PlanetMath: radical of an ideal

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radical of an ideal

(Definition)

Let be a commutative ring. For any ideal of , the radical of , written $\sqrt{I}$ or $\operatorname{Rad}(I)$ , is the set

$\displaystyle \{a \in R \mid a^n \in I$ for some integer $\displaystyle n>0 \}$

The radical of an ideal is always an ideal of .

If $I = \sqrt{I}$ , then is called a radical ideal.

Every prime ideal is a radical ideal. If is a radical ideal, the quotient ring is a ring with no nonzero nilpotent elements.

More generally, the radical of an ideal in can be defined over an arbitrary ring. Let be an ideal of a ring , the radical of is the set of $a\in R$ such that every m-system containing has a non-empty intersection with :

$\displaystyle \sqrt{I}:=\lbrace a\in R\mid$ if $\displaystyle S$ is an

-system, and $\displaystyle a\in S,$ then $\displaystyle S\cap I\ne \varnothing\rbrace.$

Under this definition, we see that $\sqrt{I}$ is again an ideal (two-sided) and it is a subset of $\lbrace a\in R\mid a^n\in I$ for some integer $n>0\rbrace$ . Furthermore, if is commutative, the two sets coincide. In other words, this definition of a radical of an ideal is indeed a “generalization” of the radical of an ideal in a commutative ring.

"radical of an ideal" is owned by CWoo. [ full author list (2) | owner history (2) ]

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Also defines:

radical ideal, radical

Keywords:

radical, ideal

Attachments:: every prime ideal is radical (Theorem) by alozano
a characterization of the radical of an ideal (Derivation) by CWoo

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Cross-references: commutative, subset, intersection, m-system, nilpotent elements, ring, quotient ring, prime ideal, ideal, commutative ring
There are 13 references to this entry.

This is version 14 of radical of an ideal, born on 2002-04-19, modified 2008-05-24.
Object id is 2850, canonical name is RadicalOfAnIdeal.
Accessed 9219 times total.

Classification:

AMS MSC:	13-00 (Commutative rings and algebras :: General reference works )
	14A05 (Algebraic geometry :: Foundations :: Relevant commutative algebra)
	16N40 (Associative rings and algebras :: Radicals and radical properties of rings :: Nil and nilpotent radicals, sets, ideals, rings)

Pending Errata and Addenda

None.[ View all 3 ]

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