Hypersurfaces with null higher order anisotropic mean curvature

Abstract

Given a positive function F on Sn which satisfies a convexity condition, for 1≤ r≤ n, we define for hypersurfaces in Rn+1 the r-th anisotropic mean curvature function Hr; F, a generalization of the usual r-th mean curvature function. We call a hypersurface is anisotropic minimal if HF=H1; F=0, and anisotropic r-minimal if Hr+1; F=0. Let W be the set of points which are omitted by the hyperplanes tangent to M. We will prove that if an oriented hypersurface M is anisotropic minimal, and the set W is open and non-empty, then x(M) is a part of a hyperplane of Rn+1. We also prove that if an oriented hypersurface M is anisotropic r-minimal and its r-th anisotropic mean curvature Hr; F is nonzero everywhere, and the set W is open and non-empty, then M has anisotropic relative nullity n-r.