A7: An aperiodic set of 7 square dominoes
Vincent Van Dongen
TL;DR
This paper introduces a new aperiodic tileset of 7 square dominoes, called A7, which is related to the Ammann A3 set, expanding the understanding of aperiodic tilings.
Contribution
The paper presents a novel aperiodic tileset of 7 square dominoes and establishes its direct connection with the Ammann A3 set, contributing to the study of aperiodic tilings.
Findings
A7 is an aperiodic tileset of 7 square dominoes.
A7 is directly related to Ammann A3.
The paper details the tileset and its connection to Ammann A3.
Abstract
This paper presents an aperiodic tileset of 7 square dominoes. We call it A7 as it directly relates to the aperiodic set Ammann A3. We start with a description of the tileset. We then present Ammann A3 and its direct link with tileset A7.
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Taxonomy
TopicsQuasicrystal Structures and Properties · Cellular Automata and Applications · Finite Group Theory Research