Combinatorics of linear iterated function systems with overlaps
摘要
Let be points in , and let be a one-parameter family of similitudes of : where is our parameter. Then, as is well known, there exists a unique self-similar attractor satisfying . Each has at least one address , i.e., . We show that for sufficiently close to 1, each has different addresses. If is not too close to 1, then we can still have an overlap, but there exist 's which have a unique address. However, we prove that almost every has addresses, provided contains no holes and at least one proper overlap. We apply these results to the case of expansions with deleted digits. Furthermore, we give sharp sufficient conditions for the Open Set Condition to fail and for the attractor to have no holes. These results are generalisations of the corresponding one-dimensional results, however most proofs are different.
引用
@article{arxiv.math/0703607,
title = {Combinatorics of linear iterated function systems with overlaps},
author = {Nikita Sidorov},
journal= {arXiv preprint arXiv:math/0703607},
year = {2015}
}
备注
Accepted for publication in Nonlinearity