Area and Hausdorff dimension of Sierpi\'nski carpet Julia sets
Abstract
We prove the existence of rational maps whose Julia sets are Sierpi\'nski carpets having positive area. Such rational maps can be constructed such that they either contain a Cremer fixed point, a Siegel disk or are infinitely renormalizable. We also construct some Sierpi\'nski carpet Julia sets with zero area but with Hausdorff dimension two. Moreover, for any given number s∈(1,2), we prove the existence of Sierpi\'nski carpet Julia sets having Hausdorff dimension exactly s.
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