Characterization of balls as minimizers of an endpoint Gagliardo seminorm on the boundary

Abstract

Given a bounded C2 domain ⊂ Rd with d≥3, we prove a sharp inequality which relates the perimeter of ∂ to the endpoint Gagliardo seminorm in Wr,2(∂), corresponding to r=0, of the normal vector field on ∂. The proof of the inequality relies on the use of Bessel potentials and a monotonicity formula; we also show that balls are the unique minimizers. For 1/2<r<1, the Gagliardo seminorm of the normal vector field on ∂ is related to a fractional second fundamental form which arises in the study of nonlocal perimeters and nonlocal minimal surfaces.