Aperiodic Order Meets Number Theory: Origin and Structure of the Field

Baake, M.; Coons, M.; Grimm, U.; Roberts, J.A.G. and Yassawi, R. (2021). Aperiodic Order Meets Number Theory: Origin and Structure of the Field. In: Wood, David R.; de Gier, Jan; Praeger, Cheryl E. and Tao, Terence eds. 2019-20 MATRIX Annals. MATRIX Book Series (4). Cham: Springer, pp. 663–667.

DOI: https://doi.org/10.1007/978-3-030-62497-2_40

Abstract

Aperiodic order is a relatively young area of mathematics with connections to many other fields, including discrete geometry, harmonic analysis, dynamical systems, algebra, combinatorics and, above all, number theory. In fact, number-theoretic methods and results are present in practically all of these connections. It was one aim of this workshop to review, strengthen and foster these connections.

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