English

Flow views and infinite interval exchange transformations for recognizable substitutions

Dynamical Systems 2024-07-18 v4

Abstract

A flow view is the graph of a measurable conjugacy Φ\Phi between a substitution or S-adic subshift (Σ,σ,μ)(\Sigma,\sigma, \mu) and an exchange of infinitely many intervals in ([0,1],F,m)([0,1], F, m), where mm is Lebesgue measure. A natural refining sequence of partitions of Σ\Sigma is transferred to ([0,1],m)([0,1],m) using a canonical addressing scheme, a fixed dual substitution, and a shift-invariant probability measure μ\mu. On the flow view, TΣT \in \Sigma is shown horizontally at a height of Φ(T)\Phi(T) using colored unit intervals to represent the letters. The infinite interval exchange transformation FF is well approximated by exchanges of finitely many intervals, making numeric and graphic methods possible. We prove that in certain cases a choice of dual substitution guarantees that FF is self-similar. We discuss why the spectral type of ΦL2(Σ,μ),\Phi \in L^2(\Sigma, \mu), is of particular interest. As an example of utility, some spectral results for constant-length substitutions are included.

Keywords

Cite

@article{arxiv.2103.07997,
  title  = {Flow views and infinite interval exchange transformations for recognizable substitutions},
  author = {Natalie Priebe Frank},
  journal= {arXiv preprint arXiv:2103.07997},
  year   = {2024}
}

Comments

To appear in the special issue of Indagationes Mathematicae in honor of Uwe Grimm

R2 v1 2026-06-24T00:08:06.810Z