Constant mean curvature k-noids in homogeneous manifolds

Abstract

For each k≥2, we construct two families of surfaces with constant mean curvature H for H∈[0,1/2] in ()× where +4H2≤0. The surfaces are invariant under 2π/k-rotations about a vertical fiber of ()×, have genus zero, and a finite number of ends. The first family generalizes the notion of k-noids: It has k ends, one horizontal and k vertical symmetry planes. The second family is less symmetric and has two types of ends. Each surface arises as the conjugate (sister) surface of a minimal graph in a homogeneous 3-manifold. The domain of the graph is non-convex in the second family. For =-1 the surfaces with constant mean curvature H arise from a minimal surface in 2() for H∈(0,1/2) and in for H=1/2. For H=0, the conjugate surfaces are both minimal in a product space.