An inequality characterizing convex domains

Abstract

A property of smooth convex domains ⊂ Rn is that if two points on the boundary x, y ∈ ∂ are close to each other, then their normal vectors n(x), n(y) point roughly in the same direction and this direction is almost orthogonal to x-y (for `nearby' x and y). We prove there exists a constant cn > 0 such that if ⊂ Rn is a bounded domain with C1-boundary ∂ , then ∫∂ × ∂ | n(x), y - x y - x, n(y) | \|x - y\|n+1~d σ(x) dσ(y) ≥ cn |∂ | and equality occurs if and only if the domain is convex.