Cannon-Thurston Maps for Kleinian Groups
Abstract
We show that Cannon-Thurston maps exist for degenerate free groups without parabolics, i.e. for handlebody groups. Combining these techniques with earlier work proving the existence of Cannon-Thurston maps for surface groups, we show that Cannon-Thurston maps exist for arbitrary finitely generated Kleinian groups without parabolics, proving conjectures of Thurston and McMullen. We also show that point pre-images under Cannon-Thurston maps for degenerate free groups without parabolics correspond to end-points of leaves of an ending lamination in the Masur domain, whenever a point has more than one pre-image. This proves a conjecture of Otal. We also prove a similar result for point pre-images under Cannon-Thurston maps for arbitrary finitely generated Kleinian groups without parabolics.
Keywords
Cite
@article{arxiv.1002.0996,
title = {Cannon-Thurston Maps for Kleinian Groups},
author = {Mahan Mj},
journal= {arXiv preprint arXiv:1002.0996},
year = {2017}
}
Comments
39 pgs 1 fig. Final version incorporating referee comments. To appear in Forum of Mathematics, Pi