Gluing and cutting cube tiling codes in dimension six

Abstract

Let S be a set of arbitrary objects, and let s s' be a permutation of S such that s"=(s')'=s and s'≠ s. Let Sd=\v1...vd vi∈ S\. Two words v,w∈ Sd are dichotomous if vi=w'i for some i∈ [d], and they form a twin pair if vi'=wi and vj=wj for every j∈ [d] \i\. A polybox code is a set V⊂ Sd in which every two words are dichotomous. A polybox code V is a cube tiling code if |V|=2d. A 2-periodic cube tiling of Rd and a cube tiling of flat torus Td can be encoded in a form of a cube tiling code. A twin pair v,w in which vi=wi' is glue (at the ith position) if the pair v,w is replaced by one word u such that uj=vj=wj for every j∈ [d] \i\ and ui=*, where *∈ S is some extra fixed symbol. A word u with ui=* is cut (at the ith position) if u is replaced by a twin pair q,t such that qi=ti' and uj=qj=tj for every j∈ [d] \i\. If V,W⊂ Sd are two cube tiling codes and there is a sequence of twin pairs which can be interchangeably gluing and cutting in a way which allows us to pass from V to W, then we say that W is obtained from V by gluing and cutting. In the paper it is shown that for every two cube tiling codes in dimension six one can be obtained from the other by gluing and cutting.