Tiles with no spectra
Abstract
We exhibit a subset of a finite Abelian group, which tiles the group by translation, and such that its tiling complements do not have a common spectrum (orthogonal basis for their L2 space consisting of group characters). This disproves the Universal Spectrum Conjecture of Lagarias and Wang. Further, we construct a set in some finite Abelian group, which tiles the group but has no spectrum. We extend this last example to the groups d and d (for d 5) thus disproving one direction of the Spectral Set Conjecture of Fuglede. The other direction was recently disproved by Tao.
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