A primal null-space affine-scaling method

Subscribe (Full Service)


	Search: The ACM Digital Library The Guide

	Feedback

A primal null-space affine-scaling method

Full text

Pdf (1.30 MB)

Source

ACM Transactions on Mathematical Software (TOMS) archive
Volume 20 , Issue 3 (September 1994) table of contents

Pages: 373 - 392

Year of Publication: 1994

ISSN:0098-3500

Authors

K. Kim	Kei-Myung Univ., Daegu, Korea
J. L. Nazareth	Washington State Univ., Pullman

Publisher

ACM New York, NY, USA

Bibliometrics

Downloads (6 Weeks): 9, Downloads (12 Months): 33, Citation Count: 0

Additional Information:

abstract references index terms review collaborative colleagues

Tools and Actions:	Request Permissions Review this Article Save this Article to a Binder Display Formats: BibTeX EndNote ACM Ref

DOI Bookmark:	Use this link to bookmark this Article: http://doi.acm.org/10.1145/192115.192153 What is a DOI?

ABSTRACT

This article develops an affine-scaling method for linear programming in standard primal form. Its descent search directions are formulated in terms of the null-space of the linear programming matrix, which, in turn, is defined by a suitable basis matrix. We describe some basic properties of the method and an experimental implementation that employs a periodic basis change strategy in conjunction with inexact computation of the search direction by an iterative method, specifically, the conjugate-gradient method with diagonal preconditioning. The result of a numerical study on a number of nontrivial problems representative of problems that arise in practice are reported and discussed.A key advantage of the primal null-space affine-scaling method is its compatibility with the primal simplex method. This is considered in the concluding section, along with implications for the development of a more practical implementation.

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	ADLER, I., KARMARKAR, N., RESENDE, M. G. C., AND VEIGA, G. 1986. An implementation of Karmarkar's algorithm for linear programming. Math. Program. 44, 297-336.
	2	Earl R. Barnes, A variation on Karmarkar's algorithm for solving linear programming problems, Mathematical Programming: Series A and B, v.36 n.2, p.174-182, Nov. 1986 [doi>10.1007/BF02592024]
	3	DANTZIG, G. B. 1963. Linear Programming and Extensions. Princeton University Press, Princeton, N.J.
	4	DANTZIG, G. B., AND YE, Y. 1990. A build-up interior method for linear programming: Affine scaling form. Tech. Rep. SOL 90-4, Systems Optimization Lab., Stanford Univ., Stanford, Calif.
	5	DEMBO, R., AND SAHI, S. 1984. A convergent framework for constrained nonlinear optimization. School of Organization and Management Working Paper, Series B #69, Yale Univ., New Haven, Conn.
	6	DIKIN, I. I. 1967. Iterative solution of problems of linear and quadratic programming. Soy. Math. Doklady 8, 674-675.
	7	GAY, D. M. 1986. Electronic mail distribution of linear programming test problems. Numerical Analysis Manuscript 86-0, AT & T Bell Laboratories, Murray Hill, N.J.
	8	Philip E. Gill , Walter Murray , Dulce B. Ponceleón , Michael A. Saunders, Preconditioners for indefinite systems arising in optimization, SIAM Journal on Matrix Analysis and Applications, v.13 n.1, p.292-311, Jan. 1992 [doi>10.1137/0613022]
	9	GILL, P. E., MURRAY, W., SAUNDERS, M. A., AND WRIGHT, M. H. 1987. Maintaining LU factors of a general sparse matrix. Lin. Alg. Appl. 88/89, 239-270.
	10	Gene H. Golub , Charles F. Van Loan, Matrix computations (3rd ed.), Johns Hopkins University Press, Baltimore, MD, 1996
	11	Koonchan Kim , John L. Nazareth, The effective integration of simplex and interior point techniques. part i. decomposition. part ii. null-space affine scaling, 1991
	12	KIM, K., AND NAZARETH, J. L. 1992. Implementation of a primal null-space affine scaling method and its extensions. Tech. Rep. 92-1, Washington State Univ., Pullman, Wash.
	13	LUSTIG, I. J., MARSTEN, R. E., AND SHANNO, D. F. 1992. Computational experience with a globally convergent primal-dual predictor-corrector algorithm for linear programming. Tech. Rep. SOR 92-10, Dept. of Civil Engineering and Operations Research, Princeton Univ., Princeton, N.J.
	14	N. Megiddo, Pathways to the optimal set in linear programming, on Progress in Mathematical Programming: Interior-Point and Related Methods, p.131-158, September 1989, Pacific Grove, California, United States
	15	MEHROTRA, S. 1989. Implementations of affine scaling methods: Approximate solutions of systems of linear equations using preconditioned conjugate-gradient methods. Tech. Rep. 89-04, Dept. of IEMS, Northwestern Umv., Evanston, Ill.
	16	MURTAGH, B. A., AND SAUNDERS, M. A. 1983. MINOS user's guide. Tech. Rep. SOL 83-20, Stanford Optimization Lab., Stanford, Calif.
	17	NAZARETH, J. L. 1993. Quadratic and conic approximating models in linear programming. MPS-COAL Bull. 23 (Dec.).
	18	J. L. Nazareth, Computer solution of linear programs, Oxford University Press, Inc., New York, NY, 1987
	19	J. L. Nazareth, Pricing criteria in linear programming, Progress in Mathematical Programming Interior-point and related methods, Springer-Verlag New York, Inc., New York, NY, 1988
	20	J. L. Nazareth, Implementation aids for optimization algorithms that solve sequences of linear programs, ACM Transactions on Mathematical Software (TOMS), v.12 n.4, p.307-323, Dec. 1986 [doi>10.1145/22721.22959]
	21	NAZARETH, J. L. 1985. Hierarchical implementation of optimization methods. In Numerical Optimizatio,. SIAM, Philadelphia, Penn., 199 210.
	22	RErD, J. K. 1976. Fortran subroutines for handling sparse linear programming bases. A.E.R.E.- R.8269, Computer Science and Systems Div., AERE Harwell, Oxfordshlre, U.K.
	23	D. F. Shanno , R. E. Marsten, A reduced-gradient variant of Karmarkar's algorithm and null-space projections, Journal of Optimization Theory and Applications, v.57 n.3, p.383-397, June 1988 [doi>10.1007/BF02346159]
	24	STEWART, G. W. 1988. On scaled projections and pseudo-inverses. Computer Science Tech. Rep. Series, TR-2026, Univ. of Maryland, College Park, Md.
	25	TSENG, P. 1992. Partial affine-sca\|ing for linearly constrained minimization. Dept. of Mathematics, Univ of Washington, Seattle (preprint).
	26	VANDERBEI, R. J., MEKETON, M. S., AND FREEDMAN, B~ A. 1986. A modification of Karmarkar's algorithm. Algorlthmlca 1,395 409.
	27	Y. Ye, A "build-down" scheme for linear programming, Mathematical Programming: Series A and B, v.46 n.1, p.61-72, Jan. 1990 [doi>10.1007/BF01585727]

INDEX TERMS

Primary Classification:
G. Mathematics of Computing
G.1 NUMERICAL ANALYSIS
G.1.6 Optimization
Subjects: Linear programming

General Terms:
Algorithms

Keywords:
conjugate gradients, diagonal preconditioning, interior-point algorithm, null-space affine scaling, primal method

REVIEW

"Joseph M. Lambert : Reviewer"

The primal null space affine scaling method was first proposed by Nazareth [1] to solve linear programming problems. Affine scaling is an offshoot of Karmarkar's method. An advantage of the null space version of the affine scaling method is th more...

Collaborative Colleagues:

K. Kim: colleagues

J. L. Nazareth: colleagues

Adobe Acrobat

QuickTime

Windows Media Player

Real Player