The σk-Loewner-Nirenberg problem on Riemannian manifolds for k=n2 and beyond

Abstract

Let (Mn,g0) be a smooth compact Riemannian manifold of dimension n≥ 3 with smooth non-empty boundary ∂ M. Let ⊂Rn be a symmetric convex cone and f a symmetric defining function for satisfying standard assumptions. Denoting by Agu the Schouten tensor of a conformal metric gu = u-2g0, we show that the associated fully nonlinear Loewner-Nirenberg problem align* cases f(λ(-gu-1Agu)) = 12, λ(-gu-1Agu)∈ & on M ∂ M u = 0 & on ∂ M cases align* admits a solution if μ+ > 1-δ, where μ+ is defined by (-μ+,1,…,1)∈∂ and δ>0 is a constant depending on certain geometric data. In particular, we solve the σk-Loewner-Nirenberg problem for all k≤ n2, which extends recent work of the authors to include the important threshold case k=n2. In the process, we establish that the fully nonlinear Loewner-Nirenberg problem and corresponding Dirichlet boundary value problem with positive boundary data admit solutions if there exists a conformal metric g∈[g0] such that λ(-g-1Ag)∈ on M; these latter results require no assumption on μ+ and are new when (1,0,…,0)∈∂.