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In mathematics, a sheaf of O-modules or simply an O-module over a ringed space (X, O) is a sheaf F such that, for any open subset U of X, F(U) is an O(U)-module and the restriction maps F(U) → F(V) are compatible with the restriction maps O(U) → O(V): the restriction of fs is the restriction of f times the restriction of s for any f in O(U) and s in F(U).
The standard case is when X is a scheme and O its structure sheaf. If O is the constant sheaf , then a sheaf of O-modules is the same as a sheaf of abelian groups (i.e., an abelian sheaf).
If X is the prime spectrum of a ring R, then any R-module defines an OX-module (called an associated sheaf) in a natural way. Similarly, if R is a graded ring and X is the Proj of R, then any graded module defines an OX-module in a natural way. O-modules arising in such a fashion are examples of quasi-coherent sheaves, and in fact, on affine or projective schemes, all quasi-coherent sheaves are obtained this way.
Sheaves of modules over a ringed space form an abelian category. Moreover, this category has enough injectives, and consequently one can and does define the sheaf cohomology as the i-th right derived functor of the global section functor .
Examples
- Given a ringed space (X, O), if F is an O-submodule of O, then it is called the sheaf of ideals or ideal sheaf of O, since for each open subset U of X, F(U) is an ideal of the ring O(U).
- Let X be a smooth variety of dimension n. Then the tangent sheaf of X is the dual of the cotangent sheaf and the canonical sheaf is the n-th exterior power (determinant) of .
- A sheaf of algebras is a sheaf of module that is also a sheaf of rings.
Operations
Let (X, O) be a ringed space. If F and G are O-modules, then their tensor product, denoted by
- or ,
is the O-module that is the sheaf associated to the presheaf (To see that sheafification cannot be avoided, compute the global sections of where O(1) is Serre's twisting sheaf on a projective space.)
Similarly, if F and G are O-modules, then
denotes the O-module that is the sheaf . In particular, the O-module
is called the dual module of F and is denoted by . Note: for any O-modules E, F, there is a canonical homomorphism
- ,
which is an isomorphism if E is a locally free sheaf of finite rank. In particular, if L is locally free of rank one (such L is called an invertible sheaf or a line bundle), then this reads:
implying the isomorphism classes of invertible sheaves form a group. This group is called the Picard group of X and is canonically identified with the first cohomology group (by the standard argument with Čech cohomology).
If E is a locally free sheaf of finite rank, then there is an O-linear map given by the pairing; it is called the trace map of E.
For any O-module F, the tensor algebra, exterior algebra and symmetric algebra of F are defined in the same way. For example, the k-th exterior power
is the sheaf associated to the presheaf . If F is locally free of rank n, then is called the determinant line bundle (though technically invertible sheaf) of F, denoted by det(F). There is a natural perfect pairing:
Let f: (X, O) →(X', O') be a morphism of ringed spaces. If F is an O-module, then the direct image sheaf is an O'-module through the natural map O' →f*O (such a natural map is part of the data of a morphism of ringed spaces.)
If G is an O'-module, then the module inverse image of G is the O-module given as the tensor product of modules:
where is the inverse image sheaf of G and is obtained from by adjuction.
There is an adjoint relation between and : for any O-module F and O'-module G,
as abelian group. There is also the projection formula: for an O-module F and a locally free O'-module E of finite rank,
Properties
Let (X, O) be a ringed space. An O-module F is said to be generated by global sections if there is a surjection of O-modules:
Explicitly, this means that there are global sections si of F such that the images of si in each stalk Fx generates Fx as Ox-module.
An example of such a sheaf is that associated in algebraic geometry to an R-module M, R being any commutative ring, on the spectrum of a ring Spec(R). Another example: according to Cartan's theorem A, any coherent sheaf on a Stein manifold is spanned by global sections. (cf. Serre's theorem A below.) In the theory of schemes, a related notion is ample line bundle. (For example, if L is an ample line bundle, some power of it is generated by global sections.)
An injective O-module is flasque (i.e., all restrictions maps F(U) → F(V) are surjective.) Since a flasque sheaf is acyclic in the category of abelian sheaves, this implies that the i-th right derived functor of the global section functor in the category of O-modules coincides with the usual i-th sheaf cohomology in the category of abelian sheaves.
Sheaf associated to a module
Let be a module over a ring . Put and write . For each pair , by the universal property of localization, there is a natural map
having the property that . Then
is a contravariant functor from the category whose objects are the sets D(f) and morphisms the inclusions of sets to the category of abelian groups. One can show it is in fact a B-sheaf (i.e., it satisfies the gluing axiom) and thus defines the sheaf on X called the sheaf associated to M.
The most basic example is the structure sheaf on X; i.e., . Moreover, has the structure of -module and thus one gets the exact functor from ModA, the category of modules over A to the category of modules over . It defines an equivalence from ModA to the category of quasi-coherent sheaves on X, with the inverse , the global section functor. When X is Noetherian, the functor is an equivalence from the category of finitely generated A-modules to the category of coherent sheaves on X.
The construction has the following properties: for any A-modules M, N, and any morphism ,
- .
- For any prime ideal p of A, as Op = Ap-module.
- .
- If M is finitely presented, .
- , since the equivalence between ModA and the category of quasi-coherent sheaves on X.
- ; in particular, taking a direct sum and ~ commute.
- A sequence of A-modules is exact if and only if the induced sequence by is exact. In particular, .
Sheaf associated to a graded module
There is a graded analog of the construction and equivalence in the preceding section. Let R be a graded ring generated by degree-one elements as R0-algebra (R0 means the degree-zero piece) and M a graded R-module. Let X be the Proj of R (so X is a projective scheme if R is Noetherian). Then there is an O-module such that for any homogeneous element f of positive degree of R, there is a natural isomorphism
as sheaves of modules on the affine scheme ; in fact, this defines by gluing.
Example: Let R(1) be the graded R-module given by R(1)n = Rn+1. Then is called Serre's twisting sheaf, which is the dual of the tautological line bundle if R is finitely generated in degree-one.
If F is an O-module on X, then, writing , there is a canonical homomorphism:
which is an isomorphism if and only if F is quasi-coherent.
Computing sheaf cohomology
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Sheaf cohomology has a reputation for being difficult to calculate. Because of this, the next general fact is fundamental for any practical computation:
Theorem — Let X be a topological space, F an abelian sheaf on it and an open cover of X such that for any i, p and 's in . Then for any i,
where the right-hand side is the i-th Čech cohomology.
Serre's vanishing theorem states that if X is a projective variety and F a coherent sheaf on it, then, for sufficiently large n, the Serre twist F(n) is generated by finitely many global sections. Moreover,
- For each i, H(X, F) is finitely generated over R0, and
- There is an integer n0, depending on F, such that
Sheaf extension
Let (X, O) be a ringed space, and let F, H be sheaves of O-modules on X. An extension of H by F is a short exact sequence of O-modules
As with group extensions, if we fix F and H, then all equivalence classes of extensions of H by F form an abelian group (cf. Baer sum), which is isomorphic to the Ext group , where the identity element in corresponds to the trivial extension.
In the case where H is O, we have: for any i ≥ 0,
since both the sides are the right derived functors of the same functor
Note: Some authors, notably Hartshorne, drop the subscript O.
Assume X is a projective scheme over a Noetherian ring. Let F, G be coherent sheaves on X and i an integer. Then there exists n0 such that
- .
Locally free resolutions
can be readily computed for any coherent sheaf using a locally free resolution: given a complex
then
hence
Examples
Hypersurface
Consider a smooth hypersurface of degree . Then, we can compute a resolution
and find that
Union of smooth complete intersections
Consider the scheme
where is a smooth complete intersection and , . We have a complex
resolving which we can use to compute .
See also
- D-module (in place of O, one can also consider D, the sheaf of differential operators.)
- fractional ideal
- holomorphic vector bundle
- generic freeness
Notes
- Vakil, Math 216: Foundations of algebraic geometry, 2.5.
- Hartshorne, Ch. III, Proposition 2.2.
- This cohomology functor coincides with the right derived functor of the global section functor in the category of abelian sheaves; cf. Hartshorne, Ch. III, Proposition 2.6.
- There is a canonical homomorphism:
- For coherent sheaves, having a tensor inverse is the same as being locally free of rank one; in fact, there is the following fact: if and if F is coherent, then F, G are locally free of rank one. (cf. EGA, Ch 0, 5.4.3.)
- Hartshorne, Ch III, Lemma 2.4.
- see also: https://math.stackexchange.com/q/447234
- Hartshorne, Ch. II, Proposition 5.1.
- EGA I, Ch. I, Proposition 1.3.6. harvnb error: no target: CITEREFEGA_I (help)
- ^ EGA I, Ch. I, Corollaire 1.3.12. harvnb error: no target: CITEREFEGA_I (help)
- EGA I, Ch. I, Corollaire 1.3.9. harvnb error: no target: CITEREFEGA_I (help)
- Hartshorne, Ch. II, Proposition 5.11.
- "Section 30.2 (01X8): Čech cohomology of quasi-coherent sheaves—The Stacks project". stacks.math.columbia.edu. Retrieved 2023-12-07.
- Costa, Miró-Roig & Pons-Llopis 2021, Theorem 1.3.1
- "Links with sheaf cohomology". Local Cohomology. Cambridge Studies in Advanced Mathematics. Cambridge University Press. 2012. pp. 438–479. doi:10.1017/CBO9781139044059.023. ISBN 9780521513630.
- Serre 1955, §.66 Faisceaux algébriques cohérents sur les variétés projectives.
- Hartshorne, Ch. III, Proposition 6.9.
- Hartshorne, Robin. Algebraic Geometry. pp. 233–235.
References
- Grothendieck, Alexandre; Dieudonné, Jean (1960). "Éléments de géométrie algébrique: I. Le langage des schémas". Publications Mathématiques de l'IHÉS. 4. doi:10.1007/bf02684778. MR 0217083.
- Hartshorne, Robin (1977), Algebraic Geometry, Graduate Texts in Mathematics, vol. 52, New York: Springer-Verlag, ISBN 978-0-387-90244-9, MR 0463157
- Costa, Laura; Miró-Roig, Rosa María; Pons-Llopis, Joan (2021). Ulrich Bundles. doi:10.1515/9783110647686. ISBN 9783110647686.
- "Links with sheaf cohomology". Local Cohomology. Cambridge Studies in Advanced Mathematics. Cambridge University Press. 2012. pp. 438–479. doi:10.1017/CBO9781139044059.023. ISBN 9780521513630.
- Serre, Jean-Pierre (1955), "Faisceaux algébriques cohérents (§.66 Faisceaux algébriques cohérents sur les variétés projectives.)" (PDF), Annals of Mathematics, 61 (2): 197–278, doi:10.2307/1969915, JSTOR 1969915, MR 0068874