A characterization of connected self-affine fractals arising from collinear digits
Abstract
Let A be an expanding integer matrix with characteristic polynomial f(x)=x2+px+q, and let D=\0,1,…,|q|-2,|q|+m\v be a collinear digit set where m≥slant 0, v∈ Z2. It is well known that there exists a unique self-affine fractal T satisfying AT=T+D. In this paper, we give a complete characterization on the connected T. That generalizes the previous result of |q|=3.
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