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- Self-tiling_tile_set abstract "A self-tiling tile set, or setiset, of order n is a set of n shapes or pieces, usually planar, each of which can be tiled with smaller replicas of the complete set of n shapes. That is, the n shapes can be assembled in n different ways so as to create larger copies of themselves, where the increase in scale is the same in each case. Figure 1 shows an example for n = 4 using distinctly shaped decominoes. The concept can be extended to include pieces of higher dimension. The name setisets was coined by Lee Sallows in 2012, but the problem of finding such sets for n = 4 was asked decades previously by C. Dudley Langford, and examples for polyaboloes (discovered by Martin Gardner, Wade E. Philpott and others) and polyominoes (discovered by Maurice J. Povah) were previously published by Gardner.".
- Self-tiling_tile_set thumbnail A_perfect_self-tiling_tile_set_of_order_4.png?width=300.
- Self-tiling_tile_set wikiPageExternalLink index.php?page_menu=Self-Tiling%20Tile%20Sets.
- Self-tiling_tile_set wikiPageID "42595150".
- Self-tiling_tile_set wikiPageLength "6704".
- Self-tiling_tile_set wikiPageOutDegree "24".
- Self-tiling_tile_set wikiPageRevisionID "685684888".
- Self-tiling_tile_set wikiPageWikiLink Aperiodic_tiling.
- Self-tiling_tile_set wikiPageWikiLink Category:Tessellation.
- Self-tiling_tile_set wikiPageWikiLink Decomino.
- Self-tiling_tile_set wikiPageWikiLink Hinged_dissection.
- Self-tiling_tile_set wikiPageWikiLink Lee_Sallows.
- Self-tiling_tile_set wikiPageWikiLink Martin_Gardner.
- Self-tiling_tile_set wikiPageWikiLink Octomino.
- Self-tiling_tile_set wikiPageWikiLink Polyabolo.
- Self-tiling_tile_set wikiPageWikiLink Polyomino.
- Self-tiling_tile_set wikiPageWikiLink Prototile.
- Self-tiling_tile_set wikiPageWikiLink Rep-tile.
- Self-tiling_tile_set wikiPageWikiLink Square_number.
- Self-tiling_tile_set wikiPageWikiLink Substitution_tiling.
- Self-tiling_tile_set wikiPageWikiLink Tessellation.
- Self-tiling_tile_set wikiPageWikiLink File:A_loop_of_length_2_using_decominoes.png.
- Self-tiling_tile_set wikiPageWikiLink File:A_perfect_self-tiling_tile_set_of_order_4.png.
- Self-tiling_tile_set wikiPageWikiLink File:A_rep-tile-based_setiset_of_order_4.png.
- Self-tiling_tile_set wikiPageWikiLink File:A_rep-tile-based_setiset_of_order_9.png.
- Self-tiling_tile_set wikiPageWikiLink File:A_setiset_of_order_4_showing_two_stages_of_inflation.png.
- Self-tiling_tile_set wikiPageWikiLink File:A_setiset_showing_weakly-connected_pieces.png.
- Self-tiling_tile_set wikiPageWikiLink File:A_setiset_with_duplicated_piece.png.
- Self-tiling_tile_set wikiPageWikiLink File:An_infinite_family_of_order_2_setisets.png.
- Self-tiling_tile_set wikiPageWikiLinkText "Self-tiling tile set".
- Self-tiling_tile_set wikiPageWikiLinkText "self-tiling tile set".
- Self-tiling_tile_set wikiPageUsesTemplate Template:Clear.
- Self-tiling_tile_set wikiPageUsesTemplate Template:Pad.
- Self-tiling_tile_set wikiPageUsesTemplate Template:Reflist.
- Self-tiling_tile_set wikiPageUsesTemplate Template:Tessellation.
- Self-tiling_tile_set subject Category:Tessellation.
- Self-tiling_tile_set hypernym Set.
- Self-tiling_tile_set comment "A self-tiling tile set, or setiset, of order n is a set of n shapes or pieces, usually planar, each of which can be tiled with smaller replicas of the complete set of n shapes. That is, the n shapes can be assembled in n different ways so as to create larger copies of themselves, where the increase in scale is the same in each case. Figure 1 shows an example for n = 4 using distinctly shaped decominoes. The concept can be extended to include pieces of higher dimension.".
- Self-tiling_tile_set label "Self-tiling tile set".
- Self-tiling_tile_set sameAs Q17078261.
- Self-tiling_tile_set sameAs m.010gk538.
- Self-tiling_tile_set sameAs Набор_плиток_с_самозамощением.
- Self-tiling_tile_set sameAs Q17078261.
- Self-tiling_tile_set wasDerivedFrom Self-tiling_tile_set?oldid=685684888.
- Self-tiling_tile_set depiction A_perfect_self-tiling_tile_set_of_order_4.png.
- Self-tiling_tile_set isPrimaryTopicOf Self-tiling_tile_set.