Trees, dendrites, and the Cannon-Thurston map
Abstract
When 1 -> H -> G -> Q -> 1 is a short exact sequence of three infinite, word-hyperbolic groups, Mahan Mitra (Mj) has shown that the inclusion map from H to G extends continuously to a map between the Gromov boundaries of H and G. This boundary map is known as the Cannon-Thurston map. In this context, Mitra associates to every point z in the Gromov boundary of Q an "ending lamination" on H which consists of pairs of distinct points in the boundary of H. We prove that for each such z, the quotient of the Gromov boundary of H by the equivalence relation generated by this ending lamination is a dendrite, that is, a tree-like topological space. This result generalizes the work of Kapovich-Lustig and Dowdall-Kapovich-Taylor, who prove that in the case where H is a free group and Q is a convex cocompact purely atoroidal subgroup of Out(F_N), one can identify the resultant quotient space with a certain -tree in the boundary of Culler-Vogtmann's Outer space.
Keywords
Cite
@article{arxiv.1907.06271,
title = {Trees, dendrites, and the Cannon-Thurston map},
author = {Elizabeth Field},
journal= {arXiv preprint arXiv:1907.06271},
year = {2020}
}
Comments
27 pages. Added Convention 4.9, which alters the proofs of the remaining results in section 4, as well as other minor revisions. Version accepted to Algebraic and Geometric Topology