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- Lehmann–Scheffé_theorem abstract "In statistics, the Lehmann–Scheffé theorem is prominent statement, tying together the ideas of completeness, sufficiency, uniqueness, and best unbiased estimation. The theorem states that any estimator which is unbiased for a given unknown quantity and that depends on the data only through a complete, sufficient statistic is the unique best unbiased estimator of that quantity. The Lehmann–Scheffé theorem is named after Erich Leo Lehmann and Henry Scheffé, given their two early papers.If T is a complete sufficient statistic for θ and E(g(T)) = τ(θ) then g(T) is the uniformly minimum-variance unbiased estimator (UMVUE) of τ(θ).".
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- Lehmann–Scheffé_theorem wikiPageRevisionID "679950957".
- Lehmann–Scheffé_theorem wikiPageWikiLink Basus_theorem.
- Lehmann–Scheffé_theorem wikiPageWikiLink Best_unbiased_estimator.
- Lehmann–Scheffé_theorem wikiPageWikiLink Bias_of_an_estimator.
- Lehmann–Scheffé_theorem wikiPageWikiLink Category:Estimation_theory.
- Lehmann–Scheffé_theorem wikiPageWikiLink Category:Statistical_theorems.
- Lehmann–Scheffé_theorem wikiPageWikiLink Complete_class_theorem.
- Lehmann–Scheffé_theorem wikiPageWikiLink Completeness_(statistics).
- Lehmann–Scheffé_theorem wikiPageWikiLink Erich_Leo_Lehmann.
- Lehmann–Scheffé_theorem wikiPageWikiLink Estimator.
- Lehmann–Scheffé_theorem wikiPageWikiLink Henry_Scheffé.
- Lehmann–Scheffé_theorem wikiPageWikiLink Minimum-variance_unbiased_estimator.
- Lehmann–Scheffé_theorem wikiPageWikiLink Rao–Blackwell_theorem.
- Lehmann–Scheffé_theorem wikiPageWikiLink Statistics.
- Lehmann–Scheffé_theorem wikiPageWikiLink Sufficiency_(statistics).
- Lehmann–Scheffé_theorem wikiPageWikiLink Sufficient_statistic.
- Lehmann–Scheffé_theorem wikiPageWikiLink Unbiased_estimator.
- Lehmann–Scheffé_theorem wikiPageWikiLink Uniformly_minimum-variance_unbiased_estimator.
- Lehmann–Scheffé_theorem wikiPageWikiLinkText "Lehmann–Scheffé theorem".
- Lehmann–Scheffé_theorem hasPhotoCollection Lehmann–Scheffé_theorem.
- Lehmann–Scheffé_theorem wikiPageUsesTemplate Template:Refimprove.
- Lehmann–Scheffé_theorem wikiPageUsesTemplate Template:Reflist.
- Lehmann–Scheffé_theorem wikiPageUsesTemplate Template:Statistics-stub.
- Lehmann–Scheffé_theorem subject Category:Estimation_theory.
- Lehmann–Scheffé_theorem subject Category:Statistical_theorems.
- Lehmann–Scheffé_theorem comment "In statistics, the Lehmann–Scheffé theorem is prominent statement, tying together the ideas of completeness, sufficiency, uniqueness, and best unbiased estimation. The theorem states that any estimator which is unbiased for a given unknown quantity and that depends on the data only through a complete, sufficient statistic is the unique best unbiased estimator of that quantity.".
- Lehmann–Scheffé_theorem label "Lehmann–Scheffé theorem".
- Lehmann–Scheffé_theorem sameAs Satz_von_Lehmann–Scheffé.
- Lehmann–Scheffé_theorem sameAs Teorema_de_Lehmann–Scheffé.
- Lehmann–Scheffé_theorem sameAs Théorème_de_Lehmann-Scheffé.
- Lehmann–Scheffé_theorem sameAs m.01y940.
- Lehmann–Scheffé_theorem sameAs Téoréma_Lehmann-Scheffé.
- Lehmann–Scheffé_theorem sameAs Q1129636.
- Lehmann–Scheffé_theorem sameAs Q1129636.
- Lehmann–Scheffé_theorem wasDerivedFrom Lehmann–Scheffé_theorem?oldid=679950957.
- Lehmann–Scheffé_theorem isPrimaryTopicOf Lehmann–Scheffé_theorem.