In algebraic geometry, the h topology is a Grothendieck topology introduced by Vladimir Voevodsky to study the homology of schemes.[1][2] It combines several good properties possessed by its related "sub"topologies, such as the qfh and cdh topologies. It has subsequently been used by Beilinson to study p-adic Hodge theory, in Bhatt and Scholze's work on projectivity of the affine Grassmanian, Huber and Jörder's study of differential forms, etc.
Definition
editVoevodsky defined the h topology to be the topology associated to finite families of morphisms of finite type such that is a universal topological epimorphism (i.e., a set of points in the target is an open subset if and only if its preimage is open, and any base change also has this property[3][4]). Voevodsky worked with this topology exclusively on categories of schemes of finite type over a Noetherian base scheme S.
Bhatt-Scholze define the h topology on the category of schemes of finite presentation over a qcqs base scheme to be generated by -covers of finite presentation. They show (generalising results of Voevodsky) that the h topology is generated by:
- fppf-coverings, and
- families of the form where
- is a proper morphism of finite presentation,
- is a closed immersion of finite presentation, and
- is an isomorphism over .
Note that is allowed in an abstract blowup, in which case Z is a nilimmersion of finite presentation.
Examples
editThe h-topology is not subcanonical, so representable presheaves are almost never h-sheaves. However, the h-sheafification of representable sheaves are interesting and useful objects; while presheaves of relative cycles are not representable, their associated h-sheaves are representable in the sense that there exists a disjoint union of quasi-projective schemes whose h-sheafifications agree with these h-sheaves of relative cycles.[5]
Any h-sheaf in positive characteristic satisfies where we interpret as the colimit over the Frobenii (if the Frobenius is of finite presentation, and if not, use an analogous colimit consisting of morphisms of finite presentation). In fact, (in positive characteristic) the h-sheafification of the structure sheaf is given by . So the structure sheaf "is an h-sheaf on the category of perfect schemes" (although this sentence doesn't really make sense mathematically since morphisms between perfect schemes are almost never of finite presentation). In characteristic zero similar results hold with perfection replaced by semi-normalisation.
Huber-Jörder study the h-sheafification of the presheaf of Kähler differentials on categories of schemes of finite type over a characteristic zero base field . They show that if X is smooth, then , and for various nice non-smooth X, the sheaf recovers objects such as reflexive differentials and torsion-free differentials. Since the Frobenius is an h-covering, in positive characteristic we get for , but analogous results are true if we replace the h-topology with the cdh-topology.
By the Nullstellensatz, a morphism of finite presentation towards the spectrum of a field admits a section up to finite extension. That is, there exists a finite field extension and a factorisation . Consequently, for any presheaf and field we have where , resp. , denotes the h-sheafification, resp. etale sheafification.
Properties
editAs mentioned above, in positive characteristic, any h-sheaf satisfies . In characteristic zero, we have where is the semi-normalisation (the scheme with the same underlying topological space, but the structure sheaf is replaced with its termwise seminormalisation).
Since the h-topology is finer than the Zariski topology, every scheme admits an h-covering by affine schemes.
Using abstract blowups and Noetherian induction, if is a field admitting resolution of singularities (e.g., a characteristic zero field) then any scheme of finite type over admits an h-covering by smooth -schemes. More generally, in any situation where de Jong's theorem on alterations is valid we can find h-coverings by regular schemes.
Since finite morphisms are h-coverings, algebraic correspondences are finite sums of morphisms.[2]
cdh topology
editThe cdh topology on the category of schemes of finite presentation over a qcqs base scheme is generated by:
- Nisnevich coverings, and
- families of the form where
- is a proper morphism of finite presentation,
- is a closed immersion of finite presentation, and
- is an isomorphism over .
The cd stands for completely decomposed (in the same sense it is used for the Nisnevich topology). As mentioned in the examples section, over a field admitting resolution of singularities, any variety admits a cdh-covering by smooth varieties. This topology is heavily used in the study of Voevodsky motives with integral coefficients (with rational coefficients the h-topology together with de Jong alterations is used).
Since the Frobenius is not a cdh-covering, the cdh-topology is also a useful replacement for the h-topology in the study of differentials in positive characteristic.
Rather confusingly, there are completely decomposed h-coverings, which are not cdh-coverings, for example the completely decomposed family of flat morphisms .
Relation to v-topology and arc-topology
editThe v-topology (or universally subtrusive topology) is equivalent to the h-topology on the category of schemes of finite type over a Noetherian base scheme S. Indeed, a morphism in is universally subtrusive if and only if it is universally submersive Rydh (2010, Cor.2.10). In other words,
More generally, on the category of all qcqs schemes, neither of the v- nor the h- topologies are finer than the other: and . There are v-covers which are not h-covers (e.g., ) and h-covers which are not v-covers (e.g., where R is a valuation ring of rank 2 and is the non-open, non-closed prime Rydh (2010, Example 4.3)).
However, we could define an h-analogue of the fpqc topology by saying that an hqc-covering is a family such that for each affine open there exists a finite set K, a map and affine opens such that is universally submersive (with no finiteness conditions). Then every v-covering is an hqc-covering.
Indeed, any subtrusive morphism is submersive (this is an easy exercise using Rydh (2010, Cor.1.5 and Def.2.2)).
By a theorem of Rydh, for a map of qcqs schemes with Noetherian, is a v-cover if and only if it is an arc-cover (for the statement in this form see Bhatt & Mathew (2018, Prop.2.6)). That is, in the Noetherian setting everything said above for the v-topology is valid for the arc-topology.
Notes
edit- ^ Voevodsky, V. (1996), "Homology of schemes", Selecta Mathematica, New Series, 2 (1): 111–153, doi:10.1007/BF01587941, MR 1403354
- ^ a b Suslin, Andrei; Voevodsky, Vladimir (1996), "Singular homology of abstract algebraic varieties", Inventiones Mathematicae, 123 (1): 61–94, doi:10.1007/BF01232367, MR 1376246
- ^ SGA I, Exposé IX, définition 2.1
- ^ Suslin and Voevodsky, 4.1
- ^ Suslin, Andrei; Voevodsky, Vladimir (2000), "Relative cycles and Chow sheaves", Cycles, transfers, and motivic homology theories, Annals of Mathematics Studies, vol. 143, Princeton University Press, pp. 10–86, ISBN 0-691-04814-2, MR 1764199
Further reading
edit- Bhatt, Bhargav; Mathew, Akhil (2018), The arc-topology, arXiv:1807.04725v2
- Rydh, David (2010), "Submersions and effective descent of étale morphisms", Bull. Soc. Math. France, 138 (2): 181–230, arXiv:0710.2488, doi:10.24033/bsmf.2588, MR 2679038, S2CID 17484591