On the multiplicative independence between n and α n
Abstract
In this article we investigate different forms of multiplicative independence between the sequences n and n α for irrational α. Our main theorem shows that for a large class of arithmetic functions a, b N C the sequences (a(n))n ∈ N and (b ( α n ))n ∈ N are asymptotically uncorrelated. This new theorem is then applied to prove a 2-dimensional version of the Erdos-Kac theorem, asserting that the sequences (ω(n))n ∈ N and (ω( α n )n∈ N behave as independent normally distributed random variables with mean n and standard deviation n. Our main result also implies a variation on Chowla's Conjecture asserting that the logarithmic average of (λ(n) λ ( α n ))n ∈ N tends to 0.
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