Log-Rayleigh Distribution: A Simple and Efficient Statistical Representation of Log-Spectral Coefficients

In this paper, we study the distribution of the log-modulus of a Gaussian complex random variable. In the circular case, it is a Log-Rayleigh (LR) variable, whose probability distribution function (pdf) depends on only one parameter. In the noncircular case, the pdf is more complicated, although we show that it can be adequately modeled by an LR pdf, for which the optimal fitting parameter is derived. These results can be used in any application using the log-modulus of discrete Fourier transform coefficients, e.g., for speech/audio signals, and suggest that a mixture of LR pdf kernels is preferable to more classical models such as mixtures of Gaussian kernels, which are more costly and less efficient

[1]  Allen Gersho,et al.  Vector quantization and signal compression , 1991, The Kluwer international series in engineering and computer science.

[2]  J. Lawless Inference in the Generalized Gamma and Log Gamma Distributions , 1980 .

[3]  Laurent Benaroya,et al.  WIENER BASED SOURCE SEPARATION WITH HMM/GMM USING A SINGLE SENSOR , 2003 .

[4]  Rainer Martin,et al.  SPEECH ENHANCEMENT IN THE DFT DOMAIN USING LAPLACIAN SPEECH PRIORS , 2003 .

[5]  Eric Moulines,et al.  Continuous probabilistic transform for voice conversion , 1998, IEEE Trans. Speech Audio Process..

[6]  William M. Hartmann,et al.  Psychoacoustics: Facts and Models , 2001 .

[7]  Bernard C. Picinbono,et al.  Second-order complex random vectors and normal distributions , 1996, IEEE Trans. Signal Process..

[8]  Douglas A. Reynolds,et al.  Robust text-independent speaker identification using Gaussian mixture speaker models , 1995, IEEE Trans. Speech Audio Process..

[9]  Aarnout Brombacher,et al.  Probability... , 2009, Qual. Reliab. Eng. Int..

[10]  Sharon Gannot,et al.  Speech enhancement using a mixture-maximum model , 2002, IEEE Trans. Speech Audio Process..

[11]  Hugo Fastl,et al.  Psychoacoustics: Facts and Models , 1990 .

[12]  Louis L. Scharf,et al.  Second-order analysis of improper complex random vectors and processes , 2003, IEEE Trans. Signal Process..

[13]  James L. Massey,et al.  Proper complex random processes with applications to information theory , 1993, IEEE Trans. Inf. Theory.

[14]  Robert M. Gray,et al.  An Algorithm for Vector Quantizer Design , 1980, IEEE Trans. Commun..

[15]  M. R. Spiegel Mathematical handbook of formulas and tables , 1968 .

[16]  D. Rubin,et al.  Maximum likelihood from incomplete data via the EM - algorithm plus discussions on the paper , 1977 .

[17]  John G. Proakis,et al.  Probability, random variables and stochastic processes , 1985, IEEE Trans. Acoust. Speech Signal Process..

[18]  Ephraim Speech enhancement using a minimum mean square error short-time spectral amplitude estimator , 1984 .