Change search
ReferencesLink to record
Permanent link

Direct link
Revisiting Hammerstein System Identification through the Two-Stage Algorithm for Bilinear Parameter Estimation
Peking University, China.
INRIA, France.
Linköping University, Department of Electrical Engineering, Automatic Control. Linköping University, The Institute of Technology.
2010 (English)Report (Other academic)
Abstract [en]

The Two-Stage Algorithm (TSA) has been extensively used and adapted for the identification of Hammerstein systems. It is essentially based on a particular formulation of Hammerstein systems in the form of bilinearly parameterized linear regressions. This paper has been motivated by a somewhat contradictory fact: though the optimality of the TSA has been established by Bai in 1998 only in the case of some special weighting matrices, the unweighted TSA is usually used in practice. It is shown in this paper that the unweighted TSA indeed gives the optimal solution of the weighted nonlinear least squares problem formulated with a particular weighting matrix. This provides a theoretical justification of the unweighted TSA, and also leads to a generalization of the obtained result to the case of colored noise with noise whitening. Numerical examples of identification of Hammerstein systems are presented to validate the theoretical analysis.

Place, publisher, year, edition, pages
Linköping: Linköping University Electronic Press, 2010. , 10 p.
LiTH-ISY-R, ISSN 1400-3902 ; 2984
Keyword [en]
System Identication
National Category
Control Engineering
URN: urn:nbn:se:liu:diva-97738ISRN: LiTH-ISY-R-2984OAI: diva2:650655
Available from: 2013-09-23 Created: 2013-09-23 Last updated: 2014-10-08Bibliographically approved

Open Access in DiVA

fulltext(937 kB)110 downloads
File information
File name FULLTEXT01.pdfFile size 937 kBChecksum SHA-512
Type fulltextMimetype application/pdf

Search in DiVA

By author/editor
Ljung, Lennart
By organisation
Automatic ControlThe Institute of Technology
Control Engineering

Search outside of DiVA

GoogleGoogle Scholar
Total: 110 downloads
The number of downloads is the sum of all downloads of full texts. It may include eg previous versions that are now no longer available

Total: 44 hits
ReferencesLink to record
Permanent link

Direct link