Flat extensions of abstract polytopes
Abstract
We consider the problem of constructing an abstract -polytope with facets isomorphic to a given -polytope , where . In particular, we consider the case where we want to be -flat, meaning that every -face is incident to every -face (facet). We show that if admits such a flat extension for a given , then the facet graph of is -colorable. Conversely, we show that if the facet graph is -colorable and is prime, then admits a flat extension for that . We also show that if is facet-bipartite, then for every even , there is a flat extension such that every automorphism of extends to an automorphism of . Finally, if is a facet-bipartite -polytope and is a vertex-bipartite -polytope, we describe a flat amalgamation of and , an -polytope that is -flat, with -faces isomorphic to and co--faces isomorphic to .
Keywords
Cite
@article{arxiv.2001.07677,
title = {Flat extensions of abstract polytopes},
author = {Gabe Cunningham},
journal= {arXiv preprint arXiv:2001.07677},
year = {2020}
}