. . . . . . . . . . "7683674"^^ . . . . . . . . "In der Mathematik ist die Chabauty-Topologie eine Topologie auf dem Raum der abgeschlossenen Untergruppen einer topologischen Gruppe."@de . "615803832"^^ . "In mathematics, the Chabauty topology is a certain topological structure introduced in 1950 by Claude Chabauty, on the set of all closed subgroups of a locally compact group G. The intuitive idea may be seen in the case of the set of all lattices in a Euclidean space E. There these are only certain of the closed subgroups: others can be found by in a sense taking limiting cases or degenerating a certain sequence of lattices. One can find linear subspaces or discrete groups that are lattices in a subspace, depending on how one takes a limit. This phenomenon suggests that the set of all closed subgroups carries a useful topology. This topology can be derived from the Vietoris topology construction, a topological structure on all non-empty subsets of a space. More precisely, it is an adaptation of the Fell topology construction, which itself derives from the Vietoris topology concept."@en . . . . "Chabauty-Topologie"@de . . . . "1210"^^ . "In mathematics, the Chabauty topology is a certain topological structure introduced in 1950 by Claude Chabauty, on the set of all closed subgroups of a locally compact group G. The intuitive idea may be seen in the case of the set of all lattices in a Euclidean space E. There these are only certain of the closed subgroups: others can be found by in a sense taking limiting cases or degenerating a certain sequence of lattices. One can find linear subspaces or discrete groups that are lattices in a subspace, depending on how one takes a limit. This phenomenon suggests that the set of all closed subgroups carries a useful topology."@en . . "Chabauty topology"@en . . "In der Mathematik ist die Chabauty-Topologie eine Topologie auf dem Raum der abgeschlossenen Untergruppen einer topologischen Gruppe."@de .