Conditions for existence of single valued optimal transport maps on convex boundaries with nontwisted cost

Abstract

We prove that if ⊂ Rn+1 is a (not necessarily strictly) convex, C1 domain, and μ and μ are probability measures absolutely continuous with respect to surface measure on ∂ , with densities bounded away from zero and infinity, whose 2-Monge-Kantorovich distance is sufficiently small, then there exists a continuous Monge solution to the optimal transport problem with cost function given by the quadratic distance on the ambient space Rn+1. This result is also shown to be sharp, via a counterexample when is uniformly convex but not C1. Additionally, if is C1, α regular for some α, then the Monge solution is shown to be H\"older continuous.