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算術函數

此條目可参照英語維基百科相應條目来扩充。若您熟悉来源语言和主题，请协助参考外语维基百科扩充条目。请勿直接提交机械翻译，也不要翻译不可靠、低品质内容。依版权协议，译文需在编辑摘要注明来源，或于讨论页顶部标记((Translated page))标签。

在數論上，算術函數（或稱數論函數）指定義域為正整數、陪域為複數的函數，即 $f:\mathbb {Z} ^{+}\rightarrow \mathbb {C}$ 。每個算術函數都可視為複數的序列。

最重要的算術函數是積性及加性函數。算術函數的最重要操作為狄利克雷卷积，對於算術函數集，以它為乘法，一般函數加法為加法，可以得到一個阿貝爾環。

而且，由于f*g=0能够推出f=0或g=0，所以这一交换环是整环(Integral Domain)，详见GTM164的附录。

（通常不称交换环为阿贝尔环，这一叫法只在群的情形下被普遍使用）

非積性或加性的算術函數的例子

馮·曼戈爾特函數：當n是質數p的整數冪，Λ(n)=ln(p)，否則Λ(n)=0。
不大於正整數n的質數的數目π(n)
整數分拆的數目P(n)：一個整數能表示成正整數之和的方法的數目

參見

貝爾級數

规范控制数据库：各地	日本

分类

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