Contents

Idea

A totally ordered ring is an ordered ring whose order forms a total order.

Definition

This definition is adapted from Peter Freyd‘s definition of a totally ordered abelian group:

A totally ordered ring is an lattice-ordered ring $R$ such that for all elements $a$ in $R$, $a \leq 0$ or $-a \leq 0$.

In a totally ordered ring, the join is usually called the maximum, while the meet is usually called the minimum

If the relation $\leq$ is only a preorder, then the prelattice-ordered ring $R$ is said to be a totally preordered ring.

Examples

The integers, the rational numbers, and the real numbers are totally ordered rings.

Related concepts

• ring

• ordered ring

• total order

• lattice-ordered ring

• totally ordered abelian group

References

• Peter Freyd, Algebraic real analysis, Theory and Applications of Categories, Vol. 20, 2008, No. 10, pp 215-306 (tac:20-10)

External links

• Wikipedia, Ordered ring