Quantitative stability for the Brunn-Minkowski inequality
Abstract
We prove a quantitative stability result for the Brunn-Minkowski inequality: if |A|=|B|=1, t ∈ [τ,1-τ] with τ>0, and |tA+(1-t)B|1/n≤ 1+δ for some small δ, then, up to a translation, both A and B are quantitatively close (in terms of δ) to a convex set K.
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