An extension of Milman's reverse Brunn-Minkowski inequality
Abstract
The classical Brunn-Minkowski inequality states that for A1,A2⊂n compact, |A1+A2|1/n |A1|1/n+|A2|1/n(1) where |·| denotes the Lebesgue measure on n. In 1986 V. Milman [Mil 1] discovered that if B1 and B2 are balls there is always a relative position of B1 and B2 for which a perturbed inverse of (1) holds. More precisely: There exists a constant C>0 such that for all n∈ and any balls B1,B2⊂n we can find a linear transformation unn with | det(u)|=1 and |u(B1)+B2|1/n C(|B1|1/n+|B2|1/n)" The aim of this paper is to extend this Milman's result to a larger class of sets.
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