This paper describes a computational method for improving the accuracy of a given eigenvalue and its associated eigenvector. The method is analogous to iterative improvement for the solution of linear systems. An iterative algorithm using working precision arithmetic is applied to increase the accuracy of the eigenpair. The only extended precision computation is the residual calculation. The method is related to inverse iteration and to Newton's method applied to the eigenvalue problem
AbstractA numerical algorithm for the inverse eigenvalue problem for symmetric matrices is developed...
実対称定値一般固有値問題の固有値が指定区間にある固有対の近似をうまく調整されたフィルタを利用して求める.フィルタを2-3回繰り返し適用して残差を減らして近似対を改良することを試みる.For a rea...
AbstractWe show that backward errors and pseudospectra combined together are useful tools to assess ...
A computational method is described for improving the accuracy of a given eigenvalue and its associa...
We examine the behavior of Newton's method in floating point arithmetic, allowing for extended preci...
AbstractWe investigate novel iterative refinement methods for solving eigenvalue problems which are ...
Many fields make use of the concepts about eigenvalues in their studies. In engineering, physics, st...
The algorithms of inverse iteration and Rayleigh quotient iteration for approximating an eigenpair o...
AbstractInverse iteration and Newton's method for the eigenvalue problem are related to best approxi...
We discuss the close connection between eigenvalue computation and optimization using the Newton met...
Inverse iteration is a standard technique for finding selected eigenvectors associated with eigenval...
15 pagesThe aim of this paper is the comparison of the recent improvements of two methods to compute...
A main concern of scientific computing is the validation of numerical simulations. Indeed, several f...
AbstractThis paper describes a way of approximating the optimal extrapolation of iterative technique...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/68981/2/10.1177_003754976400300310.pd
AbstractA numerical algorithm for the inverse eigenvalue problem for symmetric matrices is developed...
実対称定値一般固有値問題の固有値が指定区間にある固有対の近似をうまく調整されたフィルタを利用して求める.フィルタを2-3回繰り返し適用して残差を減らして近似対を改良することを試みる.For a rea...
AbstractWe show that backward errors and pseudospectra combined together are useful tools to assess ...
A computational method is described for improving the accuracy of a given eigenvalue and its associa...
We examine the behavior of Newton's method in floating point arithmetic, allowing for extended preci...
AbstractWe investigate novel iterative refinement methods for solving eigenvalue problems which are ...
Many fields make use of the concepts about eigenvalues in their studies. In engineering, physics, st...
The algorithms of inverse iteration and Rayleigh quotient iteration for approximating an eigenpair o...
AbstractInverse iteration and Newton's method for the eigenvalue problem are related to best approxi...
We discuss the close connection between eigenvalue computation and optimization using the Newton met...
Inverse iteration is a standard technique for finding selected eigenvectors associated with eigenval...
15 pagesThe aim of this paper is the comparison of the recent improvements of two methods to compute...
A main concern of scientific computing is the validation of numerical simulations. Indeed, several f...
AbstractThis paper describes a way of approximating the optimal extrapolation of iterative technique...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/68981/2/10.1177_003754976400300310.pd
AbstractA numerical algorithm for the inverse eigenvalue problem for symmetric matrices is developed...
実対称定値一般固有値問題の固有値が指定区間にある固有対の近似をうまく調整されたフィルタを利用して求める.フィルタを2-3回繰り返し適用して残差を減らして近似対を改良することを試みる.For a rea...
AbstractWe show that backward errors and pseudospectra combined together are useful tools to assess ...