A few notes on the asymptotic behavior of Rademacher random multiplicative functions

Abstract

Let Xp, p∈ be a sequence of independent random variables s.t. (Xp= 1)=1/2. Let j=Πp|jXp if j is square free and j=0 otherwise. Denote Sn=Σ=1n. The from this point of view proving limit theorems for Sn is natural problem, since Sn mimics the behavior of e(β). It is a natural guiding conjecture that Sn/ n obeys the central limit theorem (CLT). However, S. Chatterjee conjectured (as expressed in [25]) that the CLT should not hold. Chatterjee's conjecture was proved by Harper [17], and by now it is a direct consequence of a more recent breakthrough by Harper Har20 that Snbn 0 in L1, where bn=(n1/2(((n)))-1/4)un, un∞. In particular Sn/ n 0. Nevertheless, the question whether there exists a sequence an=o(bn) such that Sn/an converges to some limit remains a mystery. Note that the corresponding problem in the Steinhaus Setting was recently resolved by Gor1. In this paper make an attempt to shed some light on the convergence of Sn/an. Additionally, we obtain explicit estimates on hight moments of Sn without restrictions on the size of the moment compared to n like in [Theorem 1.2]Har19, which is of independent interest. This is achieved by a martingale argument together with the Burkholder inequality, and it has applications in a natural number theoretic combinatorial problem. Using martingale techniques we will also obtain exponential concentration inequalities for Sn (in the large deviations regime)