An Orthogonal High Relative Accuracy Algorithm for the Symmetric Eigenproblem
From MaRDI portal
Publication:4443828
DOI10.1137/S089547980139371XzbMath1053.65024OpenAlexW2117419843MaRDI QIDQ4443828
Julio Moro, Juan M. Molera, Froilán M. Dopico
Publication date: 19 January 2004
Published in: SIAM Journal on Matrix Analysis and Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/s089547980139371x
Related Items (15)
Asymptotic quadratic convergence of the parallel block-Jacobi EVD algorithm with dynamic ordering for Hermitian matrices ⋮ A periodic qd-type reduction for computing eigenvalues of structured matrix products to high relative accuracy ⋮ Asymptotic quadratic convergence of the serial block-Jacobi EVD algorithm for Hermitian matrices ⋮ Accurate eigenvalues of some generalized sign regular matrices via relatively robust representations ⋮ Perturbation theory for the LDU factorization and accurate computations for diagonally dominant matrices ⋮ Full block \(J\)-Jacobi method for Hermitian matrices ⋮ Accurate singular values of a class of parameterized negative matrices ⋮ On empirical eigenfunction-based ranking with \(\ell^1\) norm regularization ⋮ Convergence to diagonal form of block Jacobi-type methods ⋮ Block-oriented \(J\)-Jacobi methods for Hermitian matrices ⋮ On the global convergence of the block Jacobi method for the positive definite generalized eigenvalue problem ⋮ Relative eigenvalue and singular value perturbations of scaled diagonally dominant matrices ⋮ Numerical methods for accurate computation of the eigenvalues of Hermitian matrices and the singular values of general matrices ⋮ Implicit standard Jacobi gives high relative accuracy ⋮ Computing eigenvalues of quasi-generalized Vandermonde matrices to high relative accuracy
Uses Software
This page was built for publication: An Orthogonal High Relative Accuracy Algorithm for the Symmetric Eigenproblem
