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Iterative refinement
Superlu Users' Guide
A New Analysis of Iterative Refinement and Its Application to Accurate Solution of Ill-Conditioned Sparse Linear Systems Carson
Solving Systems of Linear Equations on the CELL Processor Using Cholesky Factorization – LAPACK Working Note 184
Error Bounds from Extra-Precise Iterative Refinement
Three-Precision GMRES-Based Iterative Refinement for Least Squares Problems Carson, Erin and Higham, Nicholas J. and Pranesh, Sr
Using Mixed Precision in Numerical Computations to Speedup Linear Algebra Solvers
A Survey of Recent Developments in Parallel Implementations of Gaussian Elimination
Multiprecision Algorithms 2 / 95 Lecture 1
Mixed Precision Iterative Refinement
Design, Implementation and Testing of Extended and Mixed Precision BLAS ∗
Adaptive Dynamic Precision Iterative Refinement Jun Kyu Lee
[email protected]
PARDISO User Guide Version
Mixed-Precision Numerical Linear Algebra Algorithms: Integer Arithmetic Based LU Factorization and Iterative Refinement for Hermitian Eigenvalue Problem
Numerical Linear Algebra
Error Bounds from Extra Precise Iterative Refinement
Error Bounds from Extra Precise Iterative Refinement
On Algorithmic Variants of Parallel Gaussian Elimination: Comparison of Implementations in Terms of Performance and Numerical Pr
On Algorithmic Variants of Parallel Gaussian Elimination: Comparison of Implementations in Terms of Performance and Numerical Properties ∗
Top View
Accelerating Scientific Computations with Mixed Precision Algorithms
Exploiting the Performance of 32 Bit Floating Point Arithmetic in Obtaining 64 Bit Accuracy (Revisiting Iterative Refinement for Linear Systems)
Exploiting Mixed Precision Floating Point Hardware in Scientific Computations
"Automatic Code Generation Methods Applied to Numerical Linear Algebra
Solving Diagonally Dominant Tridiagonal Linear Systems with Fpgas in an Heterogeneous Computing Environment
Solving Systems of Linear Equations on the CELL Processor Using Cholesky Factorization – LAPACK Working Note 184
Exploiting Mixed Precision Floating Point Hardware in Scientific Computations
Mixed Precision Iterative Refinement Techniques for The
Forward Stability of Iterative Refinement with a Relaxation for Linear Systems
Accelerating the Solution of Linear Systems by Iterative Refinement in Three Precisions∗
Accelerating Scientific Computations with Mixed Precision Algorithms
Iterative Methods in Linear Algebra