Convolution of periodic multiplicative functions and the divisor problem

Abstract

We study a certain class of arithmetic functions that appeared in Klurman's classification of 1 multiplicative functions with bounded partial sums, c.f., Comp. Math. 153 (8), 2017, pp. 1622-1657. These functions are periodic and 1-pretentious. We prove that if f1 and f2 belong to this class, then Σn≤ x(f1 f2)(n)=(x1/4). This confirms a conjecture by the first author. As a byproduct of our proof, we studied the correlation between (x) and (θ x), where θ is a fixed real number. We prove that there is a non-trivial correlation when θ is rational, and a decorrelation when θ is irrational. Moreover, if θ has a finite irrationality measure, then we can make it quantitative this decorrelation in terms of this measure.