AbstractApplying a permuted diagonal similarity transform DPAPTD−1 to a matrix A before calculating its eigenvalues can improve the speed and accuracy with which the eigenvalues are computed. This is often called balancing. This paper describes several balancing algorithms for sparse matrices and compares them against each other and the traditional dense algorithm. We first discuss our sparse implementation of the dense algorithm; our code is faster than the dense algorithm when the density of the matrix is no more than approximately .5, and is much faster for large, sparse matrices. We next describe a set of randomized balancing algorithms for matrices that are not given explicitly, i.e. given a vector x, we can compute only Ax and perhaps...
. The Rational Krylov algorithm computes eigenvalues and eigenvectors of a regular not necessarily s...
Abstract A matrix balancing problem and an eigenvalue problem are transformed into two minimum-norm ...
The aim of this thesis is to conduct a general investigation in the field of sparse matrices, to inv...
AbstractApplying a permuted diagonal similarity transform DPAPTD−1 to a matrix A before calculating ...
Balancing a matrix by a simple and accurate similarity transformation can improve the speed and accu...
AbstractBalancing a matrix by a simple and accurate similarity transformation can improve the speed ...
Abstract. Balancing a matrix is a preprocessing step while solving the nonsymmetric eigenvalue probl...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
An n 2 n matrix with nonnegative entries is said to be balanced if for each i = 1; : : : ; n, the s...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN028558 / BLDSC - British Library D...
This talk discusses the computation of a small set of exterior eigenvalues of a large sparse matrix ...
We discuss the generalized Davidson's algorithm for computing accurate approximations of the k princ...
In this dissertation, we consider the symmetric eigenvalue problem and the buckling eigenvalue prob...
Rayleigh Quotient Minimization methods for the calculation of minimal eigenpair achieve great effici...
This dissertation discusses parallel algorithms for the generalized eigenvalue problem Ax = λBx wher...
. The Rational Krylov algorithm computes eigenvalues and eigenvectors of a regular not necessarily s...
Abstract A matrix balancing problem and an eigenvalue problem are transformed into two minimum-norm ...
The aim of this thesis is to conduct a general investigation in the field of sparse matrices, to inv...
AbstractApplying a permuted diagonal similarity transform DPAPTD−1 to a matrix A before calculating ...
Balancing a matrix by a simple and accurate similarity transformation can improve the speed and accu...
AbstractBalancing a matrix by a simple and accurate similarity transformation can improve the speed ...
Abstract. Balancing a matrix is a preprocessing step while solving the nonsymmetric eigenvalue probl...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
An n 2 n matrix with nonnegative entries is said to be balanced if for each i = 1; : : : ; n, the s...
SIGLEAvailable from British Library Document Supply Centre-DSC:DXN028558 / BLDSC - British Library D...
This talk discusses the computation of a small set of exterior eigenvalues of a large sparse matrix ...
We discuss the generalized Davidson's algorithm for computing accurate approximations of the k princ...
In this dissertation, we consider the symmetric eigenvalue problem and the buckling eigenvalue prob...
Rayleigh Quotient Minimization methods for the calculation of minimal eigenpair achieve great effici...
This dissertation discusses parallel algorithms for the generalized eigenvalue problem Ax = λBx wher...
. The Rational Krylov algorithm computes eigenvalues and eigenvectors of a regular not necessarily s...
Abstract A matrix balancing problem and an eigenvalue problem are transformed into two minimum-norm ...
The aim of this thesis is to conduct a general investigation in the field of sparse matrices, to inv...