Gluing schemes

In algebraic geometry, a new scheme (e.g. an algebraic variety) can be obtained by gluing existing schemes through gluing maps.

Statement edit

Suppose there is a (possibly infinite) family of schemes $\{X_{i}\}_{i\in I}$ and for pairs $i,j$ , there are open subsets $U_{ij}$ and isomorphisms $\varphi _{ij}:U_{ij}{\overset {\sim }{\to }}U_{ji}$ . Now, if the isomorphisms are compatible in the sense: for each $i,j,k$ ,

$\varphi _{ij}=\varphi _{ji}^{-1}$ ,
$\varphi _{ij}(U_{ij}\cap U_{ik})=U_{ji}\cap U_{jk}$ ,
$\varphi _{jk}\circ \varphi _{ij}=\varphi _{ik}$ on $U_{ij}\cap U_{ik}$ ,

then there exists a scheme X, together with the morphisms $\psi _{i}:X_{i}\to X$ such that^[1]

$\psi _{i}$ is an isomorphism onto an open subset of X,
$X=\cup _{i}\psi _{i}(X_{i}),$
$\psi _{i}(U_{ij})=\psi _{i}(X_{i})\cap \psi _{j}(X_{j}),$
$\psi _{i}=\psi _{j}\circ \varphi _{ij}$ on $U_{ij}$ .

Examples edit

Projective line edit

The projective line is obtained by gluing two affine lines so that the origin and illusionary

\infty

on one line corresponds to illusionary

\infty

and the origin on the other line, respectively.

Let $X=\operatorname {Spec} (k[t])\simeq \mathbb {A} ^{1},Y=\operatorname {Spec} (k[u])\simeq \mathbb {A} ^{1}$ be two copies of the affine line over a field k. Let $X_{t}=\{t\neq 0\}=\operatorname {Spec} (k[t,t^{-1}])$ be the complement of the origin and $Y_{u}=\{u\neq 0\}$ defined similarly. Let Z denote the scheme obtained by gluing $X,Y$ along the isomorphism $X_{t}\simeq Y_{u}$ given by $t^{-1}\leftrightarrow u$ ; we identify $X,Y$ with the open subsets of Z.^[2] Now, the affine rings $\Gamma (X,{\mathcal {O}}_{Z}),\Gamma (Y,{\mathcal {O}}_{Z})$ are both polynomial rings in one variable in such a way

\Gamma (X,{\mathcal {O}}_{Z})=k[s]

and

\Gamma (Y,{\mathcal {O}}_{Z})=k[s^{-1}]

where the two rings are viewed as subrings of the function field $k(Z)=k(s)$ . But this means that $Z=\mathbb {P} ^{1}$ ; because, by definition, $\mathbb {P} ^{1}$ is covered by the two open affine charts whose affine rings are of the above form.

Affine line with doubled origin edit

Let $X,Y,X_{t},Y_{u}$ be as in the above example. But this time let $Z$ denote the scheme obtained by gluing $X,Y$ along the isomorphism $X_{t}\simeq Y_{u}$ given by $t\leftrightarrow u$ .^[3] So, geometrically, $Z$ is obtained by identifying two parallel lines except the origin; i.e., it is an affine line with the doubled origin. (It can be shown that Z is not a separated scheme.) In contrast, if two lines are glued so that origin on the one line corresponds to the (illusionary) point at infinity for the other line; i.e, use the isomrophism $t^{-1}\leftrightarrow u$ , then the resulting scheme is, at least visually, the projective line $\mathbb {P} ^{1}$ .

Fiber products and pushouts of schemes edit

The category of schemes admits finite pullbacks and in some cases finite pushouts;^[4] they both are constructed by gluing affine schemes. For affine schemes, fiber products and pushouts correspond to tensor products and fiber squares of algebras.

References edit

^ Hartshorne 1977, Ch. II, Exercise 2.12.
^ Vakil 2017, § 4.4.6.
^ Vakil 2017, § 4.4.5.
^ "Section 37.14 (07RS): Pushouts in the category of schemes, I—The Stacks project".

Hartshorne, Robin (1977), Algebraic Geometry, Graduate Texts in Mathematics, vol. 52, New York: Springer-Verlag, ISBN 978-0-387-90244-9, MR 0463157
Vakil, Ravi (November 18, 2017). "Math 216: Foundations of algebraic geometry".