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Autore principale: Issini, Letizia
Natura: Preprint
Pubblicazione: 2023
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Accesso online:https://arxiv.org/abs/2311.12938
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author Issini, Letizia
author_facet Issini, Letizia
contents In this paper, we show that wreath products of groups have linear divergence, and we generalise the argument to permutational wreath products. We also prove that Houghton groups $\mathcal{H}_m$ with $m\geq 2$ and Baumslag-Solitar groups have linear divergence. We explain how to generalise the argument for wreath products so that it holds for halo products of groups whose halo is large-scale commutative. Finally, we show that wreath products of graphs and Diestel-Leader graphs have linear divergence. The argument for Diestel-Leader graphs is further generalised to horocyclic products of proper, geodesically complete, Busemann $δ$-hyperbolic spaces that are uniformly not a quasi-line.
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id arxiv_https___arxiv_org_abs_2311_12938
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle On linear divergence in finitely generated groups
Issini, Letizia
Group Theory
20F65 (Primary) 20E22, 05C76 (Secondary)
In this paper, we show that wreath products of groups have linear divergence, and we generalise the argument to permutational wreath products. We also prove that Houghton groups $\mathcal{H}_m$ with $m\geq 2$ and Baumslag-Solitar groups have linear divergence. We explain how to generalise the argument for wreath products so that it holds for halo products of groups whose halo is large-scale commutative. Finally, we show that wreath products of graphs and Diestel-Leader graphs have linear divergence. The argument for Diestel-Leader graphs is further generalised to horocyclic products of proper, geodesically complete, Busemann $δ$-hyperbolic spaces that are uniformly not a quasi-line.
title On linear divergence in finitely generated groups
topic Group Theory
20F65 (Primary) 20E22, 05C76 (Secondary)
url https://arxiv.org/abs/2311.12938