A Polynomial Approach to Linear Algebra is a text which is
heavily biased towards functional methods. In using the shift
operator as a central object, it makes linear algebra a perfect
introduction to other areas of mathematics, operator theory in
particular. This technique is very powerful as becomes clear from
the analysis of canonical forms (Frobenius, Jordan). It should be
emphasized that these functional methods are not only of great
theoretical interest, but lead to computational algorithms.
Quadratic forms are treated from the same perspective, with
emphasis on the important examples of Bezoutian and Hankel forms.
These topics are of great importance in applied areas such as
signal processing, numerical linear algebra, and control theory.
Stability theory and system theoretic concepts, up to realization
theory, are treated as an integral part of linear algebra.
This new edition has been updated throughout, in particular new
sections have been added on rational interpolation, interpolation
using H DEGREES{\nfty} functions, and tensor products of
models.
Review from first edition:
..".the approach pursed by the author is of unconventional
beauty and the material covered by the book is unique."
(Mathematical Reviews)
"
General
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