The present book deals with canonical factorization of matrix and operator functions that appear in state space form or that can be transformed into such a form. A unified geometric approach is used. The main results are all expressed explicitly in terms of matrices or operators, which are parameters of the state space representation. The applications concern different classes of convolution equations. A large part the book deals with rational matrix functions only
AbstractExplicit formulas for the canonical generalized factorization of a class of matrix functions...
AbstractA class of operators is defined in a Hilbert resolution space setting that offers a new pers...
AbstractThe spectral factorization problem is solved for state-space systems via results on the cano...
We showed earlier that a state variable for a LTI system can be computed factorizing a two-variable ...
A left canonical factorization theorem for rational matrix functions relative to the unit circle is ...
AbstractA left canonical factorization theorem for rational matrix functions relative to the unit ci...
AbstractBased on a generalization of the classical Bruhat factorization of nonsingular matrices to a...
AbstractThe main purpose of the paper is to present a uniform algorithm for transforming time-invari...
A fundamental problem is to construct linear systems with given transfer functions. This problem has...
Canonical factorization of a rational matrix function on the unit circle is described explicitly in ...
AbstractCompanion based matrix functions are rational matrix functions admitting a minimal realizati...
Symbolic computation techniques are used to obtain a canonical form for polynomial matrices arising ...
Companion based matrix functions are rational matrix functions admitting a minimal realization invol...
This paper presents an algorithm for the spectral factoriza-tion of a para-Hermitian polynomial matr...
We construct an algorithm that allows us to determine an effective canonical factorization of some n...
AbstractExplicit formulas for the canonical generalized factorization of a class of matrix functions...
AbstractA class of operators is defined in a Hilbert resolution space setting that offers a new pers...
AbstractThe spectral factorization problem is solved for state-space systems via results on the cano...
We showed earlier that a state variable for a LTI system can be computed factorizing a two-variable ...
A left canonical factorization theorem for rational matrix functions relative to the unit circle is ...
AbstractA left canonical factorization theorem for rational matrix functions relative to the unit ci...
AbstractBased on a generalization of the classical Bruhat factorization of nonsingular matrices to a...
AbstractThe main purpose of the paper is to present a uniform algorithm for transforming time-invari...
A fundamental problem is to construct linear systems with given transfer functions. This problem has...
Canonical factorization of a rational matrix function on the unit circle is described explicitly in ...
AbstractCompanion based matrix functions are rational matrix functions admitting a minimal realizati...
Symbolic computation techniques are used to obtain a canonical form for polynomial matrices arising ...
Companion based matrix functions are rational matrix functions admitting a minimal realization invol...
This paper presents an algorithm for the spectral factoriza-tion of a para-Hermitian polynomial matr...
We construct an algorithm that allows us to determine an effective canonical factorization of some n...
AbstractExplicit formulas for the canonical generalized factorization of a class of matrix functions...
AbstractA class of operators is defined in a Hilbert resolution space setting that offers a new pers...
AbstractThe spectral factorization problem is solved for state-space systems via results on the cano...