A low-technology estimate in convex geometry

Abstract

Let K be an n-dimensional symmetric convex body with n 4 and let K be its polar body. We present an elementary proof of the fact that ( K)( K) bn2(2 n)n, where bn is the volume of the Euclidean ball of radius 1. The inequality is asymptotically weaker than the estimate of Bourgain and Milman, which replaces the 2 n by a constant. However, there is no known elementary proof of the Bourgain-Milman theorem.

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