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- Ruziewicz_problem abstract "In mathematics, the Ruziewicz problem (sometimes Banach-Ruziewicz problem) in measure theory asks whether the usual Lebesgue measure on the n-sphere is characterised, up to proportionality, by its properties of being finitely additive, invariant under rotations, and defined on all Lebesgue measurable sets. This was answered affirmatively and independently for n ≥ 4 by Grigory Margulis and Dennis Sullivan around 1980, and for n = 2 and 3 by Vladimir Drinfeld (published 1984). It fails for the circle.The problem is named after Stanisław Ruziewicz.".
- Ruziewicz_problem wikiPageExternalLink compact.pdf.
- Ruziewicz_problem wikiPageID "3100245".
- Ruziewicz_problem wikiPageLength "1799".
- Ruziewicz_problem wikiPageOutDegree "13".
- Ruziewicz_problem wikiPageRevisionID "627081241".
- Ruziewicz_problem wikiPageWikiLink Category:Measure_theory.
- Ruziewicz_problem wikiPageWikiLink Circle.
- Ruziewicz_problem wikiPageWikiLink Dennis_Sullivan.
- Ruziewicz_problem wikiPageWikiLink Finitely_additive.
- Ruziewicz_problem wikiPageWikiLink Grigory_Margulis.
- Ruziewicz_problem wikiPageWikiLink Lebesgue_measurable.
- Ruziewicz_problem wikiPageWikiLink Lebesgue_measure.
- Ruziewicz_problem wikiPageWikiLink Mathematics.
- Ruziewicz_problem wikiPageWikiLink Measure_(mathematics).
- Ruziewicz_problem wikiPageWikiLink Measure_theory.
- Ruziewicz_problem wikiPageWikiLink Rotation.
- Ruziewicz_problem wikiPageWikiLink Sigma_additivity.
- Ruziewicz_problem wikiPageWikiLink Sphere.
- Ruziewicz_problem wikiPageWikiLink Stanisław_Ruziewicz.
- Ruziewicz_problem wikiPageWikiLink Vladimir_Drinfeld.
- Ruziewicz_problem wikiPageWikiLinkText "Ruziewicz problem".
- Ruziewicz_problem hasPhotoCollection Ruziewicz_problem.
- Ruziewicz_problem wikiPageUsesTemplate Template:Citation.
- Ruziewicz_problem subject Category:Measure_theory.
- Ruziewicz_problem comment "In mathematics, the Ruziewicz problem (sometimes Banach-Ruziewicz problem) in measure theory asks whether the usual Lebesgue measure on the n-sphere is characterised, up to proportionality, by its properties of being finitely additive, invariant under rotations, and defined on all Lebesgue measurable sets. This was answered affirmatively and independently for n ≥ 4 by Grigory Margulis and Dennis Sullivan around 1980, and for n = 2 and 3 by Vladimir Drinfeld (published 1984).".
- Ruziewicz_problem label "Ruziewicz problem".
- Ruziewicz_problem sameAs Problème_de_Ruziewicz.
- Ruziewicz_problem sameAs m.08rdzg.
- Ruziewicz_problem sameAs Q3406236.
- Ruziewicz_problem sameAs Q3406236.
- Ruziewicz_problem wasDerivedFrom Ruziewicz_problem?oldid=627081241.
- Ruziewicz_problem isPrimaryTopicOf Ruziewicz_problem.