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arxiv: 1710.08201 · v2 · pith:7CMJWRYS · submitted 2017-10-23 · math.NT

6-th Norm of a Steinhaus Chaos

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classification math.NT
keywords leftomegarightsteinhausasympchaosdenotesfactors
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We prove that for the Steinhaus Random Variable $z(n)$ \[\mathbb{E}\left(\left|\sum_{n\in E_{N, m}}z(n)\right|^6\right)\asymp |E_{N, m}|^3 \text{ for } m\ll(\log\log N)^{\frac{1}{3}},\] where \[E_{N, m}:=\{1\leq n:\Omega(n)=m\}\] and $\Omega(n)$ denotes the number of prime factors of $N$.

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