Zariski ring

From testwiki

Revision as of 16:30, 26 April 2024 by imported>1234qwer1234qwer4 (might as well link this)

(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)

Jump to navigation Jump to search

In commutative algebra, a Zariski ring is a commutative Noetherian topological ring A whose topology is defined by an ideal $𝔞$ contained in the Jacobson radical, the intersection of all maximal ideals. They were introduced by Template:Harvs under the name "semi-local ring" which now means something different, and named "Zariski rings" by Template:Harvs. Examples of Zariski rings are noetherian local rings with the topology induced by the maximal ideal, and $𝔞$ -adic completions of Noetherian rings.

Let A be a Noetherian topological ring with the topology defined by an ideal $𝔞$ . Then the following are equivalent.

A is a Zariski ring.
The completion $\hat{A}$ is faithfully flat over A (in general, it is only flat over A).
Every maximal ideal is closed.

References

Template:Commutative-algebra-stub

Retrieved from "https://en.wiki.beta.math.wmflabs.org/w/index.php?title=Zariski_ring&oldid=31955"

Commutative algebra