Topological Structure of Fractal Squares
Abstract
Given an integer n≥ 2 and a digit set D⊂neq 0,1,...,n-12, there is a self-similar set F ⊂ R2 satisfying the set equation: F=(F+ D)/n. We call such F a fractal square. By studying a periodic extension H= F+ Z2, we classify F into three types according to their topological properties. We also provide some simple criteria for such classification.
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