Abstract An efficient method for construction of J-unitary matrix polynomials is proposed, associated with companion matrix functions the last row of which is a polynomial in 1/t. The method relies on Wiener-Hopf factorization theory and stems from recently developed J-spectral factorization algorithm for certain Hermitian matrix functions
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
Several algorithms are presented for the J-spectral factorization of a para-Hermitian polynomial mat...
The paper presents a novel Newton method for constructing canonical Wiener-Hopf factorizations of co...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
A block Toeplitz algorithm is proposed to perform the J-spectral factorization of a para-Hermitian p...
Using the para-equivalent transform, we propose a method for calculating the J-spectrum factorizatio...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
Several algorithms are presented for the J-spectral factorization of a para-Hermitian polynomial mat...
The paper presents a novel Newton method for constructing canonical Wiener-Hopf factorizations of co...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
A block Toeplitz algorithm is proposed to perform the J-spectral factorization of a para-Hermitian p...
Using the para-equivalent transform, we propose a method for calculating the J-spectrum factorizatio...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
In this paper new algorithms are developed for J-spectral factorization of polynomial matrices. Thes...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
We prove that a 2 × 2 matrix polynomial which is J-unitary on the real line can be written as a prod...
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