Title :
Identification of discrete Volterra series using maximum length sequences
Author :
Reed, M.J. ; Hawksford, M.O.J.
Author_Institution :
Dept. of Electron. Syst. Eng., Essex Univ., Colchester, UK
fDate :
10/1/1996 12:00:00 AM
Abstract :
An efficient method is described for the determination of the Volterra kernels of a discrete nonlinear system. It makes use of the Wiener general model for a nonlinear system to achieve a change of basis. The orthonormal basis required by the model is constructed from a modified binary maximum sequence (MLS). A multilevel test sequence is generated by time reversing the MLS used to form the model and suitably summing delayed forms of the sequence. This allows a sparse matrix solution of the Wiener model coefficients to be performed. The Volterra kernels are then obtained from the Wiener model by a change of basis
Keywords :
Volterra series; binary sequences; discrete systems; identification; nonlinear systems; sparse matrices; stochastic processes; Volterra kernels; Wiener general model; Wiener model coefficients; delayed forms; discrete Volterra series; discrete nonlinear system; identification; maximum length sequences; modified binary maximum sequence; multilevel test sequence; orthonormal basis; sparse matrix solution; time reversal;
Journal_Title :
Circuits, Devices and Systems, IEE Proceedings -
DOI :
10.1049/ip-cds:19960726
