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arxiv: 2303.06774 · v2 · pith:GP7VUVHL · submitted 2023-03-12 · math.NT · math.CA· math.PR

Better than square-root cancellation for random multiplicative functions

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classification math.NT math.CAmath.PR
keywords bettercancellationsquare-rootfunctionmultiplicativephenomenonrandomasymp
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We investigate when the better than square-root cancellation phenomenon exists for $\sum_{n\le N}a(n)f(n)$, where $a(n)\in \mathbb{C}$ and $f(n)$ is a random multiplicative function. We focus on the case where $a(n)$ is the indicator function of $R$ rough numbers. We prove that $\log \log R \asymp (\log \log x)^{\frac{1}{2}}$ is the threshold for the better than square-root cancellation phenomenon to disappear.

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