English

Cyclic complementary extensions and skew-morphisms

Group Theory 2023-11-29 v1 Combinatorics

Abstract

A cyclic complementary extension of a finite group AA is a finite group GG which contains AA and a cyclic subgroup CC such that AC={1G}A\cap C=\{1_G\} and G=ACG=AC. For any fixed generator cc of the cyclic factor C=cC=\langle c\rangle of order nn in a cyclic complementary extension G=ACG=AC, the equations cx=φ(x)cΠ(x)cx=\varphi(x)c^{\Pi(x)}, xAx\in A, determine a permutation φ:AA\varphi:A\to A and a function Π:AZn\Pi:A\to\mathbb{Z}_n on AA characterized by the properties: (a) φ(1A)=1A\varphi(1_A)=1_A and Π(1A)1(modn)\Pi(1_A)\equiv1\pmod{n}; (b) φ(xy)=φ(x)φΠ(x)(y)\varphi(xy)=\varphi(x)\varphi^{\Pi(x)}(y) and Π(xy)i=1Π(x)Π(φi1(y))(modn)\Pi(xy)\equiv\sum_{i=1}^{\Pi(x)}\Pi(\varphi^{i-1}(y))\pmod{n}, for all x,yAx,y\in A. The permutation φ\varphi is called a skew-morphism of AA and has already been extensively studied. One of the main contributions of the present paper is the recognition of the importance of the function Π\Pi, which we call the extended power function associated with φ\varphi. We show that {\em every} cyclic complementary extension of AA is determined and can be constructed from a skew-morphism φ\varphi of AA and an extended power function Π\Pi associated with φ\varphi. As an application, we present a classification of cyclic complementary extensions of cyclic groups obtained using skew-morphisms which are group automorphisms.

Cite

@article{arxiv.2311.16395,
  title  = {Cyclic complementary extensions and skew-morphisms},
  author = {Kan Hu and Robert Jajcay},
  journal= {arXiv preprint arXiv:2311.16395},
  year   = {2023}
}

Comments

17 pages

R2 v1 2026-06-28T13:33:32.146Z