Matches in DBpedia 2016-04 for { <http://wikidata.dbpedia.org/resource/Q7632143> ?p ?o }
Showing triples 1 to 39 of
39
with 100 triples per page.
- Q7632143 subject Q7347245.
- Q7632143 abstract "In geometry, a tile substitution is a method for constructing highly ordered tilings. Most importantly, some tile substitutions generate aperiodic tilings, which are tilings whose prototiles do not admit any tiling with translational symmetry. The most famous of these are the Penrose tilings. Substitution tilings are special cases of finite subdivision rules, which do not require the tiles to be geometrically rigid.".
- Q7632143 thumbnail Subst-square.png?width=300.
- Q7632143 wikiPageExternalLink index.
- Q7632143 wikiPageWikiLink Q12479.
- Q7632143 wikiPageWikiLink Q1456138.
- Q7632143 wikiPageWikiLink Q160398.
- Q7632143 wikiPageWikiLink Q17285.
- Q7632143 wikiPageWikiLink Q176916.
- Q7632143 wikiPageWikiLink Q181008.
- Q7632143 wikiPageWikiLink Q184743.
- Q7632143 wikiPageWikiLink Q190524.
- Q7632143 wikiPageWikiLink Q193803.
- Q7632143 wikiPageWikiLink Q207643.
- Q7632143 wikiPageWikiLink Q2116709.
- Q7632143 wikiPageWikiLink Q214526.
- Q7632143 wikiPageWikiLink Q214856.
- Q7632143 wikiPageWikiLink Q2329.
- Q7632143 wikiPageWikiLink Q263214.
- Q7632143 wikiPageWikiLink Q320346.
- Q7632143 wikiPageWikiLink Q36161.
- Q7632143 wikiPageWikiLink Q395.
- Q7632143 wikiPageWikiLink Q5450407.
- Q7632143 wikiPageWikiLink Q5450441.
- Q7632143 wikiPageWikiLink Q585688.
- Q7632143 wikiPageWikiLink Q638328.
- Q7632143 wikiPageWikiLink Q6571156.
- Q7632143 wikiPageWikiLink Q7341497.
- Q7632143 wikiPageWikiLink Q7347245.
- Q7632143 wikiPageWikiLink Q740207.
- Q7632143 wikiPageWikiLink Q741518.
- Q7632143 wikiPageWikiLink Q76592.
- Q7632143 wikiPageWikiLink Q862761.
- Q7632143 wikiPageWikiLink Q874429.
- Q7632143 wikiPageWikiLink Q876215.
- Q7632143 wikiPageWikiLink Q906377.
- Q7632143 comment "In geometry, a tile substitution is a method for constructing highly ordered tilings. Most importantly, some tile substitutions generate aperiodic tilings, which are tilings whose prototiles do not admit any tiling with translational symmetry. The most famous of these are the Penrose tilings. Substitution tilings are special cases of finite subdivision rules, which do not require the tiles to be geometrically rigid.".
- Q7632143 label "Substitution tiling".
- Q7632143 depiction Subst-square.png.