AbstractThe usual Sturmanian sequence for finding the eigenvalues of a tridiagonal matrix arising from the radial Schroedinger equation is found to be unstable. A self-stabilising continued fraction approach is suggested
This report summarizes the results of our project {open_quotes}Numerical Methods for the Unsymmetric...
Non-selfadjoint tridiagonal matrices play a role in the discretization and truncation of the Schrödi...
Block tridiagonal matrices arise in applied mathematics, physics, and signal processing. Many applic...
In the third part of his famous 1926 paper ‘Quantisierung als Eigenwertproblem’, Schrödinger came ac...
We consider the solution of the homogeneous equation (J \Gamma I)x = 0 where J is a tridiagonal mat...
A solution is given for a problem on eigenvalues of some symmetric tridiagonal matrices suggested by...
WOS: 000424722100007We introduce r-periodic tridiagonal matrices for given integer r >= 2. In which ...
We characterize the eigenvalues and eigenvectors of a class of complex valued tridiagonal n by n mat...
AbstractWe apply a novel approach to approximate within ϵ to all the eigenvalues of an n × n symmetr...
Several relative condition numbers that exploit tridiagonal form are derived. Some of them use tridi...
SIGLEAvailable from British Library Document Supply Centre- DSC:7673.7004(TAM 92-77) / BLDSC - Briti...
Abstract: A solution is given for a problem on eigenvalues of some symmetric tridiagonal matrices su...
The computation of the eigenvalue decomposition of symmetricmatrices is one of the most investigated...
A divide-and-conquer method is developed for solving the generalized eigenvalue problem Ax = Bx, whe...
We derive an explicit formula for the inverse of a general, periodic, tridiagonal matrix. Our approa...
This report summarizes the results of our project {open_quotes}Numerical Methods for the Unsymmetric...
Non-selfadjoint tridiagonal matrices play a role in the discretization and truncation of the Schrödi...
Block tridiagonal matrices arise in applied mathematics, physics, and signal processing. Many applic...
In the third part of his famous 1926 paper ‘Quantisierung als Eigenwertproblem’, Schrödinger came ac...
We consider the solution of the homogeneous equation (J \Gamma I)x = 0 where J is a tridiagonal mat...
A solution is given for a problem on eigenvalues of some symmetric tridiagonal matrices suggested by...
WOS: 000424722100007We introduce r-periodic tridiagonal matrices for given integer r >= 2. In which ...
We characterize the eigenvalues and eigenvectors of a class of complex valued tridiagonal n by n mat...
AbstractWe apply a novel approach to approximate within ϵ to all the eigenvalues of an n × n symmetr...
Several relative condition numbers that exploit tridiagonal form are derived. Some of them use tridi...
SIGLEAvailable from British Library Document Supply Centre- DSC:7673.7004(TAM 92-77) / BLDSC - Briti...
Abstract: A solution is given for a problem on eigenvalues of some symmetric tridiagonal matrices su...
The computation of the eigenvalue decomposition of symmetricmatrices is one of the most investigated...
A divide-and-conquer method is developed for solving the generalized eigenvalue problem Ax = Bx, whe...
We derive an explicit formula for the inverse of a general, periodic, tridiagonal matrix. Our approa...
This report summarizes the results of our project {open_quotes}Numerical Methods for the Unsymmetric...
Non-selfadjoint tridiagonal matrices play a role in the discretization and truncation of the Schrödi...
Block tridiagonal matrices arise in applied mathematics, physics, and signal processing. Many applic...
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