On the relative strength of split,triangle and quadrilateral cuts |
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Authors: | Amitabh Basu Pierre Bonami Gérard Cornuéjols François Margot |
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Affiliation: | 1.Tepper School of Business,Carnegie Mellon University,Pittsburgh,USA;2.LIF, Faculté des Sciences de Luminy,Université de Marseille,Marseille,France |
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Abstract: | Integer programs defined by two equations with two free integer variables and nonnegative continuous variables have three types of nontrivial facets: split, triangle or quadrilateral inequalities. In this paper, we compare the strength of these three families of inequalities. In particular we study how well each family approximates the integer hull. We show that, in a well defined sense, triangle inequalities provide a good approximation of the integer hull. The same statement holds for quadrilateral inequalities. On the other hand, the approximation produced by split inequalities may be arbitrarily bad. |
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