Add to ORKGA new parallel Jacobi-like algorithm is developed for computing the eigenvalues of a general complex matrix. Most parallel methods for this parallel typically display only linear convergence. Sequential norm-reducing algorithms also exit and they display quadratic convergence in most cases. The new algorithm is a parallel form of the norm-reducing algorithm due to Eberlein. It is proven that the asymptotic convergence rate of this algorithm is quadratic. Numerical experiments are presented which demonstrate the quadratic convergence of the algorithm and certain situations where the convergence is slow are also identified. The algorithm promises to be very competitive on a variety of parallel architectures
textThis thesis demonstrates an efficient parallel method of solving the generalized eigenvalue prob...
AbstractWe give a cubic correction step for improving the current eigenvalue algorithms for computin...
textThis thesis demonstrates an efficient parallel method of solving the generalized eigenvalue prob...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
AbstractThis paper discusses a generalization for non-Hermitian matrices of the Jacobi eigenvalue pr...
AbstractThe computation of eigenvalues and eigenvectors of a real symmetric matrix A with distinct e...
The paper describes several efficient parallel implementations of the one-sided hyperbolic Jacobi-ty...
Jacobi-based algorithms have attracted attention as they have a high degree of potential parallelism...
AbstractWe give a cubic correction step for improving the current eigenvalue algorithms for computin...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
The paper proposes a parallel algorithm to compute the eigenvalues and eigenvectors of a real symmet...
Graduation date: 1996Computing eigenpairs of a matrix corresponding to a specific geometry in the co...
This dissertation discusses parallel algorithms for the generalized eigenvalue problem Ax = λBx wher...
AbstractSystolic arrays have become established in principle, if not yet in practice, as a way of in...
This book is primarily intended as a research monograph that could also be used in graduate courses ...
textThis thesis demonstrates an efficient parallel method of solving the generalized eigenvalue prob...
AbstractWe give a cubic correction step for improving the current eigenvalue algorithms for computin...
textThis thesis demonstrates an efficient parallel method of solving the generalized eigenvalue prob...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
AbstractThis paper discusses a generalization for non-Hermitian matrices of the Jacobi eigenvalue pr...
AbstractThe computation of eigenvalues and eigenvectors of a real symmetric matrix A with distinct e...
The paper describes several efficient parallel implementations of the one-sided hyperbolic Jacobi-ty...
Jacobi-based algorithms have attracted attention as they have a high degree of potential parallelism...
AbstractWe give a cubic correction step for improving the current eigenvalue algorithms for computin...
AbstractThis article presents a new Jacobi-like eigenvalue algorithm for non-Hermitian almost diagon...
The paper proposes a parallel algorithm to compute the eigenvalues and eigenvectors of a real symmet...
Graduation date: 1996Computing eigenpairs of a matrix corresponding to a specific geometry in the co...
This dissertation discusses parallel algorithms for the generalized eigenvalue problem Ax = λBx wher...
AbstractSystolic arrays have become established in principle, if not yet in practice, as a way of in...
This book is primarily intended as a research monograph that could also be used in graduate courses ...
textThis thesis demonstrates an efficient parallel method of solving the generalized eigenvalue prob...
AbstractWe give a cubic correction step for improving the current eigenvalue algorithms for computin...
textThis thesis demonstrates an efficient parallel method of solving the generalized eigenvalue prob...