Genus one H-surfaces with k-ends in H2×R
Abstract
We construct two different families of properly Alexandrov-immersed surfaces in H2× R with constant mean curvature 0<H≤ 1 2, genus one and k≥2 ends (k=2 only for one of these families). These ends are asymptotic to vertical H-cylinders for 0<H< 1 2. This shows that there is not a Schoen-type theorem for immersed surfaces with positive constant mean curvature in H2×R. These surfaces are obtained by means of a conjugate construction.
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