Amusing Permutation Representations of Group Extensions
Abstract
Semi-direct products of finite groups have permutation representations that are constructed from the permutation representations of their constituents. One can envision these in a metaphoric sense in which a rope is made from a bundle of threads. In this way, subgroups and quotients are easily visualized. The general idea is applied to the finite subgroups of the special unitary group of -matrices. Amusing diagrams are developed that describe the unit quaternions, the binary tetrahedral, octahedral, and icosahedral group as well as the dicyclic groups. In all cases, the quotients as subgroups of the permutation group are readily apparent. These permutation representations lead to injective homomorphisms into semi-direct products.
Cite
@article{arxiv.1812.08475,
title = {Amusing Permutation Representations of Group Extensions},
author = {Yongju Bae and J. Scott Carter and Byeorhi Kim},
journal= {arXiv preprint arXiv:1812.08475},
year = {2022}
}
Comments
More than 72 figures included to blow your mind. In this replacement, many figures have been redrawn and others have been added. Minor computational errors have been corrected. Some of the newer figures have been corrected and replaced