Lee JY, Lenz D, Richard C, Sing B, Strungaru N (2020)
Publication Type: Journal article
Publication year: 2020
Book Volume: 110
Pages Range: 3435-3472
Journal Issue: 12
DOI: 10.1007/s11005-020-01337-2
Modulated crystals and quasicrystals can simultaneously be described as modulated quasicrystals, a class of point sets introduced by de Bruijn in 1987. With appropriate modulation functions, modulated quasicrystals themselves constitute a substantial subclass of strongly almost periodic point measures. We re-analyze these structures using methods from modern mathematical diffraction theory, thereby providing a coherent view over that class. Similar to de Bruijn’s analysis, we find stability with respect to almost periodic modulations.
APA:
Lee, J.Y., Lenz, D., Richard, C., Sing, B., & Strungaru, N. (2020). Modulated crystals and almost periodic measures. Letters in Mathematical Physics, 110(12), 3435-3472. https://dx.doi.org/10.1007/s11005-020-01337-2
MLA:
Lee, Jeong Yup, et al. "Modulated crystals and almost periodic measures." Letters in Mathematical Physics 110.12 (2020): 3435-3472.
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