A note on Mahler's conjecture
Abstract
Let K be a convex body in Rn with Santal\'o point at 0\. We show that if K has a point on the boundary with positive generalized Gau curvature, then the volume product |K| |K| is not minimal. This means that a body with minimal volume product has Gau curvature equal to 0 almost everywhere and thus suggests strongly that a minimal body is a polytope.
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