A remark on one-harmonic maps from a Hadamard surface of pinched negative curvature to the hyperbolic plane
Abstract
We show that every one-harmonic map, in the sense of Trapani and Valli, from a Hadamard surface of pinched negative curvature to H2 has image the interior of the convex hull of a subset of ∂∞H2. The proof relies on Minkowski geometry, by interpreting one-harmonic maps as the Gauss maps of convex surfaces.
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