Symmetric polytopes whose automorphism groups are 2-groups
Abstract
The present work investigates regular, semiregular, and chiral polytopes of any rank , whose automorphism groups are 2-groups. There is a large variety of rather small finite regular or alternating semiregular polytopes with automorphism groups of 2-power order: for such polytopes with toroidal sections of rank 3, the various sections of rank 3 can be entirely prescribed (possibly with one exception in the semiregular case). It is also shown that having a 2-group as automorphism group is hereditary under taking universal extensions: the universal extension of a given regular, chiral, or alternating semiregular polytope with a finite or infinite 2-group as automorphism group, is a polytope of one rank higher with an infinite 2-group an automorphism group.
Cite
@article{arxiv.2512.15511,
title = {Symmetric polytopes whose automorphism groups are 2-groups},
author = {Gabriel Cunningham and Yan-Quan Feng and Dong-Dong Hou and Egon Schulte},
journal= {arXiv preprint arXiv:2512.15511},
year = {2025}
}
Comments
19 pages