计算环$\mathbb Z_m \乘以\mathbb Z_n$的子数

IF 0.7 4区数学 Q2 MATHEMATICS

Journal of the Korean Mathematical Society Pub Date : 2018-01-22 DOI:10.4134/JKMS.j180828

L. Tóth

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引用次数: 0

摘要

设$m，n\in\Bbb｛n｝$。我们表示环$\Bbb的加法子群{Z}_m\times\Bbb{Z}_n$，也是（酉）子环，并推导出$N^｛（s）｝（m，N）$和$N^｝（us）｝{Z}_m\times\Bbb{Z}_n$及其单位子环。我们证明了函数$（m，n）\mapsto n^{（s）}（m，n）$和$（m，n）/mapsto n^{（us）}（m，n）$$是乘性的，视为两个变量的函数，并且它们的Dirichlet级数可以用Riemann-zeta函数表示。我们还建立了和$\sum_{m，n\le x}n^{（s）}（m，n）$的渐近公式，其误差项与Dirichlet除数问题密切相关。

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Counting subrings of the ring $\mathbb Z_m \times \mathbb Z_n$

Let $m,n\in \Bbb{N}$. We represent the additive subgroups of the ring $\Bbb{Z}_m \times \Bbb{Z}_n$, which are also (unital) subrings, and deduce explicit formulas for $N^{(s)}(m,n)$ and $N^{(us)}(m,n)$, denoting the number of subrings of the ring $\Bbb{Z}_m \times \Bbb{Z}_n$ and its unital subrings, respectively. We show that the functions $(m,n)\mapsto N^{(s)}(m,n)$ and $(m,n)\mapsto N^{(us)}(m,n)$ are multiplicative, viewed as functions of two variables, and their Dirichlet series can be expressed in terms of the Riemann zeta function. We also establish an asymptotic formula for the sum $\sum_{m,n\le x} N^{(s)}(m,n)$, the error term of which is closely related to the Dirichlet divisor problem.

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来源期刊

Journal of the Korean Mathematical Society 数学-数学

CiteScore

1.20

自引率

16.70%

发文量

审稿时长

6-12 weeks

期刊介绍： This journal endeavors to publish significant research of broad interests in pure and applied mathematics. One volume is published each year, and each volume consists of six issues (January, March, May, July, September, November).