Limit groups for relatively hyperbolic groups, I: The basic tools
Abstract
We begin the investigation of Gamma-limit groups, where Gamma is a torsion-free group which is hyperbolic relative to a collection of free abelian subgroups. Using the results of Drutu and Sapir, we adapt the results from math.GR/0404440 to this context. Specifically, given a finitely generated group G, and a sequence of pairwise non-conjugate homomorphisms {h_n : G -> Gamma}, we extract an R-tree with a nontrivial isometric G-action. We then prove an analogue of Sela's shortening argument.
Cite
@article{arxiv.math/0412492,
title = {Limit groups for relatively hyperbolic groups, I: The basic tools},
author = {Daniel Groves},
journal= {arXiv preprint arXiv:math/0412492},
year = {2016}
}
Comments
41 pages. The new version of this paper has been substantially rewritten. It now includes all of the results of the previous version, and also of math.GR/0408080. The exception to this is the proof of the Hopf property, which follows imediately from Theorem 5.2 of math.GR/0503045 (and does not use anything omitted from this version)