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- Q3406236 subject Q7036100.
- Q3406236 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.".
- Q3406236 wikiPageExternalLink compact.pdf.
- Q3406236 wikiPageWikiLink Q107617.
- Q3406236 wikiPageWikiLink Q12507.
- Q3406236 wikiPageWikiLink Q17278.
- Q3406236 wikiPageWikiLink Q192276.
- Q3406236 wikiPageWikiLink Q325705.
- Q3406236 wikiPageWikiLink Q369561.
- Q3406236 wikiPageWikiLink Q395.
- Q3406236 wikiPageWikiLink Q473551.
- Q3406236 wikiPageWikiLink Q7036100.
- Q3406236 wikiPageWikiLink Q709149.
- Q3406236 wikiPageWikiLink Q726376.
- Q3406236 wikiPageWikiLink Q827230.
- Q3406236 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).".
- Q3406236 label "Ruziewicz problem".