Quadratic flatness and Regularity for Codimension-One Varifolds with Bounded Anisotropic Mean Curvature

Abstract

We prove that if V is a n -dimensional varifold in an open subset of Rn+1 with bounded anisotropic mean curvature such that spt \| V \| has locally finite Hn -measure, then spt \| V \| can be touched by two mutually tangent balls at Hn almost all points. In particular, this result implies that Hn almost all of spt \| V \| can be covered by the union of countably many C2 -regular n -dimensional submanifolds of Rn+1 . Moreover, combined with Allard's local anisotropic regularity theorem, it implies that if V is an integral varifold with bounded anisotropic mean curvature and if Hn spt \| V \| is absolutely continuous with respect to \| V \| , then spt \| V \| is C1, α -regular around Hn almost every point of density 1 .