On disjunction convex hulls by lifting

Abstract

We study the natural extended-variable formulation for the disjunction of n+1 polytopes in Rd. We demonstrate that the convex hull D in the natural extended-variable space Rd+n is given by full optimal big-M lifting (i) when d≤ 2 (and that it is not generally true for d≥ 3), and also (ii) under some technical conditions, when the polytopes have a common facet-describing constraint matrix, for arbitrary d≥ 1 and n≥ 1. We give a broad family of examples with d≥ 3 and n=1, where the convex hull is not described after employing all full optimal big-M lifting inequalities, but it is described after one round of MIR inequalities. Additionally, we give some general results on the polyhedral structure of D, and we demonstrate that all facets of D can be enumerated in polynomial time when d is fixed.

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