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- Q5133156 subject Q6509408.
- Q5133156 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.".
- Q5133156 wikiPageWikiLink Q12510.
- Q5133156 wikiPageWikiLink Q1510587.
- Q5133156 wikiPageWikiLink Q1674514.
- Q5133156 wikiPageWikiLink Q2094241.
- Q5133156 wikiPageWikiLink Q213488.
- Q5133156 wikiPageWikiLink Q2211166.
- Q5133156 wikiPageWikiLink Q288465.
- Q5133156 wikiPageWikiLink Q381892.
- Q5133156 wikiPageWikiLink Q5161158.
- Q5133156 wikiPageWikiLink Q5533982.
- Q5133156 wikiPageWikiLink Q5533988.
- Q5133156 wikiPageWikiLink Q632814.
- Q5133156 wikiPageWikiLink Q6509408.
- Q5133156 wikiPageWikiLink Q8087.
- Q5133156 wikiPageWikiLink Q86070.
- Q5133156 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.".
- Q5133156 label "Clifton–Pohl torus".