Primary ideal

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In mathematics, an ideal $Q$ in a commutative ring $R$ is a primary ideal if for all elements $x,y\in R$ , we have that if $xy\in Q$ , then either $x\in Q$ or $y^n\in Q$ for some $n\in\mathbb{N}.$

Alternatively, an ideal $\mathfrak{q}$ is primary if and only if $A/\mathfrak{q}\neq 0$ and every zero divisor is nilpotent.

This is a generalization of the notion of a prime ideal (thus every prime ideal is primary), and (very) loosely mirrors the relationship in $\mathbb{Z}$ between prime numbers and prime powers.

If the radical of the primary ideal $Q$ is the prime ideal $P$ , then $Q$ is said to be $P$ -primary.

[edit] Example

Let $Q = (125)$ in $R=\mathbb{Z}.$ Suppose that $xy\in Q$ but $x\notin Q.$ Then $125 | x y$ , but 125 does not divide $x .$ Thus 5 must divide $y$ , so some power of $y$ (namely, $y 3$ ), must be in $Q .$ Therefore $Q$ is primary.

[edit] See also

Primary decomposition

This article incorporates material from Primary ideal on PlanetMath, which is licensed under the GFDL.

Retrieved from "http://en.wikipedia.org../../../p/r/i/Primary_ideal.html"

Categories: PlanetMath sourced articles | Ideals | Commutative algebra

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