Title :
Use of eigenvector expansions in generalized Wiener system models
Author :
Westwick, D.T. ; Kearney, R.E.
Author_Institution :
Dept. of Biomed. Eng., McGill Univ., Montreal, Que., Canada
Abstract :
The authors consider the estimation of Wiener and Volterra kernels of finite dimension, finite order, finite memory nonlinear systems. The linear filters in a generalized Wiener model are constructed using the parallel cascade identification method. The authors demonstrate that these filters span the subspace occupied by the linear part of the system being identified. This approach is compared with the Laguerre expansion method, in which a complete orthonormal basis of the linear space is created. Simulations are used to illustrate the strengths and weaknesses of each approach
Keywords :
nonlinear systems; Laguerre expansion method; Volterra kernels; eigenvector expansions; finite memory nonlinear systems; generalized Wiener model; generalized Wiener system models; linear space; orthonormal basis; parallel cascade identification method; Biomedical engineering; Filter bank; Kernel; Nonlinear filters; Nonlinear systems; Optimization methods; Polynomials; Subspace constraints; Vectors;
Conference_Titel :
Engineering in Medicine and Biology Society, 1994. Engineering Advances: New Opportunities for Biomedical Engineers. Proceedings of the 16th Annual International Conference of the IEEE
Conference_Location :
Baltimore, MD
Print_ISBN :
0-7803-2050-6
DOI :
10.1109/IEMBS.1994.415456
