On the self similarity of generalized Cantor sets
Abstract
We consider the self-similar structure of the class of generalized Cantor sets D=\Σn=1∞ dnβn: dn∈ Dn, n 1\, where 0<β<1 and Dn, n 1, are nonempty and finite subsets of Z. We give a necessary and sufficient condition for D to be a homogeneously generated self similar set. An application to the self-similarity of intersections of generalized Cantor sets will be given.
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