Nilradical of subring lemma

This article is about the statement of a simple but indispensable lemma in commutative algebra
View other indispensable lemmata

Statement

Suppose ${\displaystyle R}$ is a unital subring of a commutative unital ring ${\displaystyle S}$. Then, the nilradical of ${\displaystyle R}$ equals the intersection of ${\displaystyle R}$ with the nilradical of ${\displaystyle S}$.

Applications

• When both ${\displaystyle R}$ and ${\displaystyle S}$ are Jacobson rings (for instance, when they are both finitely generated algebras over a field) then for both rings, the Jacobson radical equals the nilradical. Thus, we obtain that the Jacobson radical of ${\displaystyle R}$ equals the intersection of ${\displaystyle R}$ with the Jacobson radical of ${\displaystyle S}$
• Effect of ideal contraction on Galois correspondent