Regular local ring: Difference between revisions

Revision as of 13:49, 4 December 2007

There are deep connections between algebraic (in fact, scheme-theoretic) notions of smoothness and regularity.

Definition

Let $A$ be a Noetherian local ring with maximal ideal $m$ and residual field $k=A/m$ . The following conditions are equivalent:

The Krull dimension of $A$ is equal to the dimension of the $k$ -vector space $m/m^{2}$ .

And when these conditions hold, $A$ is called a regular local ring.

Basic Results on Regular Local Rings

One important criterion for regularity is Serre's Criterion, which states that a Noetherian local ring $A$ is regular if and only if its global dimension is finite, in which case it is equal to the krull dimension of $A$ .

In a paper of Auslander and Buchsbaum published in 1959, it was shown that every regular local ring is a UFD.

Regular Rings

A regular ring is a Noetherian ring such that the localisation at every prime is a regular local ring.

@@ Line 12: / Line 12: @@
 ==Basic Results on Regular Local Rings==
-One important criterion for regularity is [[Serre's Criterion]], which states that a Noetherian local ring <math>A</math> is regular if and only if its global dimension is finite, in which case it is equal to the [[krull dimension]] of <math>A</math>.
+One important criterion for regularity is [[Serre's Criterion]], which states that a Noetherian local ring <math>A</math> is regular if and only if its [[global dimension]] is finite, in which case it is equal to the [[krull dimension]] of <math>A</math>.
 In a paper of Auslander and Buchsbaum published in 1959, it was shown that every regular local ring is a UFD.
 ==Regular Rings==

Regular local ring: Difference between revisions

Revision as of 13:49, 4 December 2007

Definition

Basic Results on Regular Local Rings

Regular Rings

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