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- P-compact_group abstract "In mathematics, in particular algebraic topology, a p-compact group is (roughly speaking) a space that is a homotopical version of a compact Lie group, but with all the structure concentrated at a single prime p. This concept was introduced by Dwyer and Wilkerson. Subsequently the name homotopy Lie group has also been used.".
- P-compact_group wikiPageExternalLink lillenotes.pdf.
- P-compact_group wikiPageExternalLink moeller.pdf.
- P-compact_group wikiPageID "3298657".
- P-compact_group wikiPageLength "1493".
- P-compact_group wikiPageOutDegree "15".
- P-compact_group wikiPageRevisionID "613525443".
- P-compact_group wikiPageWikiLink Algebraic_topology.
- P-compact_group wikiPageWikiLink Category:Group_theory.
- P-compact_group wikiPageWikiLink Category:Lie_groups.
- P-compact_group wikiPageWikiLink Category:Manifolds.
- P-compact_group wikiPageWikiLink Category:Symmetry.
- P-compact_group wikiPageWikiLink Compact_Lie_group.
- P-compact_group wikiPageWikiLink Compact_group.
- P-compact_group wikiPageWikiLink Homotopical.
- P-compact_group wikiPageWikiLink Homotopy.
- P-compact_group wikiPageWikiLink Integer.
- P-compact_group wikiPageWikiLink Mathematics.
- P-compact_group wikiPageWikiLink P-adic_integers.
- P-compact_group wikiPageWikiLink P-adic_number.
- P-compact_group wikiPageWikiLink P-completion.
- P-compact_group wikiPageWikiLink Prime_number.
- P-compact_group wikiPageWikiLink Rational_integer.
- P-compact_group wikiPageWikiLink Root_data.
- P-compact_group wikiPageWikiLink Root_datum.
- P-compact_group wikiPageWikiLink Sphere.
- P-compact_group wikiPageWikiLink Sullivan_sphere.
- P-compact_group wikiPageWikiLinkText "''p''-compact group".
- P-compact_group wikiPageWikiLinkText "P-compact group".
- P-compact_group hasPhotoCollection P-compact_group.
- P-compact_group wikiPageUsesTemplate Template:Topology-stub.
- P-compact_group subject Category:Group_theory.
- P-compact_group subject Category:Lie_groups.
- P-compact_group subject Category:Manifolds.
- P-compact_group subject Category:Symmetry.
- P-compact_group hypernym Space.
- P-compact_group type Article.
- P-compact_group type Article.
- P-compact_group type Physic.
- P-compact_group type Space.
- P-compact_group type Technique.
- P-compact_group comment "In mathematics, in particular algebraic topology, a p-compact group is (roughly speaking) a space that is a homotopical version of a compact Lie group, but with all the structure concentrated at a single prime p. This concept was introduced by Dwyer and Wilkerson. Subsequently the name homotopy Lie group has also been used.".
- P-compact_group label "P-compact group".
- P-compact_group sameAs m.0943g7.
- P-compact_group sameAs Q7116927.
- P-compact_group sameAs Q7116927.
- P-compact_group wasDerivedFrom P-compact_group?oldid=613525443.
- P-compact_group isPrimaryTopicOf P-compact_group.