Abstract
Let T=T(A,D⁎) be a disk-like Z2-tile generated by an expanding 2×2 matrix A and a digit set D⁎⊂Z2. We study the subset F of T defined by AF=F+D, where D⊊D⁎ is a sub-digit set. By studying a periodic extension H=F+Z2, we classify F into three types according to their topological properties, which generalizes a result of Lau et al. [13]. We also provide some simple criteria for such classification.
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