Classifying complements for groups. Applications

TL;DR

This paper provides a comprehensive classification of all complements of a subgroup within a group, using deformation maps and cohomological objects, with applications to counting group isomorphism types.

Contribution

It introduces a new method to classify and describe all A-complements of a group G via deformation maps and cohomology, extending the understanding of group factorizations.

Findings

Classification of A-complements via deformation maps

Existence of a bijection with a cohomological object

Application to counting group isomorphism types

Abstract

Let $A \leq G$ be a subgroup of a group $G$. An $A$-complement of $G$ is a subgroup $H$ of $G$ such that $G = A H$ and $A \cap H = \{1\}$. The \emph{classifying complements problem} asks for the description and classification of all $A$-complements of $G$. We shall give the answer to this problem in three steps. Let $H$ be a given $A$-complement of $G$ and $(\triangleright, \triangleleft)$ the canonical left/right actions associated to the factorization $G = A H$. To start with, $H$ is deformed to a new $A$-complement of $G$, denoted by $H_r$, using a certain map $r: H \to A$ called a deformation map of the matched pair $(A, H, \triangleright, \triangleleft)$. Then the description of all complements is given: ${\mathbb H}$ is an $A$-complement of $G$ if and only if ${\mathbb H}$ is isomorphic to $H_{r}$, for some deformation map $r: H \to A$. Finally, the classification of complements proves that there exists a bijection between the isomorphism classes of all $A$-complements of $G$ and a cohomological object ${\mathcal D} \, (H, A \, | \,(\triangleright, \triangleleft))$. As an application we show that the theoretical formula for computing the number of isomorphism types of all groups of order $n$ arises only from the factorization $S_n = S_{n-1} C_n$.