Asymptotic structure in substitution tiling spaces
Abstract
Every sufficiently regular space of tilings of has at least one pair of distinct tilings that are asymptotic under translation in all the directions of some open -dimensional hemisphere. If the tiling space comes from a substitution, there is a way of defining a location on such tilings at which asymptoticity `starts'. This leads to the definition of the {\em branch locus} of the tiling space: this is a subspace of the tiling space, of dimension at most , that summarizes the `asymptotic in at least a half-space' behavior in the tiling space. We prove that if a -dimensional self-similar substitution tiling space has a pair of distinct tilings that are asymptotic in a set of directions that contains a closed -hemisphere in its interior, then the branch locus is a topological invariant of the tiling space. If the tiling space is a 2-dimensional self-similar Pisot substitution tiling space, the branch locus has a description as an inverse limit of an expanding Markov map on a 1-dimensional simplicial complex.
Keywords
Cite
@article{arxiv.1101.4902,
title = {Asymptotic structure in substitution tiling spaces},
author = {Marcy Barge and Carl Olimb},
journal= {arXiv preprint arXiv:1101.4902},
year = {2019}
}
Comments
33 pages, 5 figures