I had asked this question on math.stackexchange.com, but I have not received a response. Hoping to get some help here.
I am trying to prove this result and I am stuck at one step. Let $(R,m)$ be a Noetherian local ring. Let $P$ be a prime ideal. Define the n-th symbolic power of $P$ as $P^{(n)}={{r\in R: \exists y \in R\setminus P}}$ s.t. $yr \in P^n$.
I want to show $P^{(n)}=P^n:m^{\infty}$.
Let $r\in P^n:m^{\infty}$. Then, $\exists t$ s.t. $rm^t\in P^n$. Now, $m^t \subsetneq P^n$, else by taking radicals, we have $m=P$. Let $y\in m^t \setminus P$. Then, $yr\in P^n$, so that $r\in P^{(n)}$.
For the converse, let $r\in P^{(n)}$. Suppose, $y\in R\setminus P$ s.t. $ry\in P^n$. If $y\in R\setminus m$, then $y$ is a unit and $r\in P^n\subseteq P^{(n)}$.
I am not sure how to handle the case, where $y\in m\setminus P$. Is it true $yR$ is $m$-primary? This would imply $yR$ contains a power of $m$ and thus completing the proof.
