Symmetric Alcoved Polytopes
Combinatorics
2016-08-22 v2
Abstract
Generalized alcoved polytopes are polytopes whose facet normals are roots in a given root system. We call a set of points in an alcoved polytope a generating set if there does not exist a strictly smaller alcoved polytope containing it. The type alcoved polytopes are precisely the tropical polytopes that are also convex in the usual sense. In this case the tropical generators form a generating set. We show that for any root system other than , every alcoved polytope invariant under the natural Weyl group action has a generating set of cardinality equal to the Coxeter number of the root system.
Keywords
Cite
@article{arxiv.1201.4378,
title = {Symmetric Alcoved Polytopes},
author = {Annette Werner and Josephine Yu},
journal= {arXiv preprint arXiv:1201.4378},
year = {2016}
}
Comments
Introduction revised and typos fixed. Final version to appear in the Electronic Journal of Combinatorics