Tilings, tiling spaces and topology
动力系统
2018-07-18 v2 数学物理
度量几何
math.MP
摘要
To understand an aperiodic tiling (or a quasicrystal modeled on an aperiodic tiling), we construct a space of similar tilings, on which the group of translations acts naturally. This space is then an (abstract) dynamical system. Dynamical properties of the space (such as mixing, or the spectrum of the translation operator) are closely related to bulk properties of the individual tilings (such as the diffraction pattern). The topology of the space of tilings, particularly the Cech cohomology, gives information on how the original tiling can be deformed. Tiling spaces can be constructed as inverse limits of branched manifolds.
引用
@article{arxiv.math/0506054,
title = {Tilings, tiling spaces and topology},
author = {Lorenzo Sadun},
journal= {arXiv preprint arXiv:math/0506054},
year = {2018}
}
备注
8 pages, including 2 figures, talk given at ICQ9