Raman Sanyal
Published 2007-02-23, updated 2007-03-22Version 2
We show that for polytopes P_1, P_2, ..., P_r \subset \R^d, each having n_i \ge d+1 vertices, the Minkowski sum P_1 + P_2 + ... + P_r cannot achieve the maximum of \prod_i n_i vertices if r \ge 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\"{o}rig, Sanyal, and Ziegler (2007).
Comments: 13 pages, 2 figures; Improved exposition and less typos. Construction/example and remarks added
Journal: J. Combin. Theory Ser. A 116 (2009), no. 1, 168-179
Sharp bounds for the number of regions of maxout networks and vertices of Minkowski sums
The flag polynomial of the Minkowski sum of simplices
Invariant chains in algebra and discrete geometry
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