Polygons as sections of higher-dimensional polytopes
Abstract
We show that every heptagon is a section of a 3-polytope with 6 vertices. This implies that every n-gon with n≥ 7 can be obtained as a section of a (2+n7)-dimensional polytope with at most 6n7 vertices; and provides a geometric proof of the fact that every nonnegative n× m matrix of rank 3 has nonnegative rank not larger than 6(n,m)7. This result has been independently proved, algebraically, by Shitov (J. Combin. Theory Ser. A 122, 2014).
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