Add to ORKGPole-swapping algorithms, which are generalizations of the QZ algorithm for the generalized eigenvalue problem, are studied. A new modular (and therefore more flexible) convergence theory that applies to all pole-swapping algorithms is developed. A key component of all such algorithms is a procedure that swaps two adjacent eigenvalues in a triangular pencil. An improved swapping routine is developed, and its superiority over existing methods is demonstrated by a backward error analysis and numerical tests. The modularity of the new convergence theory and the generality of the pole-swapping approach shed new light on bi-directional chasing algorithms, optimally packed shifts, and bulge pencils, and allow the design of novel algorithms
AbstractWe develop a new algorithm, KQZ, for solving the generalized eigenvalue problem Mx=λLx which...
This manuscript focusses on an alternative method for computing the eigenvalues of a pencil of two m...
This algorithm is an extension of Moler and Stewart's QZ algorithm with some added features for savi...
Pole-swapping algorithms, which are generalizations of the QZ algorithm for the generalized eigenval...
Pole-swappingalgorithmsaregeneralizationsofbulge-chasingalgorithms for the generalized eigenvalue pr...
The matrix eigenvalue problem is often encountered in scientific computing applications. Although it...
Watkins DS, Elsner L. Chasing Algorithmus for the Eigenvalue Problem. SIAM Journal on matrix analysi...
Watkins DS, Elsner L. Theory of decomposition and bulge-chasing algorithms for the generalized eigen...
AbstractWe develop the theory of convergence of a generic GR algorithm for the matrix eigenvalue pro...
AbstractIn 1989, Bai and Demmel proposed the multishift QR algorithm for eigenvalue problems. Althou...
The implicitly shifted (bulge chasing ) QZ algorithm is the most popular method for solving the gene...
In the article "A Rational QZ Method"" by D. Camps, K. Meerbergen, and R. Vandebril [SIAM J. Matrix ...
Recently an extension of the class of matrices admitting a Francis type of multishift QR algorithm w...
It is observed that an algorithm proposed in 1985 by Kautsky, Nichols and Van Dooren (KNV) amounts t...
Eigenvalue computations are ubiquitous in science and engineering. John Francis's implicitly shifted...
AbstractWe develop a new algorithm, KQZ, for solving the generalized eigenvalue problem Mx=λLx which...
This manuscript focusses on an alternative method for computing the eigenvalues of a pencil of two m...
This algorithm is an extension of Moler and Stewart's QZ algorithm with some added features for savi...
Pole-swapping algorithms, which are generalizations of the QZ algorithm for the generalized eigenval...
Pole-swappingalgorithmsaregeneralizationsofbulge-chasingalgorithms for the generalized eigenvalue pr...
The matrix eigenvalue problem is often encountered in scientific computing applications. Although it...
Watkins DS, Elsner L. Chasing Algorithmus for the Eigenvalue Problem. SIAM Journal on matrix analysi...
Watkins DS, Elsner L. Theory of decomposition and bulge-chasing algorithms for the generalized eigen...
AbstractWe develop the theory of convergence of a generic GR algorithm for the matrix eigenvalue pro...
AbstractIn 1989, Bai and Demmel proposed the multishift QR algorithm for eigenvalue problems. Althou...
The implicitly shifted (bulge chasing ) QZ algorithm is the most popular method for solving the gene...
In the article "A Rational QZ Method"" by D. Camps, K. Meerbergen, and R. Vandebril [SIAM J. Matrix ...
Recently an extension of the class of matrices admitting a Francis type of multishift QR algorithm w...
It is observed that an algorithm proposed in 1985 by Kautsky, Nichols and Van Dooren (KNV) amounts t...
Eigenvalue computations are ubiquitous in science and engineering. John Francis's implicitly shifted...
AbstractWe develop a new algorithm, KQZ, for solving the generalized eigenvalue problem Mx=λLx which...
This manuscript focusses on an alternative method for computing the eigenvalues of a pencil of two m...
This algorithm is an extension of Moler and Stewart's QZ algorithm with some added features for savi...