中文

Cube packings, second moment and holes

组合数学 2007-05-23 v1

摘要

We consider tilings and packings of \RRd\RR^d by integral translates of cubes [0,2[d[0,2[^d, which are 4\ZZd4\ZZ^d-periodic. Such cube packings can be described by cliques of an associated graph, which allow us to classify them in dimension d4d\leq 4. For higher dimension, we use random methods for generating some examples. Such a cube packing is called {\em non-extendible} if we cannot insert a cube in the complement of the packing. In dimension 3, there is a unique non-extendible cube packing with 4 cubes. We prove that dd-dimensional cube packings with more than 2d32^d-3 cubes can be extended to cube tilings. We also give a lower bound on the number NN of cubes of non-extendible cube packings. Given such a cube packing and z\ZZdz\in \ZZ^d, we denote by NzN_z the number of cubes inside the \4t\4t-cube z+[0,4[dz+[0,4[^d and call {\em second moment} the average of Nz2N_z^2. We prove that the regular tiling by cubes has maximal second moment and give a lower bound on the second moment of a cube packing in terms of its density and dimension.

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引用

@article{arxiv.math/0509100,
  title  = {Cube packings, second moment and holes},
  author = {Mathieu Dutour and Yoshiaki Itoh and Alexei Poyarkov},
  journal= {arXiv preprint arXiv:math/0509100},
  year   = {2007}
}

备注

11 pages, 1 figure