Title :
Efficient implementation of Volterra systems using a multilinear SVD
Author :
Seagraves, Ernest ; Walcott, Bruce ; Feinauer, David
Author_Institution :
Univ. of Kentucky, Lexington
fDate :
Nov. 28 2007-Dec. 1 2007
Abstract :
A large class of nonlinear systems have been successfully modeled using Volterra series techniques. The problem with Volterra series is that the number of parameters grows very rapidly with the order of the nonlinearity and the memory in the system. Techniques exist to efficiently model and compensate for Volterra systems but are often not practical to implement. One approach is to factor the Volterra kernels into a sum of simple terms that are easy to implement. Approaches utilizing the eigen-decomposition have been published for second order nonlinearities. This work proposes using a multilinear extension of the SVD to factor third and higher order kernels into terms that are easily implemented.
Keywords :
Volterra series; eigenvalues and eigenfunctions; nonlinear systems; singular value decomposition; Volterra kernels; Volterra series techniques; Volterra systems; eigen-decomposition; multilinear SVD; nonlinear systems; second order nonlinearities; Design engineering; Kernel; Knowledge engineering; Linear systems; Magnetic analysis; Nonlinear systems; Power system modeling; Signal processing; Taylor series; Tensile stress; Multilinear; Nonlinear; SVD; Volterra;
Conference_Titel :
Intelligent Signal Processing and Communication Systems, 2007. ISPACS 2007. International Symposium on
Conference_Location :
Xiamen
Print_ISBN :
978-1-4244-1447-5
Electronic_ISBN :
978-1-4244-1447-5
DOI :
10.1109/ISPACS.2007.4445999
