Symbolic power of an ideal

In algebra, given a ring R and a prime ideal P in it, the n-th symbolic power of P is the ideal

${\displaystyle P^{(n)}=P^{n}R_{P}\cap R=\{f\in R\mid sf\in P^{n}{\text{ for some }}s\in R-P\}.}$^[1]

It is the smallest P-primary ideal containing the n-th power Pⁿ. Very roughly, it consists of functions with zeros of order n along the variety defined by P. If R is Noetherian, then it is the P-primary component in the primary decomposition of Pⁿ. We have: ${\displaystyle P^{(1)}=P}$ and if P is a maximal ideal, then ${\displaystyle P^{(n)}=P^{n}}$.

• Math 711: Lecture of September 7, 2007

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