Halfspaces minimise nonlocal perimeter: a proof via calibrations

Abstract

We consider a nonlocal functional JK that may be regarded as a nonlocal version of the total variation. More precisely, for any measurable function u Rd R, we define JK(u) as the integral of weighted differences of u. The weight is encoded by a positive kernel K, possibly singular in the origin. We study the minimisation of this energy under prescribed boundary conditions, and we introduce a notion of calibration suited for this nonlocal problem. Our first result shows that the existence of a calibration is a sufficient condition for a function to be a minimiser. As an application of this criterion, we prove that halfspaces are the unique minimisers of JK in a ball, provided they are admissible competitors. Finally, we outline how to exploit the optimality of hyperplanes to recover a -convergence result concerning the scaling limit of JK.