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- Bergers_inequality_for_Einstein_manifolds abstract "In mathematics — specifically, in differential topology — Berger's inequality for Einstein manifolds is the statement that any 4-dimensional Einstein manifold (M, g) has non-negative Euler characteristic χ(M) ≥ 0. The inequality is named after the French mathematician Marcel Berger.".
- Bergers_inequality_for_Einstein_manifolds wikiPageID "13229336".
- Bergers_inequality_for_Einstein_manifolds wikiPageLength "829".
- Bergers_inequality_for_Einstein_manifolds wikiPageOutDegree "12".
- Bergers_inequality_for_Einstein_manifolds wikiPageRevisionID "657307888".
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Category:4-manifolds.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Category:Differential_topology.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Category:Geometric_inequalities.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Category:Riemannian_manifolds.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Differential_topology.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Einstein_manifold.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Euler_characteristic.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink France.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Hitchin–Thorpe_inequality.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Marcel_Berger.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Mathematician.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLink Mathematics.
- Bergers_inequality_for_Einstein_manifolds wikiPageWikiLinkText "Berger's inequality for Einstein manifolds".
- Bergers_inequality_for_Einstein_manifolds wikiPageUsesTemplate Template:Cite_book.
- Bergers_inequality_for_Einstein_manifolds wikiPageUsesTemplate Template:Differential-geometry-stub.
- Bergers_inequality_for_Einstein_manifolds subject Category:4-manifolds.
- Bergers_inequality_for_Einstein_manifolds subject Category:Differential_topology.
- Bergers_inequality_for_Einstein_manifolds subject Category:Geometric_inequalities.
- Bergers_inequality_for_Einstein_manifolds subject Category:Riemannian_manifolds.
- Bergers_inequality_for_Einstein_manifolds hypernym Statement.
- Bergers_inequality_for_Einstein_manifolds type Inequality.
- Bergers_inequality_for_Einstein_manifolds type Physic.
- Bergers_inequality_for_Einstein_manifolds type Theorem.
- Bergers_inequality_for_Einstein_manifolds comment "In mathematics — specifically, in differential topology — Berger's inequality for Einstein manifolds is the statement that any 4-dimensional Einstein manifold (M, g) has non-negative Euler characteristic χ(M) ≥ 0. The inequality is named after the French mathematician Marcel Berger.".
- Bergers_inequality_for_Einstein_manifolds label "Berger's inequality for Einstein manifolds".
- Bergers_inequality_for_Einstein_manifolds sameAs Q4891605.
- Bergers_inequality_for_Einstein_manifolds sameAs Bergerova_nejednakost_za_Einsteinove_višestrukosti.
- Bergers_inequality_for_Einstein_manifolds sameAs m.03bzjrm.
- Bergers_inequality_for_Einstein_manifolds sameAs Q4891605.
- Bergers_inequality_for_Einstein_manifolds wasDerivedFrom Bergers_inequality_for_Einstein_manifolds?oldid=657307888.
- Bergers_inequality_for_Einstein_manifolds isPrimaryTopicOf Bergers_inequality_for_Einstein_manifolds.