Yau's conjecture for nonlocal minimal surfaces

Abstract

We introduce nonlocal minimal surfaces on closed manifolds and establish a far-reaching Yau-type result: in every closed, n-dimensional Riemannian manifold we construct infinitely many nonlocal s-minimal surfaces. We prove that, when s∈ (0,1) is sufficiently close to 1, the constructed surfaces are smooth for n=3 and n=4, while for n 5 they are smooth outside of a closed set of dimension n-5. Moreover, we prove surprisingly strong regularity and rigidity properties of finite Morse index s-minimal surfaces such as a "finite Morse index Bernstein-type result". These properties make nonlocal minimal surfaces ideal objects on which to apply min-max variational methods.