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'''Schemes''', and [[function (mathematics)|function]]s between them, are the principal objects of study in modern [[algebraic geometry]].  Algebraic geometry began as the study of [[variety (mathematics)|varieties]], geometric figures described by polynomial equations with coefficents in a [[field (mathematics)|field]]. The geometric properties of an [[affine variety]] are reflected in algebraic properties in its [[ring (mathematics)|ring]] of functions, which is the [[quotient ring|quotient]] of a [[polynomial ring]].  These algebraic properties can be defined in the context of arbitrary [[commutative ring]]s, and [[affine scheme]s are the corresponding geometric objects.  A general [[scheme]] is a geometric object  which looks like an [[affine scheme]] in a neighborhood of every point.
Schemes have superseded varieties as the main objects of interest in algebraic geometry for several reasons:  they give a uniform way to treat all previous disparate definitions of varieties, including [[affine variety|affine]], [[projective variety|projective]], [[quasi-projective variety| quasi-projective]], and [[abstract variety|abstract]] varieties, and there is a huge variety of schemes that are not classical varieties.  Also, the theory of varieties is most successful when the points on the varieties have values in an [[algebraically closed]] field.  By contrast, important problems in [[arithmetic geometry]] involve studying arithmetic properties of points on varieties, which cannot be done by working over an algebraically closed field.  Schemes have proven to be effective at overcoming this difficulty.
The theory of schemes was pioneered by [[Alexander Grothendieck]]. The foundations of scheme theory were initially organized in Grothendieck's multi-volume work [[EGA|Éléments de Géométrie Algébrique]] with the assistance of [[Jean Dieudonné]].  
The theory of schemes was pioneered by [[Alexander Grothendieck]]. The foundations of scheme theory were initially organized in Grothendieck's multi-volume work [[EGA|Éléments de Géométrie Algébrique]] with the assistance of [[Jean Dieudonné]].  


Roughly speaking, a scheme is a topological space which is locally affine; that is, a scheme has the local structure of the so-called [[Affine Scheme|affine schemes]], i.e. of spectra of rings endowed with [[Affine Scheme|Zariski topologies]].
A number of technical definitions and procedures are outlined in the [[glossary of scheme theory]].


==Definition==  
==The Category of Schemes==  
A '''scheme''' <math>(X,\mathcal{O}_X)</math> consists of a topological space <math>X</math> together with a sheaf <math>\mathcal{O}_X</math> of rings (called the structural sheaf on <math>X</math>) such that every point of <math>X</math> has an open neighborhood <math>U</math> such that the locally ringed space <math>(U,\mathcal{O}_X\vert_U)</math> is isomorphic to an [[Affine Scheme|affine scheme]].  
A '''scheme''' <math>(X,\mathcal{O}_X)</math> consists of a topological space <math>X</math> together with a sheaf <math>\mathcal{O}_X</math> of rings (called the structural sheaf on <math>X</math>) such that every point of <math>X</math> has an open neighborhood <math>U</math> such that the locally ringed space <math>(U,\mathcal{O}_X\vert_U)</math> is isomorphic to an [[Affine Scheme|affine scheme]].  


[[Projective Scheme|Projective Schemes]] constitute an important class of schemes, especially for the study of curves.  
[[Projective Scheme|Projective Schemes]] constitute an important class of schemes, especially for the study of curves.  


The ''category of schemes'' is defined by taking morphisms of schemes to be morphisms of [[Locally Ringed Space|locally ringed spaces]].  Many kinds of morphisms of schemes are characterized affine-locally, in the sense that  
The ''category of schemes'' is defined by taking morphisms of schemes to be morphisms of [[Locally Ringed Space|locally ringed spaces]].  Many kinds of morphisms of schemes are characterized affine-locally, in the sense that


==Gluing Properties==
==Gluing Properties==
The notion of "gluing" is one of the central ideas in the theory of schemes.  
The notion of "gluing" is one of the central ideas in the theory of schemes. Let <math>S</math> be a scheme, and
 
<math>(X_i)_{i\in I}</math> a family of <math>S</math>-schemes. If we're given families <math>(X_{ij})_{j\in I}</math> and <math>S</math>-isomorphisms <math>f_{ij}:X_{ij}\to X_{ji}</math> such that: <math>f_{ii}=id_{X_i}</math>, <math>f_{ij}(X_{ij}\cap X_{ik})=X_{ji}\cap X_{jk}</math>, and <math>f_{ik}=f_{jk}\circ f_{ij}</math> on <math>X_{ij}\cap X_{ik}</math> for all <math>i,j,k\in I</math>, then there is an <math>S</math>-scheme <math>X</math> together with <math>S</math>-immersions <math>g_i:X_i\to X</math> such that <math>g_i=g_j\circ f_ij</math> on <math>X_{ij}</math> and so that <math>X=\bigcup_{i\in I} g_i(X_i)</math>.  This scheme <math>X</math> is called the ''gluing over <math>S</math> of the <math>X_i</math> along the <math>X_{ij}</math>''.
==Morphisms of Schemes==
 
 


The <math>S</math>-scheme <math>X</math> is universal for the property above: i.e., for any <math>S</math>-scheme <math>Z</math> and family of morphisms <math>u_i:X_i\to Z</math> such that <math>u_i=u_j\circ f_{ij}</math> on <math>X_{ij}</math>, then there is a unique morphism <math>u:X\to Z</math> such that <math>u_i=u\circ g_i</math>.  Moreover, if <math>Z</math> is a scheme, then giving a morphism <math>u:Z\to X</math> is equivalent to giving an
open covering <math>(Z_i)_{i\in I}</math> of <math>Z</math> and morphisms <math>u_i:Z_i\to X_i</math> such that <math>u_j=f_{ij}\circ u_i</math> on <math>Z_i\cap Z_j</math>.


[[Category:CZ Live]]
==Morphisms of Schemes==[[Category:Suggestion Bot Tag]]
[[Category:Stub Articles]]
[[Category:Mathematics Workgroup]]

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Schemes, and functions between them, are the principal objects of study in modern algebraic geometry. Algebraic geometry began as the study of varieties, geometric figures described by polynomial equations with coefficents in a field. The geometric properties of an affine variety are reflected in algebraic properties in its ring of functions, which is the quotient of a polynomial ring. These algebraic properties can be defined in the context of arbitrary commutative rings, and [[affine scheme]s are the corresponding geometric objects. A general scheme is a geometric object which looks like an affine scheme in a neighborhood of every point.

Schemes have superseded varieties as the main objects of interest in algebraic geometry for several reasons: they give a uniform way to treat all previous disparate definitions of varieties, including affine, projective, quasi-projective, and abstract varieties, and there is a huge variety of schemes that are not classical varieties. Also, the theory of varieties is most successful when the points on the varieties have values in an algebraically closed field. By contrast, important problems in arithmetic geometry involve studying arithmetic properties of points on varieties, which cannot be done by working over an algebraically closed field. Schemes have proven to be effective at overcoming this difficulty.

The theory of schemes was pioneered by Alexander Grothendieck. The foundations of scheme theory were initially organized in Grothendieck's multi-volume work Éléments de Géométrie Algébrique with the assistance of Jean Dieudonné.


A number of technical definitions and procedures are outlined in the glossary of scheme theory.

The Category of Schemes

A scheme consists of a topological space together with a sheaf of rings (called the structural sheaf on ) such that every point of has an open neighborhood such that the locally ringed space is isomorphic to an affine scheme.

Projective Schemes constitute an important class of schemes, especially for the study of curves.

The category of schemes is defined by taking morphisms of schemes to be morphisms of locally ringed spaces. Many kinds of morphisms of schemes are characterized affine-locally, in the sense that

Gluing Properties

The notion of "gluing" is one of the central ideas in the theory of schemes. Let be a scheme, and a family of -schemes. If we're given families and -isomorphisms such that: , , and on for all , then there is an -scheme together with -immersions such that on and so that . This scheme is called the gluing over of the along the .

The -scheme is universal for the property above: i.e., for any -scheme and family of morphisms such that on , then there is a unique morphism such that . Moreover, if is a scheme, then giving a morphism is equivalent to giving an open covering of and morphisms such that on .

==Morphisms of Schemes==