ON THE DIVISOR FUNCTION OVER NONHOMOGENEOUS BEATTY SEQUENCES

• Published in: Bulletin of the Australian Mathematical Society Vol. 106; no. 2; pp. 280 - 287
• Main Author: ZHANG, WEI
• Format: Journal Article
• Language: English
• Published: Cambridge, UK Cambridge University Press 01.10.2022
• Subjects: Estimates; Mathematical functions; Sequences; divisor problems; exponential sums; 11L07; 11L20; 11B83; Beatty sequences
• ISSN: 0004-9727; 1755-1633
• DOI: 10.1017/S0004972722000181

We consider sums involving the divisor function over nonhomogeneous ( $\beta \neq 0$ ) Beatty sequences $ \mathcal {B}_{\alpha ,\beta }:=\{[\alpha n+\beta ]\}_{n=1}^{\infty } $ and show that $$ \begin{align*} \sum_{n\leq N,\ n\in\mathcal{B}_{\alpha,\beta}}d(n) =\alpha^{-1}\sum_{m\leq N}d(m) +O(N^{1-1/(\tau+1)+\varepsilon}), \end{align*} $$ where N is a sufficiently large integer, $\alpha $ is of finite type $\tau $ and $\beta \neq 0$ . Previously, such estimates were only obtained for homogeneous Beatty sequences or for almost all $\alpha $ .