In geometry, a chair tiling (or L tiling) is a nonperiodic substitution tiling created from L-tromino prototiles. These prototiles are examples of rep-tiles and so an iterative process of decomposing the L tiles into smaller copies and then rescaling them to their original size can be used to cover patches of the plane.[1]: 581  Chair tilings do not possess translational symmetry, i.e., they are examples of nonperiodic tilings, but the chair tiles are not aperiodic tiles since they are not forced to tile nonperiodically by themselves.[2]: 482  The trilobite and cross tiles are aperiodic tiles that enforce the chair tiling substitution structure[3] and these tiles have been modified to a simple aperiodic set of tiles using matching rules enforcing the same structure.[4] Barge et al. have computed the Čech cohomology of the chair tiling[5] and it has been shown that chair tilings can also be obtained via a cut-and-project scheme.[6]

The chair substitution (left) and a portion of a chair tiling (right)

References

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  1. ^ Robinson Jr., E. Arthur (1999-12-20). "On the table and the chair". Indagationes Mathematicae. 10 (4): 581–599. doi:10.1016/S0019-3577(00)87911-2.
  2. ^ Goodman-Strauss, Chaim (1999), "Aperiodic Hierarchical Tilings" (PDF), in Sadoc, J. F.; Rivier, N. (eds.), Foams and Emulsions, Dordrecht: Springer, pp. 481–496, doi:10.1007/978-94-015-9157-7_28, ISBN 978-90-481-5180-6
  3. ^ Goodman-Strauss, Chaim (1999). "A Small Aperiodic Set of Planar Tiles". European Journal of Combinatorics. 20 (5): 375–384. doi:10.1006/eujc.1998.0281.
  4. ^ Goodman-Strauss, Chaim (2018). "Lots of aperiodic sets of tiles". Journal of Combinatorial Theory. Series A. 160: 409–445. arXiv:1608.07165. doi:10.1016/j.jcta.2018.07.002.
  5. ^ Barge, Marcy; Diamond, Beverly; Hunton, John; Sadun, Lorenzo (2010). "Cohomology of substitution tiling spaces". Ergodic Theory and Dynamical Systems. 30 (6): 1607–1627. arXiv:0811.2507. doi:10.1017/S0143385709000777.
  6. ^ Baake, Michael; Moody, Robert V.; Schlottmann, Martin (1998). "Limit-(quasi)periodic point sets as quasicrystals with p-adic internal spaces". Journal of Physics A: Mathematical and General. 31 (27): 5755–5766. arXiv:math-ph/9901008. Bibcode:1998JPhA...31.5755B. doi:10.1088/0305-4470/31/27/006.
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  • Tilings Encyclopedia, Chair