Existence, characterization and stability of Pansu spheres in sub-Riemannian 3-space forms

Abstract

Let M be a complete Sasakian sub-Riemannian 3-manifold of constant Webster scalar curvature . For any point p∈ M and any number λ∈R with λ2+>0, we show existence of a C2 spherical surface Sλ(p) immersed in M with constant mean curvature λ. Our construction recovers in particular the description of Pansu spheres in the first Heisenberg group and the sub-Riemannian 3-sphere. Then, we study variational properties of Sλ(p) related to the area functional. First, we obtain uniqueness results for the spheres Sλ(p) as critical points of the area under a volume constraint, thus providing sub-Riemannian counterparts to the theorems of Hopf and Alexandrov for CMC surfaces in Riemannian 3-space forms. Second, we derive a second variation formula for admissible deformations possibly moving the singular set, and prove that Sλ(p) is a second order minimum of the area for those preserving volume. We finally give some applications of our results to the isoperimetric problem in sub-Riemannian 3-space forms.