论文信息 - The effects of scalings on the performance of a sparse symmetric indefinite solver

The effects of scalings on the performance of a sparse symmetric indefinite solver

Scaling is an important part of solving large sparse symmetric linear systems. In a direct method where the analysis is based only on strucuture it can help by reducing the number of delayed pivots and hence the memory required, the size of the computed factors, and total solution time. In this paper, we examine the effects of scaling on the performance of a sparse symmetric indefinite solver than implements a multifrontal algorithm. We compare several scalings from the mathematical software library HSL, using a large test set of 367 problems from a wide range of practical applications.

Jennifer A. Scott | Jd Hogg

[1] Iain S. Duff,et al. MA57---a code for the solution of sparse symmetric definite and indefinite systems , 2004, TOMS.

[2] Jorge J. Moré,et al. Benchmarking optimization software with performance profiles , 2001, Math. Program..

[3] Serge Gratton,et al. A Note on GMRES Preconditioned by a Perturbed L D LT Decomposition with Static Pivoting , 2007, SIAM J. Sci. Comput..

[4] F. L. Bauer. Optimally scaled matrices , 1963 .

[5] Jennifer A. Scott,et al. An out-of-core sparse Cholesky solver , 2009, TOMS.

[6] J. Reid,et al. On the Automatic Scaling of Matrices for Gaussian Elimination , 1972 .

[7] James Demmel,et al. A Supernodal Approach to Sparse Partial Pivoting , 1999, SIAM J. Matrix Anal. Appl..

[8] Vipin Kumar,et al. A Fast and High Quality Multilevel Scheme for Partitioning Irregular Graphs , 1998, SIAM J. Sci. Comput..

[9] Iain S. Duff,et al. Strategies for Scaling and Pivoting for Sparse Symmetric Indefinite Problems , 2005, SIAM J. Matrix Anal. Appl..

[10] Iain S. Duff,et al. On Algorithms For Permuting Large Entries to the Diagonal of a Sparse Matrix , 2000, SIAM J. Matrix Anal. Appl..

[11] Michele Benzi,et al. Preconditioning Highly Indefinite and Nonsymmetric Matrices , 2000, SIAM J. Sci. Comput..

[12] Patrick R. Amestoy,et al. An Approximate Minimum Degree Ordering Algorithm , 1996, SIAM J. Matrix Anal. Appl..