Title :
A Gaussianity measure for blind source separation insensitive to the sign of kurtosis
Author :
Wu, Hsiao-Chun ; Principe, Jose C.
Author_Institution :
Dept. of Electr. & Comput. Eng., Florida Univ., Gainesville, FL, USA
Abstract :
Various existing criteria to characterize the statistical independence are applied in blind source separation and independent component analysis. However, almost all of them are based on parametric models. The distribution model mismatch between the output PDF (probability density functions) and the chosen underlying distribution model is a serious problem in blind signal processing. Nonparametric PDF estimates like the Parzen window applied to the popular Kullback-Leibler divergence produce computational difficulties. Hence we propose a new measure, the quadratic Gaussianity measure, which is associated with the Euclidean distance between the marginal probability density function and the Gaussian distribution. We show that it outperforms other Gaussianity measures in signal processing applications, such as standardized kurtosis tests because our novel Gaussianity measure is robust to changes in the distribution form
Keywords :
Gaussian distribution; computational complexity; signal processing; Euclidean distance; blind source separation; distribution model mismatch; kurtosis; probability density functions; quadratic Gaussianity measure; statistical independence; Blind source separation; Density measurement; Euclidean distance; Gaussian distribution; Gaussian processes; Independent component analysis; Parametric statistics; Probability density function; Signal processing; Testing;
Conference_Titel :
Neural Networks for Signal Processing IX, 1999. Proceedings of the 1999 IEEE Signal Processing Society Workshop.
Conference_Location :
Madison, WI
Print_ISBN :
0-7803-5673-X
DOI :
10.1109/NNSP.1999.788123
