Existence and uniqueness to a fully non-linear version of the Loewner-Nirenberg problem

Abstract

We consider the problem of finding on a given Euclidean domain of dimension n ≥ 3 a complete conformally flat metric whose Schouten curvature A satisfies some equation of the form f(λ(-A)) = 1. This generalizes a problem considered by Loewner and Nirenberg for the scalar curvature. We prove the existence and uniqueness of such metric when the boundary ∂ is a smooth bounded hypersurface (of codimension one). When ∂ contains a compact smooth submanifold of higher codimension with ∂ being compact, we also give a `sharp' condition for the divergence to infinity of the conformal factor near in terms of the codimension.