Free boundary minimal surfaces: a nonlocal approach

Abstract

Given a Ck-smooth closed embedded manifold N⊂ Rm, with k 2, and a compact connected smooth Riemannian surface (S,g) with ∂ S≠, we consider 12-harmonic maps u∈ H1/2(∂ S, N). These maps are critical points of the nonlocal energy equationE(f;g):=∫S|∇ u|2\,dvolg,equation where u is the harmonic extension of u in S. We express the energy as a sum of the 12-energies at each boundary component of ∂ S (suitably identified with the circle S1), plus a quadratic term which is continuous in the Hs( S1) topology, for any s∈ R. We show the Ck-1,δ regularity of 12-harmonic maps. We also establish a connection between free boundary minimal surfaces and critical points of E with respect to variations of the pair (f,g), in terms of the Teichm\"uller space of S.