Title :
Error Entropy, Correntropy and M-Estimation
Author :
Liu, Weifeng ; Pokharel, P.P. ; Principe, J.C.
Author_Institution :
CNEL, Univ. of Florida, Gainesville, FL
Abstract :
Minimization of the error entropy (MEE) cost function was introduced for nonlinear and non-Gaussian signal processing. In this paper, we show that this cost function has a close relation to a introduced correntropy criterion and M-estimation, thus it also theoretically explains the robustness of MEE to outliers. Based on this understanding, we propose a modification to the MEE cost function named minimization of error entropy with fiducial points, which sets the bias for MEE in an elegant and robust way. The performance of this new criterion is compared with the original MEE and the mean square error criterion (MSE) in robust regression and short-term prediction of a chaotic time series.
Keywords :
Gaussian processes; chaos; entropy; estimation theory; minimisation; regression analysis; signal processing; time series; M-estimation; chaotic time series; correntropy; error entropy cost function minimization; non-Gaussian signal processing; nonlinear Gaussian signal processing; robust regression; short-term prediction; Adaptive systems; Chaos; Computer errors; Computer integrated manufacturing; Cost function; Entropy; Kernel; Mean square error methods; Robustness; Signal processing;
Conference_Titel :
Machine Learning for Signal Processing, 2006. Proceedings of the 2006 16th IEEE Signal Processing Society Workshop on
Conference_Location :
Arlington, VA
Print_ISBN :
1-4244-0656-0
Electronic_ISBN :
1551-2541
DOI :
10.1109/MLSP.2006.275544
