On binary correlations of multiplicative functions
Abstract
We study logarithmically averaged binary correlations of bounded multiplicative functions and . A breakthrough on these correlations was made by Tao, who showed that the correlation average is negligibly small whenever or does not pretend to be any twisted Dirichlet character, in the sense of the pretentious distance for multiplicative functions. We consider a wider class of real-valued multiplicative functions , namely those that are uniformly distributed in arithmetic progressions to fixed moduli. Under this assumption, we obtain a discorrelation estimate, showing that the correlation of and is asymptotic to the product of their mean values. We derive several applications, first showing that the number of large prime factors of and are independent of each other with respect to the logarithmic density. Secondly, we prove a logarithmic version of the conjecture of Erd\H{o}s and Pomerance on two consecutive smooth numbers. Thirdly, we show that if is cube-free and belongs to the Burgess regime , the logarithmic average around of the real character over the values of a reducible quadratic polynomial is small.
Cite
@article{arxiv.1710.01195,
title = {On binary correlations of multiplicative functions},
author = {Joni Teräväinen},
journal= {arXiv preprint arXiv:1710.01195},
year = {2018}
}
Comments
33 pages; Referee comments incorporated; To appear in Forum Math. Sigma