Key points are not available for this paper at this time.
The periodic tiling conjecture asserts that any finite subset of a lattice Zᵈ that tiles that lattice by translations, in fact tiles periodically. In this work we disprove this conjecture for sufficiently large d, which also implies a disproof of the corresponding conjecture for Euclidean spaces Rᵈ. In fact, we also obtain a counterexample in a group of the form Z² G₀ for some finite abelian 2-group G₀. Our methods rely on encoding a "Sudoku puzzle" whose rows and other non-horizontal lines are constrained to lie in a certain class of "2-adically structured functions, " in terms of certain functional equations that can be encoded in turn as a single tiling equation, and then demonstrating that solutions to this Sudoku puzzle exist, but are all non-periodic.
Greenfeld et al. (Mon,) studied this question.