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- Radxc3xb3s_theorem_(Riemann_surfaces) abstract "In mathematical complex analysis, Radó's theorem, proved by Tibor Radó (1925), states that every connected Riemann surface is second-countable (has a countable base for its topology).The Prüfer surface is an example of a surface with no countable base for the topology, so cannot have the structure of a Riemann surface.The obvious analogue of Radó's theorem in higher dimensions is false: there are 2-dimensional connected complex manifolds that are not second-countable.".
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageExternalLink home.action?noDataSet=true.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageExternalLink TeichmullerVol1.html.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageID "31303013".
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageLength "1271".
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageOutDegree "6".
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageRevisionID "573364376".
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLink Category:Riemann_surfaces.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLink Category:Theorems_in_complex_analysis.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLink Connected_space.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLink Prüfer_manifold.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLink Prüfer_surface.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLink Riemann_surface.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLink Second-countable_space.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLinkText "Radó's theorem (Riemann surfaces)".
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageWikiLinkText "theorem".
- Radxc3xb3s_theorem_(Riemann_surfaces) authorlink "Tibor Radó".
- Radxc3xb3s_theorem_(Riemann_surfaces) first "Tibor".
- Radxc3xb3s_theorem_(Riemann_surfaces) hasPhotoCollection Radxc3xb3s_theorem_(Riemann_surfaces).
- Radxc3xb3s_theorem_(Riemann_surfaces) last "Radó".
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageUsesTemplate Template:Citation.
- Radxc3xb3s_theorem_(Riemann_surfaces) wikiPageUsesTemplate Template:Harvs.
- Radxc3xb3s_theorem_(Riemann_surfaces) year "1925".
- Radxc3xb3s_theorem_(Riemann_surfaces) subject Category:Riemann_surfaces.
- Radxc3xb3s_theorem_(Riemann_surfaces) subject Category:Theorems_in_complex_analysis.
- Radxc3xb3s_theorem_(Riemann_surfaces) comment "In mathematical complex analysis, Radó's theorem, proved by Tibor Radó (1925), states that every connected Riemann surface is second-countable (has a countable base for its topology).The Prüfer surface is an example of a surface with no countable base for the topology, so cannot have the structure of a Riemann surface.The obvious analogue of Radó's theorem in higher dimensions is false: there are 2-dimensional connected complex manifolds that are not second-countable.".
- Radxc3xb3s_theorem_(Riemann_surfaces) label "Radó's theorem (Riemann surfaces)".
- Radxc3xb3s_theorem_(Riemann_surfaces) sameAs Théorème_de_Radó_(surfaces_de_Riemann).
- Radxc3xb3s_theorem_(Riemann_surfaces) sameAs m.0gjd1hk.
- Radxc3xb3s_theorem_(Riemann_surfaces) sameAs Q3527149.
- Radxc3xb3s_theorem_(Riemann_surfaces) sameAs Q3527149.
- Radxc3xb3s_theorem_(Riemann_surfaces) wasDerivedFrom Radxc3xb3s_theorem_(Riemann_surfaces)oldid=573364376.
- Radxc3xb3s_theorem_(Riemann_surfaces) isPrimaryTopicOf Radxc3xb3s_theorem_(Riemann_surfaces).