Disks area-minimizing in mean convex Riemannian n-manifolds

Abstract

We prove the validity of an inequality involving a mean of the area and the length of the boundary of immersed disks whose boundaries are homotopically non-trivial curves in an oriented compact manifold which possesses convex mean curvature boundary, positive escalar curvature and admits a map to D2× Tn with nonzero degree, where D2 is a disk and Tn is an n-dimensional torus. We also prove a rigidity result for the equality case when the boundary is totally geodesic. This can be viewed as a partial generalization of a result due to Lucas Ambr\'ozio in AMB to higher dimensions.