Perpendicularity and Locality for Codimension-One Varifolds with Bounded Anisotropic Mean Curvature
Abstract
Suppose F is an integrand associated with a uniformly convex C3 -norm, and V is a n -dimensional varifold in an open subset of Rn+1 such that Hn spt \| V \| is absolutely continuous with respect to \| V \| and the mean F -curvature hF(V, ·) is bounded in L∞ . In our previous result arXiv:2507.18357 we prove that spt \| V \| is C2 -rectifiable and the C1 -regular part M of spt \| V \| coincides Hn almost everywhere with the unit-density stratum of V . In this paper we prove that hF(V,a) ∈ Nor(M,a) for Hn a.e.\ a ∈ M and that hF(V, ·) agrees with the approximate mean F -curvature coming from the C2 -rectifiable covering of M . These results provide anisotropic extensions of well known theorems in the Euclidean setting by Brakke, Sch\"atzle and Ambrosio-Masnou.
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