Thickness, relative hyperbolicity, and randomness in Coxeter groups
Abstract
For right-angled Coxeter groups , we obtain a condition on that is necessary and sufficient to ensure that is thick and thus not relatively hyperbolic. We show that Coxeter groups which are not thick all admit canonical minimal relatively hyperbolic structures; further, we show that in such a structure, the peripheral subgroups are both parabolic (in the Coxeter group-theoretic sense) and strongly algebraically thick. We exhibit a polynomial-time algorithm that decides whether a right-angled Coxeter group is thick or relatively hyperbolic. We analyze random graphs in the Erd\'{o}s-R\'{e}nyi model and establish the asymptotic probability that a random right-angled Coxeter group is thick. In the joint appendix we study Coxeter groups in full generality and there we also obtain a dichotomy whereby any such group is either strongly algebraically thick or admits a minimal relatively hyperbolic structure. In this study, we also introduce a notion we call \emph{intrinsic horosphericity} which provides a dynamical obstruction to relative hyperbolicity which generalizes thickness.
Keywords
Cite
@article{arxiv.1312.4789,
title = {Thickness, relative hyperbolicity, and randomness in Coxeter groups},
author = {Jason Behrstock and Mark F. Hagen and Alessandro Sisto and Pierre-Emmanuel Caprace},
journal= {arXiv preprint arXiv:1312.4789},
year = {2017}
}
Comments
Primary article by Behrstock, Hagen, and Sisto with an appendix by Behrstock, Caprace, Hagen, and Sisto. 31 pages, 5 figures, 1 table. All necessary C++ code can be downloaded from this ArXiv page. The same C++ code, along with instructions and control scripts, is available at http://www-personal.umich.edu/~mfhagen/thickracgcode.tar