English

Quasi-hyperbolic planes in relatively hyperbolic groups

Group Theory 2020-11-09 v3 Geometric Topology Metric Geometry

Abstract

We show that any group that is hyperbolic relative to virtually nilpotent subgroups, and does not admit peripheral splittings, contains a quasi-isometrically embedded copy of the hyperbolic plane. In natural situations, the specific embeddings we find remain quasi-isometric embeddings when composed with the inclusion map from the Cayley graph to the coned-off graph, as well as when composed with the quotient map to "almost every" peripheral (Dehn) filling. We apply our theorem to study the same question for fundamental groups of 3-manifolds. The key idea is to study quantitative geometric properties of the boundaries of relatively hyperbolic groups, such as linear connectedness. In particular, we prove a new existence result for quasi-arcs that avoid obstacles.

Keywords

Cite

@article{arxiv.1111.2499,
  title  = {Quasi-hyperbolic planes in relatively hyperbolic groups},
  author = {John M. Mackay and Alessandro Sisto},
  journal= {arXiv preprint arXiv:1111.2499},
  year   = {2020}
}

Comments

v1: 32 pages, 4 figures. v2: 38 pages, 4 figures. v3: 44 pages, 4 figures. An application (Theorem 1.2) is weakened as there was an error in its proof in section 7, all other changes minor, improved exposition

R2 v1 2026-06-21T19:34:08.183Z