Subgroups of 3-Factor Direct Products-Reference-Cited by-同舟云学术

Subgroups of 3-Factor Direct Products

Published:2019-08-01 Issue:1 Volume:73 Page:19-38
ISSN:1210-3195
Container-title:Tatra Mountains Mathematical Publications
language:en
Short-container-title:

Author:

Neuen Daniel¹,Schweitzer Pascal²

Affiliation:

1. Department of Computer Science 7 , RWTII Aachen University , Aachen , Germany

2. Department of Computer Science , Technical University Kaiserslautern , Kaiserslautern , Germany

Abstract

Abstract Extending Goursat’s Lemma we investigate the structure of subdirect products of 3-factor direct products. We construct several examples and then provide a structure theorem showing that every such group is essentially obtained by a combination of the examples. The central observation in this structure theorem is that the dependencies among the group elements in the subdirect product that involve all three factors are of Abelian nature. In the spirit of Goursat’s Lemma, for two special cases, we derive correspondence theorems between data obtained from the subgroup lattices of the three factors (as well as isomorphisms between arising factor groups) and the subdirect products. Using our results we derive an explicit formula to count the number of subdirect products of the direct product of three symmetric groups.

Publisher

Walter de Gruyter GmbH

Subject

General Mathematics

Link

https://www.sciendo.com/pdf/10.2478/tmmp-2019-0003

Reference16 articles.

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