Closed immersion

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In algebraic geometry, a closed immersion of schemes is a morphism of schemes ${\displaystyle f:Z\to X}$ that identifies Z as a closed subset of X such that locally, regular functions on Z can be extended to X.^[1] The latter condition can be formalized by saying that ${\displaystyle f^{\mathrm{\#}}:{𝒪}_X\to f_{\ast }{𝒪}_Z}$ is surjective.^[2]

An example is the inclusion map ${\displaystyle \mathrm{Spec}(R/I)\to \mathrm{Spec}(R)}$ induced by the canonical map ${\displaystyle R\to R/I}$.

The following are equivalent:

1. ${\displaystyle f:Z\to X}$ is a closed immersion.
2. For every open affine ${\displaystyle U=\mathrm{Spec}(R)\subset X}$, there exists an ideal ${\displaystyle I\subset R}$ such that ${\displaystyle f^{-1}(U)=\mathrm{Spec}(R/I)}$ as schemes over U.
3. There exists an open affine covering ${\displaystyle X=\bigcup U_j,U_j=\mathrm{Spec}{R}_j}$ and for each j there exists an ideal ${\displaystyle I_j\subset R_j}$ such that ${\displaystyle f^{-1}(U_j)=\mathrm{Spec}(R_j/I_j)}$ as schemes over ${\displaystyle U_j}$.
4. There is a quasi-coherent sheaf of ideals ${\displaystyle ℐ}$ on X such that ${\displaystyle f_{\ast }{𝒪}_Z\cong {𝒪}_X/ℐ}$ and f is an isomorphism of Z onto the global Spec of ${\displaystyle {𝒪}_X/ℐ}$ over X.

In the case of locally ringed spaces^[3] a morphism ${\displaystyle i:Z\to X}$ is a closed immersion if a similar list of criteria is satisfied

1. The map ${\displaystyle i}$ is a homeomorphism of ${\displaystyle Z}$ onto its image
2. The associated sheaf map ${\displaystyle {𝒪}_X\to i_{*}{𝒪}_Z}$ is surjective with kernel ${\displaystyle ℐ}$
3. The kernel ${\displaystyle ℐ}$ is locally generated by sections as an ${\displaystyle {𝒪}_X}$-module^[4]

The only varying condition is the third. It is instructive to look at a counter-example to get a feel for what the third condition yields by looking at a map which is not a closed immersion,

where

${\displaystyle {𝔾}_m=\text{Spec}(\mathbb{Z}[x,x^{-1}])}$

If we look at the stalk of

at

then there are no sections. This implies for any open subscheme

containing

the sheaf has no sections. This violates the third condition since at least one open subscheme

covering

contains

.

A closed immersion is finite and radicial (universally injective). In particular, a closed immersion is universally closed. A closed immersion is stable under base change and composition. The notion of a closed immersion is local in the sense that f is a closed immersion if and only if for some (equivalently every) open covering ${\displaystyle X=\bigcup U_j}$ the induced map ${\displaystyle f:f^{-1}(U_j)\to U_j}$ is a closed immersion.^[5][6]

If the composition ${\displaystyle Z\to Y\to X}$ is a closed immersion and ${\displaystyle Y\to X}$ is separated, then ${\displaystyle Z\to Y}$ is a closed immersion. If X is a separated S-scheme, then every S-section of X is a closed immersion.^[7]

If ${\displaystyle i:Z\to X}$ is a closed immersion and ${\displaystyle ℐ\subset {𝒪}_X}$ is the quasi-coherent sheaf of ideals cutting out Z, then the direct image ${\displaystyle i_{*}}$ from the category of quasi-coherent sheaves over Z to the category of quasi-coherent sheaves over X is exact, fully faithful with the essential image consisting of ${\displaystyle 𝒢}$ such that ${\displaystyle ℐ𝒢=0}$.^[8]

A flat closed immersion of finite presentation is the open immersion of an open closed subscheme.^[9]

• Segre embedding
• Regular embedding

Template:Reflist

• Template:EGA
• The Stacks Project
• Template:Hartshorne AG