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- Borel–Moore_homology abstract "In topology, Borel−Moore homology or homology with closed support is a homology theory for locally compact spaces, introduced by Borel and Moore (1960). For reasonable compact spaces, Borel−Moore homology coincides with the usual singular homology. For non-compact spaces, each theory has its own advantages. In particular, a closed oriented submanifold defines a class in Borel–Moore homology, but not in ordinary homology unless the submanifold is compact.Note: The equivariant cohomology theory for spaces with an action of a group G is sometimes called Borel cohomology; it is defined as H*G(X) = H*((EG × X)/G). That is not related to the subject of this article.".
- Borel–Moore_homology wikiPageExternalLink 1028998385.
- Borel–Moore_homology wikiPageID "6495737".
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- Borel–Moore_homology wikiPageOutDegree "37".
- Borel–Moore_homology wikiPageRevisionID "697359955".
- Borel–Moore_homology wikiPageWikiLink Alexandroff_extension.
- Borel–Moore_homology wikiPageWikiLink Algebraic_variety.
- Borel–Moore_homology wikiPageWikiLink CW_complex.
- Borel–Moore_homology wikiPageWikiLink Category:Homology_theory.
- Borel–Moore_homology wikiPageWikiLink Category:Sheaf_theory.
- Borel–Moore_homology wikiPageWikiLink Chain_complex.
- Borel–Moore_homology wikiPageWikiLink Codimension.
- Borel–Moore_homology wikiPageWikiLink Cohomology_with_compact_support.
- Borel–Moore_homology wikiPageWikiLink Compact_space.
- Borel–Moore_homology wikiPageWikiLink Equivariant_cohomology.
- Borel–Moore_homology wikiPageWikiLink Exact_sequence.
- Borel–Moore_homology wikiPageWikiLink Functor.
- Borel–Moore_homology wikiPageWikiLink Fundamental_class.
- Borel–Moore_homology wikiPageWikiLink Homology_(mathematics).
- Borel–Moore_homology wikiPageWikiLink Homotopy.
- Borel–Moore_homology wikiPageWikiLink Hyperhomology.
- Borel–Moore_homology wikiPageWikiLink Locally_compact_space.
- Borel–Moore_homology wikiPageWikiLink Manifold.
- Borel–Moore_homology wikiPageWikiLink Orientability.
- Borel–Moore_homology wikiPageWikiLink Poincaré_duality.
- Borel–Moore_homology wikiPageWikiLink Proper_map.
- Borel–Moore_homology wikiPageWikiLink Relative_homology.
- Borel–Moore_homology wikiPageWikiLink Sheaf_cohomology.
- Borel–Moore_homology wikiPageWikiLink Singular_homology.
- Borel–Moore_homology wikiPageWikiLink Smooth_scheme.
- Borel–Moore_homology wikiPageWikiLink Springer_Science+Business_Media.
- Borel–Moore_homology wikiPageWikiLink Submanifold.
- Borel–Moore_homology wikiPageWikiLink Topology.
- Borel–Moore_homology wikiPageWikiLink Universal_coefficient_theorem.
- Borel–Moore_homology wikiPageWikiLink Verdier_duality.
- Borel–Moore_homology wikiPageWikiLink Σ-compact_space.
- Borel–Moore_homology wikiPageWikiLinkText "Borel–Moore homology".
- Borel–Moore_homology wikiPageWikiLinkText "Borel–Moore homology".
- Borel–Moore_homology author1Link "Armand Borel".
- Borel–Moore_homology author2Link "John Coleman Moore".
- Borel–Moore_homology last "Borel".
- Borel–Moore_homology last "Moore".
- Borel–Moore_homology wikiPageUsesTemplate Template:Citation.
- Borel–Moore_homology wikiPageUsesTemplate Template:Harvs.
- Borel–Moore_homology wikiPageUsesTemplate Template:Math.
- Borel–Moore_homology wikiPageUsesTemplate Template:Mvar.
- Borel–Moore_homology wikiPageUsesTemplate Template:Reflist.
- Borel–Moore_homology year "1960".
- Borel–Moore_homology subject Category:Homology_theory.
- Borel–Moore_homology subject Category:Sheaf_theory.
- Borel–Moore_homology hypernym Theory.
- Borel–Moore_homology type Work.
- Borel–Moore_homology type Redirect.
- Borel–Moore_homology comment "In topology, Borel−Moore homology or homology with closed support is a homology theory for locally compact spaces, introduced by Borel and Moore (1960). For reasonable compact spaces, Borel−Moore homology coincides with the usual singular homology. For non-compact spaces, each theory has its own advantages.".
- Borel–Moore_homology label "Borel–Moore homology".
- Borel–Moore_homology sameAs Q4944924.
- Borel–Moore_homology sameAs m.0g7m6w.
- Borel–Moore_homology sameAs Borel–Moorehomologi.
- Borel–Moore_homology sameAs Q4944924.
- Borel–Moore_homology wasDerivedFrom Borel–Moore_homology?oldid=697359955.
- Borel–Moore_homology isPrimaryTopicOf Borel–Moore_homology.