English

Metric transforms yielding Gromov hyperbolic spaces

Metric Geometry 2018-07-17 v2 Geometric Topology

Abstract

A real valued function φ\varphi of one variable is called a metric transform if for every metric space (X,d)(X,d) the composition dφ=φdd_\varphi = \varphi\circ d is also a metric on XX. We give a complete characterization of the class of approximately nondecreasing, unbounded metric transforms φ\varphi such that the transformed Euclidean half line ([0,),φ)([0,\infty),|\cdot|_\varphi) is Gromov hyperbolic. As a consequence, we obtain metric transform rigidity for roughly geodesic Gromov hyperbolic spaces, that is, if (X,d)(X,d) is any metric space containing a rough geodesic ray and φ\varphi is an approximately nondecreasing, unbounded metric transform such that the transformed space (X,dφ)(X,d_\varphi) is Gromov hyperbolic and roughly geodesic then φ\varphi is an approximate dilation and the original space (X,d)(X,d) is Gromov hyperbolic and roughly geodesic.

Keywords

Cite

@article{arxiv.1710.05078,
  title  = {Metric transforms yielding Gromov hyperbolic spaces},
  author = {George Dragomir and Andrew Nicas},
  journal= {arXiv preprint arXiv:1710.05078},
  year   = {2018}
}

Comments

Final version, with several minor corrections and improvements. To appear in Geometriae Dedicata

R2 v1 2026-06-22T22:13:17.969Z