A Fast Gradient Approximation for Nonlinear Blind Signal Processing

When dealing with nonlinear blind processing algorithms (deconvolution or post-nonlinear source separation), complex mathematical estimations must be done giving as a result very slow algorithms. This is the case, for example, in speech processing, spike signals deconvolution or microarray data analysis. In this paper, we propose a simple method to reduce computational time for the inversion of Wiener systems or the separation of post-nonlinear mixtures, by using a linear approximation in a minimum mutual information algorithm. Simulation results demonstrate that linear spline interpolation is fast and accurate, obtaining very good results (similar to those obtained without approximation) while computational time is dramatically decreased. On the other hand, cubic spline interpolation also obtains similar good results, but due to its intrinsic complexity, the global algorithm is much more slow and hence not useful for our purpose.

[1]  S. Haykin Blind source separation , 2000 .

[2]  Tom E. Bishop,et al.  Blind Deconvolution , 2014, Computer Vision, A Reference Guide.

[3]  Christian Jutten,et al.  Parametric approach to blind deconvolution of nonlinear channels , 2002, ESANN.

[4]  E. Parzen On Estimation of a Probability Density Function and Mode , 1962 .

[5]  M. J. Korenberg,et al.  The identification of nonlinear biological systems: Wiener and Hammerstein cascade models , 1986, Biological Cybernetics.

[6]  S. Fukunaga,et al.  Nonlinear blind deconvolution based on a state-space model , 2006, Proceedings of the 45th IEEE Conference on Decision and Control.

[7]  Jordi Solé i Casals,et al.  A Simple Approximation for Fast Nonlinear Deconvolution , 2011, NOLISP.

[8]  Enzo Baccarelli,et al.  A new approach based on "soft statistics" to the nonlinear blind-deconvolution of unknown data channels , 2001, IEEE Trans. Signal Process..

[9]  Christian Jutten,et al.  Quasi-nonparametric blind inversion of Wiener systems , 2001, IEEE Trans. Signal Process..

[10]  C. D. Kemp,et al.  Density Estimation for Statistics and Data Analysis , 1987 .

[11]  Asoke K. Nandi,et al.  Blind Source Separation , 1999 .

[12]  Pierre Comon,et al.  Handbook of Blind Source Separation: Independent Component Analysis and Applications , 2010 .

[13]  P. M. Prenter Splines and variational methods , 1975 .

[14]  Christian Jutten,et al.  Source separation in post-nonlinear mixtures , 1999, IEEE Trans. Signal Process..