Excess decay for minimizing hypercurrents mod 2Q

Abstract

We consider codimension 1 area-minimizing m-dimensional currents T mod an even integer p=2Q in a C2 Riemannian submanifold of the Euclidean space. We prove a suitable excess-decay estimate towards the unique tangent cone at every point q∈ spt (T) sptp (∂ T) where at least one such tangent cone is Q copies of a single plane. While an analogous decay statement was proved in arXiv:2111.11202 as a corollary of a more general theory for stable varifolds, in our statement we strive for the optimal dependence of the estimates upon the second fundamental form of . This technical improvement is in fact needed in arXiv:2201.10204 to prove that the singular set of T can be decomposed into a C1,α (m-1)-dimensional submanifold and an additional closed remaining set of Hausdorff dimension at most m-2.