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Matrix splitting
Fast Solution of Sparse Linear Systems with Adaptive Choice of Preconditioners Zakariae Jorti
Efficient “Black-Box” Multigrid Solvers for Convection-Dominated Problems
Chapter 7 Iterative Methods for Large Sparse Linear Systems
Chebyshev and Fourier Spectral Methods 2000
Relaxed Modulus-Based Matrix Splitting Methods for the Linear Complementarity Problem †
Numerical Solution of Saddle Point Problems
Trigonometric Transform Splitting Methods for Real Symmetric Toeplitz Systems
Numerical Linear Algebra
The Jacobi-Davidson Algorithm for Solving Large Sparse Symmetric Eigenvalue Problems with Application to the Design of Accelerator Cavities
Relaxation Or Iterative Techniques for the Solution of Linear Equations
On CSCS-Based Iteration Methods for Toeplitz System of Weakly Nonlinear
Stationary Splitting Iterative Methods for the Matrix Equation Axb = C
AMS526: Numerical Analysis I (Numerical Linear Algebra For
Parallelizing the Divide and Conquer Algorithm for The
Matrix Splitting Principles
Arxiv:2108.03312V1 [Math.NA] 6 Aug 2021
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Sufficient Conditions for the Convergent Splittings of Non-Hermitian Positive Definite Matrices
Efficient Iterative and Multigrid Solvers with Applications
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Exploiting Multiple Levels of Parallelism in Sparse Matrix-Matrix Multiplication
A Circulant and Block-Diagonal Splitting Method for Solving Toeplitz Systems
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Arxiv:2104.01196V2 [Math.NA] 24 Apr 2021 Proposed As an Alternative to the Sequential Algorithm Based on a Triangular Solve
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The Spectral Decomposition of Nonsymmetric Matrices
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A Parallel Divide and Conquer Algorithm for the Symmetric Eigenvalue Problem on Distributed Memory Architectures
Matrix Splitting Principles
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An Efficient Algorithm for the Parallel Solution of High-Dimensional Differential Equations
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A Shift-Splitting Preconditioner for Non-Hermitian Positive Definite Matrices ∗1)
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Fast Matrix Splitting Iteration Method for the Linear System from Spatial Fractional Diffusion Equations
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Classical Iterative Methods for Linear Systems
On Local Circulant and Residue Splitting Iterative Method for Toeplitz-Structured Saddle Point Problems Mu-Zheng Zhu† Member, IAENG, and Ya-E Qi‡ and Guo-Feng Zhang ∗
On the Compression of Low Rank Matrices∗
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Finite Difference Methods for Differential Equations
Householder Symposium XVII Book of Abstracts
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An Efficient Algorithm for the Parallel Solution of High-Dimensional Differential Equations
Iterative Krylov Methods for Large Linear Systems Iterative Krylov Methods for Large Linear Systems
Avant-Garde Matrix Splitting for the Solution of Sparse Non-Symmetric Linear Systems
Efficient Large Scale Distributed Matrix Computation with Spark
Eigenvalue Algorithms for Symmetric Hierarchical Matrices
The PPADMM Method for Solving Quadratic Programming Problems
Multistep Matrix Splitting Iteration Preconditioning for Singular