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• Hahn_decomposition_theorem abstract "In mathematics, the Hahn decomposition theorem, named after the Austrian mathematician Hans Hahn, states that given a measurable space (X,Σ) and a signed measure μ defined on the σ-algebra Σ, there exist two measurable sets P and N in Σ such that:P ∪ N = X and P ∩ N = ∅.For each E in Σ such that E ⊆ P one has μ(E) ≥ 0; that is, P is a positive set for μ.For each E in Σ such that E ⊆ N one has μ(E) ≤ 0; that is, N is a negative set for μ.Moreover, this decomposition is essentially unique, in the sense that for any other pair (P', N') of measurable sets fulfilling the above three conditions, the symmetric differences P Δ P' and N Δ N' are μ-null sets in the strong sense that every measurable subset of them has zero measure. The pair (P,N) is called a Hahn decomposition of the signed measure μ.".
• Hahn_decomposition_theorem wikiPageExternalLink 1206.5449.
• Hahn_decomposition_theorem wikiPageExternalLink ?op=getobj&from=objects&id=4014.
• Hahn_decomposition_theorem wikiPageExternalLink www.encyclopediaofmath.org.
• Hahn_decomposition_theorem wikiPageExternalLink Jordan_decomposition_(of_a_signed_measure).
• Hahn_decomposition_theorem wikiPageID "2985858".
• Hahn_decomposition_theorem wikiPageRevisionID "591709449".
• Hahn_decomposition_theorem hasPhotoCollection Hahn_decomposition_theorem.
• Hahn_decomposition_theorem id "p/h046140".
• Hahn_decomposition_theorem title "Hahn decomposition".
• Hahn_decomposition_theorem subject Category:Articles_containing_proofs.
• Hahn_decomposition_theorem subject Category:Theorems_in_measure_theory.
• Hahn_decomposition_theorem type Abstraction100002137.
• Hahn_decomposition_theorem type Communication100033020.
• Hahn_decomposition_theorem type Message106598915.
• Hahn_decomposition_theorem type Proposition106750804.
• Hahn_decomposition_theorem type Statement106722453.
• Hahn_decomposition_theorem type Theorem106752293.
• Hahn_decomposition_theorem type TheoremsInMeasureTheory.
• Hahn_decomposition_theorem comment "In mathematics, the Hahn decomposition theorem, named after the Austrian mathematician Hans Hahn, states that given a measurable space (X,Σ) and a signed measure μ defined on the σ-algebra Σ, there exist two measurable sets P and N in Σ such that:P ∪ N = X and P ∩ N = ∅.For each E in Σ such that E ⊆ P one has μ(E) ≥ 0; that is, P is a positive set for μ.For each E in Σ such that E ⊆ N one has μ(E) ≤ 0; that is, N is a negative set for μ.Moreover, this decomposition is essentially unique, in the sense that for any other pair (P', N') of measurable sets fulfilling the above three conditions, the symmetric differences P Δ P' and N Δ N' are μ-null sets in the strong sense that every measurable subset of them has zero measure. ".
• Hahn_decomposition_theorem label "Hahn decomposition theorem".
• Hahn_decomposition_theorem label "Hahn-Jordan-Zerlegung".
• Hahn_decomposition_theorem label "Teorema di decomposizione di Hahn".
• Hahn_decomposition_theorem label "Twierdzenie Hahna o rozkładzie".
• Hahn_decomposition_theorem label "ハーンの分解定理".
• Hahn_decomposition_theorem sameAs Hahn-Jordan-Zerlegung.
• Hahn_decomposition_theorem sameAs Teorema_di_decomposizione_di_Hahn.
• Hahn_decomposition_theorem sameAs ハーンの分解定理.
• Hahn_decomposition_theorem sameAs Twierdzenie_Hahna_o_rozkładzie.
• Hahn_decomposition_theorem sameAs m.08htxl.
• Hahn_decomposition_theorem sameAs Q1568811.
• Hahn_decomposition_theorem sameAs Q1568811.
• Hahn_decomposition_theorem sameAs Hahn_decomposition_theorem.
• Hahn_decomposition_theorem wasDerivedFrom Hahn_decomposition_theorem?oldid=591709449.
• Hahn_decomposition_theorem isPrimaryTopicOf Hahn_decomposition_theorem.