Rigidity on horocycles and hypercycles

Abstract

We show that a bijection f:H2→H2 of the hyperbolic plane that sends horocycles to horocycles (respectively hypercycles to hypercycles) is an isometry. This extends a previous result of J. Jeffers on geodesics to all curves with constant curvature in H2. We go beyond by showing that every abstract automorphism of the geodesic graph (respectively horocycles and hypercycles graphs) is induced by an earthquake map (respectively an isometry) of H2. This shadowed the difference between the geometry of geodesics and that of horocycles/hypercycles.

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