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- Vitali_convergence_theorem abstract "In real analysis and measure theory, the Vitali convergence theorem, named after the Italian mathematician Giuseppe Vitali, is a generalization of the better-known dominated convergence theorem of Henri Lebesgue. It is a strong condition that depends on uniform integrability. It is useful when a dominating function cannot be found for the sequence of functions in question; when such a dominating function can be found, Lebesgue's theorem follows as a special case of Vitali's.".
- Vitali_convergence_theorem wikiPageID "13197969".
- Vitali_convergence_theorem wikiPageLength "3359".
- Vitali_convergence_theorem wikiPageOutDegree "16".
- Vitali_convergence_theorem wikiPageRevisionID "674803531".
- Vitali_convergence_theorem wikiPageWikiLink Almost_everywhere.
- Vitali_convergence_theorem wikiPageWikiLink Category:Theorems_in_measure_theory.
- Vitali_convergence_theorem wikiPageWikiLink Dominated_convergence_theorem.
- Vitali_convergence_theorem wikiPageWikiLink Egorovs_theorem.
- Vitali_convergence_theorem wikiPageWikiLink Fatous_lemma.
- Vitali_convergence_theorem wikiPageWikiLink Giuseppe_Vitali.
- Vitali_convergence_theorem wikiPageWikiLink Henri_Lebesgue.
- Vitali_convergence_theorem wikiPageWikiLink Italy.
- Vitali_convergence_theorem wikiPageWikiLink Mathematician.
- Vitali_convergence_theorem wikiPageWikiLink Measure_(mathematics).
- Vitali_convergence_theorem wikiPageWikiLink Measure_space.
- Vitali_convergence_theorem wikiPageWikiLink Measure_theory.
- Vitali_convergence_theorem wikiPageWikiLink Real_analysis.
- Vitali_convergence_theorem wikiPageWikiLink Triangle_inequality.
- Vitali_convergence_theorem wikiPageWikiLink Uniform_integrability.
- Vitali_convergence_theorem wikiPageWikiLinkText "Vitali convergence theorem".
- Vitali_convergence_theorem hasPhotoCollection Vitali_convergence_theorem.
- Vitali_convergence_theorem title "Vitali convergence theorem".
- Vitali_convergence_theorem urlname "VitaliConvergenceTheorem".
- Vitali_convergence_theorem wikiPageUsesTemplate Template:Cite_book.
- Vitali_convergence_theorem wikiPageUsesTemplate Template:MathSciNet.
- Vitali_convergence_theorem wikiPageUsesTemplate Template:PlanetMath.
- Vitali_convergence_theorem wikiPageUsesTemplate Template:Reflist.
- Vitali_convergence_theorem subject Category:Theorems_in_measure_theory.
- Vitali_convergence_theorem hypernym Generalization.
- Vitali_convergence_theorem type Theorem.
- Vitali_convergence_theorem comment "In real analysis and measure theory, the Vitali convergence theorem, named after the Italian mathematician Giuseppe Vitali, is a generalization of the better-known dominated convergence theorem of Henri Lebesgue. It is a strong condition that depends on uniform integrability. It is useful when a dominating function cannot be found for the sequence of functions in question; when such a dominating function can be found, Lebesgue's theorem follows as a special case of Vitali's.".
- Vitali_convergence_theorem label "Vitali convergence theorem".
- Vitali_convergence_theorem sameAs Teorema_di_convergenza_di_Vitali.
- Vitali_convergence_theorem sameAs ヴィタリの収束定理.
- Vitali_convergence_theorem sameAs m.03byk1t.
- Vitali_convergence_theorem sameAs Q11352023.
- Vitali_convergence_theorem sameAs Q11352023.
- Vitali_convergence_theorem wasDerivedFrom Vitali_convergence_theorem?oldid=674803531.
- Vitali_convergence_theorem isPrimaryTopicOf Vitali_convergence_theorem.