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- Alexandrov_theorem abstract "In mathematical analysis, the Alexandrov theorem, named after Aleksandr Danilovich Aleksandrov, states that if U is an open subset of Rn and f : U → Rm is a convex function, then f has a second derivative almost everywhere.In this context, having a second derivative at a point means having a second-order Taylor expansion at that point with a local error smaller than any quadratic.The result is closely related to Rademacher's theorem.".
- Alexandrov_theorem wikiPageID "37490344".
- Alexandrov_theorem wikiPageLength "1241".
- Alexandrov_theorem wikiPageOutDegree "9".
- Alexandrov_theorem wikiPageRevisionID "664699491".
- Alexandrov_theorem wikiPageWikiLink Aleksandr_Danilovich_Aleksandrov.
- Alexandrov_theorem wikiPageWikiLink Category:Theorems_in_measure_theory.
- Alexandrov_theorem wikiPageWikiLink Convex_function.
- Alexandrov_theorem wikiPageWikiLink Euclidean_space.
- Alexandrov_theorem wikiPageWikiLink Mathematical_analysis.
- Alexandrov_theorem wikiPageWikiLink Open_set.
- Alexandrov_theorem wikiPageWikiLink Rademachers_theorem.
- Alexandrov_theorem wikiPageWikiLink Springer-Verlag.
- Alexandrov_theorem wikiPageWikiLink Springer_Science+Business_Media.
- Alexandrov_theorem wikiPageWikiLinkText "Alexandrov theorem".
- Alexandrov_theorem hasPhotoCollection Alexandrov_theorem.
- Alexandrov_theorem wikiPageUsesTemplate Template:Cite_book.
- Alexandrov_theorem wikiPageUsesTemplate Template:Math.
- Alexandrov_theorem wikiPageUsesTemplate Template:Mathanalysis-stub.
- Alexandrov_theorem wikiPageUsesTemplate Template:Mvar.
- Alexandrov_theorem wikiPageUsesTemplate Template:Reflist.
- Alexandrov_theorem subject Category:Theorems_in_measure_theory.
- Alexandrov_theorem hypernym Subset.
- Alexandrov_theorem type Software.
- Alexandrov_theorem type Theorem.
- Alexandrov_theorem comment "In mathematical analysis, the Alexandrov theorem, named after Aleksandr Danilovich Aleksandrov, states that if U is an open subset of Rn and f : U → Rm is a convex function, then f has a second derivative almost everywhere.In this context, having a second derivative at a point means having a second-order Taylor expansion at that point with a local error smaller than any quadratic.The result is closely related to Rademacher's theorem.".
- Alexandrov_theorem label "Alexandrov theorem".
- Alexandrov_theorem sameAs Aleksandrovin_lause.
- Alexandrov_theorem sameAs アレクサンドロフの定理.
- Alexandrov_theorem sameAs m.0nb1fgw.
- Alexandrov_theorem sameAs Теорема_Александрова.
- Alexandrov_theorem sameAs Aleksandrovs_sats.
- Alexandrov_theorem sameAs Q4454912.
- Alexandrov_theorem sameAs Q4454912.
- Alexandrov_theorem wasDerivedFrom Alexandrov_theorem?oldid=664699491.
- Alexandrov_theorem isPrimaryTopicOf Alexandrov_theorem.