彭罗斯几何倾斜的特点是其 1-atlas

IF 0.9 4区计算机科学 Q3 COMPUTER SCIENCE, THEORY & METHODS

Theoretical Computer Science Pub Date : 2024-09-23 DOI:10.1016/j.tcs.2024.114883

Thomas Fernique , Victor Lutfalla

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引用次数: 0

摘要

彭罗斯菱形平铺是由两个装饰菱形组成的平面平铺，在两个平铺之间的交界处（就像拼图一样），装饰菱形相匹配。用动力学术语来说，它们构成了一个有限类型的平铺空间。如果我们去掉装饰，根据定义，就会得到一个索菲克平铺空间，我们在这里称之为几何彭罗斯平铺空间。在这里，我们展示了如何通过三种不同的方法计算出现在这些平铺中的给定大小的图案：两种方法基于彭罗斯平铺的替代结构，最后一种方法基于切割和投影法的定义。我们以此证明，几何彭罗斯罗列的特征是一小部分称为顶点-阿特拉斯的图案，即它们构成了一个有限类型的罗列空间。据我们所知，这一结果虽然被视为民间传说，但还没有发表过完整的证明。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Geometrical Penrose tilings are characterized by their 1-atlas

Penrose rhombus tilings are tilings of the plane by two decorated rhombi such that the decorations match at the junction between two tiles (like in a jigsaw puzzle). In dynamical terms, they form a tiling space of finite type. If we remove the decorations, we get, by definition, a sofic tiling space that we here call geometrical Penrose tilings. Here, we show how to compute the patterns of a given size which appear in these tilings by three different methods: two based on the substitutive structure of the Penrose tilings and the last on their definition by the cut and projection method. We use this to prove that the geometrical Penrose tilings are characterized by a small set of patterns called vertex-atlas, i.e., they form a tiling space of finite type. Though considered as folklore, no complete proof of this result has been published, to our knowledge.

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来源期刊

Theoretical Computer Science 工程技术-计算机：理论方法

CiteScore

2.60

自引率

18.20%

发文量

471

审稿时长

12.6 months

期刊介绍： Theoretical Computer Science is mathematical and abstract in spirit, but it derives its motivation from practical and everyday computation. Its aim is to understand the nature of computation and, as a consequence of this understanding, provide more efficient methodologies. All papers introducing or studying mathematical, logic and formal concepts and methods are welcome, provided that their motivation is clearly drawn from the field of computing.