On a Bohr set analogue of Chowla's conjecture

Abstract

Let λ denote the Liouville function. We show that the logarithmic mean of λ( α1n)λ( α2n) is 0 whenever α1,α2 are positive reals with α1/α2 irrational. We also show that for k≥ 3 the logarithmic mean of λ( α1n)·s λ( αkn) has some nontrivial amount of cancellation, under certain rational independence assumptions on the real numbers αi. Our results for the Liouville function generalise to produce independence statements for general bounded real-valued multiplicative functions evaluated at Beatty sequences. These results answer the two-point case of a conjecture of Frantzikinakis (and provide some progress on the higher order cases), generalising a recent result of Crncevi\'c--Hern\'andez--Rizk--Sereesuchart--Tao. As an ingredient in our proofs, we establish bounds for the logarithmic correlations of the Liouville function along Bohr sets.