Topological obstructions for vertex numbers of Minkowski sums
Abstract
We show that for polytopes P1, P2, ..., Pr ⊂ d, each having ni d+1 vertices, the Minkowski sum P1 + P2 + ... + Pr cannot achieve the maximum of Πi ni vertices if r d. This complements a recent result of Fukuda & Weibel (2006), who show that this is possible for up to d-1 summands. The result is obtained by combining methods from discrete geometry (Gale transforms) and topological combinatorics (van Kampen--type obstructions) as developed in R\"orig, Sanyal, and Ziegler (2007).
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