Monge problem in metric measure spaces with Riemannian curvature-dimension condition

We prove the existence of solutions for the Monge minimization problem, addressed in a metric measure space (X,d,m)(X,d,m) enjoying the Riemannian curvature-dimension condition RCD∗(K,N), with N<∞N<∞. For the first marginal measure, we assume that μ0≪mμ0≪m. As a corollary, we obtain that the Monge problem and its relaxed version, the Monge–Kantorovich problem, attain the same minimal value.Moreover we prove a structure theorem for dd-cyclically monotone sets: neglecting a set of zero mm-measure they do not contain any branching structures, that is, they can be written as the disjoint union of the image of a disjoint family of geodesics.