Scheme (mathematics)

In mathematics, specifically algebraic geometry, a scheme is a structure that enlarges the notion of algebraic variety in several ways, such as taking account of multiplicities (the equations x = 0 and x² = 0 define the same algebraic variety but different schemes) and allowing "varieties" defined over any commutative ring (for example, Fermat curves are defined over the integers).

Scheme theory was introduced by Alexander Grothendieck in 1960 in his treatise Éléments de géométrie algébrique (EGA); one of its aims was developing the formalism needed to solve deep problems of algebraic geometry, such as the Weil conjectures (the last of which was proved by Pierre Deligne).^[1] Strongly based on commutative algebra, scheme theory allows a systematic use of methods of topology and homological algebra. Scheme theory also unifies algebraic geometry with much of number theory, which eventually led to Wiles's proof of Fermat's Last Theorem.

Schemes elaborate the fundamental idea that an algebraic variety is best analyzed through the

.

Formally, a scheme is a ringed space covered by affine schemes. An affine scheme is the spectrum of a commutative ring; its points are the prime ideals of the ring, and its closed points are maximal ideals. The coordinate ring of an affine scheme is the ring itself, and the coordinate rings of open subsets are rings of fractions.

The relative point of view is that much of algebraic geometry should be developed for a morphism X → Y of schemes (called a scheme X over the base Y ), rather than for an individual scheme. For example, in studying algebraic surfaces, it can be useful to consider families of algebraic surfaces over any scheme Y. In many cases, the family of all varieties of a given type can itself be viewed as a variety or scheme, known as a moduli space.

For some of the detailed definitions in the theory of schemes, see the

.

The origins of algebraic geometry mostly lie in the study of

used to study complex varieties do not seem to apply?

Hilbert's Nullstellensatz suggests an approach to algebraic geometry over any algebraically closed field k : the maximal ideals in the polynomial ring k[x₁, ... , x_n] are in one-to-one correspondence with the set kⁿ of n-tuples of elements of k, and the prime ideals correspond to the irreducible algebraic sets in kⁿ, known as affine varieties. Motivated by these ideas, Emmy Noether and Wolfgang Krull developed commutative algebra in the 1920s and 1930s.^[3] Their work generalizes algebraic geometry in a purely algebraic direction, generalizing the study of points (maximal ideals in a polynomial ring) to the study of prime ideals in any commutative ring. For example, Krull defined the dimension of a commutative ring in terms of prime ideals and, at least when the ring is Noetherian, he proved that this definition satisfies many of the intuitive properties of geometric dimension.

Noether and Krull's commutative algebra can be viewed as an algebraic approach to affine algebraic varieties. However, many arguments in algebraic geometry work better for

of the complex numbers).

For applications to number theory, van der Waerden and Weil formulated algebraic geometry over any field, not necessarily algebraically closed. Weil was the first to define an abstract variety (not embedded in projective space), by gluing affine varieties along open subsets, on the model of abstract manifolds in topology. He needed this generality for his construction of the Jacobian variety of a curve over any field. (Later, Jacobians were shown to be projective varieties by Weil, Chow and Matsusaka.)

The algebraic geometers of the Italian school had often used the somewhat foggy concept of the generic point of an algebraic variety. What is true for the generic point is true for "most" points of the variety. In Weil's Foundations of Algebraic Geometry (1946), generic points are constructed by taking points in a very large algebraically closed field, called a universal domain.^[4] This worked awkwardly: there were many different generic points for the same variety. (In the later theory of schemes, each algebraic variety has a single generic point.)

In the 1950s, Claude Chevalley, Masayoshi Nagata and Jean-Pierre Serre, motivated in part by the Weil conjectures relating number theory and algebraic geometry, further extended the objects of algebraic geometry, for example by generalizing the base rings allowed. The word scheme was first used in the 1956 Chevalley Seminar, in which Chevalley pursued Zariski's ideas.^[5] According to Pierre Cartier, it was André Martineau who suggested to Serre the possibility of using the spectrum of an arbitrary commutative ring as a foundation for algebraic geometry.^[6]

The theory took its definitive form in Grothendieck's Éléments de géométrie algébrique (EGA) and the later Séminaire de géométrie algébrique (SGA), bringing to a conclusion a generation of experimental suggestions and partial developments.^[7] Grothendieck defined the spectrum ${\displaystyle X}$ of a commutative ring ${\displaystyle R}$ as the space of prime ideals of ${\displaystyle R}$ with a natural topology (known as the Zariski topology), but augmented it with a sheaf of rings: to every open subset ${\displaystyle U}$ he assigned a commutative ring ${\displaystyle {\mathcal {O}}_{X}(U)}$, which may be thought of as the coordinate ring of regular functions on ${\displaystyle U}$. These objects ${\displaystyle \operatorname {Spec} (R)}$ are the affine schemes; a general scheme is then obtained by "gluing together" affine schemes.

Much of algebraic geometry focuses on projective or quasi-projective varieties over a field ${\displaystyle k}$, most often over the complex numbers. Grothendieck developed a large body of theory for arbitrary schemes extending much of the geometric intuition for varieties. For example, it is common to construct a moduli space first as a scheme, and only later study whether it is a more concrete object such as a projective variety. Applying Grothendieck's theory to schemes over the integers and other number fields led to powerful new perspectives in number theory.

An affine scheme is a

${\displaystyle \operatorname {Spec} (R)}$ of a commutative ring ${\displaystyle R}$. A scheme is a locally ringed space ${\displaystyle X}$ admitting a covering by open sets ${\displaystyle U_{i}}$, such that each ${\displaystyle U_{i}}$ (as a locally ringed space) is an affine scheme.[8] In particular, ${\displaystyle X}$ comes with a sheaf ${\displaystyle {\mathcal {O}}_{X}}$, which assigns to every open subset ${\displaystyle U}$ a commutative ring ${\displaystyle {\mathcal {O}}_{X}(U)}$ called the ring of regular functions on ${\displaystyle U}$. One can think of a scheme as being covered by "coordinate charts" that are affine schemes. The definition means exactly that schemes are obtained by gluing together affine schemes using the Zariski topology.

In the early days, this was called a prescheme, and a scheme was defined to be a

The sheaf properties of ${\displaystyle {\mathcal {O}}_{X}(U)}$ mean that its elements, which are not necessarily functions, can neverthess be patched together from their restrictions in the same way as functions.

A basic example of an affine scheme is affine ${\displaystyle n}$-space over a field ${\displaystyle k}$, for a natural number ${\displaystyle n}$. By definition, ${\displaystyle A_{k}^{n}}$ is the spectrum of the polynomial ring ${\displaystyle k[x_{1},\dots ,x_{n}]}$. In the spirit of scheme theory, affine ${\displaystyle n}$-space can in fact be defined over any commutative ring ${\displaystyle R}$, meaning ${\displaystyle \operatorname {Spec} (R[x_{1},\dots ,x_{n}])}$.

Schemes form a category, with morphisms defined as morphisms of locally ringed spaces. (See also: morphism of schemes.) For a scheme Y, a scheme X over Y (or a Y-scheme) means a morphism X → Y of schemes. A scheme X over a commutative ring R means a morphism X → Spec(R).

An algebraic variety over a field k can be defined as a scheme over k with certain properties. There are different conventions about exactly which schemes should be called varieties. One standard choice is that a variety over k means an integral separated scheme of finite type over k.^[10]

A morphism f: X → Y of schemes determines a pullback homomorphism on the rings of regular functions, f*: O(Y) → O(X). In the case of affine schemes, this construction gives a one-to-one correspondence between morphisms Spec(A) → Spec(B) of schemes and ring homomorphisms B → A.^[11] In this sense, scheme theory completely subsumes the theory of commutative rings.

Since Z is an

.

For a scheme X over a commutative ring R, an R-point of X means a section of the morphism X → Spec(R). One writes X(R) for the set of R-points of X. In examples, this definition reconstructs the old notion of the set of solutions of the defining equations of X with values in R. When R is a field k, X(k) is also called the set of k-rational points of X.

More generally, for a scheme X over a commutative ring R and any commutative R-

The fiber product of schemes always exists. That is, for any schemes X and Z with morphisms to a scheme Y, the categorical fiber product ${\displaystyle X\times _{Y}Z}$ exists in the category of schemes. If X and Z are schemes over a field k, their fiber product over Spec(k) may be called the product X × Z in the category of k-schemes. For example, the product of affine spaces ${\displaystyle \mathbb {A} ^{m}}$ and ${\displaystyle \mathbb {A} ^{n}}$ over k is affine space ${\displaystyle \mathbb {A} ^{m+n}}$ over k.

Since the category of schemes has fiber products and also a terminal object Spec(Z), it has all finite limits.

Here and below, all the rings considered are commutative.

Let k be an algebraically closed field. The affine space ${\displaystyle {\bar {X}}=\mathbb {A} _{k}^{n}}$ is the algebraic variety of all points ${\displaystyle a=(a_{1},\ldots ,a_{n})}$ with coordinates in k; its coordinate ring is the polynomial ring ${\displaystyle R=k[x_{1},\ldots ,x_{n}]}$. The corresponding scheme ${\displaystyle X=\mathrm {Spec} (R)}$ is a topological space with the Zariski topology, whose closed points are the maximal ideals ${\displaystyle {\mathfrak {m}}_{a}=(x_{1}-a_{1},\ldots ,x_{n}-a_{n})}$, the set of polynomials vanishing at a. The scheme also contains a non-closed point for each non-maximal prime ideal ${\displaystyle {\mathfrak {p}}\subset R}$, whose vanishing defines an irreducible subvariety ${\displaystyle {\bar {V}}={\bar {V}}({\mathfrak {p}})\subset {\bar {X}}}$; the topological closure of the scheme point ${\displaystyle {\mathfrak {p}}}$ is the subscheme ${\displaystyle V({\mathfrak {p}})=\{{\mathfrak {q}}\in X\ \ {\text{with}}\ \ {\mathfrak {p}}\subset {\mathfrak {q}}\}}$, including all the closed points of the subvariety, i.e. ${\displaystyle {\mathfrak {m}}_{a}}$ with ${\displaystyle a\in {\bar {V}}}$, or equivalently ${\displaystyle {\mathfrak {p}}\subset {\mathfrak {m}}_{a}}$.

The scheme X has a basis of open subsets given by the complements of hypersurfaces, $${\displaystyle U_{f}=X\setminus V(f)=\{{\mathfrak {p}}\in X\ \ {\text{with}}\ \ f\notin {\mathfrak {p}}\}}$$ for irreducible polynomials ${\displaystyle f\in R}$. This set is endowed with its coordinate ring of regular functions $${\displaystyle {\mathcal {O}}_{X}(U_{f})=R[f^{-1}]=\left\{{\tfrac {r}{f^{m}}}\ \ {\text{for}}\ \ r\in R,\ m\in \mathbb {Z} _{\geq 0}\right\}.}$$ This induces a unique sheaf ${\displaystyle {\mathcal {O}}_{X}}$ which gives the usual ring of rational functions regular on a given open set U.

Each ring element ${\displaystyle r=r(x_{1},\ldots ,x_{n})\in R}$, a polynomial function on ${\displaystyle {\bar {X}}}$, also defines a function on the points of the scheme X whose value at ${\displaystyle {\mathfrak {p}}}$ lies in the quotient ring ${\displaystyle R/{\mathfrak {p}}}$, the residue ring. We define ${\displaystyle r({\mathfrak {p}})}$ as the image of r under the natural map ${\displaystyle R\to R/{\mathfrak {p}}}$. A maximal ideal ${\displaystyle {\mathfrak {m}}_{a}}$ gives the residue field ${\displaystyle k({\mathfrak {m}}_{a})=R/{\mathfrak {m}}_{a}\cong k}$, with the natural isomorphism ${\displaystyle x_{i}\mapsto a_{i}}$, so that ${\displaystyle r({\mathfrak {m}}_{a})}$ corresponds to the original value ${\displaystyle r(a)}$.

The vanishing locus of a polynomial ${\displaystyle f=f(x_{1},\ldots ,x_{n})}$ is a hypersurface subvariety ${\displaystyle {\bar {V}}(f)\subset \mathbb {A} _{k}^{n}}$, corresponding to the principal ideal ${\displaystyle (f)\subset R}$. The corresponding scheme is ${\textstyle V(f)=\operatorname {Spec} (R/(f))}$, a closed subscheme of affine space. For example, taking k to be the complex or real numbers, the equation ${\displaystyle x^{2}=y^{2}(y+1)}$ defines a nodal cubic curve in the affine plane ${\displaystyle \mathbb {A} _{k}^{2}}$, corresponding to the scheme ${\displaystyle V=\operatorname {Spec} k[x,y]/(x^{2}-y^{2}(y+1))}$.

The ring of integers ${\displaystyle \mathbb {Z} }$ can be considered as the coordinate ring of the scheme ${\displaystyle Z=\operatorname {Spec} (\mathbb {Z} )}$. The Zariski topology has closed points ${\displaystyle {\mathfrak {m}}_{p}=(p)}$, the principal ideals of the prime numbers ${\displaystyle p\in \mathbb {Z} }$; as well as the generic point ${\displaystyle {\mathfrak {p}}_{0}=(0)}$, the zero ideal, whose closure is the whole scheme. Closed sets are finite sets, and open sets are their complements, the cofinite sets; any infinite set of points is dense.

The basis open set corresponding to the irreducible element ${\displaystyle p\in \mathbb {Z} }$ is ${\displaystyle U_{p}=Z\smallsetminus \{{\mathfrak {m}}_{p}\}}$, with coordinate ring ${\displaystyle {\mathcal {O}}_{Z}(U_{p})=\mathbb {Z} [p^{-1}]=\{{\tfrac {n}{p^{m}}}\ {\text{for}}\ n\in \mathbb {Z} ,\ m\geq 0\}}$. For the open set ${\displaystyle U=Z\smallsetminus \{{\mathfrak {m}}_{p_{1}},\ldots ,{\mathfrak {m}}_{p_{\ell }}\}}$, this induces ${\displaystyle {\mathcal {O}}_{Z}(U)=\mathbb {Z} [p_{1}^{-1},\ldots ,p_{\ell }^{-1}]}$.

A number ${\displaystyle n\in \mathbb {Z} }$ corresponds to a function on the scheme ${\displaystyle Z}$, a function whose value at ${\displaystyle {\mathfrak {m}}_{p}}$ lies in the residue field ${\displaystyle k({\mathfrak {m}}_{p})=\mathbb {Z} /(p)=\mathbb {F} _{p}}$, the finite field of integers modulo ${\displaystyle p}$: the function is defined by ${\displaystyle n({\mathfrak {m}}_{p})=n\ {\text{mod}}\ p}$, and also ${\displaystyle n({\mathfrak {p}}_{0})=n}$ in the generic residue ring ${\displaystyle \mathbb {Z} /(0)=\mathbb {Z} }$. The function ${\displaystyle n}$ is determined by its values at the points ${\displaystyle {\mathfrak {m}}_{p}}$ only, so we can think of ${\displaystyle n}$ as a kind of "regular function" on the closed points, a very special type among the arbitrary functions ${\displaystyle f}$ with ${\displaystyle f({\mathfrak {m}}_{p})\in \mathbb {F} _{p}}$.

Note that the point ${\displaystyle {\mathfrak {m}}_{p}}$ is the vanishing locus of the function ${\displaystyle n=p}$, the point where the value of ${\displaystyle p}$ is equal to zero in the residue field. The field of "rational functions" on ${\displaystyle Z}$ is the fraction field of the generic residue ring, ${\displaystyle k({\mathfrak {p}}_{0})=\operatorname {Frac} (\mathbb {Z} )=\mathbb {Q} }$. A fraction ${\displaystyle a/b}$ has "poles" at the points ${\displaystyle {\mathfrak {m}}_{p}}$ corresponding to prime divisors of the denominator.

This also gives a geometric interpretaton of

stating that if the integers ${\displaystyle n_{1},\ldots ,n_{r}}$ have no common prime factor, then there are integers ${\displaystyle a_{1},\ldots ,a_{r}}$ with ${\displaystyle a_{1}n_{1}+\cdots +a_{r}n_{r}=1}$. Geometrically, this is a version of the weak Hilbert Nullstellensatz for the scheme ${\displaystyle Z}$: if the functions ${\displaystyle n_{1},\ldots ,n_{r}}$ have no common vanishing points ${\displaystyle {\mathfrak {m}}_{p}}$ in ${\displaystyle Z}$, then they generate the unit ideal ${\displaystyle (n_{1},\ldots ,n_{r})=(1)}$ in the coordinate ring ${\displaystyle \mathbb {Z} }$. Indeed, we may consider the terms ${\displaystyle \rho _{i}=a_{i}n_{i}}$ as forming a kind of partition of unity subordinate to the covering of ${\displaystyle Z}$ by the open sets ${\displaystyle U_{i}=Z\smallsetminus V(n_{i})}$.

The affine space ${\displaystyle \mathbb {A} _{\mathbb {Z} }^{1}=\{a\ {\text{for}}\ a\in \mathbb {Z} \}}$ is a variety with coordinate ring ${\displaystyle \mathbb {Z} [x]}$, the polynomials with integer coefficients. The corresponding scheme is ${\displaystyle Y=\operatorname {Spec} (\mathbb {Z} [x])}$, whose points are all of the prime ideals ${\displaystyle {\mathfrak {p}}\subset \mathbb {Z} [x]}$. The closed points are maximal ideals of the form ${\displaystyle {\mathfrak {m}}=(p,f(x))}$, where ${\displaystyle p}$ is a prime number, and ${\displaystyle f(x)}$ is a non-constant polynomial with no integer factor and which is irreducible modulo ${\displaystyle p}$. Thus, we may picture ${\displaystyle Y}$ as two-dimensional, with a "characteristic direction" measured by the coordinate ${\displaystyle p}$, and a "spatial direction" with coordinate ${\displaystyle x}$.

A given prime number ${\displaystyle p}$ defines a "vertical line", the subscheme ${\displaystyle V(p)}$ of the prime ideal ${\displaystyle {\mathfrak {p}}=(p)}$: this contains ${\displaystyle {\mathfrak {m}}=(p,f(x))}$ for all ${\displaystyle f(x)}$, the "characteristic ${\displaystyle p}$ points" of the scheme. Fixing the ${\displaystyle x}$-coordinate, we have the "horizontal line" ${\displaystyle x=a}$, the subscheme ${\displaystyle V(x-a)}$ of the prime ideal ${\displaystyle {\mathfrak {p}}=(x-a)}$. We also have the line ${\displaystyle V(bx-a)}$ corresponding to the rational coordinate ${\displaystyle x=a/b}$, which does not intersect ${\displaystyle V(p)}$ for those ${\displaystyle p}$ which divide ${\displaystyle b}$.

A higher degree "horizontal" subscheme like ${\displaystyle V(x^{2}+1)}$ corresponds to ${\displaystyle x}$-values which are roots of ${\displaystyle x^{2}+1}$, namely ${\displaystyle x=\pm {\sqrt {-1}}}$. This behaves differently under different ${\displaystyle p}$-coordinates. At ${\displaystyle p=5}$, we get two points ${\displaystyle x=\pm 2\ {\text{mod}}\ 5}$, since ${\displaystyle (5,x^{2}+1)=(5,x-2)\cap (5,x+2)}$. At ${\displaystyle p=2}$, we get one

double-point ${\displaystyle x=1\ {\text{mod}}\ 2}$, since ${\displaystyle (2,x^{2}+1)=(2,(x-1)^{2})}$. And at ${\displaystyle p=3}$, we get that ${\displaystyle {\mathfrak {m}}=(3,x^{2}+1)}$ is a prime ideal corresponding to ${\displaystyle x=\pm {\sqrt {-1}}}$ in an extension field of ${\displaystyle \mathbb {F} _{3}}$; since we cannot distinguish between these values (they are symmetric under the Galois group), we should picture ${\displaystyle V(3,x^{2}+1)}$ as two fused points. Overall, ${\displaystyle V(x^{2}+1)}$ is a kind of fusion of two Galois-symmetric horizonal lines, a curve of degree 2.

The residue field at ${\displaystyle {\mathfrak {m}}=(p,f(x))}$ is ${\displaystyle k({\mathfrak {m}})=\mathbb {Z} [x]/{\mathfrak {m}}=\mathbb {F} _{p}[x]/(f(x))\cong \mathbb {F} _{p}(\alpha )}$, a field extension of ${\displaystyle \mathbb {F} _{p}}$ adjoining a root ${\displaystyle x=\alpha }$ of ${\displaystyle f(x)}$; this is a finite field with ${\displaystyle p^{d}}$elements, ${\displaystyle d=\operatorname {deg} (f)}$. A polynomial ${\displaystyle r(x)\in \mathbb {Z} [x]}$ corresponds to a function on the scheme ${\displaystyle Y}$ with values ${\displaystyle r({\mathfrak {m}})=r\ \mathrm {mod} \ {\mathfrak {m}}}$, that is ${\displaystyle r({\mathfrak {m}})=r(\alpha )\in \mathbb {F} _{p}(\alpha )}$. Again each ${\displaystyle r(x)\in \mathbb {Z} [x]}$ is determined by its values ${\displaystyle r({\mathfrak {m}})}$ at closed points; ${\displaystyle V(p)}$ is the vanishing locus of the constant polynomial ${\displaystyle r(x)=p}$; and ${\displaystyle V(f(x))}$ contains the points in each characteristic ${\displaystyle p}$ corresponding to Galois orbits of roots of ${\displaystyle f(x)}$ in the algebraic closure ${\displaystyle {\overline {\mathbb {F} }}_{p}}$.

The scheme ${\displaystyle Y}$ is not

.

Arithmetic surfaces

If we consider a polynomial ${\displaystyle f\in \mathbb {Z} [x,y]}$ then the affine scheme ${\displaystyle X=\operatorname {Spec} (\mathbb {Z} [x,y]/(f))}$ has a canonical morphism to ${\displaystyle \operatorname {Spec} \mathbb {Z} }$ and is called an arithmetic surface. The fibers ${\displaystyle X_{p}=X\times _{\operatorname {Spec} (\mathbb {Z} )}\operatorname {Spec} (\mathbb {F} _{p})}$ are then algebraic curves over the finite fields ${\displaystyle \mathbb {F} _{p}}$. If ${\displaystyle f(x,y)=y^{2}-x^{3}+ax^{2}+bx+c}$ is an elliptic curve, then the fibers over its discriminant locus, where $${\displaystyle \Delta _{f}=-4a^{3}c+a^{2}b^{2}+18abc-4b^{3}-27c^{2}=0\ {\text{mod}}\ p,}$$are all singular schemes.^[13] For example, if ${\displaystyle p}$ is a prime number and $${\displaystyle X=\operatorname {Spec} {\frac {\mathbb {Z} [x,y]}{(y^{2}-x^{3}-p)}}}$$ then its discriminant is ${\displaystyle -27p^{2}}$. This curve is singular over the prime numbers ${\displaystyle 3,p}$.

• For any commutative ring R and natural number n, projective space ${\displaystyle \mathbb {P} _{R}^{n}}$ can be constructed as a scheme by gluing n + 1 copies of affine n-space over R along open subsets. This is the fundamental example that motivates going beyond affine schemes. The key advantage of projective space over affine space is that ${\displaystyle \mathbb {P} _{R}^{n}}$ is proper over R; this is an algebro-geometric version of compactness. Indeed, complex projective space ${\displaystyle \mathbb {C} \mathbb {P} ^{n}}$ is a compact space in the classical topology, whereas ${\displaystyle \mathbb {C} ^{n}}$ is not.
• A homogeneous polynomial f of positive degree in the polynomial ring R[x₀, ..., x_n] determines a closed subscheme f = 0 in projective space ${\displaystyle \mathbb {P} _{R}^{n}}$, called a
  projective hypersurface. In terms of the Proj construction
  , this subscheme can be written as $${\displaystyle \operatorname {Proj} R[x_{0},\ldots ,x_{n}]/(f).}$$ For example, the closed subscheme x³ + y³ = z³ of ${\displaystyle \mathbb {P} _{\mathbb {Q} }^{2}}$ is an elliptic curve over the rational numbers.
• The line with two origins (over a field k) is the scheme defined by starting with two copies of the affine line over k, and gluing together the two open subsets A¹ − 0 by the identity map. This is a simple example of a non-separated scheme. In particular, it is not affine.^[14]
• A simple reason to go beyond affine schemes is that an open subset of an affine scheme need not be affine. For example, let ${\displaystyle X=\mathbb {A} ^{n}\smallsetminus \{0\}}$, say over the complex numbers ${\displaystyle \mathbb {C} }$; then X is not affine for n ≥ 2. (However, the affine line minus the origin is isomorphic to the affine scheme ${\displaystyle \mathrm {Spec} \,\mathbb {C} [x,x^{-1}]}$. To show X is not affine, one computes that every regular function on X extends to a regular function on ${\displaystyle \mathbb {A} ^{n}}$ when n ≥ 2: this is analogous to
  Hartogs's lemma
  in complex analysis, though easier to prove. That is, the inclusion ${\displaystyle f:X\to \mathbb {A} ^{n}}$ induces an isomorphism from ${\displaystyle O(\mathbb {A} ^{n})=\mathbb {C} [x_{1},\ldots ,x_{n}]}$ to ${\displaystyle O(X)}$. If X were affine, it would follow that f is an isomorphism, but f is not surjective and hence not an isomorphism. Therefore, the scheme X is not affine.^[15]
• Let k be a field. Then the scheme ${\textstyle \operatorname {Spec} \left(\prod _{n=1}^{\infty }k\right)}$ is an affine scheme whose underlying topological space is the Stone–Čech compactification of the positive integers (with the discrete topology). In fact, the prime ideals of this ring are in one-to-one correspondence with the ultrafilters on the positive integers, with the ideal ${\textstyle \prod _{m\neq n}k}$ corresponding to the principal ultrafilter associated to the positive integer n.
  quasi-compact, this is an example of a non-Noetherian quasi-compact scheme with infinitely many irreducible components. (By contrast, a Noetherian scheme
  has only finitely many irreducible components.)

Examples of morphisms

This section needs expansion. You can help by adding to it. (March 2024)

It is also fruitful to consider examples of morphisms as examples of schemes since they demonstrate their technical effectiveness for encapsulating many objects of study in algebraic and arithmetic geometry.

Motivation for schemes

Here are some of the ways in which schemes go beyond older notions of algebraic varieties, and their significance.

• Field extensions. Given some polynomial equations in n variables over a field k, one can study the set X(k) of solutions of the equations in the product set kⁿ. If the field k is algebraically closed (for example the complex numbers), then one can base algebraic geometry on sets such as X(k): define the Zariski topology on X(k), consider polynomial mappings between different sets of this type, and so on. But if k is not algebraically closed, then the set X(k) is not rich enough. Indeed, one can study the solutions X(E) of the given equations in any field extension E of k, but these sets are not determined by X(k) in any reasonable sense. For example, the plane curve X over the real numbers defined by x² + y² = −1 has X(R) empty, but X(C) not empty. (In fact, X(C) can be identified with C − 0.) By contrast, a scheme X over a field k has enough information to determine the set X(E) of E-rational points for every extension field E of k. (In particular, the closed subscheme of A²
  _R defined by x² + y² = −1 is a nonempty topological space.)
• Generic point. The points of the affine line A¹
  _C, as a scheme, are its complex points (one for each complex number) together with one generic point (whose closure is the whole scheme). The generic point is the image of a natural morphism Spec(C(x)) → A¹
  _C, where C(x) is the field of rational functions in one variable. To see why it is useful to have an actual "generic point" in the scheme, consider the following example.
• Let X be the plane curve y² = x(x−1)(x−5) over the complex numbers. This is a closed subscheme of A²
  _C. It can be viewed as a
  ramified
  double cover of the affine line A¹
  _C by projecting to the x-coordinate. The fiber of the morphism X → A¹ over the generic point of A¹ is exactly the generic point of X, yielding the morphism $${\displaystyle \operatorname {Spec} \mathbf {C} (x)\left({\sqrt {x(x-1)(x-5)}}\right)\to \operatorname {Spec} \mathbf {C} (x).}$$ This in turn is equivalent to the degree-2 extension of fields $${\displaystyle \mathbf {C} (x)\subset \mathbf {C} (x)\left({\sqrt {x(x-1)(x-5)}}\right).}$$ Thus, having an actual generic point of a variety yields a geometric relation between a degree-2 morphism of algebraic varieties and the corresponding degree-2 extension of function fields. This generalizes to a relation between the fundamental group (which classifies covering spaces in topology) and the Galois group (which classifies certain field extensions). Indeed, Grothendieck's theory of the étale fundamental group treats the fundamental group and the Galois group on the same footing.

• Nilpotent elements. Let X be the closed subscheme of the affine line A¹
  _C defined by x² = 0, sometimes called a fat point. The ring of regular functions on X is C[x]/(x²); in particular, the regular function x on X is
  reduced schemes brings the ideas of calculus and infinitesimals
  into algebraic geometry.
• Nilpotent elements arise naturally in intersection theory. For example in the plane ${\displaystyle \mathbb {A} _{k}^{2}}$ over a field ${\displaystyle k}$, with coordinate ring ${\displaystyle k[x,y]}$, consider the x-axis, which is the variety ${\displaystyle V(y)}$, and the parabola ${\displaystyle y=x^{2}}$, which is ${\displaystyle V(x^{2}-y)}$. Their scheme-theoretic intersection is defined by the ideal ${\displaystyle (y)+(x^{2}-y)=(x^{2},\,y)}$. Since the intersection is not transverse, this is not merely the point ${\displaystyle (x,y)=(0,0)}$ defined by the ideal ${\displaystyle (x,y)\subset k[x,y]}$, but rather a fat point containing the x-axis tangent direction (the common tangent of the two curves) and having coordinate ring:$${\displaystyle {\frac {k[x,y]}{(x^{2},\,y)}}\cong {\frac {k[x]}{(x^{2})}}.}$$The intersection multiplicity of 2 is defined as the length of this ${\displaystyle k[x,y]}$-module, i.e. its dimension as a ${\displaystyle k}$-vector space.
• For a more elaborate example, one can describe all the zero-dimensional closed subschemes of degree 2 in a smooth complex variety Y. Such a subscheme consists of either two distinct complex points of Y, or else a subscheme isomorphic to X = Spec C[x]/(x²) as in the previous paragraph. Subschemes of the latter type are determined by a complex point y of Y together with a line in the tangent space T_yY.^[17] This again indicates that non-reduced subschemes have geometric meaning, related to derivatives and tangent vectors.

A central part of scheme theory is the notion of

on each affine open subset of X.

Coherent sheaves include the important class of vector bundles, which are the sheaves that locally come from finitely generated

Generalizations

Considered as its functor of points, a scheme is a functor that is a sheaf of sets for the Zariski topology on the category of commutative rings, and that, locally in the Zariski topology, is an affine scheme. This can be generalized in several ways. One is to use the étale topology. Michael Artin defined an algebraic space as a functor that is a sheaf in the étale topology and that, locally in the étale topology, is an affine scheme. Equivalently, an algebraic space is the quotient of a scheme by an étale equivalence relation. A powerful result, the Artin representability theorem, gives simple conditions for a functor to be represented by an algebraic space.^[20]

A further generalization is the idea of a

for the action of G. More generally, moduli spaces in algebraic geometry are often best viewed as stacks, thereby keeping track of the automorphism groups of the objects being classified.

Grothendieck originally introduced stacks as a tool for the theory of

that is an algebraic space.

Another type of generalization is to enrich the structure sheaf, bringing algebraic geometry closer to homotopy theory. In this setting, known as derived algebraic geometry or "spectral algebraic geometry", the structure sheaf is replaced by a homotopical analog of a sheaf of commutative rings (for example, a sheaf of E-infinity ring spectra). These sheaves admit algebraic operations that are associative and commutative only up to an equivalence relation. Taking the quotient by this equivalence relation yields the structure sheaf of an ordinary scheme. Not taking the quotient, however, leads to a theory that can remember higher information, in the same way that derived functors in homological algebra yield higher information about operations such as tensor product and the Hom functor on modules.

• Flat morphism, Smooth morphism, Proper morphism, Finite morphism, Étale morphism
• Stable curve
• Birational geometry
• Étale cohomology, Chow group, Hodge theory
• Group scheme, Abelian variety, Linear algebraic group, Reductive group
• Moduli of algebraic curves
• Gluing schemes

External links

• David Mumford, Can one explain schemes to biologists?
• The Stacks Project Authors, The Stacks Project
• https://quomodocumque.wordpress.com/2012/09/03/mochizuki-on-abc/ – the comment section contains some interesting discussion on scheme theory (including posts from Terence Tao).