A note on the quantitative local version of the log-Brunn-Minkowski inequality
Abstract
We prove that the log-Brunn-Minkowski inequality equation* |λ K+0 (1-λ)L|≥ |K|λ|L|1-λ equation* (where |·| is the Lebesgue measure and +0 is the so-called log-addition) holds when K⊂Rn is a ball and L is a symmetric convex body in a suitable C2 neighborhood of K.
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