Escaping Chaos in Random Multiplicative Functions
Abstract
Let f(n) be a Steinhaus random multiplicative function. Let A⊂ [1, N] be a finite set of integers. We show that \[1|A| Σn∈ A f(n) []d CN(0,1)\] forces that |A|=o(N). We prove that the o(1) density is sharp by showing that for most sets A, and thus confirm the existence, with density ρ such that (1-ρ)-1 =o(( N)1/2), we have \[ 1(1-ρ) |A| Σn∈ A f(n) d CN(0,1). \] The extra factor 1-ρ makes a difference as long as the density ρ>0.
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