The hole probability for Gaussian random SU(2) polynomials

Abstract

We show that for Gaussian random SU(2)polynomials of a large degree N the probability that there are no zeros in the disk of radius r is less than e-c1,r N2, and is also greater than e-c2,r N2. Enroute to this result, we also derive a more general result: probability estimates for the event that the number of complex zeros of a random polynomial of high degree deviates significantly from its mean.

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