Expansivity properties and rigidity for non-recurrent exponential maps
Dynamical Systems
2014-08-08 v2
Abstract
We show that an exponential map whose singular value is combinatorially non-recurrent and non-escaping is uniquely determined by its combinatorics, i.e. the pattern in which its dynamic rays land together. We do this by constructing puzzles and parapuzzles in the exponential family. We also prove a theorem about hyperbolicity of the postsingular set in the case that the singular value is non-recurrent. Finally, we show that boundedness of the postsingular set implies combinatorial non-recurrence if is in the Julia set.
Keywords
Cite
@article{arxiv.1210.1353,
title = {Expansivity properties and rigidity for non-recurrent exponential maps},
author = {Anna Miriam Benini},
journal= {arXiv preprint arXiv:1210.1353},
year = {2014}
}