Rigidity and large volume residues in exterior isoperimetry for convex sets

Abstract

A comparison theorem by Choe, Ghomi and Ritor\'e states that the exterior isoperimetric profile IC of any convex body C in RN lies above that of any half-space H. We characterize convex bodies such that IC IH in terms of a notion of "maximal affine dimension at infinity'', briefly called the asymptotic dimension d*(C) of C. More precisely, we show that IC IH if and only if d*(C) N-1. We also show that if d*(C) N-2, then, for large volumes, IC is asymptotic to the isoperimetric profile of RN. We then estimate, in terms of d*(C)-dependent power laws, the order as v∞ of the difference between IC and the isoperimetric profile of RN.

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