PlanetMath: ordered ring

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ordered ring

(Definition)

An ordered ring is a commutative ring with a total ordering $\leq$ such that, for every $a,b,c \in R$ :

An ordered field is an ordered ring $(R,\leq)$ where is also a field.

Examples of ordered rings include:

The integers $\mathbb{Z}$ , under the standard ordering $\leq$ .
The real numbers $\mathbb{R}$ under the standard ordering.
The polynomial ring $\mathbb{R}[x]$ in one variable over $\mathbb{R}$ , under the relation $f \leq g$ if and only if has nonnegative leading coefficient.

Examples of rings which do not admit any ordering relation making them into an ordered ring include:

"ordered ring" is owned by djao.

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Also defines:

ordered field

Attachments:: positivity in ordered ring (Theorem) by pahio
basic facts about ordered rings (Result) by Wkbj79
$\mathbb{C}$ is not an ordered field (Theorem) by Wkbj79

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AMS MSC:	13J25 (Commutative rings and algebras :: Topological rings and modules :: Ordered rings)
	12J15 (Field theory and polynomials :: Topological fields :: Ordered fields)
	06F25 (Order, lattices, ordered algebraic structures :: Ordered structures :: Ordered rings, algebras, modules)

Pending Errata and Addenda

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