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Abstract
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We study the zeroes of a family of random holomorphic functions on the unit disc,
distinguished by their invariance with respect to the hyperbolic geometry. Our main
finding is a transition in the limiting behaviour of the number of zeroes in a large
hyperbolic disc. We find a normal distribution if the covariance decays faster than a
certain critical value. In contrast, in the regime of “long-range dependence”
when the covariance decays slowly, the limiting distribution is skewed. For
a closely related model we emphasise a link with Gaussian multiplicative
chaos.
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Keywords
Gaussian analytic functions, stationary point processes,
Wiener chaos
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Mathematical Subject Classification
Primary: 30B20, 60F05, 60G15
Secondary: 60G55
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Milestones
Received: 16 August 2021
Revised: 6 April 2022
Accepted: 29 April 2022
Published: 12 December 2022
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