Domino tilings of cylinders: the domino group and connected components under flips

Abstract

We consider domino tilings of three-dimensional cubiculated regions. A flip is a local move: two neighboring parallel dominoes are removed and placed back in a different position. The twist is an integer associated to each tiling, which is invariant under flips. A balanced quadriculated disk D is regular if whenever two tilings t0 and t1 of D × [0,N] have the same twist then t0 and t1 can be joined by a sequence of flips provided some extra vertical space is allowed. We define the domino group of a quadriculated disk and prove that D is regular if and only if its domino group is isomorphic to Z Z/(2). We prove that a rectangle D = [0,L] × [0,M] with LM even is regular if and only if \L,M\ 3 and conjecture that in general "large" disks are regular. In the cases where D is not regular we prove partial results concerning the structure of the domino group: the group is not abelian and has exponential growth. We also prove that if D is regular then the extra vertical space necessary to join by flips two tilings of D × [0,N] with the same twist depends only on D, not on the height N.