Existence of constant mean curvature surfaces with controlled topology in 3-manifolds

Abstract

We establish the existence of a non-trivial, branched immersion of a closed Riemann surface Σ with constant mean curvature (CMC) H into any closed, orientable 3-manifold M, for almost every prescribed value of H. The genus of the surface Σ is bounded from above by the Heegaard genus h of M. Starting from a family of sweep-outs of M by surfaces of genus h, we apply a min-max construction for a family \EH,σ\σ of perturbations of the energy involving the second fundamental form of the immersions to produce almost-critical points uk of EH,σ. We then show, following ideas introduced by Rivière and developed by Pigati and Rivière, that the maps uk converge to a "CMC-parametrized varifold". This limiting object is then shown to be a smooth, branched immersion with the prescribed mean curvature H.