AN EXTENSION OF A RESULT OF ERDŐS AND ZAREMBA
Glasgow mathematical journal, Tome 63 (2021) no. 1, pp. 193-222
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Erdös and Zaremba showed that $ \limsup_{n\to \infty} \frac{\Phi(n)}{(\log\log n)^2}=e^\gamma$, γ being Euler’s constant, where $\Phi(n)=\sum_{d|n} \frac{\log d}{d}$.We extend this result to the function $\Psi(n)= \sum_{d|n} \frac{(\log d )(\log\log d)}{d}$ and some other functions. We show that $ \limsup_{n\to \infty}\, \frac{\Psi(n)}{(\log\log n)^2(\log\log\log n)}\,=\, e^\gamma$. The proof requires a new approach. As an application, we prove that for any $\eta>1$, any finite sequence of reals $\{c_k, k\in K\}$, $\sum_{k,\ell\in K} c_kc_\ell \, \frac{\gcd(k,\ell)^{2}}{k\ell} \le C(\eta) \sum_{\nu\in K} c_\nu^2(\log\log\log \nu)^\eta \Psi(\nu)$, where C(η) depends on η only. This improves a recent result obtained by the author.
WEBER, MICHEL JEAN GEORGES. AN EXTENSION OF A RESULT OF ERDŐS AND ZAREMBA. Glasgow mathematical journal, Tome 63 (2021) no. 1, pp. 193-222. doi: 10.1017/S0017089520000129
@article{10_1017_S0017089520000129,
author = {WEBER, MICHEL JEAN GEORGES},
title = {AN {EXTENSION} {OF} {A} {RESULT} {OF} {ERD\H{O}S} {AND} {ZAREMBA}},
journal = {Glasgow mathematical journal},
pages = {193--222},
year = {2021},
volume = {63},
number = {1},
doi = {10.1017/S0017089520000129},
url = {http://geodesic.mathdoc.fr/articles/10.1017/S0017089520000129/}
}
TY - JOUR AU - WEBER, MICHEL JEAN GEORGES TI - AN EXTENSION OF A RESULT OF ERDŐS AND ZAREMBA JO - Glasgow mathematical journal PY - 2021 SP - 193 EP - 222 VL - 63 IS - 1 UR - http://geodesic.mathdoc.fr/articles/10.1017/S0017089520000129/ DO - 10.1017/S0017089520000129 ID - 10_1017_S0017089520000129 ER -
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