Some geometric properties of hypersurfaces with constant r-mean curvature in Euclidean space

Abstract

Let f:M m+1 be an isometrically immersed hypersurface. In this paper, we exploit recent results due to the authors in bimari to analyze the stability of the differential operator Lr associated with the r-th Newton tensor of f. This appears in the Jacobi operator for the variational problem of minimizing the r-mean curvature Hr. Two natural applications are found. The first one ensures that, under the mild condition that the integral of Hr over geodesic spheres grows sufficiently fast, the Gauss map meets each equator of m infinitely many times. The second one deals with hypersurfaces with zero (r+1)-mean curvature. Under similar growth assumptions, we prove that the affine tangent spaces f*TpM, p∈ M, fill the whole m+1.