The Domino problem is undecidable on every rhombus subshift
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We extend the classical Domino problem to any tiling of rhombus-shaped tiles. For any subshift X of edge-to-edge rhombus tilings, such as the Penrose subshift, we prove that the associated X-Domino problem is Π^0_1 -hard and therefore undecidable. It is Π^0_1 -complete when the subshift X is given by a computable sequence of forbidden patterns.
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