Hypersurfaces in space forms satisfying the condition Lkx=Ax+b

Abstract

We study hypersurfaces either in the sphere n+1 or in the hyperbolic space n+1 whose position vector x satisfies the condition Lkx=Ax+b, where Lk is the linearized operator of the (k+1)-th mean curvature of the hypersurface for a fixed k=0,...,n-1, A∈(n+2)× (n+2) is a constant matrix and b∈n+2 is a constant vector. For every k, we prove that when A is self-adjoint and b=0, the only hypersurfaces satisfying that condition are hypersurfaces with zero (k+1)-th mean curvature and constant k-th mean curvature, and open pieces of standard Riemannian products of the form m(1-r2)×n-m(r)⊂n+1, with 0<r<1, and m(-1+r2)×n-m(r)⊂n+1, with r>0. If Hk is constant, we also obtain a classification result for the case where b≠ 0.