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- Mahler_volume 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.".
- Mahler_volume wikiPageID "21867246".
- Mahler_volume wikiPageRevisionID "555726905".
- Mahler_volume authorlink "Luis Santaló".
- Mahler_volume first "Luis".
- Mahler_volume hasPhotoCollection Mahler_volume.
- Mahler_volume last "Santaló".
- Mahler_volume year "1949".
- Mahler_volume subject Category:Convex_geometry.
- Mahler_volume subject Category:Geometric_inequalities.
- Mahler_volume subject Category:Volume.
- Mahler_volume type Abstraction100002137.
- Mahler_volume type Attribute100024264.
- Mahler_volume type Difference104748836.
- Mahler_volume type GeometricInequalities.
- Mahler_volume type Inequality104752221.
- Mahler_volume type Quality104723816.
- Mahler_volume 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.".
- Mahler_volume label "Mahler volume".
- Mahler_volume label "マーラー体積".
- Mahler_volume sameAs マーラー体積.
- Mahler_volume sameAs m.05p4d24.
- Mahler_volume sameAs Q15864883.
- Mahler_volume sameAs Q15864883.
- Mahler_volume sameAs Mahler_volume.
- Mahler_volume wasDerivedFrom Mahler_volume?oldid=555726905.
- Mahler_volume isPrimaryTopicOf Mahler_volume.