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EJC
2000

Cyclic Polytopes and Oriented Matroids

14 years 7 days ago
Cyclic Polytopes and Oriented Matroids
Consider the moment curve in the real Euclidean space Rd defined parametrically by the map : R Rd , t (t) = (t, t2 , . . . , td ). The cyclic d-polytope Cd(t1, . . . , tn) is the convex hull of the n, n > d, different points on this curve. The matroidal analogues are the alternating oriented uniform matroids. A polytope [resp. matroid polytope] is called cyclic if its face lattice is isomorphic to that of Cd(t1, . . . , tn). We give combinatorial and geometrical characterizations of cyclic [matroid] polytopes. A simple evenness criterion determining the facets of Cd(t1, . . . , tn) was given by David Gale. We characterize the admissible orderings of the vertices of the cyclic polytope, i.e., those linear orderings of the vertices for which Gale's evenness criterion holds. Proofs give a systematic account on an oriented matroid approach to cyclic polytopes.
Raul Cordovil, Pierre Duchet
Added 18 Dec 2010
Updated 18 Dec 2010
Type Journal
Year 2000
Where EJC
Authors Raul Cordovil, Pierre Duchet
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