We present fast numerical methods for computing the Hessenberg reduction of a unitary plus low-rank matrix $A=G+U V^H$, where $Gin mathbb C^{n imes n}$ is a unitary matrix represented in some compressed format using $O(nk)$ parameters and $U$ and $V$ are $n imes k$ matrices with $k< n$. At the core of these methods is a certain structured decomposition, referred to as a LFR decomposition, of $A$ as product of three possibly perturbed unitary $k$ Hessenberg matrices of size $n$. It is shown that in most interesting cases an initial LFR decomposition of $A$ can be computed very cheaply. Then we prove structural properties of LFR decompositions by giving conditions under which the LFR decomposition of $A$ implies its Hessenbe...
Hermitian plus possibly non-Hermitian low rank matrices can be efficiently reduced into Hessenberg f...
The QR-algorithm is a renowned method for computing all eigenvalues of an arbitrary matrix. A prelim...
International audienceThe reduction of a matrix to an upper J-Hessenberg form is a crucial step in t...
We present fast numerical methods for computing the Hessenberg reduction of a unitary plus low-rank...
We develop two fast algorithms for Hessenberg reduction of a structured matrix $A = D + UV^H$, where...
Some fast algorithms for computing the eigenvalues of a block companion matrix A=U+XYH, where U∈Cn×n...
AbstractIn this paper we describe how to compute the eigenvalues of a unitary rank structured matrix...
We present a novel algorithm to perform the Hessenberg reduction of an $n imes n$ matrix $A$ of the...
In this paper a new framework for transforming arbitrary matrices to compressed representations is p...
Hermitian plus possibly non-Hermitian low rank matrices can be efficiently reduced into Hessenberg f...
The QR-algorithm is a renowned method for computing all eigenvalues of an arbitrary matrix. A prelim...
AbstractIn this paper we design a fast new algorithm for reducing an N×N quasiseparable matrix to up...
Hermitian plus possibly non-Hermitian low rank matrices can be efficiently reduced into Hessenberg f...
Hermitian plus possibly unhermitian low rank matrices can be efficiently reduced into Hessenberg for...
We present two variants of Moler and Stewart's algorithm for reducing a matrix pair to Hessenberg-tr...
Hermitian plus possibly non-Hermitian low rank matrices can be efficiently reduced into Hessenberg f...
The QR-algorithm is a renowned method for computing all eigenvalues of an arbitrary matrix. A prelim...
International audienceThe reduction of a matrix to an upper J-Hessenberg form is a crucial step in t...
We present fast numerical methods for computing the Hessenberg reduction of a unitary plus low-rank...
We develop two fast algorithms for Hessenberg reduction of a structured matrix $A = D + UV^H$, where...
Some fast algorithms for computing the eigenvalues of a block companion matrix A=U+XYH, where U∈Cn×n...
AbstractIn this paper we describe how to compute the eigenvalues of a unitary rank structured matrix...
We present a novel algorithm to perform the Hessenberg reduction of an $n imes n$ matrix $A$ of the...
In this paper a new framework for transforming arbitrary matrices to compressed representations is p...
Hermitian plus possibly non-Hermitian low rank matrices can be efficiently reduced into Hessenberg f...
The QR-algorithm is a renowned method for computing all eigenvalues of an arbitrary matrix. A prelim...
AbstractIn this paper we design a fast new algorithm for reducing an N×N quasiseparable matrix to up...
Hermitian plus possibly non-Hermitian low rank matrices can be efficiently reduced into Hessenberg f...
Hermitian plus possibly unhermitian low rank matrices can be efficiently reduced into Hessenberg for...
We present two variants of Moler and Stewart's algorithm for reducing a matrix pair to Hessenberg-tr...
Hermitian plus possibly non-Hermitian low rank matrices can be efficiently reduced into Hessenberg f...
The QR-algorithm is a renowned method for computing all eigenvalues of an arbitrary matrix. A prelim...
International audienceThe reduction of a matrix to an upper J-Hessenberg form is a crucial step in t...