On disjunction convex hulls for generalized cross polytopes
Abstract
We continue the study of the natural polytope D in Rn+d associated with the disjunction of a set of n+1 polytopes in Rd, managed by n binary variables. Already D had been characterized for arbitrary n≥ 1 and (i) d∈\1,2\, and (ii) for a broad generalization of hyper-rectangles. In both cases, the complete characterization employs full optimal big-M lifting. Here, we give a complete description of D for the case of n=1 and arbitrary d, when the (two) polytopes are arbitrary generalized cross polytopes. Furthermore, we characterize when our complete description employs only optimal big-M lifting. For n>1, we generalize the family of facet-describing inequalities used for n=1. Finally, we carry out some computational experiments demonstrating the value of our theoretical results.
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