The Number of Non-cyclic Sylow Subgroups of the Multiplicative Group Modulo n
Canadian mathematical bulletin, Tome 64 (2021) no. 1, pp. 204-215
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For each positive integer n, let $U(\mathbf {Z}/n\mathbf {Z})$ denote the group of units modulo n, which has order $\phi (n)$ (Euler’s function) and exponent $\lambda (n)$ (Carmichael’s function). The ratio $\phi (n)/\lambda (n)$ is always an integer, and a prime p divides this ratio precisely when the (unique) Sylow p-subgroup of $U(\mathbf {Z}/n\mathbf {Z})$ is noncyclic. Write W(n) for the number of such primes p. Banks, Luca, and Shparlinski showed that for certain constants $C_1, C_2>0$, $$ \begin{align*} C_1 \frac{\log\log{n}}{(\log\log\log{n})^2} \le W(n) \le C_2 \log\log{n} \end{align*} $$ for all n from a sequence of asymptotic density 1. We sharpen their result by showing that W(n) has normal order $\log \log {n}/\log \log \log {n}$.
Mots-clés :
Euler function, Carmichael function, Sylow subgroup, multiplicative group
Pollack, Paul. The Number of Non-cyclic Sylow Subgroups of the Multiplicative Group Modulo n. Canadian mathematical bulletin, Tome 64 (2021) no. 1, pp. 204-215. doi: 10.4153/S0008439520000375
@article{10_4153_S0008439520000375,
author = {Pollack, Paul},
title = {The {Number} of {Non-cyclic} {Sylow} {Subgroups} of the {Multiplicative} {Group} {Modulo} n},
journal = {Canadian mathematical bulletin},
pages = {204--215},
year = {2021},
volume = {64},
number = {1},
doi = {10.4153/S0008439520000375},
url = {http://geodesic.mathdoc.fr/articles/10.4153/S0008439520000375/}
}
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