A frontal code for the solution of sparse positive-definite symmetric systems arising from finite-element applications

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A frontal code for the solution of sparse positive-definite symmetric systems arising from finite-element applications

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ACM Transactions on Mathematical Software (TOMS) archive
Volume 25 , Issue 4 (December 1999) table of contents

Pages: 404 - 424

Year of Publication: 1999

ISSN:0098-3500

Authors

Iain S. Duff	Rutherford Appleton Lab, Oxford, UK
Jennifer A. Scott	Rutherford Appleton Lab, Oxford, UK

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 9, Downloads (12 Months): 65, Citation Count: 3

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abstract references cited by index terms review collaborative colleagues peer to peer

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ABSTRACT

We describe the design, implementation, and performance of a frontal code for the solution of large sparse symmetric systems of linear finite-element equations. The code is intended primarily for positive-definite systems, since numerical pivoting is not performed. The resulting software package, MA62, will be included in the Harwell Subroutine Library. We illustrate the performance of our new code on a range of problems arising from real engineering and industrial applications. The performance of the code is compared with that of the Harwell Subroutine Library general frontal solver MA42 and with other positive-definite codes from the Harwell Subroutine Library.

REFERENCES

Note: OCR errors may be found in this Reference List extracted from the full text article. ACM has opted to expose the complete List rather than only correct and linked references.

	1	CLIFFE, K. A., DUFF, I. S., AND SCOTT, J.A. 1998. Performance issues for frontal schemes on a cache-based high performance computer. Int. J. Num. Methods Eng. 42, 127-143.
	2	J. J. Dongarra , Jeremy Du Croz , Sven Hammarling , I. S. Duff, A set of level 3 basic linear algebra subprograms, ACM Transactions on Mathematical Software (TOMS), v.16 n.1, p.1-17, March 1990 [doi>10.1145/77626.79170]
	3	DUFF, I. S. 1981. MA32--A package for solving sparse unsymmetric systems using the frontal method. Rep. AERE R10079. Her Majesty's Stationery Office, London, UK.
	4	DUFF, I. S. 1983. Enhancements to the MA32 package for solving sparse unsymmetric equations. Rep. AERE Rl1009. Her Majesty's Stationery Office, London, UK.
	5	DUFF, I. S. 1984. Design features of a frontal code for solving sparse unsymmetric linear systems out-of-core. SIAM J. Sci. Comput. 5, 270-280.
	6	DUFF, I. S. AND REID, J.A. 1982. MA27--A set of Fortran subroutines for solving sparse symmetric sets of linear equations. Rep. AERE R10533. Her Majesty's Stationery Office, London, UK.
	7	I. S. Duff , J. A. Scott, The design of a new frontal code for solving sparse, unsymmetric systems, ACM Transactions on Mathematical Software (TOMS), v.22 n.1, p.30-45, March 1996 [doi>10.1145/225545.225550]
	8	DUFF, I. S. AND SCOTT, J.A. 1997. MA62--A new frontal code for sparse positive-definite symmetric systems from finitie-element applications. Tech. Rep. RAL-TR-97-012. Ruthorford Appleton Laboratory, Didcot, Oxon, England.
	9	DUFF, I. S., GRIMES, R. G., AND LEWIS, J. G. 1992. Users' guide for the Harwell-Boeing sparse matrix collection (Release 1). Tech. Rep. RAL-92-086. Rutherford Appleton Lab., Didcot, Oxon, United Kingdom.
	10	DUFF, I., REID, J., AND SCOTT, J. 1989. The use of profile reduction algorithms with a frontal code. Int. J. Numer. Method. Eng. 28, 2555-2568.
	11	HARTLEY, L. J., JACKSON, C. P., AND WATSON, S. P. 1996. NAMMU (release 6.3) user guide. Tech. Rep. AEA-ES-0138. Harwell Laboratory, AEA Technology, Didcot, Oxon, United Kingdom.
	12	HOOD, P. 1976. Frontal solution program for unsymmetric matrices. Int. J. Num. Methods Eng. 10, 379-400.
	13	HSL. 1996. Harwell Subroutine Library: A Catalogue of Subroutines (Release 12). AEA Technology, Didcot, Oxon, United Kingdom.
	14	IRONS, B. M. 1970. A frontal solution program for finite element analysis. Int. J. Numer. Method. Eng. 2, 5-32.
	15	RAMAGE, A. AND WATHEN, A.g. 1993. Iterative solution techniques for the Navier-Stokes equations. Tech. Rep. AM-93-01. School of Mathematics, University of Bristol, Bristol, UK.
	16	REID, J. AND SCOTT, J. 1999. Ordering symmetric sparse matrices for small profile and wavefront. Int. J. Numer. Method. Eng. 45, 1737-1755.
	17	SCOTT, g. A. 1997. Exploiting zeros in frontal solvers. Tech. Rep. RAL-TR-98-041. Rutherford Appleton Lab., Didcot, Oxon, United Kingdom.
	18	SCOTT, g. 1999. On ordering elements for a frontal solver. Commun. Numer. Methods Eng. 15, 309-323.

CITED BY 3

	Nicholas I. M. Gould , Jennifer A. Scott, A numerical evaluation of HSL packages for the direct solution of large sparse, symmetric linear systems of equations, ACM Transactions on Mathematical Software (TOMS), v.30 n.3, p.300-325, September 2004
	Jennifer A. Scott , Yifan Hu, Experiences of sparse direct symmetric solvers, ACM Transactions on Mathematical Software (TOMS), v.33 n.3, p.18-es, August 2007
	Omer Meshar , Dror Irony , Sivan Toledo, An out-of-core sparse symmetric-indefinite factorization method, ACM Transactions on Mathematical Software (TOMS), v.32 n.3, p.445-471, September 2006

INDEX TERMS

Primary Classification:
G. Mathematics of Computing
G.1 NUMERICAL ANALYSIS
G.1.0 General
Subjects: Numerical algorithms

Additional Classification:
G. Mathematics of Computing
G.1 NUMERICAL ANALYSIS
G.1.3 Numerical Linear Algebra
Subjects: Sparse, structured, and very large systems (direct and iterative methods)

General Terms:
Algorithms, Performance

Keywords:
Gaussian elimination, Level 3 BLAS, finite-element equations, sparse symmetric linear equations, symmetric frontal method

REVIEW

"Ian Gladwell : Reviewer"

The authors develop a new frontal code, MA62 in the Harwell subroutine library, for solving sparse, positive definite, linear symmetric systems. The matrices must arise from a finite element analysis, because a crucial part of the frontal appr more...

Collaborative Colleagues:

Iain S. Duff: colleagues

Jennifer A. Scott: colleagues

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