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- Bryant_surface abstract "In Riemannian geometry, a Bryant surface is a 2-dimensional surface embedded in 3-dimensional hyperbolic space with constant mean curvature equal to 1. These surfaces take their name from the geometer Robert Bryant, who proved that every simply-connected minimal surface in 3-dimensional Euclidean space is isometric to a Bryant surface by a holomorphic parameterization analogous to the (Euclidean) Weierstrass–Enneper parameterization.".
- Bryant_surface wikiPageID "13622958".
- Bryant_surface wikiPageLength "1685".
- Bryant_surface wikiPageOutDegree "13".
- Bryant_surface wikiPageRevisionID "637102726".
- Bryant_surface wikiPageWikiLink Category:Hyperbolic_geometry.
- Bryant_surface wikiPageWikiLink Category:Minimal_surfaces.
- Bryant_surface wikiPageWikiLink Category:Riemannian_geometry.
- Bryant_surface wikiPageWikiLink Euclidean_space.
- Bryant_surface wikiPageWikiLink Holomorphic_function.
- Bryant_surface wikiPageWikiLink Hyperbolic_space.
- Bryant_surface wikiPageWikiLink Isometry.
- Bryant_surface wikiPageWikiLink Mean_curvature.
- Bryant_surface wikiPageWikiLink Minimal_surface.
- Bryant_surface wikiPageWikiLink Riemannian_geometry.
- Bryant_surface wikiPageWikiLink Robert_Bryant_(mathematician).
- Bryant_surface wikiPageWikiLink Simply-connected.
- Bryant_surface wikiPageWikiLink Simply_connected_space.
- Bryant_surface wikiPageWikiLink Weierstrass–Enneper_parameterization.
- Bryant_surface wikiPageWikiLinkText "Bryant surface".
- Bryant_surface hasPhotoCollection Bryant_surface.
- Bryant_surface wikiPageUsesTemplate Template:Differential-geometry-stub.
- Bryant_surface wikiPageUsesTemplate Template:Reflist.
- Bryant_surface subject Category:Hyperbolic_geometry.
- Bryant_surface subject Category:Minimal_surfaces.
- Bryant_surface subject Category:Riemannian_geometry.
- Bryant_surface hypernym Surface.
- Bryant_surface type Article.
- Bryant_surface type Bone.
- Bryant_surface type Article.
- Bryant_surface type Surface.
- Bryant_surface comment "In Riemannian geometry, a Bryant surface is a 2-dimensional surface embedded in 3-dimensional hyperbolic space with constant mean curvature equal to 1. These surfaces take their name from the geometer Robert Bryant, who proved that every simply-connected minimal surface in 3-dimensional Euclidean space is isometric to a Bryant surface by a holomorphic parameterization analogous to the (Euclidean) Weierstrass–Enneper parameterization.".
- Bryant_surface label "Bryant surface".
- Bryant_surface sameAs m.03cc498.
- Bryant_surface sameAs Q4980628.
- Bryant_surface sameAs Q4980628.
- Bryant_surface wasDerivedFrom Bryant_surface?oldid=637102726.
- Bryant_surface isPrimaryTopicOf Bryant_surface.