Constant mean curvature graphs on exterior domains of the hyperbolic plane
Abstract
We prove an existence result for non rotational constant mean curvature ends in H2 × R, where H2 is the hyperbolic real plane. The value of the curvature is h \, ∈ \, (0, 1/2). We use Schauder theory and a continuity method for solution of the prescribed mean curvature equation of exterior domains of H2. We also prove a fine property of the asymptotic behavior of the rotational ends introduced by Sa Earp and Toubiana.
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