Convexity of Radial Mean Bodies via an Extension of Ball's Bodies

Abstract

In this work, we extend a classical theorem of Keith Ball on integrals of log-concave functions along rays against the weight rp-1 to the previously inaccessible regime p∈ (-1,0): if g: Rn R+ is an integrable, upper semi-continuous, log-concave function which attains its maximum at the origin, then \[ x (pg(o)∫0∞rp-1(g(rx)-g(o))d\,r)-1p \] is a positively 1-homogeneous convex function on Rn. Our approach also provides a new proof of the original regime p> 0. The argument is based on a reduction to a two-dimensional inequality derived from Prékopa's theorem, which may be of independent interest. As a consequence of this extension, we resolve a nearly 30-year-old question of Richard Gardner and Gaoyong Zhang in the affirmative. In 1998, R. Gardner and G. Zhang introduced the radial pth mean bodies Rp K of a convex body K⊂ Rn for p>-1. Furthermore, they established that Rp K is convex for p≥ 0, but the convexity of Rp K for p∈ (-1,0) remained open. We prove that Rp K is convex for all p>-1.

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