The fine structure of the singular set of area-minimizing integral currents II: rectifiability of flat singular points with singularity degree larger than 1

Abstract

We consider an area-minimizing integral current T of codimension higher than 1 in a smooth Riemannian manifold . In a previous paper we have subdivided the set of interior singular points with at least one flat tangent cone according to a real parameter, which we refer to as ``singularity degree''. This parameter determines the infinitesimal order of contact at the point in question between the ``singular part'' of T and its ``best regular approximation''. In this paper we show that the set of points for which the singularity degree is strictly larger than 1, is (m-2)-rectifiable. In a subsequent work we prove that the remaining flat singular points form an (m-2)-null set, thus concluding that the singular set of T is m-2-rectifiable.