Set Covering by an All Integer Algorithm

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Set Covering by an All Integer Algorithm: Computational Experience

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Journal of the ACM (JACM) archive
Volume 20 , Issue 2 (April 1973) table of contents

Pages: 189 - 193

Year of Publication: 1973

ISSN:0004-5411

Authors

Ronald D. Koncal	Case Western Reserve University, Department of Operations Research, Cleveland, Ohio
Harvey M. Salkin	Case Western Reserve University, Department of Operations Research, Cleveland, Ohio

Publisher

ACM New York, NY, USA

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Downloads (6 Weeks): 5, Downloads (12 Months): 48, Citation Count: 5

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ABSTRACT

Computational experience with a modified linear programming method for the inequality or equality set covering problem (i.e. minimize cx subject to Ex ≥ e or Ex = e, xi = 0 or 1, where E is a zero-one matrix, e is a column of ones, and c is a nonnegative integral row) is presented. The zero-one composition of the constraint matrix and the right-hand side of ones suggested an algorithm in which dual simplex iterations are performed whenever unit pivots are available and Gomory all integer cuts are adjoined when they are not. Applications to enumerative and heuristic schemes are also discussed.

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	ANDREW, G , HOFFMAN, T., AND KRBEK, C. On the generalized set covering problem ORSA/TIMS Conf., May 1968.
	2	BALAS, E., AND PADBERG, M. On the set covering problem Manag. Sci. Res. Rep 197, Carnegie-Mellon U , Pittsburgh, Pa., Feb 1970; rev. June 1971; also Oper Res. (to appear).
	3	BXLINSKI, M. L. Integer programming: methods, uses, computation. Manag. Sci. 12, 3 (Nov. 1965), 253-313.
	4	GARFINKEL, R. S,, AND NEMHAUSER, G. L. The set-partitioning problem: set covering with equahty constraints. Oper. Res. 17 (1969), 848-856.
	5	GOMORY, R.E. All-integer integer programming algorithm IBM Res Ctr Rep. RC-189, Jan. 1960; also in Industrial Scheduling, J. F. Muth and E L. Thompson, Eds., Prentice- Hall, Englewood Cliffs, N J., 1963, pp. 193-206.
	6	LEMKFE, C., SALKIN, H., AND SPIELBERG, K. Set covering by single branch enumeration wit linear programming subproblems. IBM N. Y. ScI. Ctr. Rep. 320-2979, Oct. 1969; also in Oper. Res. 19 (1971), 998-1022
	7	Rums, J. A technique for the solution of massive set covering problems, with application to airline crew scheduling. IBM Philadelphia Sci. Ctr. Rep. 320-3004, Sept. 1971
	8	SALKIN, H. M, AND KONCAL, R. A Dual all-integer algorithm (in revised simplex form) for the set covering problem. Dep. of Oper. Res. Tech. Memo 250, Case Western Reserve U., Cleveland, Ohio, Aug. 1971.
	9	SALKIN, H. M., AND KONCAL, R. A pseudo dual all-integer algorithm for the set covering problem. Dep. of Oper. Res. Tech. Mere. 204, Case Western Reserve U., Cleveland, Ohio, Nov. 1970.

CITED BY 5

	Charles R. Kime , Ramachendra P. Batni , Jeffrey D. Russell, An Efficient Algorithm for Finding an Irredundant Set Cover, Journal of the ACM (JACM), v.21 n.3, p.351-355, July 1974
	Gideon Frieder , Harry J. Saal, A process for the determination of addresses in variable length addressing, Communications of the ACM, v.19 n.6, p.335-338, June 1976
	Jorng-Tzong Horng , Gwo-Dong Chen , Baw-Jhiune Liu, Extending SQL with graph matching and set covering for decision support applications, Journal of Management Information Systems, v.11 n.1, p.101-129, June 1994
	Matthias F. Stallmann , Franc Brglez, High-contrast algorithm behavior: observation, conjecture, and experimental design, Experimental computer science on Experimental computer science, p.13-13, June 13-14, 2007, San Diego
	Matthias F. Stallmann , Franc Brglez, High-contrast algorithm behavior: observation, hypothesis, and experimental design, Proceedings of the 2007 workshop on Experimental computer science, p.12-es, June 13-14, 2007, San Diego, California