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- Borel_conjecture abstract "In mathematics, specifically geometric topology, the Borel conjecture (named for Armand Borel) asserts that an aspherical closed manifold is determined by its fundamental group, up to homeomorphism. It is a rigidity conjecture, demanding that a weak, algebraic notion of equivalence (namely, a homotopy equivalence) imply a stronger, topological notion (namely, a homeomorphism).There is a different Borel conjecture (named for Émile Borel) in set theory. It asserts that every strong measure zero set of reals is countable. Work of Nikolai Luzin and Richard Laver shows that this conjecture is independent of the ZFC axioms. This article is about the Borel conjecture in geometric topology.".
- Borel_conjecture wikiPageExternalLink borel.pdf.
- Borel_conjecture wikiPageID "7181855".
- Borel_conjecture wikiPageLength "3898".
- Borel_conjecture wikiPageOutDegree "40".
- Borel_conjecture wikiPageRevisionID "652915991".
- Borel_conjecture wikiPageWikiLink 3-sphere.
- Borel_conjecture wikiPageWikiLink Armand_Borel.
- Borel_conjecture wikiPageWikiLink Aspherical_space.
- Borel_conjecture wikiPageWikiLink Category:Conjectures.
- Borel_conjecture wikiPageWikiLink Category:Geometric_topology.
- Borel_conjecture wikiPageWikiLink Category:Homeomorphisms.
- Borel_conjecture wikiPageWikiLink Category:Surgery_theory.
- Borel_conjecture wikiPageWikiLink Closed_manifold.
- Borel_conjecture wikiPageWikiLink Connected_sum.
- Borel_conjecture wikiPageWikiLink Diffeomorphism.
- Borel_conjecture wikiPageWikiLink Differentiable_manifold.
- Borel_conjecture wikiPageWikiLink Exotic_sphere.
- Borel_conjecture wikiPageWikiLink Fundamental_group.
- Borel_conjecture wikiPageWikiLink Geometric_topology.
- Borel_conjecture wikiPageWikiLink Homeomorphism.
- Borel_conjecture wikiPageWikiLink Homotopy.
- Borel_conjecture wikiPageWikiLink Hyperbolic_manifold.
- Borel_conjecture wikiPageWikiLink Isometry.
- Borel_conjecture wikiPageWikiLink Jean-Pierre_Serre.
- Borel_conjecture wikiPageWikiLink Lens_space.
- Borel_conjecture wikiPageWikiLink Manifold.
- Borel_conjecture wikiPageWikiLink Mathematics.
- Borel_conjecture wikiPageWikiLink Mostow_rigidity_theorem.
- Borel_conjecture wikiPageWikiLink Nikolai_Luzin.
- Borel_conjecture wikiPageWikiLink Novikov_conjecture.
- Borel_conjecture wikiPageWikiLink Poincaré_conjecture.
- Borel_conjecture wikiPageWikiLink Richard_Laver.
- Borel_conjecture wikiPageWikiLink Rigidity_(mathematics).
- Borel_conjecture wikiPageWikiLink Strong_measure_zero_set.
- Borel_conjecture wikiPageWikiLink Topological_manifold.
- Borel_conjecture wikiPageWikiLink Torus.
- Borel_conjecture wikiPageWikiLink Zermelo–Fraenkel_set_theory.
- Borel_conjecture wikiPageWikiLink Émile_Borel.
- Borel_conjecture wikiPageWikiLinkText "Borel conjecture".
- Borel_conjecture wikiPageWikiLinkText "Borel".
- Borel_conjecture wikiPageUsesTemplate Template:Use_dmy_dates.
- Borel_conjecture subject Category:Conjectures.
- Borel_conjecture subject Category:Geometric_topology.
- Borel_conjecture subject Category:Homeomorphisms.
- Borel_conjecture subject Category:Surgery_theory.
- Borel_conjecture type Conjecture.
- Borel_conjecture type Homeomorphism.
- Borel_conjecture type Mapping.
- Borel_conjecture type Morphism.
- Borel_conjecture type Statement.
- Borel_conjecture type Statement.
- Borel_conjecture comment "In mathematics, specifically geometric topology, the Borel conjecture (named for Armand Borel) asserts that an aspherical closed manifold is determined by its fundamental group, up to homeomorphism. It is a rigidity conjecture, demanding that a weak, algebraic notion of equivalence (namely, a homotopy equivalence) imply a stronger, topological notion (namely, a homeomorphism).There is a different Borel conjecture (named for Émile Borel) in set theory.".
- Borel_conjecture label "Borel conjecture".
- Borel_conjecture sameAs Q4138792.
- Borel_conjecture sameAs Congetura_ëd_Borel.
- Borel_conjecture sameAs m.025vdgs.
- Borel_conjecture sameAs Гипотеза_Бореля.
- Borel_conjecture sameAs Q4138792.
- Borel_conjecture wasDerivedFrom Borel_conjecture?oldid=652915991.
- Borel_conjecture isPrimaryTopicOf Borel_conjecture.