Equivalence of dimension notions for affine domain: Difference between revisions
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==Statement== | ==Statement== | ||
Let <math>A</math> be an [[affine domain]] over a [[field]] <math>k</math>, i.e. a finitely generated algebra over <math>k</math>, that also happens to be an integral domain. Then, the following are | Let <math>A</math> be an [[affine domain]] over a [[field]] <math>k</math>, i.e. a finitely generated algebra over <math>k</math>, that also happens to be an integral domain. Then, the following are equal: | ||
* The [[Krull dimension]] of <math>A</math> | * The [[Krull dimension]] of <math>A</math> | ||
Latest revision as of 16:19, 12 May 2008
This fact is an application of the following pivotal fact/result/idea: Noether normalization theorem
View other applications of Noether normalization theorem OR Read a survey article on applying Noether normalization theorem
This fact is an application of the following pivotal fact/result/idea: going down
View other applications of going down OR Read a survey article on applying going down
Statement
Let be an affine domain over a field , i.e. a finitely generated algebra over , that also happens to be an integral domain. Then, the following are equal:
- The Krull dimension of
- The Krull dimension of the localization of at any maximal ideal (which is the same as that obtained using the Hilbert-Samuel polynomial)
- The transcendence degree of the field of fractions of , over
Facts used
- Proving that the Krull dimension of the polynomial ring in variables, is equal to exactly
- Noether normalization theorem
- Going up theorem
- Going down for integral extensions of normal domains
Proof
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