English

Flat extensions of abstract polytopes

Combinatorics 2020-01-22 v1

Abstract

We consider the problem of constructing an abstract (n+1)(n+1)-polytope QQ with kk facets isomorphic to a given nn-polytope PP, where k3k \geq 3. In particular, we consider the case where we want QQ to be (n2,n)(n-2,n)-flat, meaning that every (n2)(n-2)-face is incident to every nn-face (facet). We show that if PP admits such a flat extension for a given kk, then the facet graph of PP is (k1)(k-1)-colorable. Conversely, we show that if the facet graph is (k1)(k-1)-colorable and k1k-1 is prime, then PP admits a flat extension for that kk. We also show that if PP is facet-bipartite, then for every even kk, there is a flat extension PkP|k such that every automorphism of PP extends to an automorphism of PkP|k. Finally, if PP is a facet-bipartite nn-polytope and QQ is a vertex-bipartite mm-polytope, we describe a flat amalgamation of PP and QQ, an (m+n1)(m+n-1)-polytope that is (n2,n)(n-2,n)-flat, with nn-faces isomorphic to PP and co-(n2)(n-2)-faces isomorphic to QQ.

Keywords

Cite

@article{arxiv.2001.07677,
  title  = {Flat extensions of abstract polytopes},
  author = {Gabe Cunningham},
  journal= {arXiv preprint arXiv:2001.07677},
  year   = {2020}
}
R2 v1 2026-06-23T13:16:52.337Z