Hole Probability for Entire Functions represented by Gaussian Taylor Series

Details Hole Probability for Entire Functions represented by Gaussian Taylor Series Hole Probability for Entire Functions represented by Gaussian Taylor Series

2011-05-28

arxiv.org/abs/1105.5734v2

Mathematics

Complex Variables

16 pages

Scientific paper

We study the hole probability of Gaussian entire functions. More specifically, we work with entire functions in Taylor series form with i.i.d complex Gaussian random variables and arbitrary non-random coefficients. A hole is the event where the function has no zeros in a disc of radius r. We find exact asymptotics for the rate of decay of the hole probability for large values of r, outside a small exceptional set. The exceptional set depends only on the non-random coefficients. We assume no regularity conditions on the non-random coefficients.

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