Diffraction of limit periodic point sets
Abstract
Limit periodic point sets are aperiodic structures with pure point diffraction supported on a countably, but not finitely generated Fourier module that is based on a lattice and certain integer multiples of it. Examples are cut and project sets with p-adic internal spaces. We illustrate this by explicit results for the diffraction measures of two examples with 2-adic internal spaces. The first and well-known example is the period doubling sequence in one dimension, which is based on the period doubling substitution rule. The second example is a weighted planar point set that is derived from the classic chair tiling in the plane. It can be described as a fixed point of a block substitution rule.
Cite
@article{arxiv.1007.0707,
title = {Diffraction of limit periodic point sets},
author = {Michael Baake and Uwe Grimm},
journal= {arXiv preprint arXiv:1007.0707},
year = {2019}
}
Comments
10 pages, 2 figures; paper presented at ICQ11 (Sapporo)