Renormalization towers and their forcing
Abstract
A cyclic permutation has a \emph{block structure} if there is a partition of into segments (\emph{blocks}) permuted by ; call the \emph{period} of this block structure. Let be periods of all possible block structures on . Call the finite string the {\it renormalization tower of }. The same terminology can be used for \emph{patterns}, i.e., for families of cycles of interval maps inducing the same (up to a flip) cyclic permutation. A renormalization tower \emph{forces} a renormalization tower if every continuous interval map with a cycle of pattern with renormalization tower must have a cycle of pattern with renormalization tower . We completely characterize the forcing relation among renormalization towers. Take the following order among natural numbers: understood in the strict sense. We show that the forcing relation among renormalization towers is given by the lexicographic extension of this order. Moreover, for any tail of this order there exists an interval map for which the set of renormalization towers of its cycles equals .
Keywords
Cite
@article{arxiv.1811.09872,
title = {Renormalization towers and their forcing},
author = {Alexander Blokh and Michał Misiurewicz},
journal= {arXiv preprint arXiv:1811.09872},
year = {2021}
}
Comments
19 pages, 5 figures