On the regularity of stationary points of a nonlocal isoperimetric problem

Abstract

In this article we establish C3,α-regularity of the reduced boundary of stationary points of a nonlocal isoperimetric problem in a domain ⊂ Rn. In particular, stationary points satisfy the corresponding Euler-Lagrange equation classically on the reduced boundary. Moreover, we show that the singular set has zero (n-1)-dimensional Hausdorff measure. This complements the results in Choksi & Sternberg, in which the Euler-Lagrange equation was derived under the assumption of C2-regularity of the topological boundary and the results in Sternberg & Topaloglu in which the authors assume local minimality. In case has non-empty boundary, we show that stationary points meet the boundary of orthogonally in a weak sense, unless they have positive distance to it.