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- Q15864883 subject Q7214708.
- Q15864883 subject Q8175902.
- Q15864883 subject Q8488081.
- Q15864883 abstract "In convex geometry, the Mahler volume of a centrally symmetric convex body is a dimensionless quantity that is associated with the body and is invariant under linear transformations. It is named after German-English mathematician Kurt Mahler. It is known that the shapes with the largest possible Mahler volume are the spheres and ellipsoids; this is now known as the Blaschke–Santaló inequality. The still-unsolved Mahler conjecture states that the minimum possible Mahler volume is attained by a hypercube.".
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- Q15864883 wikiPageWikiLink Q1187914.
- Q15864883 wikiPageWikiLink Q1203075.
- Q15864883 wikiPageWikiLink Q126818.
- Q15864883 wikiPageWikiLink Q17020753.
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- Q15864883 wikiPageWikiLink Q17295.
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- Q15864883 wikiPageWikiLink Q188884.
- Q15864883 wikiPageWikiLink Q190046.
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- Q15864883 wikiPageWikiLink Q295981.
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- Q15864883 wikiPageWikiLink Q327167.
- Q15864883 wikiPageWikiLink Q381892.
- Q15864883 wikiPageWikiLink Q465654.
- Q15864883 wikiPageWikiLink Q5166516.
- Q15864883 wikiPageWikiLink Q617417.
- Q15864883 wikiPageWikiLink Q7214708.
- Q15864883 wikiPageWikiLink Q747980.
- Q15864883 wikiPageWikiLink Q79078.
- Q15864883 wikiPageWikiLink Q812880.
- Q15864883 wikiPageWikiLink Q8175902.
- Q15864883 wikiPageWikiLink Q8488081.
- Q15864883 comment "In convex geometry, the Mahler volume of a centrally symmetric convex body is a dimensionless quantity that is associated with the body and is invariant under linear transformations. It is named after German-English mathematician Kurt Mahler. It is known that the shapes with the largest possible Mahler volume are the spheres and ellipsoids; this is now known as the Blaschke–Santaló inequality.".
- Q15864883 label "Mahler volume".