Conformal dynamics at infinity for groups with contracting elements
Abstract
This paper develops a theory of conformal density at infinity for groups with contracting elements. We start by introducing a class of convergence boundary encompassing many known hyperbolic-like boundaries, on which a detailed study of conical points and Myrberg points is carried out. The basic theory of conformal density is then established on the convergence boundary, including the Sullivan shadow lemma and a Hopf--Tsuji--Sullivan dichotomy. This gives a unification of the theory of conformal density on the Gromov and Floyd boundary for (relatively) hyperbolic groups, the visual boundary for rank-1 CAT(0) groups, and Thurston boundary for mapping class groups. Besides that, the conformal density on the horofunction boundary provides a new important example of our general theory. Applications include the identification of Poisson boundary of random walks, the co-growth problem of divergent groups, measure theoretical results for CAT(0) groups and mapping class groups.
Cite
@article{arxiv.2208.04861,
title = {Conformal dynamics at infinity for groups with contracting elements},
author = {Wenyuan Yang},
journal= {arXiv preprint arXiv:2208.04861},
year = {2025}
}
Comments
Version 5: 79 pages, 16 figures. Expositions improved, several arguments clarified, and a new section 10 added about applications in RHGs