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- Vitali–Carathéodory_theorem abstract "In mathematics, the Vitali–Carathéodory theorem is a result in real analysis that shows that, under the conditions stated below, integrable functions can be approximated in L1 from above and below by lower- and upper-semicontinuous functions, respectively. It is named after Giuseppe Vitali and Constantin Carathéodory.".
- Vitali–Carathéodory_theorem wikiPageID "42737919".
- Vitali–Carathéodory_theorem wikiPageLength "1327".
- Vitali–Carathéodory_theorem wikiPageOutDegree "13".
- Vitali–Carathéodory_theorem wikiPageRevisionID "614107874".
- Vitali–Carathéodory_theorem wikiPageWikiLink Borel_measure.
- Vitali–Carathéodory_theorem wikiPageWikiLink Category:Theorems_in_real_analysis.
- Vitali–Carathéodory_theorem wikiPageWikiLink Compact_set.
- Vitali–Carathéodory_theorem wikiPageWikiLink Compact_space.
- Vitali–Carathéodory_theorem wikiPageWikiLink Constantin_Carathéodory.
- Vitali–Carathéodory_theorem wikiPageWikiLink Giuseppe_Vitali.
- Vitali–Carathéodory_theorem wikiPageWikiLink Hausdorff_space.
- Vitali–Carathéodory_theorem wikiPageWikiLink Integrable.
- Vitali–Carathéodory_theorem wikiPageWikiLink Integrable_system.
- Vitali–Carathéodory_theorem wikiPageWikiLink Locally_compact.
- Vitali–Carathéodory_theorem wikiPageWikiLink Locally_compact_space.
- Vitali–Carathéodory_theorem wikiPageWikiLink Mathematics.
- Vitali–Carathéodory_theorem wikiPageWikiLink Outer_regular.
- Vitali–Carathéodory_theorem wikiPageWikiLink Radon_measure.
- Vitali–Carathéodory_theorem wikiPageWikiLink Real_analysis.
- Vitali–Carathéodory_theorem wikiPageWikiLink Semi-continuity.
- Vitali–Carathéodory_theorem wikiPageWikiLink Tightness_of_measures.
- Vitali–Carathéodory_theorem wikiPageWikiLink Upper-semicontinuous.
- Vitali–Carathéodory_theorem wikiPageWikiLinkText "Vitali–Carathéodory theorem".
- Vitali–Carathéodory_theorem hasPhotoCollection Vitali–Carathéodory_theorem.
- Vitali–Carathéodory_theorem wikiPageUsesTemplate Template:Cite_book.
- Vitali–Carathéodory_theorem wikiPageUsesTemplate Template:Multiple_issues.
- Vitali–Carathéodory_theorem subject Category:Theorems_in_real_analysis.
- Vitali–Carathéodory_theorem comment "In mathematics, the Vitali–Carathéodory theorem is a result in real analysis that shows that, under the conditions stated below, integrable functions can be approximated in L1 from above and below by lower- and upper-semicontinuous functions, respectively. It is named after Giuseppe Vitali and Constantin Carathéodory.".
- Vitali–Carathéodory_theorem label "Vitali–Carathéodory theorem".
- Vitali–Carathéodory_theorem sameAs m.010lyg8v.
- Vitali–Carathéodory_theorem sameAs Q17098012.
- Vitali–Carathéodory_theorem sameAs Q17098012.
- Vitali–Carathéodory_theorem wasDerivedFrom Vitali–Carathéodory_theorem?oldid=614107874.
- Vitali–Carathéodory_theorem isPrimaryTopicOf Vitali–Carathéodory_theorem.