Regular local ring

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

Definition

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

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

And when these conditions hold, ${\displaystyle A}$ 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 ${\displaystyle A}$ is regular if and only if its global dimension is finite, in which case it is equal to the krull dimension of ${\displaystyle A}$.

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

Regular Rings

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

References

• Jean-Pierre Serre, Local algebra, Springer-Verlag, 2000, ISBN 3-540-66641-9. Chap.IV.D.