Rigidity on horocycles and hypercycles
Geometric Topology
2024-05-29 v1
Abstract
We show that a bijection 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 . 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 . This shadowed the difference between the geometry of geodesics and that of horocycles/hypercycles.
Cite
@article{arxiv.2405.17598,
title = {Rigidity on horocycles and hypercycles},
author = {Cheikh Lo and Abdoul Karim Sane},
journal= {arXiv preprint arXiv:2405.17598},
year = {2024}
}