On the Set Covering Polytope. I. All the Facets with Coefficients in (0,1,2). Revision.

Abstract

While the set packing polytope, through its connection with vertex packing, has lent itself to fruitful investigations, little is known about the set covering polytope. We characterize the class of valid inequalities for the set covering polytope with coefficients equal to 0, 1, or 2, and give necessary and sufficient conditions for such an inequality to be minimal and to be facet defining. We show that all inequalities in the above class are contained in the elementary closure of the constraint set, and that 2 is the largest value of k such that all valid inequalities for the set covering polytope with integer coefficients no greater than k are contained in the elementary closure. We point out a connection between minimal inequalities in the class investigated and certain circulant submatrices of the coefficient matrix. Finally, we discuss a procedure for generating all the inequalities in the above class, as well as inequalities that cut off a fractional solution to the linear programming relaxation of the set covering problem, and inequalities whose addition to the constraint set improves the lower bound given by a feasible solution to the dual of the linear programming relaxation. (Author)

Document Details

Document Type

Technical Report

Publication Date

Feb 01, 1986

Accession Number

ADA166265

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