A note on a flip-connected class of generalized domino tilings of the box [0,2]n

Abstract

Let n,d∈ N and n>d. An (n-d)-domino is a box I1× ·s × In such that Ij∈ \[0,1],[1,2]\ for all j∈ N⊂ [n] with |N|=d and Ii=[0,2] for every i∈ [n] N. If A and B are two (n-d)-dominoes such that A B is an (n-(d-1))-domino, then A,B is called a twin pair. If C,D are two (n-d)-dominoes which form a twin pair such that A B=C D and \C,D\≠ \A,B\, then the pair C,D is called a flip of A,B. A family D of (n-d)-dominoes is a tiling of the box [0,2]n if interiors of every two members of D are disjoint and B∈ DB=[0,2]n. An (n-d)-domino tiling D' is obtained from an (n-d)-domino tiling D by a flip, if there is a twin pair A,B∈ D such that D'=(D \A,B\) \C,D\, where C,D is a flip of A,B. A family of (n-d)-domino tilings of the box [0,2]n is flip-connected, if for every two members D,E of this family the tiling E can be obtained from D by a sequence of flips. In the paper some flip-connected class of (n-d)-domino tilings of the box [0,2]n is described.