# Artinian ring

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In abstract algebra, an **Artinian ring** is a ring that satisfies the descending chain condition on ideals. They are also called **Artin rings** and are named after Emil Artin, who first discovered that the descending chain condition for ideals simultaneously generalizes finite rings and rings that are finite-dimensional vector spaces over fields. The definition of Artinian rings may be restated by interchanging the descending chain condition with an equivalent notion: the minimum condition.

A ring is **left Artinian** if it satisfies the descending chain condition on left ideals, **right Artinian** if it satisfies the descending chain condition on right ideals, and **Artinian** or **two-sided Artinian** if it is both left and right Artinian. For commutative rings the left and right definitions coincide, but in general they are distinct from each other.

The Artin–Wedderburn theorem characterizes all simple Artinian rings as the matrix rings over a division ring. This implies that a simple ring is left Artinian if and only if it is right Artinian.

Although the descending chain condition appears dual to the ascending chain condition, in rings it is in fact the stronger condition. Specifically, a consequence of the Akizuki–Hopkins–Levitzki theorem is that a left (right) Artinian ring is automatically a left (right) Noetherian ring. This is not true for general modules, that is, an Artinian module need not be a Noetherian module.

## Examples

- An integral domain is Artinian if and only if it is a field.
- A ring with finitely many, say left, ideals is left Artinian. In particular, a finite ring (e.g., ) is left and right Artinian.
- Let
*k*be a field. Then is Artinian for every positive integer*n*. - If
*I*is a nonzero ideal of a Dedekind domain*A*, then is a principal Artinian ring.^{[1]} - For each , the full matrix ring over a left Artinian (resp. left Noetherian) ring
*R*is left Artinian (resp. left Noetherian).^{[2]}

The ring of integers is a Noetherian ring but is not Artinian.

## Modules over Artinian rings

Let *M* be a left module over a left Artinian ring. Then the following are equivalent: (i) *M* is finitely generated, (ii) *M* has finite length, (iii) *M* is Noetherian, (iv) *M* is Artinian.^{[3]}

## Commutative Artinian rings

Let *A* be a commutative Noetherian ring with unity. Then the following are equivalent.

*A*is Artinian.*A*is a finite product of commutative Artinian local rings.^{[4]}*A*/ nil(*A*) is a semisimple ring, where nil(*A*) is the nilradical of*A*.{{ safesubst:#invoke:Unsubst||date=__DATE__ |$B=

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- Every finitely generated module over
*A*has finite length. (see above) *A*has Krull dimension zero.^{[6]}(In particular, the nilradical is the Jacobson radical since prime ideals are maximal.)- is finite and discrete.
- is discrete.
^{[7]}

Let *k* be a field and *A* finitely generated *k*-algebra. Then *A* is Artinian if and only if *A* is finitely generated as *k*-module.

An Artinian local ring is complete. A quotient and localization of an Artinian ring is Artinian.

## See also

## Notes

- ↑ Theorem 459 of http://math.uga.edu/~pete/integral.pdf
- ↑ Template:Harvnb
- ↑ Template:Harvnb
- ↑ Template:Harvard citations, Theorems 8.7
- ↑ Sketch: In commutative rings, nil(
*A*) is contained in the Jacobson radical of*A*. Since*A*/nil(*A*) is semisimple, nil(*A*) is actually equal to the Jacobson radical of*A*. By Levitzky's theorem, nil(*A*) is a nilpotent ideal. These last two facts show that*A*is a semiprimary ring, and by the Hopkins–Levitzki theorem*A*is Artinian. - ↑ Template:Harvard citations, Theorems 8.5
- ↑ Template:Harvard citations, Ch. 8, Exercise 2.

## References

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- Bourbaki, Algèbre
- Charles Hopkins. Rings with minimal condition for left ideals. Ann. of Math. (2) 40, (1939). 712–730.
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