Published March 2019
| Submitted
Journal Article
Open
On Makarov's Principle in Conformal Mapping
- Creators
- Ivrii, Oleg
Chicago
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Abstract
We examine several characteristics of conformal maps that resemble the variance of a Gaussian: asymptotic variance, the constant in Makarov's law of iterated logarithm and the second derivative of the integral means spectrum at the origin. While these quantities need not be equal in general, they agree for domains whose boundaries are regular fractals such as Julia sets or limit sets of quasi-Fuchsian groups. We give a new proof of these dynamical equalities. We also show that these characteristics have the same universal bounds and prove a central limit theorem for extremals. Our method is based on analyzing the local variance of dyadic martingales associated to Bloch functions.
Additional Information
© The Author 2017. Published by Oxford University Press. All rights reserved. This article is published and distributed under the terms of the Oxford University Press, Standard Journals Publication Model (https://academic.oup.com/journals/pages/open_access/funder_policies/chorus/standard_publication_model). Received: 26 April 2016; Revision Requested: 01 January 2017; Accepted: 19 May 2017; Published: 09 August 2017. The author was supported by the Academy of Finland, project nos. 271983 and 273458.Attached Files
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Additional details
- Eprint ID
- 95885
- Resolver ID
- CaltechAUTHORS:20190529-144822553
- Academy of Finland
- 271983
- Academy of Finland
- 273458
- Created
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2019-05-29Created from EPrint's datestamp field
- Updated
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2021-11-16Created from EPrint's last_modified field