Some variants of the periodic tiling conjecture

Abstract

The periodic tiling conjecture (PTC) asserts, for a finitely generated Abelian group G and a finite subset F of G, that if there is a set A that solves the tiling equation 1F * 1A = 1, there is also a periodic solution 1Ap. This conjecture is known to hold for some groups G and fail for others. In this paper we establish three variants of the PTC. The first (due to Tim Austin) replaces the constant function 1 on the right-hand side of the tiling equation by 0, and the indicator functions 1F and 1A by bounded integer-valued functions. The second, which applies in G=Z2, replaces the right-hand side of the tiling equation by an integer-valued periodic function, and the functions 1F and 1A on the left-hand side by bounded integer-valued functions. The third (which is the most difficult to establish) is similar to the second, but retains the property of both 1A and 1Ap being indicator functions; in particular, we establish the PTC for multi-tilings in G=Z2. As a result, we obtain the decidability of constant-level integer tilings in any finitely generated Abelian group G and multi-tilings in G=Z2.