Co-dimension one area-minimizing currents with C1,α tangentially immersed boundary having Lipschitz co-oriented mean curvature

Abstract

We study n-dimensional area-minimizing currents T in Rn+1, with boundary ∂ T satisfying two properties: ∂ T is locally a finite sum of (n-1)-dimensional C1,α orientable submanifolds which only meet tangentially and with same orientation, for some α ∈ (0,1]; ∂ T has mean curvature =h T where h is a Lipschitz scalar-valued function and T is the generalized outward pointing normal of ∂ T with respect to T. We give a partial boundary regularity result for such currents T. We show that near any point x in the support of ∂ T, either the support of T has very uncontrolled structure, or the support of T near x is the finite union of orientable C1,α hypersurfaces-with-boundary with disjoint interiors and common boundary points only along the support of ∂ T.