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Autori principali: Leemann, Paul-Henry, Schneeberger, Grégoire
Natura: Preprint
Pubblicazione: 2021
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Accesso online:https://arxiv.org/abs/2102.08001
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author Leemann, Paul-Henry
Schneeberger, Grégoire
author_facet Leemann, Paul-Henry
Schneeberger, Grégoire
contents If $\textbf{S}$ is a subcategory of metric spaces, we say that a group G has property $B\textbf{S}$ if any isometric action on an $\textbf{S}$-space has bounded orbits. Examples of such subcategories include metric spaces, affine real Hilbert spaces, CAT(0) cube complexes, connected median graphs, trees or ultra-metric spaces. The corresponding properties $B\textbf{S}$ are respectively Bergman's property, property FH (which, for countable groups, is equivalent to the celebrated Kazhdan's property (T)), property FW (both for CAT(0) cube complexes and for connected median graphs), property FA and uncountable cofinality. Historically many of these properties were defined using the existence of fixed points. Our main result is that for many subcategories $\textbf{S}$, the wreath product $G\wr_XH$ has property $B\textbf{S}$ if and only if both $G$ and $H$ have property $B\textbf{S}$ and $X$ is finite. On one hand, this encompasses in a general setting previously known results for properties FH and FW. On the other hand, this also applies to the Bergman's property. Finally, we also obtain that $G\wr_XH$ has uncountable cofinality if and only if both $G$ and $H$ have uncountable cofinality and $H$ acts on $X$ with finitely many orbits.
format Preprint
id arxiv_https___arxiv_org_abs_2102_08001
institution arXiv
publishDate 2021
record_format arxiv
spellingShingle Wreath products of groups acting with bounded orbits
Leemann, Paul-Henry
Schneeberger, Grégoire
Group Theory
20E22, 20F65
If $\textbf{S}$ is a subcategory of metric spaces, we say that a group G has property $B\textbf{S}$ if any isometric action on an $\textbf{S}$-space has bounded orbits. Examples of such subcategories include metric spaces, affine real Hilbert spaces, CAT(0) cube complexes, connected median graphs, trees or ultra-metric spaces. The corresponding properties $B\textbf{S}$ are respectively Bergman's property, property FH (which, for countable groups, is equivalent to the celebrated Kazhdan's property (T)), property FW (both for CAT(0) cube complexes and for connected median graphs), property FA and uncountable cofinality. Historically many of these properties were defined using the existence of fixed points. Our main result is that for many subcategories $\textbf{S}$, the wreath product $G\wr_XH$ has property $B\textbf{S}$ if and only if both $G$ and $H$ have property $B\textbf{S}$ and $X$ is finite. On one hand, this encompasses in a general setting previously known results for properties FH and FW. On the other hand, this also applies to the Bergman's property. Finally, we also obtain that $G\wr_XH$ has uncountable cofinality if and only if both $G$ and $H$ have uncountable cofinality and $H$ acts on $X$ with finitely many orbits.
title Wreath products of groups acting with bounded orbits
topic Group Theory
20E22, 20F65
url https://arxiv.org/abs/2102.08001