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- Gromovs_compactness_theorem_(geometry) abstract "In Riemannian geometry, Gromov's (pre)compactness theorem states that the set of Riemannian manifolds of a given dimension, with Ricci curvature ≥ c and diameter ≤ D is relatively compact in the Gromov-Hausdorff metric. It was proved by Mikhail Gromov.This theorem is a generalization of the Myers theorem.".
- Gromovs_compactness_theorem_(geometry) wikiPageID "6657292".
- Gromovs_compactness_theorem_(geometry) wikiPageLength "1913".
- Gromovs_compactness_theorem_(geometry) wikiPageOutDegree "9".
- Gromovs_compactness_theorem_(geometry) wikiPageRevisionID "645246461".
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Category:Theorems_in_Riemannian_geometry.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Diameter.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Gromov-Hausdorff_metric.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Gromov–Hausdorff_convergence.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Mikhail_Gromov_(mathematician).
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Mikhail_Leonidovich_Gromov.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Myers_theorem.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Myerss_theorem.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Relatively_compact.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Relatively_compact_subspace.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Ricci_curvature.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Riemannian_geometry.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLink Riemannian_manifold.
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLinkText "Gromov's compactness theorem (geometry)".
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLinkText "Gromov's compactness theorem".
- Gromovs_compactness_theorem_(geometry) wikiPageWikiLinkText "geometry".
- Gromovs_compactness_theorem_(geometry) hasPhotoCollection Gromovs_compactness_theorem_(geometry).
- Gromovs_compactness_theorem_(geometry) wikiPageUsesTemplate Template:About.
- Gromovs_compactness_theorem_(geometry) wikiPageUsesTemplate Template:Differential-geometry-stub.
- Gromovs_compactness_theorem_(geometry) wikiPageUsesTemplate Template:Reflist.
- Gromovs_compactness_theorem_(geometry) subject Category:Theorems_in_Riemannian_geometry.
- Gromovs_compactness_theorem_(geometry) comment "In Riemannian geometry, Gromov's (pre)compactness theorem states that the set of Riemannian manifolds of a given dimension, with Ricci curvature ≥ c and diameter ≤ D is relatively compact in the Gromov-Hausdorff metric. It was proved by Mikhail Gromov.This theorem is a generalization of the Myers theorem.".
- Gromovs_compactness_theorem_(geometry) label "Gromov's compactness theorem (geometry)".
- Gromovs_compactness_theorem_(geometry) sameAs Kompaktheitssatz_von_Cheeger_und_Gromov.
- Gromovs_compactness_theorem_(geometry) sameAs Compactheidsstelling_van_Gromov.
- Gromovs_compactness_theorem_(geometry) sameAs m.0ggb92.
- Gromovs_compactness_theorem_(geometry) sameAs Gromovs_kompakthetssats_(geometri).
- Gromovs_compactness_theorem_(geometry) sameAs Q5610188.
- Gromovs_compactness_theorem_(geometry) sameAs Q5610188.
- Gromovs_compactness_theorem_(geometry) wasDerivedFrom Gromovs_compactness_theorem_(geometry)oldid=645246461.
- Gromovs_compactness_theorem_(geometry) isPrimaryTopicOf Gromovs_compactness_theorem_(geometry).