Category:Nilradicals of Rings

This category contains results about Nilradicals of Rings.
Definitions specific to this category can be found in Definitions/Nilradicals of Rings.

Let $A$ be a commutative ring with unity.

Definition 1

The nilradical of $A$ is the subset consisting of all nilpotent elements of $A$.

Definition 2

Let $\Spec A$ denote the prime spectrum of $A$.

The nilradical of $A$ is:

$\ds \Nil A = \bigcap_{\mathfrak p \mathop \in \Spec A} \mathfrak p$

That is, it is the intersection of all prime ideals of $A$.