Transcendental Julia Sets with Fractional Packing Dimension
Abstract
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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