English

Hyperbolicity via Geodesic Stability

Metric Geometry 2026-01-21 v3 Group Theory Geometric Topology

Abstract

A geodesic gg is Morse, for every L1,A0L \geq 1, A \geq 0 there exists a C=Cg(L,A)C=C_g(L,A) such that any (L,A)(L,A)-quasi-geodesic connecting two points on gg stays CC-close to gg. The Morse lemma implies that in a hyperbolic space every geodesic is Morse. Here we prove the converse: If a homogeneous proper geodesic space is such that for every geodesic gg and every L1,A0L\geq 1, A \geq 0 there exists a constant C=Cg(L,A)C=C_g(L,A) such that any (L,A)(L,A)-quasi-geodesic between any two points on gg stays CC-close, then the space is hyperbolic. This applies in particular to infinite groups in which all geodesics are Morse.

Keywords

Cite

@article{arxiv.1504.06863,
  title  = {Hyperbolicity via Geodesic Stability},
  author = {Elisabeth Fink},
  journal= {arXiv preprint arXiv:1504.06863},
  year   = {2026}
}

Comments

Contains errors

R2 v1 2026-06-22T09:22:54.881Z