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- Clifton–Pohl_torus abstract "In geometry, the Clifton–Pohl torus is an example of a compact Lorentzian manifold that is not geodesically complete. While every compact Riemannian manifold is also geodesically complete (by the Hopf–Rinow theorem), this space shows that the same implication does not generalize to pseudo-Riemannian manifolds. It is named after Yeaton H. Clifton and William F. Pohl, who described it in 1962 but did not publish their result.".
- Clifton–Pohl_torus wikiPageID "34242725".
- Clifton–Pohl_torus wikiPageLength "4493".
- Clifton–Pohl_torus wikiPageOutDegree "15".
- Clifton–Pohl_torus wikiPageRevisionID "690869344".
- Clifton–Pohl_torus wikiPageWikiLink Category:Lorentzian_manifolds.
- Clifton–Pohl_torus wikiPageWikiLink Compact_space.
- Clifton–Pohl_torus wikiPageWikiLink Conjugate_points.
- Clifton–Pohl_torus wikiPageWikiLink Eberhard_Hopf.
- Clifton–Pohl_torus wikiPageWikiLink Geodesic.
- Clifton–Pohl_torus wikiPageWikiLink Geodesic_manifold.
- Clifton–Pohl_torus wikiPageWikiLink Geodesics_in_general_relativity.
- Clifton–Pohl_torus wikiPageWikiLink Geometry.
- Clifton–Pohl_torus wikiPageWikiLink Group_action.
- Clifton–Pohl_torus wikiPageWikiLink Hopf–Rinow_theorem.
- Clifton–Pohl_torus wikiPageWikiLink Isometry_(Riemannian_geometry).
- Clifton–Pohl_torus wikiPageWikiLink Isometry_group.
- Clifton–Pohl_torus wikiPageWikiLink Pseudo-Riemannian_manifold.
- Clifton–Pohl_torus wikiPageWikiLink Riemannian_manifold.
- Clifton–Pohl_torus wikiPageWikiLink Torus.
- Clifton–Pohl_torus wikiPageWikiLinkText "Clifton–Pohl torus".
- Clifton–Pohl_torus wikiPageUsesTemplate Template:Reflist.
- Clifton–Pohl_torus subject Category:Lorentzian_manifolds.
- Clifton–Pohl_torus hypernym Example.
- Clifton–Pohl_torus type Building.
- Clifton–Pohl_torus type Physic.
- Clifton–Pohl_torus comment "In geometry, the Clifton–Pohl torus is an example of a compact Lorentzian manifold that is not geodesically complete. While every compact Riemannian manifold is also geodesically complete (by the Hopf–Rinow theorem), this space shows that the same implication does not generalize to pseudo-Riemannian manifolds. It is named after Yeaton H. Clifton and William F. Pohl, who described it in 1962 but did not publish their result.".
- Clifton–Pohl_torus label "Clifton–Pohl torus".
- Clifton–Pohl_torus sameAs Q5133156.
- Clifton–Pohl_torus sameAs m.0hzp_d5.
- Clifton–Pohl_torus sameAs Q5133156.
- Clifton–Pohl_torus wasDerivedFrom Clifton–Pohl_torus?oldid=690869344.
- Clifton–Pohl_torus isPrimaryTopicOf Clifton–Pohl_torus.