Central limit theorems for random multiplicative functions
Abstract
A Steinhaus random multiplicative function f is a completely multiplicative function obtained by setting its values on primes f(p) to be independent random variables distributed uniformly on the unit circle. Recent work of Harper shows that Σn N f(n) exhibits ``more than square-root cancellation," and in particular 1N Σn N f(n) does not have a (complex) Gaussian distribution. This paper studies Σn∈ A f(n), where A is a subset of the integers in [1,N], and produces several new examples of sets A where a central limit theorem can be established. We also consider more general sums such as Σn N f(n) e2π i nθ, where we show that a central limit theorem holds for any irrational θ that does not have extremely good Diophantine approximations.
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