Strong stability of convexity with respect to the perimeter

Abstract

Let E⊂ Rn, n 2, be a set of finite perimeter with |E|=|B|, where B denotes the unit ball. When n=2, since convexification decreases perimeter (in the class of open connected sets), it is easy to prove the existence of a convex set F, with |E|=|F|, such that P(E) - P(F) c\,|E F|, c>0. Here we prove that, when n 3, there exists a convex set F, with |E|=|F|, such that P(E) - P(F) c(n) \,f(|E F|), c(n)>0, f(t)=t| t| for t 1. Moreover, one can choose F to be a small C2-deformation of the unit ball. Furthermore, this estimate is essentially sharp as we can show that the inequality above fails for f(t)=t. Interestingly, the proof of our result relies on a new stability estimate for Alexandrov's Theorem on constant mean curvature sets.