High and odd moments in the Erdos--Kac theorem

Abstract

Granville and Soundararajan showed that the kth moment in the Erdos--Kac theorem is equal to the kth moment of the standard Gaussian distribution in the range k=o(( x)1/3), up to a negligible error term. We show that their range is sharp: when k/( x)1/3 tends to infinity, a different behavior emerges, and odd moments start exhibiting similar growth to even moments. For odd k we find the asymptotics of the kth moment when k=O(( x)1/3), where previously only an upper bound was known. Our methods are flexible and apply to other distributions, including the Poisson distribution, whose centered moments turn out to be excellent approximations for the Erdos--Kac moments.

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