Title :
Blind identification of a second order Volterra-Hammerstein series using cumulant cubic tensor analysis
Author :
Cherif, Imen ; Fnaiech, Farhat
Author_Institution :
Ecole Super. des Sci. et Tech. de Tunis, Tunis
Abstract :
In this paper we deal with blind identification of second order Volterra-Hammerstein series based on the analysis of a third order tensor composed of the fourth order output cumulants. We demonstrate that this nonlinear identification problem can be reduced to a linear one having the form Ax + By = c. The resolution of this system can be made with many methods. In this work we have used two algorithms: the alternating least square algorithm (ALS) and the alternating QR factorization algorithm (AQR). Simulation results show a good estimation of kernels with little superiority of the AQR algorithm. This superiority is the result of the numerical stability of the algorithm.
Keywords :
Volterra series; least squares approximations; nonlinear filters; numerical stability; tensors; alternating QR factorization algorithm; alternating least square algorithm; blind identification; cumulant cubic tensor analysis; fourth order output cumulants; nonlinear identification problem; numerical stability; second order Volterra-Hammerstein series; third order tensor; Biological system modeling; Decision feedback equalizers; Kernel; Least squares methods; Optical filters; Optical receivers; Signal processing; Signal processing algorithms; Stability; Tensile stress; Alternating least square; Blind identification; Cumulant cubic tensor; QR matrix factorization; Volterra-Hammerstein series;
Conference_Titel :
Industrial Electronics, 2008. IECON 2008. 34th Annual Conference of IEEE
Conference_Location :
Orlando, FL
Print_ISBN :
978-1-4244-1767-4
Electronic_ISBN :
1553-572X
DOI :
10.1109/IECON.2008.4758237
