Fine Structure of Singularities in Area-Minimizing Currents Mod(q)

Abstract

We study fine structural properties related to the interior regularity of m-dimensional area minimizing currents mod(q) in arbitrary codimension. We show: (i) the set of points where at least one tangent cone is translation invariant along m-1 directions is locally a connected C1,β submanifold, and moreover such points have unique tangent cones; (ii) the remaining part of the singular set is countably (m-2)-rectifiable, with a unique flat tangent cone (with multiplicity) at Hm-2-a.e. flat singular point. These results are consequences of fine excess decay theorems as well as almost monotonicity of a universal frequency function.