Rotational symmetry of Weingarten spheres in homogeneous three-manifolds

Abstract

Let M be a simply connected homogeneous three-manifold with isometry group of dimension 4, and let be any compact surface of genus zero immersed in M whose mean, extrinsic and Gauss curvatures satisfy a smooth elliptic relation (H,Ke,K)=0. In this paper we prove that is a sphere of revolution, provided that the unique inextendible rotational surface S in M that satisfies this equation and touches its rotation axis orthogonally has bounded second fundamental form. In particular, we prove that: (i) any elliptic Weingarten sphere immersed in H2× R is a rotational sphere. (ii) Any sphere of constant positive extrinsic curvature immersed in M is a rotational sphere, and (iii) Any immersed sphere in M that satisfies an elliptic Weingarten equation H=φ(H2-Ke)≥ a>0 with φ bounded, is a rotational sphere. As a very particular case of this last result, we recover the Abresch-Rosenberg classification of constant mean curvature spheres in M.