English

A combinatorial higher-rank hyperbolicity condition

Metric Geometry 2023-10-04 v3 Group Theory

Abstract

We investigate a coarse version of a 2(n+1)2(n+1)-point inequality characterizing metric spaces of combinatorial dimension at most nn due to Dress. This condition, experimentally called (n,δ)(n,\delta)-hyperbolicity, reduces to Gromov's quadruple definition of δ\delta-hyperbolicity in case n=1n = 1. The ll_\infty-product of nn δ\delta-hyperbolic spaces is (n,δ)(n,\delta)-hyperbolic. Every (n,δ)(n,\delta)-hyperbolic metric space, without any further assumptions, possesses a slim (n+1)(n+1)-simplex property analogous to the slimness of quasi-geodesic triangles in Gromov hyperbolic spaces. In connection with recent work in geometric group theory, we show that every Helly group and every hierarchically hyperbolic group of (asymptotic) rank nn acts geometrically on some (n,δ)(n,\delta)-hyperbolic space.

Keywords

Cite

@article{arxiv.2206.08153,
  title  = {A combinatorial higher-rank hyperbolicity condition},
  author = {Martina Jørgensen and Urs Lang},
  journal= {arXiv preprint arXiv:2206.08153},
  year   = {2023}
}

Comments

22 pages, 3 figures. V3: some improvements, updated references. To appear in Comment. Math. Helv

R2 v1 2026-06-24T11:53:49.038Z