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Bibliographic Details
Main Author: Iofin, Michael
Format: Preprint
Published: 2026
Subjects:
Online Access:https://arxiv.org/abs/2603.15715
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author Iofin, Michael
author_facet Iofin, Michael
contents We study the conformal type of surfaces spread over the sphere via random quasiconformal maps. Constructing a random Beltrami coefficient on the complex plane, we obtain a locally quasiconformal homeomorphism with prescribed dilatation that is almost surely surjective and, with high probability, approximately linear. This yields a normalization for random meromorphic functions associated to surfaces spread over the sphere, from which we prove that the surfaces are almost surely parabolic and obtain bounds on the growth order of their Nevanlinna characteristic.
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institution arXiv
publishDate 2026
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spellingShingle Quasiconformal Normalization of Random Meromorphic Functions
Iofin, Michael
Complex Variables
We study the conformal type of surfaces spread over the sphere via random quasiconformal maps. Constructing a random Beltrami coefficient on the complex plane, we obtain a locally quasiconformal homeomorphism with prescribed dilatation that is almost surely surjective and, with high probability, approximately linear. This yields a normalization for random meromorphic functions associated to surfaces spread over the sphere, from which we prove that the surfaces are almost surely parabolic and obtain bounds on the growth order of their Nevanlinna characteristic.
title Quasiconformal Normalization of Random Meromorphic Functions
topic Complex Variables
url https://arxiv.org/abs/2603.15715