Quasisymmetries of the Basilica and the Thompson Group

Mikhail Lyubich; Sergei Merenkov

doi:10.1007/s00039-018-0452-0

Quasisymmetries of the Basilica and the Thompson Group

Mikhail Lyubich
, Sergei Merenkov

Mathematical Science Institute

City University of New York

Research output: Contribution to journal › Article › peer-review

7 Scopus citations

Abstract

We give a description of the group of all quasisymmetric self-maps of the Julia set of f(z) = z²−1 that have orientation preserving homeomorphic extensions to the whole plane. More precisely, we prove that this group is the uniform closure of the group generated by the Thompson group of the unit circle and an inversion. Moreover, this result is quantitative in the sense that distortions of the approximating maps are uniformly controlled by the distortion of the given map.

Original language	English
Pages (from-to)	727-754
Number of pages	28
Journal	Geometric and Functional Analysis
Volume	28
Issue number	3
DOIs	https://doi.org/10.1007/s00039-018-0452-0
State	Published - Jun 1 2018

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title = "Quasisymmetries of the Basilica and the Thompson Group",

abstract = "We give a description of the group of all quasisymmetric self-maps of the Julia set of f(z) = z2−1 that have orientation preserving homeomorphic extensions to the whole plane. More precisely, we prove that this group is the uniform closure of the group generated by the Thompson group of the unit circle and an inversion. Moreover, this result is quantitative in the sense that distortions of the approximating maps are uniformly controlled by the distortion of the given map.",

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AB - We give a description of the group of all quasisymmetric self-maps of the Julia set of f(z) = z2−1 that have orientation preserving homeomorphic extensions to the whole plane. More precisely, we prove that this group is the uniform closure of the group generated by the Thompson group of the unit circle and an inversion. Moreover, this result is quantitative in the sense that distortions of the approximating maps are uniformly controlled by the distortion of the given map.

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Quasisymmetries of the Basilica and the Thompson Group

Abstract

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