Eigenvalue computations are ubiquitous in science and engineering. John Francis's implicitly shifted QR algorithm has been the method of choice for small to medium sized eigenvalue problems since its invention in 1959. This book presents a new view of this classical algorithm. While Francis's original procedure chases bulges, the new version chases core transformations, which allows the development of fast algorithms for eigenvalue problems with a variety of special structures. This also leads to a fast and backward stable algorithm for computing the roots of a polynomial by solving the companion matrix eigenvalue problem. The authors received a SIAM Outstanding Paper prize for this work
AbstractMatrix methods are increasingly popular for polynomial root-finding. The idea is to approxim...
International audienceAn implicit version of the shifted QR eigenvalue algorithm given in Bini et al...
Matrix methods are increasingly popular for polynomial root-finding. The idea is to approxi-mate the...
Eigenvalue computations are ubiquitous in science and engineering. John Francis's implicitly shifted...
AbstractIn the year 2000 the dominant method for solving matrix eigenvalue problems is still the QR ...
Abstract. John Francis’s implicitly shifted QR algorithm turned the problem of matrix eigen-value co...
Watkins DS, Elsner L. Chasing Algorithmus for the Eigenvalue Problem. SIAM Journal on matrix analysi...
© 2015 Society for Industrial and Applied Mathematics. A stable algorithm to compute the roots of po...
In the last decade matrix polynomials have been investigated with the primary focus on adequate line...
In this lecture we will propose a new fast and stable manner of computing roots of polynomials. Root...
A stable algorithm to compute the roots of polynomials is presented. The roots are found by computin...
© 2018 American Mathematical Society. In the last decade matrix polynomials have been investigated w...
An implicit version of the QR eigenvalue algorithm given in [D. A. Bini, Y. Eidelman
The class of eigenvalue problems for upper Hessenberg matrices of banded-plus-spike form includes co...
A stable algorithm to compute the roots of polynomials is presented. The roots are found by computin...
AbstractMatrix methods are increasingly popular for polynomial root-finding. The idea is to approxim...
International audienceAn implicit version of the shifted QR eigenvalue algorithm given in Bini et al...
Matrix methods are increasingly popular for polynomial root-finding. The idea is to approxi-mate the...
Eigenvalue computations are ubiquitous in science and engineering. John Francis's implicitly shifted...
AbstractIn the year 2000 the dominant method for solving matrix eigenvalue problems is still the QR ...
Abstract. John Francis’s implicitly shifted QR algorithm turned the problem of matrix eigen-value co...
Watkins DS, Elsner L. Chasing Algorithmus for the Eigenvalue Problem. SIAM Journal on matrix analysi...
© 2015 Society for Industrial and Applied Mathematics. A stable algorithm to compute the roots of po...
In the last decade matrix polynomials have been investigated with the primary focus on adequate line...
In this lecture we will propose a new fast and stable manner of computing roots of polynomials. Root...
A stable algorithm to compute the roots of polynomials is presented. The roots are found by computin...
© 2018 American Mathematical Society. In the last decade matrix polynomials have been investigated w...
An implicit version of the QR eigenvalue algorithm given in [D. A. Bini, Y. Eidelman
The class of eigenvalue problems for upper Hessenberg matrices of banded-plus-spike form includes co...
A stable algorithm to compute the roots of polynomials is presented. The roots are found by computin...
AbstractMatrix methods are increasingly popular for polynomial root-finding. The idea is to approxim...
International audienceAn implicit version of the shifted QR eigenvalue algorithm given in Bini et al...
Matrix methods are increasingly popular for polynomial root-finding. The idea is to approxi-mate the...