Backward iteration in the unit ball
Abstract
We will consider iteration of an analytic self-map of the unit ball in . Many facts were established about such dynamics in the 1-dimensional case (i.e. for self-maps of the unit disk), and we will generalize some of them in higher dimensions. In particular, in the case when is hyperbolic or elliptic, it will be shown that backward-iteration sequences with bounded hyperbolic step converge to a point on the boundary. These points will be called boundary repelling fixed points and will possess several nice properties. At each isolated boundary repelling fixed point we will also construct a (semi) conjugation of to an automorphism via an analytic intertwining map. We will finish with some new examples.
Cite
@article{arxiv.0910.5451,
title = {Backward iteration in the unit ball},
author = {Olena Ostapyuk},
journal= {arXiv preprint arXiv:0910.5451},
year = {2015}
}
Comments
32 pages, 3 figures. Changes from the previous version: 1)Theorem 1.8 is now proven in elliptic case. 2)Examples and open questions added