Author:
Lee Dong-il,Akiyama Shigeki,Lee Jeong-Yup
Abstract
Primitive substitution tilings on {\bb R}^d whose expansion maps are unimodular are considered. It is assumed that all the eigenvalues of the expansion maps are algebraic conjugates with the same multiplicity. In this case, a cut-and-project scheme can be constructed with a Euclidean internal space. Under some additional condition, it is shown that if the substitution tiling has pure discrete spectrum, then the corresponding representative point sets are regular model sets in that cut-and-project scheme.
Funder
National Research Foundation of Korea
Japan Society for the Promotion of Science
Seoul Women`s University
Publisher
International Union of Crystallography (IUCr)
Subject
Inorganic Chemistry,Physical and Theoretical Chemistry,Condensed Matter Physics,General Materials Science,Biochemistry,Structural Biology
Reference38 articles.
1. Akiyama, S., Barge, M., Berth, V., Lee, J.-Y. & Siegel, A. (2015). Mathematics of Aperiodic Order. Progress in Mathematics, Vol. 309, pp. 33-72. Basel: Birkhauser/Springer.
2. Algorithm for determining pure pointedness of self-affine tilings
3. Baake, M. & Grimm, U. (2013). Aperiodic Order, Vol. 1. Cambridge University Press.
4. Baake, M. & Grimm, U. (2017). Aperiodic Order, Vol. 2. Cambridge University Press.
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