We define spectral factorization in Lp (or a generalized Wiener-Hopf factorization) of a measurable singular matrix function on a simple closed rectifiable contour G. Such factorization has the same uniqueness properties as in the nonsingular case. We discuss basic properties of the vector valued Riemann problem whose coefficient takes singular values almost everywhere on G. In particular, we introduce defect numbers for this problem which agree with the usual defect numbers in the case of a nonsingular coefficient. Based on the Riemann problem, we obtain a necessary and sufficient condition for existence of a spectral factorization in Lp
In this paper, the Wiener–Hopf factorization problem is presented in a unified framework with the Ri...
We describe a new spectral method for solving matrix-valued Riemann-Hilbert problems numerically. We...
A univariate compactly supported refinable function OE can always be factored into B k f , with B ...
AbstractThe Wiener–Hopf factorization of 2×2 matrix functions and its close relation to scalar Riema...
Note:The main result of this thesis is a necessary and sufficient condition for an operator polynomi...
In this note, we consider a general discrete-time spectral factorization problem for rational matrix...
Let [special characters omitted] be function of [special characters omitted], 0 [special characters ...
Consider the matrix Riemann-Hilbert problem. In contrast to scalar Riemann-Hilbert problems, a gener...
Consider the matrix Riemann-Hilbert problem. In contrast to scalar Riemann-Hilbert problems, a gener...
The topic of the paper is the spectral factorization problem for a proper rational matrix function o...
The topic of the paper is the spectral factorization problem for a proper rational matrix function o...
For the Wiener class of matrix-valued functions we provide necessary and sufficient conditions for t...
The necessity of factoring spectral matrices arises in stationary control settings. The optimality c...
AbstractThe properties of a discrete Wiener-Hopf equation are closely related to the factorization o...
Matrix spectral factorization is traditionally described as finding spectral factors having a fixed ...
In this paper, the Wiener–Hopf factorization problem is presented in a unified framework with the Ri...
We describe a new spectral method for solving matrix-valued Riemann-Hilbert problems numerically. We...
A univariate compactly supported refinable function OE can always be factored into B k f , with B ...
AbstractThe Wiener–Hopf factorization of 2×2 matrix functions and its close relation to scalar Riema...
Note:The main result of this thesis is a necessary and sufficient condition for an operator polynomi...
In this note, we consider a general discrete-time spectral factorization problem for rational matrix...
Let [special characters omitted] be function of [special characters omitted], 0 [special characters ...
Consider the matrix Riemann-Hilbert problem. In contrast to scalar Riemann-Hilbert problems, a gener...
Consider the matrix Riemann-Hilbert problem. In contrast to scalar Riemann-Hilbert problems, a gener...
The topic of the paper is the spectral factorization problem for a proper rational matrix function o...
The topic of the paper is the spectral factorization problem for a proper rational matrix function o...
For the Wiener class of matrix-valued functions we provide necessary and sufficient conditions for t...
The necessity of factoring spectral matrices arises in stationary control settings. The optimality c...
AbstractThe properties of a discrete Wiener-Hopf equation are closely related to the factorization o...
Matrix spectral factorization is traditionally described as finding spectral factors having a fixed ...
In this paper, the Wiener–Hopf factorization problem is presented in a unified framework with the Ri...
We describe a new spectral method for solving matrix-valued Riemann-Hilbert problems numerically. We...
A univariate compactly supported refinable function OE can always be factored into B k f , with B ...