Decision problems on geometric tilings

arXiv - CS - Discrete Mathematics Pub Date : 2024-09-18 DOI:arxiv-2409.11739
Benjamin Hellouin de MenibusGALaC, Victor LutfallaI2M, Pascal Vanier
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Abstract

We study decision problems on geometric tilings. First, we study a variant of the Domino problem where square tiles are replaced by geometric tiles of arbitrary shape. We show that, under some weak assumptions, this variant is undecidable regardless of the shapes, extending previous results on rhombus tiles. This result holds even when the geometric tiling is forced to belong to a fixed set.Second, we consider the problem of deciding whether a geometric subshift has finite local complexity, which is a common assumption when studying geometric tilings. We show that it is undecidable even in a simple setting (square shapes with small modifications).
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几何倾斜上的决策问题
我们研究几何瓦片上的决策问题。首先,我们研究了多米诺问题的一个变式,即用任意形状的几何瓦片替换正方形瓦片。我们证明,在一些较弱的假设条件下,无论形状如何,这个变体都是不可解的,从而扩展了之前关于菱形瓦的结果。其次,我们考虑了决定几何子变换是否具有有限局部复杂性的问题,这是研究几何子变换时的一个常见假设。我们证明,即使是在简单集合中(有小修改的正方形),这个问题也是不可判定的。
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arXiv - CS - Discrete Mathematics
arXiv - CS - Discrete Mathematics
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