Iterative refinement (IR) is a popular scheme for solving a linear system of equations based on gradually improving the accuracy of an initial approximation. Originally developed to improve upon the accuracy of Gaussian elimination, interest in IR has been revived because of its suitability for execution on fast low-precision hardware such as analog devices and graphics processing units. IR generally converges when the error associated with the solution method is small, but is known to diverge when this error is large. We propose and analyze a novel enhancement to the IR algorithm by adding a line search optimization step that guarantees the algorithm will not diverge. Numerical experiments verify our theoretical results and illustrate the ...
In this note we examine the performance of a few iterative methods to solve linear systems of equati...
AbstractThis paper describes and analyzes a simple technique that accelerates the convergence of ite...
The solution of dense linear systems received much attention after the second world war, and by the ...
Stability analysis of Wilkinson’s iterative refinement method IR(ω) with a relaxation parameter ω f...
Iterative refinement is a long-standing technique for improving the accuracy of a computed solution ...
Iterative refinement is a well-known technique for improving the quality of an approximate solution ...
We present the design and testing of an algorithm for iterative refinement of the solution of linear...
Hardware trends have motivated the development of mixed precision algo-rithms in numerical linear al...
Consider using the right-preconditioned GMRES (AB-GMRES) for obtaining the minimum-norm solution of ...
summary:With the emergence of mixed precision hardware, mixed precision GMRES-based iterative refine...
LU and Cholesky matrix factorization algorithms are core subroutines used to solve systems of linear...
We propose a general algorithm for solving a $n\times n$ nonsingular linear system $Ax = b$ based on...
With the commercial availability of mixed precision hardware, mixed precision GMRES-based iterative ...
AbstractThe approximate solutions in standard iteration methods for linear systems Ax=b, with A an n...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...
In this note we examine the performance of a few iterative methods to solve linear systems of equati...
AbstractThis paper describes and analyzes a simple technique that accelerates the convergence of ite...
The solution of dense linear systems received much attention after the second world war, and by the ...
Stability analysis of Wilkinson’s iterative refinement method IR(ω) with a relaxation parameter ω f...
Iterative refinement is a long-standing technique for improving the accuracy of a computed solution ...
Iterative refinement is a well-known technique for improving the quality of an approximate solution ...
We present the design and testing of an algorithm for iterative refinement of the solution of linear...
Hardware trends have motivated the development of mixed precision algo-rithms in numerical linear al...
Consider using the right-preconditioned GMRES (AB-GMRES) for obtaining the minimum-norm solution of ...
summary:With the emergence of mixed precision hardware, mixed precision GMRES-based iterative refine...
LU and Cholesky matrix factorization algorithms are core subroutines used to solve systems of linear...
We propose a general algorithm for solving a $n\times n$ nonsingular linear system $Ax = b$ based on...
With the commercial availability of mixed precision hardware, mixed precision GMRES-based iterative ...
AbstractThe approximate solutions in standard iteration methods for linear systems Ax=b, with A an n...
Solving large-scale systems of linear equations [] { } {}bxA = is one of the most expensive and cr...
In this note we examine the performance of a few iterative methods to solve linear systems of equati...
AbstractThis paper describes and analyzes a simple technique that accelerates the convergence of ite...
The solution of dense linear systems received much attention after the second world war, and by the ...