribution Applications DFrFT Acoustics & Music Signals Conclusions and Future works Reference
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DISP LAB 37 Conclusions and Future works FrFT & LCT &DFrFT Time-Frequency Distribution Applications Acoustics & Music Signals Fractional Fourier Series Discrete Time Fourier Transform Time-Frequency Resolution and Computation Music Autoscore
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DISP LAB 38 Reference [1] H.M. Ozaktas, Z. Zalevsky and M. A. Kutay, The fractional Fourier transform with Applications in Optics and Signal Processing, John Wiley & Sons, 2001. [2] J. J. Ding, Research of Fractional Fourier Transform and Linear Canonical Transform, Ph.D. thesis, National Taiwan University, Taipei, Taiwan, R.O.C, 2001. [3] S. Qian and D. Chen, Joint Time-Frequency Analysis: Methods and Applications, Prentice Hall, N.J., 1996. [4] R. L. Allen and D. W. Mills, Signal Analysis: Time, Frequency, Scale, and Structure, Wiley- Interscience, NJ, 2004. [5] S. C. Pei and J. J. Ding, “Relations between Gabor Transforms and Fractional Fourier Transforms and Their Applications for Signal Processing,” Revised Version: T-SP-04763- 2006.R1. [6] X. G. Xia, “On Bandlimited Signals with Fractional Fourier Transform,” IEEE Signal Processing Letters, Vol. 3, No. 3, March 1996. [7] P. Andres, W. D. Furlan and G. Saavedra, “Variable Fractional Fourier Processor: A Simple Implementation,” J. Opt. Soc. Am. A, Vol. 14, p.853-858, No. 4, April 1997. [8] H. M. Ozaktas and D. Mendlovic, “Fractional Fourier Optics,” J. Opt. Soc. Am. A, Vol. 12, p.743-751, No. 4, April 1995. [9] D. Mendlovic, R. G. Dorsch, A. W. Lohmann, Z. Zalevsky, and C. Ferreira, “Optical Illustration of a Varied Fractional Fourier Transform Order and the Radon-Wigner Display,” Appl. Opt. Vol. 35, No. 20, 10, p.3925-3929, July 1996. [10] L. R. Rabiner and R. W. Schafer, Digital Processing of Speech Signals, Pren-tice-Hall, 1978. [11] 王小川, 語音訊號處理, 全華科技圖書股份有限公司, Taipei, 2004. [12] A. Klapuri, “Signal Processing Methods for the Automatic Transcription of Mu-sic,” Ph. D thesis, Tampere University of Technology, Tampere, March 2004.
![DISP LAB 38 Reference [1] H.M. Ozaktas, Z. Zalevsky and M.](http://images.slideplayer.com/26/8391085/slides/slide_38.jpg "A. Kutay, The fractional Fourier transform with Applications in Optics and Signal Processing, John Wiley & Sons, [2] J. J. Ding, Research of Fractional Fourier Transform and Linear Canonical Transform, Ph.D. thesis, National Taiwan University, Taipei, Taiwan, R.O.C, [3] S. Qian and D. Chen, Joint Time-Frequency Analysis: Methods and Applications, Prentice Hall, N.J., [4] R. L. Allen and D. W. Mills, Signal Analysis: Time, Frequency, Scale, and Structure, Wiley- Interscience, NJ, [5] S. C. Pei and J. J. Ding, Relations between Gabor Transforms and Fractional Fourier Transforms and Their Applications for Signal Processing, Revised Version: T-SP R1. [6] X. G. Xia, On Bandlimited Signals with Fractional Fourier Transform, IEEE Signal Processing Letters, Vol. 3, No. 3, March [7] P. Andres, W. D. Furlan and G. Saavedra, Variable Fractional Fourier Processor: A Simple Implementation, J. Opt. Soc. Am. A, Vol. 14, p , No. 4, April [8] H. M. Ozaktas and D. Mendlovic, Fractional Fourier Optics, J. Opt. Soc. Am. A, Vol. 12, p , No. 4, April [9] D. Mendlovic, R. G. Dorsch, A. W. Lohmann, Z. Zalevsky, and C. Ferreira, Optical Illustration of a Varied Fractional Fourier Transform Order and the Radon-Wigner Display, Appl. Opt. Vol. 35, No. 20, 10, p , July [10] L. R. Rabiner and R. W. Schafer, Digital Processing of Speech Signals, Pren-tice-Hall, [11] 王小川, 語音訊號處理, 全華科技圖書股份有限公司, Taipei, [12] A. Klapuri, Signal Processing Methods for the Automatic Transcription of Mu-sic, Ph. D thesis, Tampere University of Technology, Tampere, March")
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