artinian ring

A (left) **artinian ring** $R$ is a ring for which every descending chain $R=I_0\supset I_1\supset I_2\supset \ldots \supset I_n\supset\ldots$ of its (left) ideals stabilizes, i.e. there is $n_0$ such that $I_{n+1}=I_n$ for all $n\geq n_0$. A ring is artinian if it is both left artinian and right artinian.

In an artinian ring $R$ the Jacobson radical $J(R)$ is nilpotent. A left artinian ring is semiprimitive if and only if the zero ideal is the unique nilpotent ideal.

A dual condition is noetherian: a **noetherian ring** is a ring satisfying the ascending chain condition on ideals. The symmetry is severely broken if one considers unital rings: for example every unital artinian ring is noetherian. For a converse there is a strong condition: a left (unital) ring $R$ is left artinian iff $R/J(R)$ is semisimple in $_R Mod$ and the Jacobson radical $J(R)$ is nilpotent. Artinian rings are intuitively much smaller than generic noetherian rings.

- artinian object?

Last revised on December 6, 2011 at 21:23:57. See the history of this page for a list of all contributions to it.