Hatem Hamrouni scite author profile

The closed subsets {\mathcal{F}(X)} of any topological space can be given a topology, called the Chabauty–Fell topology, in which {\mathcal{F}(X)} is quasi-compact. If X is a locally compact space, then {\mathcal{F}(X)} is Hausdorff. If {X=G} is a locally compact group, then the subset {\mathcal{S\kern-0.853583ptU\kern-0.569055ptB}(G)} of closed subgroups is closed in {\mathcal{F}(G)} , and the set of closed subgroups inherits its own compact topology, called the Chabauty topology. We develop some of the important properties of this topology. More precisely, the results contained in this paper deal with the following question: Given a locally compact topological group, when is {\mathcal{F}(G)} (resp. {\mathcal{S\kern-0.853583ptU\kern-0.569055ptB}(G)} ) a totally disconnected space?

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Discretely approximable locally compact groups and Jessen's theorem for nilmanifolds

Hamrouni¹,

Kadri²

2016

Bulletin des Sciences Mathématiques

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On approximation of Lie groups by discrete subgroups

Hamrouni

Souissi

2014

Proc Math Sci

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On the connectedness of the Chabauty space of a locally compact prosolvable group

Hamrouni

Kadri

2015

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Hatem Hamrouni

Locally compact groups approximable by subgroups isomorphic to Z or R

Locally compact groups with totally disconnected space of subgroups

Discretely approximable locally compact groups and Jessen's theorem for nilmanifolds

On approximation of Lie groups by discrete subgroups

On the connectedness of the Chabauty space of a locally compact prosolvable group

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