Inverse Additive Problems for Minkowski Sumsets II

Abstract

The Brunn-Minkowski Theorem asserts that μd(A+B)1/d≥ μd(A)1/d+μd(B)1/d for convex bodies A,\,B⊂eq d, where μd denotes the d-dimensional Lebesgue measure. It is well-known that equality holds if and only if A and B are homothetic, but few characterizations of equality in other related bounds are known. Let H be a hyperplane. Bonnesen later strengthened this bound by showing μd(A+B)≥ (M1/(d-1)+N1/(d-1))d-1(μd(A)M+μd(B)N), where M=\μd-1(( x+H) A) x∈ d\ and N=\μd-1(( y+H) B) y∈ d\. Standard compression arguments show that the above bound also holds when M=μd-1(π(A)) and N=μd-1(π(B)), where π denotes a projection of Rd onto H, which gives an alternative generalization of the Brunn-Minkowski bound. In this paper, we characterize the cases of equality in this later bound, showing that equality holds if and only if A and B are obtained from a pair of homothetic convex bodies by `stretching' along the direction of the projection, which is made formal in the paper. When d=2, we characterize the case of equality in the former bound as well.