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- Q5659356 subject Q6960175.
- Q5659356 subject Q7347245.
- Q5659356 subject Q8376892.
- Q5659356 abstract "In mathematics, a harmonious set is a subset of a locally compact abelian group on which every weak character may be uniformly approximated by strong characters. Equivalently, a suitably defined dual set is relatively dense in the Pontryagin dual of the group. This notion was introduced by Yves Meyer in 1970 and later turned out to play an important role in the mathematical theory of quasicrystals. Some related concepts are model sets, Meyer sets, and cut-and-project sets.".
- Q5659356 wikiPageWikiLink Q1030382.
- Q5659356 wikiPageWikiLink Q1066983.
- Q5659356 wikiPageWikiLink Q1194053.
- Q5659356 wikiPageWikiLink Q1227061.
- Q5659356 wikiPageWikiLink Q12916.
- Q5659356 wikiPageWikiLink Q1361055.
- Q5659356 wikiPageWikiLink Q1632419.
- Q5659356 wikiPageWikiLink Q17098889.
- Q5659356 wikiPageWikiLink Q175116.
- Q5659356 wikiPageWikiLink Q2608380.
- Q5659356 wikiPageWikiLink Q263214.
- Q5659356 wikiPageWikiLink Q331089.
- Q5659356 wikiPageWikiLink Q3343049.
- Q5659356 wikiPageWikiLink Q395.
- Q5659356 wikiPageWikiLink Q574597.
- Q5659356 wikiPageWikiLink Q616608.
- Q5659356 wikiPageWikiLink Q680081.
- Q5659356 wikiPageWikiLink Q6960175.
- Q5659356 wikiPageWikiLink Q7347245.
- Q5659356 wikiPageWikiLink Q8376892.
- Q5659356 comment "In mathematics, a harmonious set is a subset of a locally compact abelian group on which every weak character may be uniformly approximated by strong characters. Equivalently, a suitably defined dual set is relatively dense in the Pontryagin dual of the group. This notion was introduced by Yves Meyer in 1970 and later turned out to play an important role in the mathematical theory of quasicrystals. Some related concepts are model sets, Meyer sets, and cut-and-project sets.".
- Q5659356 label "Harmonious set".