English

On binary correlations of multiplicative functions

Number Theory 2018-07-25 v2

Abstract

We study logarithmically averaged binary correlations of bounded multiplicative functions g1g_1 and g2g_2. A breakthrough on these correlations was made by Tao, who showed that the correlation average is negligibly small whenever g1g_1 or g2g_2 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 gjg_j, 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 g1g_1 and g2g_2 is asymptotic to the product of their mean values. We derive several applications, first showing that the number of large prime factors of nn and n+1n+1 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 QQ is cube-free and belongs to the Burgess regime Qx4εQ\leq x^{4-\varepsilon}, the logarithmic average around xx of the real character χ(modQ)\chi \pmod{Q} over the values of a reducible quadratic polynomial is small.

Keywords

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

R2 v1 2026-06-22T22:02:29.986Z