Difference between revisions of "Affine variety"
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A generalization of the concept of an [[Affine algebraic set|affine algebraic set]]. An affine variety is a reduced [[Affine scheme|affine scheme]] $ X $ | A generalization of the concept of an [[Affine algebraic set|affine algebraic set]]. An affine variety is a reduced [[Affine scheme|affine scheme]] $ X $ | ||
of finite type over a field $ k $, | of finite type over a field $ k $, | ||
− | i.e. $ X = { \mathop{\rm Spec} } A $, | + | ''i.e.'' $ X = { \mathop{\rm Spec} } A $, |
where $ A $ | where $ A $ | ||
is a commutative $ k $- | is a commutative $ k $- | ||
Line 50: | Line 50: | ||
If $ B = \overline{k}\; $( | If $ B = \overline{k}\; $( | ||
respectively, if $ B = k $), | respectively, if $ B = k $), | ||
− | the elements of the set | + | the elements of the set $X(\overline{k})$ (respectively, $ X(k) $) |
− | respectively, $ X(k) $) | ||
are called geometric (respectively, rational) points of $ X $. | are called geometric (respectively, rational) points of $ X $. | ||
− | The set $ X( \overline{k} | + | The set $ X( \overline{k}) $ |
is in a bijective correspondence with the set of maximal ideals $ { \mathop{\rm Specm} } (A) $ | is in a bijective correspondence with the set of maximal ideals $ { \mathop{\rm Specm} } (A) $ | ||
of the ring $ A $, | of the ring $ A $, | ||
Line 60: | Line 59: | ||
The spectral topology in the space $ X $ | The spectral topology in the space $ X $ | ||
induces on the everywhere-dense subset $ { \mathop{\rm Specm} } (A) $ | induces on the everywhere-dense subset $ { \mathop{\rm Specm} } (A) $ | ||
− | a topology which corresponds to the Zariski topology on $ V $. | + | a topology which corresponds to the [[Zariski topology]] on $ V $. |
====Comments==== | ====Comments==== | ||
− | Frequently the name " | + | Frequently the name "variety" means a reduced and irreducible [[scheme]] of finite type over an algebraically closed field. |
====References==== | ====References==== | ||
− | + | ||
+ | * {{Ref|a1}} I.R. Shafarevich, "Basic algebraic geometry", Springer (1977) (Translated from Russian) {{MR|0447223}} {{ZBL|0362.14001}} |
Latest revision as of 20:48, 15 March 2023
affine algebraic variety
A generalization of the concept of an affine algebraic set. An affine variety is a reduced affine scheme $ X $ of finite type over a field $ k $, i.e. $ X = { \mathop{\rm Spec} } A $, where $ A $ is a commutative $ k $- algebra of finite type without nilpotent elements. The affine variety $ X = { \mathop{\rm Spec} } k[ T _ {1} \dots T _ {n} ] $, where $ k[T _ {1} \dots T _ {n} ] $ is the ring of polynomials over $ k $, is called affine space over $ k $ and is denoted by $ \mathbf A _ {k} ^ {n} $. An affine scheme is an affine variety if and only if it is isomorphic to a reduced closed subscheme of an affine space. Each system of generators $ x _ {1} \dots x _ {n} $ of a $ k $- algebra $ A $ defines a surjective homomorphism $ \phi : k[ T _ {1} \dots T _ {n} ] \rightarrow A $, defined by the formula $ \phi ( T _ {i} ) = x _ {i} $. Let $ \overline{k}\; $ be the algebraic closure of $ k $. The subset of the set $ \overline{k}\; ^ {n} $ consisting of the common zeros of all the polynomials of the ideal $ { \mathop{\rm ker} } \phi $ is an affine algebraic set over $ k $. The coordinate ring of such an affine algebraic set is isomorphic to the ring $ A $. Each affine algebraic set over $ k $ in turn defines an algebraic variety $ { \mathop{\rm Spec} } k[X] $, where $ k[X] $ is the coordinate ring of $ X $. The set of points of an affine variety is in a one-to-one correspondence with the irreducible subvarieties of the corresponding affine algebraic set.
To each affine variety $ X = { \mathop{\rm Spec} } A $ a functor on the category of $ k $- algebras is assigned. It is defined by the correspondence:
$$ B \rightarrow X (B) = { \mathop{\rm Hom} } _ {k- \mathop{\rm alg} } ( A , B ). $$
If $ B = \overline{k}\; $( respectively, if $ B = k $), the elements of the set $X(\overline{k})$ (respectively, $ X(k) $) are called geometric (respectively, rational) points of $ X $. The set $ X( \overline{k}) $ is in a bijective correspondence with the set of maximal ideals $ { \mathop{\rm Specm} } (A) $ of the ring $ A $, and with the set of points of an algebraic set $ V $ whose coordinate ring is isomorphic to $ A $. The spectral topology in the space $ X $ induces on the everywhere-dense subset $ { \mathop{\rm Specm} } (A) $ a topology which corresponds to the Zariski topology on $ V $.
Comments
Frequently the name "variety" means a reduced and irreducible scheme of finite type over an algebraically closed field.
References
- [a1] I.R. Shafarevich, "Basic algebraic geometry", Springer (1977) (Translated from Russian) MR0447223 Zbl 0362.14001
Affine variety. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Affine_variety&oldid=45051