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- Heine–Cantor_theorem abstract "In mathematics, the Heine–Cantor theorem, named after Eduard Heine and Georg Cantor, states that if f : M → N is a continuous function between two metric spaces, and M is compact, then f is uniformly continuous. An important special case is that every continuous function from a closed interval to the real numbers is uniformly continuous.".
- Heine–Cantor_theorem wikiPageID "1194729".
- Heine–Cantor_theorem wikiPageLength "3667".
- Heine–Cantor_theorem wikiPageOutDegree "14".
- Heine–Cantor_theorem wikiPageRevisionID "706815720".
- Heine–Cantor_theorem wikiPageWikiLink Category:Articles_containing_proofs.
- Heine–Cantor_theorem wikiPageWikiLink Category:Continuous_mappings.
- Heine–Cantor_theorem wikiPageWikiLink Category:Metric_geometry.
- Heine–Cantor_theorem wikiPageWikiLink Category:Theorems_in_analysis.
- Heine–Cantor_theorem wikiPageWikiLink Compact_space.
- Heine–Cantor_theorem wikiPageWikiLink Continuous_function.
- Heine–Cantor_theorem wikiPageWikiLink Eduard_Heine.
- Heine–Cantor_theorem wikiPageWikiLink Georg_Cantor.
- Heine–Cantor_theorem wikiPageWikiLink Interval_(mathematics).
- Heine–Cantor_theorem wikiPageWikiLink Mathematics.
- Heine–Cantor_theorem wikiPageWikiLink Metric_space.
- Heine–Cantor_theorem wikiPageWikiLink Non-standard_calculus.
- Heine–Cantor_theorem wikiPageWikiLink Real_number.
- Heine–Cantor_theorem wikiPageWikiLink Uniform_continuity.
- Heine–Cantor_theorem wikiPageWikiLinkText "Heine–Cantor theorem".
- Heine–Cantor_theorem id "3066".
- Heine–Cantor_theorem id "4114".
- Heine–Cantor_theorem title "Heine–Cantor theorem".
- Heine–Cantor_theorem title "Proof of Heine–Cantor theorem".
- Heine–Cantor_theorem wikiPageUsesTemplate Template:Distinguish.
- Heine–Cantor_theorem wikiPageUsesTemplate Template:Mathanalysis-stub.
- Heine–Cantor_theorem wikiPageUsesTemplate Template:Planetmath_reference.
- Heine–Cantor_theorem subject Category:Articles_containing_proofs.
- Heine–Cantor_theorem subject Category:Continuous_mappings.
- Heine–Cantor_theorem subject Category:Metric_geometry.
- Heine–Cantor_theorem subject Category:Theorems_in_analysis.
- Heine–Cantor_theorem hypernym Function.
- Heine–Cantor_theorem type Disease.
- Heine–Cantor_theorem type Function.
- Heine–Cantor_theorem type Mapping.
- Heine–Cantor_theorem type Proof.
- Heine–Cantor_theorem type Redirect.
- Heine–Cantor_theorem type Theorem.
- Heine–Cantor_theorem type Thing.
- Heine–Cantor_theorem comment "In mathematics, the Heine–Cantor theorem, named after Eduard Heine and Georg Cantor, states that if f : M → N is a continuous function between two metric spaces, and M is compact, then f is uniformly continuous. An important special case is that every continuous function from a closed interval to the real numbers is uniformly continuous.".
- Heine–Cantor_theorem label "Heine–Cantor theorem".
- Heine–Cantor_theorem differentFrom Cantors_theorem.
- Heine–Cantor_theorem sameAs Q765987.
- Heine–Cantor_theorem sameAs Cantorova-Heineova_věta.
- Heine–Cantor_theorem sameAs Satz_von_Heine.
- Heine–Cantor_theorem sameAs Teorema_de_Heine-Cantor.
- Heine–Cantor_theorem sameAs Théorème_de_Heine.
- Heine–Cantor_theorem sameAs משפט_קנטור_לרציפות_במידה_שווה.
- Heine–Cantor_theorem sameAs Heine-tétel.
- Heine–Cantor_theorem sameAs Teorema_di_Heine-Cantor.
- Heine–Cantor_theorem sameAs ハイネ・カントールの定理.
- Heine–Cantor_theorem sameAs 하이네-칸토어_정리.
- Heine–Cantor_theorem sameAs Stelling_van_Heine-Cantor.
- Heine–Cantor_theorem sameAs Twierdzenie_Heinego-Cantora.
- Heine–Cantor_theorem sameAs m.04g9j6.
- Heine–Cantor_theorem sameAs Teorema_lui_Heine.
- Heine–Cantor_theorem sameAs Теорема_Кантора_—_Гейне.
- Heine–Cantor_theorem sameAs Канторов_став_о_равномерној_непрекидности.
- Heine–Cantor_theorem sameAs Heine–Cantors_sats.
- Heine–Cantor_theorem sameAs Теорема_Кантора_—_Гейне.
- Heine–Cantor_theorem sameAs Q765987.
- Heine–Cantor_theorem sameAs 海涅-康托尔定理.
- Heine–Cantor_theorem wasDerivedFrom Heine–Cantor_theorem?oldid=706815720.
- Heine–Cantor_theorem isPrimaryTopicOf Heine–Cantor_theorem.