Paper Info
Title
Algebraic and Spectral Properties of General Toeplitz Matrices
Abstract
We consider problems related to the generalization of the classical Fourier basis to a basis of rational functions with prescribed poles outside the unit disk. We give some generalizations about the convergence and estimation of the Fourier coefficients with respect to this generalized basis. We also consider a rational generalization of the classical Toeplitz matrices and consider the asymptotic distribution of their spectrum. These bases and general Toeplitz matrices were considered by Ninness et al. in the context of least-squares system estimation where the prescribed poles allow to incorporate a priori knowledge into the system dynamics of the model.
Year
DOI
Venue
2002
10.1137/S0363012900377183
SIAM J. Control and Optimization
Keywords
Field
DocType
prescribed pole,fourier coefficient,classical toeplitz matrix,classical fourier basis,system dynamic,least-squares system estimation,general toeplitz matrix,rational generalization,general toeplitz matrices,spectral properties,generalized basis,rational function,system identification
Algebraic number,Mathematical analysis,Matrix (mathematics),Generalization,Unit circle,Toeplitz matrix,Fourier series,Basis function,Rational function,Mathematics
Journal
Volume
Issue
ISSN
41
5
0363-0129
Citations 
PageRank 
References 
2
0.73
1
Authors
2
Name
Order
Citations
PageRank
A. Bultheel111717.02
P. Carrette261.53