Random Chowla's Conjecture for Rademacher Multiplicative Functions

Jake Chinis, Besfort Shala
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Abstract

We study the distribution of partial sums of Rademacher random multiplicative functions $(f(n))_n$ evaluated at polynomial arguments. We show that for a polynomial $P\in \mathbb Z[x]$ that is a product of distinct linear factors or an irreducible quadratic satisfying a natural condition, there exists a constant $\kappa_P>0$ such that \[ \frac{1}{\sqrt{\kappa_P N}}\sum_{n\leq N}f(P(n))\xrightarrow{d}\mathcal{N}(0,1), \] as $N\rightarrow\infty$, where convergence is in distribution to a standard (real) Gaussian. This confirms a conjecture of Najnudel and addresses a question of Klurman-Shkredov-Xu. We also study large fluctuations of $\sum_{n\leq N}f(n^2+1)$ and show that there almost surely exist arbitrarily large values of $N$ such that \[ \Big|\sum_{n\leq N}f(n^2+1)\Big|\gg \sqrt{N \log\log N}. \] This matches the bound one expects from the law of iterated logarithm.
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拉德马赫乘法函数的随机乔拉猜想
我们研究了在多项式参数处求值的拉德马赫随机乘法函数 $(f(n))_n$ 部分和的分布。我们证明,对于 \mathbb Z[x]$ 中的多项式 $P,它是满足自然条件的不同线性因子或不可还原二次方的乘积、存在常数 $/kappa_P>0$,使得\[ \frac{1}{sqrt\kappa_P N}}\sum_{n\leqN}f(P(n))\xrightarrow{d}\mathcal{N}(0,1), \] as $N\rightarrow\infty$, 其中收敛于标准(实)高斯分布。这证实了纳伊努德尔的猜想,并解决了克鲁尔曼-施克雷多夫-徐的问题。我们还研究了 $\sum_{n\leq N}f(n^2+1)$ 的大波动,并证明几乎肯定存在任意大的 $N$ 值,使得 \[\Big|\sum_{n\leq N}f(n^2+1)\Big|\gg \sqrt{N \log\log N}。
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