Abstract. Balancing a matrix is a preprocessing step while solving the nonsymmetric eigenvalue problem. Balancing a matrix reduces the norm of the matrix and hopefully this will improve the accuracy of the computation. Experiments have shown that balancing can improve the accuracy of the computed eigenval-ues. However, there exists examples where balancing increases the eigenvalue condition number (potential loss in accuracy), deteriorates eigenvector accuracy, and deteriorates the backward error of the eigenvalue decomposition. In this paper we propose a change to the stopping criteria of the LAPACK balancing al-gorithm, GEBAL. The new stopping criteria is better at determining when a matrix is nearly balanced. Our experiments show that th...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
AbstractIterative methods for solving large, sparse, symmetric eigenvalue problems often encounter c...
The investigation of the full eigenvalue and eigenvector problem in the case of multiple or close ei...
Abstract. Balancing is a common preprocessing step for the unsymmetric eigenvalue problem. If a matr...
Abstract. Balancing is a common preprocessing step for the unsymmetric eigenvalue problem. If a matr...
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 ...
A standard approach for computing eigenvectors of a non-symmetric matrix reduced to real Schurform r...
Abstract A matrix balancing problem and an eigenvalue problem are transformed into two minimum-norm ...
We study a classical iterative algorithm for balancing matrices in the L_∞ norm via a scaling transf...
summary:One of the most efficient methods for solving the polynomial eigenvalue problem (PEP) is the...
An n 2 n matrix with nonnegative entries is said to be balanced if for each i = 1; : : : ; n, the s...
In this dissertation, we consider the symmetric eigenvalue problem and the buckling eigenvalue prob...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
AbstractIterative methods for solving large, sparse, symmetric eigenvalue problems often encounter c...
The investigation of the full eigenvalue and eigenvector problem in the case of multiple or close ei...
Abstract. Balancing is a common preprocessing step for the unsymmetric eigenvalue problem. If a matr...
Abstract. Balancing is a common preprocessing step for the unsymmetric eigenvalue problem. If a matr...
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 ...
A standard approach for computing eigenvectors of a non-symmetric matrix reduced to real Schurform r...
Abstract A matrix balancing problem and an eigenvalue problem are transformed into two minimum-norm ...
We study a classical iterative algorithm for balancing matrices in the L_∞ norm via a scaling transf...
summary:One of the most efficient methods for solving the polynomial eigenvalue problem (PEP) is the...
An n 2 n matrix with nonnegative entries is said to be balanced if for each i = 1; : : : ; n, the s...
In this dissertation, we consider the symmetric eigenvalue problem and the buckling eigenvalue prob...
This PhD thesis is an important development in the theories, methods, and applications of eigenvalue...
Conventional algorithms for the (symmetric or non-symmetric) eigenvalue decomposition and the singul...
AbstractIterative methods for solving large, sparse, symmetric eigenvalue problems often encounter c...
The investigation of the full eigenvalue and eigenvector problem in the case of multiple or close ei...