Attractor sets and Julia sets in low dimensions
Abstract
If X is the attractor set of a conformal IFS in dimension two or three, we prove that there exists a quasiregular semigroup G with Julia set equal to X. We also show that in dimension two, with a further assumption similar to the open set condition, the same result can be achieved with a semigroup generated by one element. Consequently, in this case the attractor set is quasiconformally equivalent to the Julia set of a rational map.
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