A note on reduction of tiling problems

Abstract

We show that translational tiling problems in a quotient of Zd can be effectively reduced or ``simulated'' by translational tiling problems in Zd. In particular, for any d ∈ N, k < d and N1,…,Nk ∈ N the existence of an aperiodic tile in Zd-k × (Z / N1Z × … × Z / Nk Z) implies the existence of an aperiodic tile in Zd. Greenfeld and Tao have recently disproved the well-known periodic tiling conjecture in Zd for sufficiently large d ∈ N by constructing an aperiodic tile in Zd-k × (Z / N1Z × … × Z / Nk Z) for suitable d,N1,…,Nk ∈ N.

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