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Title:

Discrete tomography of mathematcal qquasicrystals: A primer

Document type:
Zeitschriftenaufsatz
Author(s):
Baake, C.; P. Gritzmann, C. Huck, B. Langfeld and K. Lord
Abstract:
This text is a report on work progress. We introduce the class of cyclotomic model sets (mathematical quasicrystals) Λ⊂Z[ξn], where Z[ξn] is the ring of integers in the nth cyclotomic field Q(ξn), and discuss the corresponding decomposition, consistency and reconstruction problems of the discrete tomography of these sets. Our solution of the so-called decomposition problem also applies to the case of the square lattice Z2=Z[ξ4], which corresponds to the classical setting of discrete tomography.
Keywords:
Consistency problemcyclomatic model setdecomposition problemdiscrete tomographyreconstruction problem
Journal title:
Electronic Notes in Discrete Mathematics
Year:
2005
Journal issue:
20
Pages contribution:
179-191
Reviewed:
ja
Language:
en
TUM Institution:
Lehrstuhl für Angewandte Geometrie und Diskrete Mathematik
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