On the random Chowla conjecture

Abstract

We show that for a Steinhaus random multiplicative function f:N and any polynomial P(x)∈Z[x] of deg\ P 2 which is not of the form w(x+c)d for some w∈ Z, c∈ Q, we have \[1xΣn x f(P(n)) d CN(0,1),\] where CN(0,1) is the standard complex Gaussian distribution with mean 0 and variance 1. This confirms a conjecture of Najnudel in a strong form. We further show that there almost surely exist arbitrary large values of x 1, such that |Σn x f(P(n))| deg\ P x ( x)1/2, for any polynomial P(x)∈Z[x] with deg\ P 2, which is not a product of linear factors (over Q). This matches the bound predicted by the law of the iterated logarithm. Both of these results are in contrast with the well-known case of linear phase P(n)=n, where the partial sums are known to behave in a non-Gaussian fashion and the corresponding sharp fluctuations are speculated to be O(x( x)14+) for any >0.