Interior regularity of area minimizing currents within a C2,α-submanifold

Abstract

Given an area-minimizing integral m-current in , we prove that the Hausdorff dimension of the interior singular set of T cannot exceed m-2, provided that is an embedded (m+n)-submanifold of Rm+n of class C2,α, where α>0. This result establishes the complete counterpart, in the arbitrary codimension setting, of the interior regularity theory for area-minimizing integral hypercurrents within a Riemannian manifold of class C2,α.

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