Shifted L\'evy's Dragon Curve and Directed Graph
Abstract
It is known that every point on L\'evy's Dragon Curve admits a natural representation as a complex power series. We introduce a directed graph G1 which characterizes this representation. In this paper, we study the translation of the curve by s=-1/2+i/2. We identify another directed graph G2, that characterizes the translated curve and exhibits a revolving structure analogous to that of G1.
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