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- Locally_profinite_group abstract "In mathematics, a locally profinite group is a hausdorff topological group in which every neighborhood of the identity element contains a compact open subgroup. Equivalently, a locally profinite group is a topological group that is hausdorff locally compact and totally disconnected. Moreover, a locally profinite group is compact if and only if it is profinite; this explains the terminology. Basic examples of locally profinite groups are discrete groups and p-adic Lie group. Non-examples are real Lie groups which have no small subgroup property.In a locally profinite group, a closed subgroup is locally profinite, and every compact subgroup is contained in an open compact subgroup.".
- Locally_profinite_group wikiPageExternalLink Blondel_Beijin.pdf.
- Locally_profinite_group wikiPageID "32286640".
- Locally_profinite_group wikiPageRevisionID "527549715".
- Locally_profinite_group hasPhotoCollection Locally_profinite_group.
- Locally_profinite_group subject Category:Topological_groups.
- Locally_profinite_group type Abstraction100002137.
- Locally_profinite_group type Group100031264.
- Locally_profinite_group type TopologicalGroups.
- Locally_profinite_group comment "In mathematics, a locally profinite group is a hausdorff topological group in which every neighborhood of the identity element contains a compact open subgroup. Equivalently, a locally profinite group is a topological group that is hausdorff locally compact and totally disconnected. Moreover, a locally profinite group is compact if and only if it is profinite; this explains the terminology. Basic examples of locally profinite groups are discrete groups and p-adic Lie group.".
- Locally_profinite_group label "Locally profinite group".
- Locally_profinite_group sameAs m.0j669yy.
- Locally_profinite_group sameAs Q6664696.
- Locally_profinite_group sameAs Q6664696.
- Locally_profinite_group sameAs Locally_profinite_group.
- Locally_profinite_group wasDerivedFrom Locally_profinite_group?oldid=527549715.
- Locally_profinite_group isPrimaryTopicOf Locally_profinite_group.