Matches in DBpedia 2016-04 for { ?s ?p "A set of prototiles is aperiodic if copies of them can be assembled to create tilings, and all such tilings are non-periodic. Consequently, aperiodicity is a property of the set of prototiles; the tilings themselves are just non-periodic. Typically, distinct tilings may be obtained from a single aperiodic set of tiles.The various Penrose tiles are the best-known examples of an aperiodic set of tiles."@en }
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- Aperiodic_set_of_prototiles comment "A set of prototiles is aperiodic if copies of them can be assembled to create tilings, and all such tilings are non-periodic. Consequently, aperiodicity is a property of the set of prototiles; the tilings themselves are just non-periodic. Typically, distinct tilings may be obtained from a single aperiodic set of tiles.The various Penrose tiles are the best-known examples of an aperiodic set of tiles.".
- Q17002261 comment "A set of prototiles is aperiodic if copies of them can be assembled to create tilings, and all such tilings are non-periodic. Consequently, aperiodicity is a property of the set of prototiles; the tilings themselves are just non-periodic. Typically, distinct tilings may be obtained from a single aperiodic set of tiles.The various Penrose tiles are the best-known examples of an aperiodic set of tiles.".