New examples of constant mean curvature surfaces in S2×R and H2× R

Abstract

We construct non-zero constant mean curvature H surfaces in the product spaces S2 × R and H2× R by using suitable conjugate Plateau constructions. The resulting surfaces are complete, have bounded height and are invariant under a discrete group of horizontal translations. In S2×R (for any H > 0) or H2×R (for H > 1/2), a 1-parameter family of unduloid-type surfaces is obtained, some of which are shown to be compact in S2×R. Finally, in the case of H = 1/2 in H2 × R, the constructed examples have the symmetries of a tessellation of H2 by regular polygons.