Transcendental Julia Sets with Fractional Packing Dimension
classification
🧮 math.CV
math.DS
keywords
dimensionpackingjuliasetstranscendentalallowarbitrarilyattained
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We construct a family of transcendental entire functions whose Julia sets have packing dimension in $(1,2)$. These are the first examples where the computed packing dimension is not $1$ or $2$. Our construction will allow us further show that the set of packing dimensions attained is dense in the interval $(1,2)$, and that the Hausdorff dimension of the Julia sets can be made arbitrarily close to the corresponding packing dimension.
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