Authors: | Jevtić, Filip Jelić, Marija Živaljević, Rade |
Title: | Cyclohedron and Kantorovich–Rubinstein Polytopes | Journal: | Arnold Mathematical Journal | Volume: | 4 | Issue: | 1 | First page: | 87 | Last page: | 112 | Issue Date: | 1-Apr-2018 | ISSN: | 2199-6792 | DOI: | 10.1007/s40598-018-0083-4 | Abstract: | We show that the cyclohedron (Bott–Taubes polytope) Wn arises as the polar dual of a Kantorovich–Rubinstein polytope KR(ρ) , where ρ is an explicitly described quasi-metric (asymmetric distance function) satisfying strict triangle inequality. From a broader perspective, this phenomenon illustrates the relationship between a nestohedron Δ F^ (associated to a building set F^) and its non-simple deformation Δ F, where F is an irredundant or tight basis of F^ (Definition 21). Among the consequences are a new proof of a recent result of Gordon and Petrov (Arnold Math. J. 3(2):205–218, 2017) about f-vectors of generic Kantorovich–Rubinstein polytopes and an extension of a theorem of Gelfand, Graev, and Postnikov, about triangulations of the type A, positive root polytopes. |
Keywords: | Cyclohedron | Kantorovich-Rubinstein polytopes | Lipschitz polytope | Metric spaces | Nestohedron | Unimodular triangulations | Publisher: | Springer Link | Project: | Geometry and Topology of Manifolds, Classical Mechanics and Integrable Dynamical Systems Topology, geometry and global analysis on manifolds and discrete structures |
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