Complex dimensions for IFS with overlaps
Abstract
The notion of complex dimension of a one-dimensional Cantor set C=n=1∞ Cn dates back decades. It is defined as the set of poles of the meromorphic ζ-function ζ(s)=Σn=1∞djs, where s>0, and dj is the length of the jth interval in Cn. Following the trend, I switch from sets to measures, which will allow me to generalize the construction to iterated function schemes that do not necessarily satisfy the Open Set Condition.
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