Localization at a prime ideal

Definition

Definition with symbols

Let ${\displaystyle A}$ be a commutative unital ring and ${\displaystyle P}$ a prime ideal in ${\displaystyle A}$. Then, the localization of ${\displaystyle A}$ at ${\displaystyle P}$ is defined as follows:

• As a set, it is the collection of fractions ${\displaystyle a/s}$ where ${\displaystyle a\in A,s\in A\setminus P}$, subject to the equivalence ${\displaystyle a/s\sim a^{\prime }/s^{\prime }⟺a{s}^{\prime }=a^{\prime }s}$.
• The operations are defined as follows: ${\displaystyle a/s+a^{\prime }/s^{\prime }=(a{s}^{\prime }+a^{\prime }s)/(s{s}^{\prime })}$ and ${\displaystyle (a/s)(a^{\prime }/s^{\prime })=(a{a}^{\prime })/(s{s}^{\prime })}$

Facts

${\displaystyle A}$ embeds naturally as a subset of ${\displaystyle A_P}$. If ${\displaystyle P\le P^{\prime }}$ are prime ideals in ${\displaystyle A}$, we have an embedding from ${\displaystyle A_{P^{\prime }}}$ into ${\displaystyle A_P}$. In fact, if ${\displaystyle A}$ is an [[integral domain], then all the ${\displaystyle A_P}$s are contained inside the residue field of ${\displaystyle A}$. Further, their intersection is exactly ${\displaystyle A}$.