Dynamics of transcendental entire functions with siegel disks and its applications
TLDR
In this paper, it was shown that the Siegel disk and its boundary correspond to those of some quadratic polynomial at the level of quasiconformality.Abstract:
We study the dynamics of transcendental entire functions with Siegel disks whose singular values are just two points. One of the two singular values is not only a superattracting fixed point with multiplicity more than two but also an asymptotic value. Another one is a critical value with free dynamics under iterations. We prove that if the multiplicity of the superattracting fixed point is large enough, then the restriction of the transcendental entire function near the Siegel point is a quadratic-like map. Therefore the Siegel disk and its boundary correspond to those of some quadratic polynomial at the level of quasiconformality. As its applications, the logarithmic lift of the above transcendental entire function has a wandering domain whose shape looks like a Siegel disk of a quadratic polynomial.read more
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Journal ArticleDOI
Dimension of the boundary of quasiconformal Siegel disks
Jacek Graczyk,Peter W. Jones +1 more
TL;DR: In this article, the authors studied quasiconformal Siegel disks with critical points in their boundaries and showed that every subarc of the boundary of the Siegel disk has the Hausdorff dimension strictly larger than 1 and that the boundary does not have a tangent at any point.
The Teichmuller Space of an Entire Function
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Surgery on Herman rings of the complex standard family
Núria Fagella,Lukas Geyer +1 more
TL;DR: In this paper, it was shown that the Herman ring can be parametrized real-analytically by the modulus of the Herman rings, from 0 up to a point (β_0, β_0) with β ≥ 1.
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Xavier Buff,Arnaud Chéritat +1 more
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Linda Keen,Gaofei Zhang +1 more
TL;DR: For any map in the family (e2πiθz+αz2)ez, α∈ℂ, the boundary of the Siegel disk, with fixed point at the origin, is a quasi-circle passing through one or both of the critical points.
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