Quasisymmetric geometry of Sierpiński carpet Julia sets

Weiyuan Qiu; Fei Yang; Jinsong Zeng

doi:10.4064/fm494-12-2017

Publishing house / Journals and Serials / Fundamenta Mathematicae / Online First articles

PDF files of articles are only available for institutions which have paid for the online version upon signing an Institutional User License.

Quasisymmetric geometry of Sierpiński carpet Julia sets

Volume 244 / 2019

Weiyuan Qiu, Fei Yang, Jinsong Zeng Fundamenta Mathematicae 244 (2019), 73-107 MSC: Primary 37F45; Secondary 37F10. DOI: 10.4064/fm494-12-2017 Published online: 7 September 2018

Abstract

In this paper, the main focus is on the Sierpiński carpet Julia sets of rational maps with non-recurrent critical points. We study the uniform quasicircle property of the peripheral circles, the relatively separated property of the peripheral circles and the locally porous property of these carpets. We also establish some quasisymmetric rigidities of these carpets, which generalizes the main results of Bonk–Lyubich–Merenkov (2016) to the postcritically infinite case. In the end we give a strategy to construct a class of postcritically infinite rational maps whose Julia sets are quasisymetrically equivalent to some round carpets.

Authors

Weiyuan QiuSchool of Mathematical Sciences
Fudan University
Shanghai 200433, P.R. China
e-mail
Fei YangDepartment of Mathematics
Nanjing University
Nanjing 210093, P.R. China
e-mail
Jinsong ZengSchool of Mathematics and Information Science
Guangzhou University
Guangzhou 510006, P.R. China
e-mail

8.00

Download

Search for IMPAN publications

Publishing house / Journals and Serials / Fundamenta Mathematicae / Online First articles

Fundamenta Mathematicae

Quasisymmetric geometry of Sierpiński carpet Julia sets

Volume 244 / 2019

Abstract

Authors

Search for IMPAN publications

Rewrite code from the image