Artin–Tate lemma

In algebra, the Artin–Tate lemma, named after John Tate and his former advisor Emil Artin, states:^[1]

Let A be a commutative Noetherian ring and

B \subset C

commutative algebras over A. If C is of finite type over A and if C is finite over B, then B is of finite type over A.

(Here, "of finite type" means "finitely generated algebra" and "finite" means "finitely generated module".) The lemma was introduced by E. Artin and J. Tate in 1951^[2] to give a proof of Hilbert's Nullstellensatz. The lemma is similar to the Eakin–Nagata theorem, which says: if C is finite over B and C is a Noetherian ring, then B is a Noetherian ring.

Proof

The following proof can be found in Atiyah–MacDonald.^[3] Let $x_{1}, \dots, x_{m}$ generate $C$ as an $A$ -algebra and let $y_{1}, \dots, y_{n}$ generate $C$ as a $B$ -module. Then we can write

x_{i} = \sum_{j} b_{i j} y_{j} and y_{i} y_{j} = \sum_{k} b_{i j k} y_{k}

with $b_{i j}, b_{i j k} \in B$ . Then $C$ is finite over the $A$ -algebra $B_{0}$ generated by the $b_{i j}, b_{i j k}$ . Using that $A$ and hence $B_{0}$ is Noetherian, also $B$ is finite over $B_{0}$ . Since $B_{0}$ is a finitely generated $A$ -algebra, also $B$ is a finitely generated $A$ -algebra.

Noetherian necessary

Without the assumption that A is Noetherian, the statement of the Artin–Tate lemma is no longer true. Indeed, for any non-Noetherian ring A we can define an A-algebra structure on $C = A \oplus A$ by declaring $(a, x) (b, y) = (a b, b x + a y)$ . Then for any ideal $I \subset A$ which is not finitely generated, $B = A \oplus I \subset C$ is not of finite type over A, but all conditions as in the lemma are satisfied.

References

↑ Eisenbud, David, Commutative Algebra with a View Toward Algebraic Geometry, Graduate Texts in Mathematics, 150, Springer-Verlag, 1995, ISBN 0-387-94268-8, Exercise 4.32
↑ E Artin, J.T Tate, "A note on finite ring extensions," J. Math. Soc Japan, Volume 3, 1951, pp. 74–77
↑ M. Atiyah, I.G. Macdonald, Introduction to Commutative Algebra, Addison–Wesley, 1994. ISBN 0-201-40751-5. Proposition 7.8

External links

http://commalg.subwiki.org/wiki/Artin-Tate_lemma

[1] Eisenbud, David, Commutative Algebra with a View Toward Algebraic Geometry, Graduate Texts in Mathematics, 150, Springer-Verlag, 1995, ISBN 0-387-94268-8, Exercise 4.32

[2] E Artin, J.T Tate, "A note on finite ring extensions," J. Math. Soc Japan, Volume 3, 1951, pp. 74–77

[3] M. Atiyah, I.G. Macdonald, Introduction to Commutative Algebra, Addison–Wesley, 1994. ISBN 0-201-40751-5. Proposition 7.8

[1]

[2]

[3]

Artin–Tate lemma

Contents

Proof

Noetherian necessary

References

External links

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