In algebraic geometry, a presheaf with transfers is, roughly, a presheaf that, like cohomology theory, comes with pushforwards, “transfer” maps. Precisely, it is, by definition, a contravariant additive functor from the category of finite correspondences (defined below) to the category of abelian groups (in category theory, “presheaf” is another term for a contravariant functor).
When a presheaf F with transfers is restricted to the subcategory of smooth separated schemes, it can be viewed as a presheaf on the category with extra maps , not coming from morphisms of schemes but also from finite correspondences from X to Y
A presheaf F with transfers is said to be -homotopy invariant if for every X.
For example, Chow groups as well as motivic cohomology groups form presheaves with transfers.
Let be algebraic schemes (i.e., separated and of finite type over a field) and suppose is smooth. Then an elementary correspondence is an irreducible closed subscheme , some connected component of X, such that the projection is finite and surjective.[1] Let be the free abelian group generated by elementary correspondences from X to Y; elements of are then called finite correspondences.
The category of finite correspondences, denoted by , is the category where the objects are smooth algebraic schemes over a field; where a Hom set is given as:
and where the composition is defined as in intersection theory: given elementary correspondences from to and from to , their composition is:
This category contains the category of smooth algebraic schemes as a subcategory in the following sense: there is a faithful functor that sends an object to itself and a morphism to the graph of .
The basic notion underlying all of the different theories are presheaves with transfers. These are contravariant additive functors
and their associated category is typically denoted , or just if the underlying field is understood. Each of the categories in this section are abelian categories, hence they are suitable for doing homological algebra.
These are defined as presheaves with transfers such that the restriction to any scheme is an etale sheaf. That is, if is an etale cover, and is a presheaf with transfers, it is an Etale sheaf with transfers if the sequence
One of the basic examples of presheaves with transfers are given by representable functors. Given a smooth scheme there is a presheaf with transfers sending .[2]
Another class of elementary examples comes from pointed schemes with . This morphism induces a morphism whose cokernel is denoted . There is a splitting coming from the structure morphism , so there is an induced map , hence .
Given a finite family of pointed schemes there is an associated presheaf with transfers , also denoted [2] from their Smash product. This is defined as the cokernel of
For example, given two pointed schemes , there is the associated presheaf with transfers equal to the cokernel of
A finite wedge of a pointed space is denoted . One example of this construction is , which is used in the definition of the motivic complexes used in Motivic cohomology.
A presheaf with transfers is homotopy invariant if the projection morphism induces an isomorphism for every smooth scheme . There is a construction associating a homotopy invariant sheaf[2] for every presheaf with transfers using an analogue of simplicial homology.
giving a cosimplicial scheme , where the morphisms are given by . That is,
gives the induced morphism . Then, to a presheaf with transfers , there is an associated complex of presheaves with transfers sending
and has the induced chain morphisms
giving a complex of presheaves with transfers. The homology invaritant presheaves with transfers are homotopy invariant. In particular, is the universal homotopy invariant presheaf with transfers associated to .
The zeroth homology of is where homotopy equivalence is given as follows. Two finite correspondences are -homotopy equivalent if there is a morphism such that and .
For Voevodsky's category of mixed motives, the motive associated to , is the class of in . One of the elementary motivic complexes are for , defined by the class of
For an abelian group , such as , there is a motivic complex . These give the motivic cohomology groups defined by
since the motivic complexes restrict to a complex of Zariksi sheaves of .[2] These are called the -th motivic cohomology groups of weight. They can also be extended to any abelian group ,
giving motivic cohomology with coefficients in of weight .