A350963 Coordination sequence for the XXOXX tiling with respect to a tile of type R.
1, 9, 29, 42, 63, 75, 97, 106, 131, 139, 165, 170, 199, 203, 233, 234, 267, 267, 301, 298, 335, 331, 369, 362, 403, 395, 437, 426, 471, 459, 505, 490, 539, 523, 573, 554, 607, 587, 641, 618, 675, 651, 709, 682, 743, 715, 777, 746, 811, 779, 845, 810, 879, 843
Offset: 0
Keywords
Links
- Chaim Goodman-Strauss and N. J. A. Sloane, A Coloring Book Approach to Finding Coordination Sequences, Acta Cryst. A75 (2019), 121-134, also on NJAS's home page. Also on arXiv, arXiv:1803.08530 [math.CO], 2018-2019.
- Vytautas Gruslys, Imre Leader, and Ta Sheng Tan, Tiling with arbitrary tiles, arXiv:1505.03697 [math.CO], 2015-2016. A small piece of this tiling is shown in Fig. 2.
- Rémy Sigrist, Illustration of initial terms
- Rémy Sigrist, Illustration of the configuration for n = 0..100 with cyclic colors
- Rémy Sigrist, PARI program
- N. J. A. Sloane, (Top) A large portion of the tiling. (Bottom) The start of the coordination sequence with respect to a tile of type R.
- N. J. A. Sloane, A large portion of the tiling in higher resolution
- Index entries for coordination sequences
Crossrefs
Programs
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PARI
See Links section.
Formula
Conjectured g.f.: -(2*t^7-6*t^6-24*t^5-33*t^4-33*t^3-28*t^2-9*t-1)/((1-t^2)*(1-t^4)). Given the decomposition of this structure into eight sectors (see Sigrist's illustration of the first 100 generations), it should be possible to establish this g.f. and those of the other two coordination sequences by using the coloring book method. - N. J. A. Sloane, Feb 26 2022
Extensions
More terms from Rémy Sigrist, Feb 26 2022
Comments