In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. These algorithms are based on the calculus of two-variable polynomial matrices and associated quadratic differential forms, and share the common feature that the problem is lifted from the original one-variable polynomial context to a two-variable polynomial context. The problem of polynomial J-spectral factorization is thus reduced to a problem of factoring a constant matrix obtained from the coefficient matrices of the polynomial matrix to be factored. In the second part of the paper, we specifically address the problem of computing polynomial J-spectral factors in the context of H∞ control. For this, we propose an algorithm that uses the notio...
A novel multichannel spectral factorization algorithm is illustrated in this paper. This new algori...
A novel algorithm for the spectral factorization (SF) of a para-Hermitian polynomial matrix (PPM) is...
In this paper we propose an algebraic approach to the discrete-time polynomial spectral factorizatio...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
Several algorithms are presented for the J-spectral factorization of a para-Hermitian polynomial mat...
The paper presents a polynomial solution to the standard H,-optimal control problem. Based on two po...
In this thesis we develop new numerical algorithms for polynomial matrices. We tackle the problem of...
An iterative algorithm to perform the J-spectral factorization of a para-Hermitian matrix is present...
A block Toeplitz algorithm is proposed to perform the J-spectral factorization of a para-Hermitian p...
AbstractThis paper presents an algebraic approach to polynomial spectral factorization, an important...
Dimirovski, Georgi M. (Dogus Author)We present a simple algorithm for linear-quadratic control of di...
In this paper, algorithms are developed for the problems of spectral factorization and sum of square...
In this paper, algorithms are developed for the problems of spectral factorization and sum of square...
Polynomial matrix theory is very important to many automatic control related pro- blems. This thesis...
AbstractThe topic of the paper is spectral factorization of rectangular and possibly non-full-rank p...
A novel multichannel spectral factorization algorithm is illustrated in this paper. This new algori...
A novel algorithm for the spectral factorization (SF) of a para-Hermitian polynomial matrix (PPM) is...
In this paper we propose an algebraic approach to the discrete-time polynomial spectral factorizatio...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
Several algorithms are presented for the J-spectral factorization of a para-Hermitian polynomial mat...
The paper presents a polynomial solution to the standard H,-optimal control problem. Based on two po...
In this thesis we develop new numerical algorithms for polynomial matrices. We tackle the problem of...
An iterative algorithm to perform the J-spectral factorization of a para-Hermitian matrix is present...
A block Toeplitz algorithm is proposed to perform the J-spectral factorization of a para-Hermitian p...
AbstractThis paper presents an algebraic approach to polynomial spectral factorization, an important...
Dimirovski, Georgi M. (Dogus Author)We present a simple algorithm for linear-quadratic control of di...
In this paper, algorithms are developed for the problems of spectral factorization and sum of square...
In this paper, algorithms are developed for the problems of spectral factorization and sum of square...
Polynomial matrix theory is very important to many automatic control related pro- blems. This thesis...
AbstractThe topic of the paper is spectral factorization of rectangular and possibly non-full-rank p...
A novel multichannel spectral factorization algorithm is illustrated in this paper. This new algori...
A novel algorithm for the spectral factorization (SF) of a para-Hermitian polynomial matrix (PPM) is...
In this paper we propose an algebraic approach to the discrete-time polynomial spectral factorizatio...