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Main Authors: Zhang, Qiang, Zhao, Dongxiao
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2409.09567
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author Zhang, Qiang
Zhao, Dongxiao
author_facet Zhang, Qiang
Zhao, Dongxiao
contents A group $G$ is called a Howson group if the intersection $H\cap K$ of any two finitely generated subgroups $H, K<G$ is again finitely generated, and called a strongly Howson group when a uniform bound for the rank of $H\cap K$ can be obtained from the ranks of $H$ and $K$. Clearly, every strongly Howson group is a Howson group, but it is unclear in the literature whether the converse is true. In this note, we show that the converse is not true by constructing the first Howson groups which are not strongly Howson.
format Preprint
id arxiv_https___arxiv_org_abs_2409_09567
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Howson groups which are not strongly Howson
Zhang, Qiang
Zhao, Dongxiao
Group Theory
Geometric Topology
A group $G$ is called a Howson group if the intersection $H\cap K$ of any two finitely generated subgroups $H, K<G$ is again finitely generated, and called a strongly Howson group when a uniform bound for the rank of $H\cap K$ can be obtained from the ranks of $H$ and $K$. Clearly, every strongly Howson group is a Howson group, but it is unclear in the literature whether the converse is true. In this note, we show that the converse is not true by constructing the first Howson groups which are not strongly Howson.
title Howson groups which are not strongly Howson
topic Group Theory
Geometric Topology
url https://arxiv.org/abs/2409.09567