Tese de doutoramento em Ciências - Área de Conhecimento Matemática.The development of satisfactory methods for reducing an unsymmetric matrix to tridiagonal form has been greatly hampered by the fact that there is not an accepted good algorithm for exploiting this form. Nevertheless, recently, promising elimination techniques for achieving a stable reduction to this form have been developed. But the standard QR algorithm destroys it immediately. Our work aims to fill this gap in the armoury of software tools for the matrix eigenvalue problem and so encourage the refinement of methods to reduce a matrix to tridiagonal form. The progressive quotient difference algorithm with shifts (qds) was presented by Rutishauser as early as 1954. ...
AbstractIn this paper we design a fast new algorithm for reducing an N×N quasiseparable matrix to up...
AbstractIn this paper we described block algorithms for the reduction of a real symmetric matrix to ...
For the eigenvalues of a symmetric tridiagonal matrix T, the most accurate algorithms deliver approx...
The paper discusses the following topics: attractions of the real tridiagonal case, relative eigenva...
The stable similarity reduction of a nonsymmetric square matrix to tridiagonal form has been a long-...
AbstractThe dqds algorithm was introduced in 1994 to compute singular values of bidiagonal matrices ...
AbstractThis paper presents an algorithm for similarly reducing an arbitrary real matrix to a pseudo...
在計算矩陣的特徵值(eigenvalues)中,QR演算法是一種常見的技巧. 尤其如果使用適當的移位,將可以較快得到特徵值. 在本文中提出一種新的移位策略, 我們證明這各方法是可行的,而且可適用於任何...
In this paper we consider the application of polynomial root-finding methods to the solution of the...
Abstract. The convergence results obtained by J. H. Wilkinson [Linear Algebra Appl. 1 (1968) 409420]...
Several relative condition numbers that exploit tridiagonal form are derived. Some of them use tridi...
In this talk we present a new fast method for computing the smallest absolute eigenvalue, i.e. the s...
AbstractHistorically, the algorithm for completely solving the symmetric tridiagonal eigenvalue prob...
Numerous routines are available to find the eigenvalues of a real symmetric tridiagonal matrix. Sinc...
We improve divide-and-conquer with multiple divisions for real symmetric tridiagonal eigenproblem pr...
AbstractIn this paper we design a fast new algorithm for reducing an N×N quasiseparable matrix to up...
AbstractIn this paper we described block algorithms for the reduction of a real symmetric matrix to ...
For the eigenvalues of a symmetric tridiagonal matrix T, the most accurate algorithms deliver approx...
The paper discusses the following topics: attractions of the real tridiagonal case, relative eigenva...
The stable similarity reduction of a nonsymmetric square matrix to tridiagonal form has been a long-...
AbstractThe dqds algorithm was introduced in 1994 to compute singular values of bidiagonal matrices ...
AbstractThis paper presents an algorithm for similarly reducing an arbitrary real matrix to a pseudo...
在計算矩陣的特徵值(eigenvalues)中,QR演算法是一種常見的技巧. 尤其如果使用適當的移位,將可以較快得到特徵值. 在本文中提出一種新的移位策略, 我們證明這各方法是可行的,而且可適用於任何...
In this paper we consider the application of polynomial root-finding methods to the solution of the...
Abstract. The convergence results obtained by J. H. Wilkinson [Linear Algebra Appl. 1 (1968) 409420]...
Several relative condition numbers that exploit tridiagonal form are derived. Some of them use tridi...
In this talk we present a new fast method for computing the smallest absolute eigenvalue, i.e. the s...
AbstractHistorically, the algorithm for completely solving the symmetric tridiagonal eigenvalue prob...
Numerous routines are available to find the eigenvalues of a real symmetric tridiagonal matrix. Sinc...
We improve divide-and-conquer with multiple divisions for real symmetric tridiagonal eigenproblem pr...
AbstractIn this paper we design a fast new algorithm for reducing an N×N quasiseparable matrix to up...
AbstractIn this paper we described block algorithms for the reduction of a real symmetric matrix to ...
For the eigenvalues of a symmetric tridiagonal matrix T, the most accurate algorithms deliver approx...