The maximum number of faces of the Minkowski sum of two convex polytopes

Abstract

We derive tight expressions for the maximum number of k-faces, 0kd-1, of the Minkowski sum, P1P2, of two d-dimensional convex polytopes P1 and P2, as a function of the number of vertices of the polytopes. For even dimensions d2, the maximum values are attained when P1 and P2 are cyclic d-polytopes with disjoint vertex sets. For odd dimensions d3, the maximum values are attained when P1 and P2 are d2-neighborly d-polytopes, whose vertex sets are chosen appropriately from two distinct d-dimensional moment-like curves.