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- Hellys_selection_theorem abstract "In mathematics, Helly's selection theorem states that a sequence of functions that is locally of bounded total variation and uniformly bounded at a point has a convergent subsequence. In other words, it is a compactness theorem for the space BVloc. It is named for the Austrian mathematician Eduard Helly.The theorem has applications throughout mathematical analysis. In probability theory, the result implies compactness of a tight family of measures.".
- Hellys_selection_theorem wikiPageID "6740565".
- Hellys_selection_theorem wikiPageLength "4213".
- Hellys_selection_theorem wikiPageOutDegree "34".
- Hellys_selection_theorem wikiPageRevisionID "674682997".
- Hellys_selection_theorem wikiPageWikiLink Austria.
- Hellys_selection_theorem wikiPageWikiLink Banach_space.
- Hellys_selection_theorem wikiPageWikiLink Bounded_set.
- Hellys_selection_theorem wikiPageWikiLink Bounded_variation.
- Hellys_selection_theorem wikiPageWikiLink Category:Compactness_theorems.
- Hellys_selection_theorem wikiPageWikiLink Category:Theorems_in_analysis.
- Hellys_selection_theorem wikiPageWikiLink Closure_(topology).
- Hellys_selection_theorem wikiPageWikiLink Compact_space.
- Hellys_selection_theorem wikiPageWikiLink Compactly_embedded.
- Hellys_selection_theorem wikiPageWikiLink Compactness_theorem.
- Hellys_selection_theorem wikiPageWikiLink Convergent_sequence.
- Hellys_selection_theorem wikiPageWikiLink Convex_set.
- Hellys_selection_theorem wikiPageWikiLink Distribution_(mathematics).
- Hellys_selection_theorem wikiPageWikiLink Eduard_Helly.
- Hellys_selection_theorem wikiPageWikiLink Fraňková-Helly_selection_theorem.
- Hellys_selection_theorem wikiPageWikiLink Fraňková–Helly_selection_theorem.
- Hellys_selection_theorem wikiPageWikiLink Limit_of_a_sequence.
- Hellys_selection_theorem wikiPageWikiLink Locally_integrable_function.
- Hellys_selection_theorem wikiPageWikiLink Mathematical_analysis.
- Hellys_selection_theorem wikiPageWikiLink Mathematician.
- Hellys_selection_theorem wikiPageWikiLink Mathematics.
- Hellys_selection_theorem wikiPageWikiLink Open_set.
- Hellys_selection_theorem wikiPageWikiLink Open_subset.
- Hellys_selection_theorem wikiPageWikiLink Probability_theory.
- Hellys_selection_theorem wikiPageWikiLink Real_line.
- Hellys_selection_theorem wikiPageWikiLink Reflexive_space.
- Hellys_selection_theorem wikiPageWikiLink Separable_space.
- Hellys_selection_theorem wikiPageWikiLink Sequence.
- Hellys_selection_theorem wikiPageWikiLink Subsequence.
- Hellys_selection_theorem wikiPageWikiLink Tightness_of_measures.
- Hellys_selection_theorem wikiPageWikiLink Total_variation.
- Hellys_selection_theorem wikiPageWikiLink Uniform_boundedness.
- Hellys_selection_theorem wikiPageWikiLink Uniformly_bounded.
- Hellys_selection_theorem wikiPageWikiLinkText "Helly's selection theorem".
- Hellys_selection_theorem hasPhotoCollection Hellys_selection_theorem.
- Hellys_selection_theorem wikiPageUsesTemplate Template:Cite_book.
- Hellys_selection_theorem wikiPageUsesTemplate Template:MathSciNet.
- Hellys_selection_theorem subject Category:Compactness_theorems.
- Hellys_selection_theorem subject Category:Theorems_in_analysis.
- Hellys_selection_theorem comment "In mathematics, Helly's selection theorem states that a sequence of functions that is locally of bounded total variation and uniformly bounded at a point has a convergent subsequence. In other words, it is a compactness theorem for the space BVloc. It is named for the Austrian mathematician Eduard Helly.The theorem has applications throughout mathematical analysis. In probability theory, the result implies compactness of a tight family of measures.".
- Hellys_selection_theorem label "Helly's selection theorem".
- Hellys_selection_theorem sameAs Teorema_di_Helly.
- Hellys_selection_theorem sameAs ヘリーの選択定理.
- Hellys_selection_theorem sameAs m.0glmmx.
- Hellys_selection_theorem sameAs Q3984017.
- Hellys_selection_theorem sameAs Q3984017.
- Hellys_selection_theorem wasDerivedFrom Hellys_selection_theoremoldid=674682997.
- Hellys_selection_theorem isPrimaryTopicOf Hellys_selection_theorem.