Intersection of prime equals radical: Difference between revisions

This article gives the statement and possibly, proof, of an implication relation between two commutative unital ring properties. That is, it states that every commutative unital ring satisfying the first commutative unital ring property must also satisfy the second commutative unital ring property
View all commutative unital ring property implications | View all commutative unital ring property non-implications |Get help on looking up commutative unital ring property implications/non-implications
|

Statement

An ideal in a commutative unital ring is radical if and only if it is an intersection of prime ideals.

Proof

Because of the way the properties are quotient-determined, we can reduce this to the statement that:

nilradical equals intersection of all prime ideals