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Main Author: Gopaulsingh, Alexa
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2603.11309
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author Gopaulsingh, Alexa
author_facet Gopaulsingh, Alexa
contents Rosenmann and Ventura asked "What is the right definition of dependence of subgroups for general groups?". Here we aim to answer this question. We consider a definition of subgroup independence which is a special case of a category-theoretic one. It is that: Two subgroups of a group are independent if and only if any two endomorphisms, one acting on each subgroup, can be extended to an endomorphism of the group generated by these subgroups. This definition helps to illuminate that the usual condition of almost disjointness of subgroups (two subgroups $A$ and $B$ are almost disjoint if and only if $A \cap B = \{e\}$, where $e$ is the identity element) is not enough to force independence and here we find necessary and (different) sufficient conditions for subgroup independence. The aim of this note is to introduce this general notion of subgroup independence to the group theory community and to pose the open question of its characterisation. We present the partial results known up to this point. Moreover, we use the progress made so far to give a heuristic algorithm that decides subgroup independence for many cases.
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spellingShingle When are Two Subgroups Independent?
Gopaulsingh, Alexa
Group Theory
Rosenmann and Ventura asked "What is the right definition of dependence of subgroups for general groups?". Here we aim to answer this question. We consider a definition of subgroup independence which is a special case of a category-theoretic one. It is that: Two subgroups of a group are independent if and only if any two endomorphisms, one acting on each subgroup, can be extended to an endomorphism of the group generated by these subgroups. This definition helps to illuminate that the usual condition of almost disjointness of subgroups (two subgroups $A$ and $B$ are almost disjoint if and only if $A \cap B = \{e\}$, where $e$ is the identity element) is not enough to force independence and here we find necessary and (different) sufficient conditions for subgroup independence. The aim of this note is to introduce this general notion of subgroup independence to the group theory community and to pose the open question of its characterisation. We present the partial results known up to this point. Moreover, we use the progress made so far to give a heuristic algorithm that decides subgroup independence for many cases.
title When are Two Subgroups Independent?
topic Group Theory
url https://arxiv.org/abs/2603.11309