Expanding Thurston Maps
Abstract
We study the dynamics of Thurston maps under iteration. These are branched covering maps of 2-spheres with a finite set of postcritical points. We also assume that the maps are expanding in a suitable sense. Every expanding Thurston map gives rise to a type of fractal geometry on the underlying sphere . This geometry is represented by a class of \emph{visual metrics} that are associated with the map. Many dynamical properties of the map are encoded in the geometry of the corresponding {\em visual sphere}, meaning equipped with a visual metric . For example, we will see that an expanding Thurston map is topologically conjugate to a rational map if and only if is quasisymmetrically equivalent to the Riemann sphere . We also obtain existence and uniqueness results for -invariant Jordan curves containing the set . Furthermore, we obtain several characterizations of Latt\`{e}s maps.
Cite
@article{arxiv.1009.3647,
title = {Expanding Thurston Maps},
author = {Mario Bonk and Daniel Meyer},
journal= {arXiv preprint arXiv:1009.3647},
year = {2017}
}
Comments
492 pages, 51 figures