Maximal Lattice-Free Convex Sets in Linear Subspaces

Basu, Amitabh; Conforti, Michele; Cornuejols, Gerard; Zambelli, Giacomo

doi:10.1184/R1/6706727.v1

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Maximal Lattice-Free Convex Sets in Linear Subspaces

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posted on 2005-01-01, 00:00 authored by Amitabh Basu, Michele Conforti, Gerard CornuejolsGerard Cornuejols, Giacomo Zambelli

We consider a model that arises in integer programming, and show that all irredundant inequalities are obtained from maximal lattice-free convex sets in an affine subspace. We also show that these sets are polyhedra. The latter result extends a theorem of Lovász characterizing maximal lattice-free convex sets in Rⁿ

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Maximal Lattice-Free Convex Sets in Linear Subspaces

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