nLab integers modulo n

Definition

Given a natural number $n$ , the ring of integers modulo $n$ is the quotient ring $\mathbb{Z}/n\mathbb{Z}$ .

These are also the quotient rig $\mathbb{N}/n\mathbb{N}$ .

The integers modulo $n$ are precisely the finite cyclic rings, since the underlying set is the finite set of cardinality $n$ and the underlying abelian group is the cyclic group of order $n$ .

Given any positive integer $n$ , $\mathbb{Z}/n\mathbb{Z}$ is a prefield ring whose monoid of cancellative elements consists of all integers $m$ modulo $n$ which are coprime with $n$ . For $n$ a prime number this is a prime field, and for $n$ a prime power this is a prime power local ring.

e.g. example 5 in these notes: pdf

Last revised on January 22, 2023 at 21:28:17. See the history of this page for a list of all contributions to it.