Bubbles with constant mean curvature, and almost constant mean curvature, in the hyperbolic space

Abstract

Given a constant k>1, let Z be the family of round spheres of radius artanh(k-1) in the hyperbolic space H3, so that any sphere in Z has mean curvature k. We prove a crucial nondegeneracy result involving the manifold Z. As an application, we provide sufficient conditions on a prescribed function φ on H3, which ensure the existence of a C1-curve, parametrized by ≈ 0, of embedded spheres in H3 having mean curvature k +φ at each point.