Optimal transportation between hypersurfaces bounding some strictly convex domains

Abstract

Let M,N be two smooth compact hypersurfaces of Rn which bound strictly convex domains equipped with two absolutely continuous measures μ and (with respect to the volume measures of M and N). We consider the optimal transportation from μ to for the quadratic cost. Let (φ:m R,:N R) be some functions which achieve the supremum in the Kantorovich formulation of the problem and which satisfy (y) = ∈fz∈ M ( 12|y-z|2 -(z)); (x)=∈fz∈ N ( 12|x-z|2 -(z)). Define for y ∈ N, (y) = z∈ M ( 12|y-z|2 -(z)). In this short paper, we exhibit a relationship between the regularity of and the existence of a solution to the Monge problem.