Note on the Complexity of the Mixed-Integer Hull of a Polyhedron
Abstract
We study the complexity of computing the mixed-integer hull conv(Pn×Rd) of a polyhedron P. Given an inequality description, with one integer variable, the mixed-integer hull can have exponentially many vertices and facets in d. For n,d fixed, we give an algorithm to find the mixed integer hull in polynomial time. Given P=conv(V) and n fixed, we compute a vertex description of the mixed-integer hull in polynomial time and give bounds on the number of vertices of the mixed integer hull.
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