Random Chowla's Conjecture for Rademacher Multiplicative Functions

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∈ Z[x] that is a product of at least two distinct linear factors or an irreducible quadratic satisfying a natural condition, there exists a constant P>0 such that \[ 1P NΣn≤ Nf(P(n))dN(0,1), \] as N→∞, 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 Σn≤ Nf(n2+1) and show that there almost surely exist arbitrarily large values of N such that \[ |Σn≤ Nf(n2+1)| N N. \] This matches the bound one expects from the law of iterated logarithm.