Regularity of viscosity solutions of the σk-Loewner-Nirenberg problem

Abstract

We study the regularity of the viscosity solution u of the σk-Loewner-Nirenberg problem on a bounded smooth domain ⊂ Rn for k ≥ 2. It was known that u is locally Lipschitz in . We prove that, with d being the distance function to ∂ and δ > 0 sufficiently small, u is smooth in \0 < d(x) < δ\ and the first (n-1) derivatives of dn-22 u are H\"older continuous in \0 ≤ d(x) < δ\. Moreover, we identify a boundary invariant which is a polynomial of the principal curvatures of ∂ and its covariant derivatives and vanishes if and only if dn-22 u is smooth in \0 ≤ d(x) < δ\. Using a relation between the Schouten tensor of the ambient manifold and the mean curvature of a submanifold and related tools from geometric measure theory, we further prove that, when ∂ contains more than one connected components, u is not differentiable in .