Face numbers of centrally symmetric polytopes from split graphs

Details Face numbers of centrally symmetric polytopes from split graphs Face numbers of centrally symmetric polytopes from split graphs

2012-01-27

arxiv.org/abs/1201.5790v1

Mathematics

Metric Geometry

10 pages, 1 figure

Scientific paper

We analyze a remarkable class of centrally symmetric polytopes, the Hansen polytopes of split graphs. We confirm Kalai's 3^d-conjecture for such polytopes (they all have at least 3^d nonempty faces) and show that the Hanner polytopes among them (which have exactly 3^d nonempty faces) correspond to threshold graphs. Our study produces a new family of Hansen polytopes that have only 3^d+16 nonempty faces.

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