Exceptional inverse image functor

In mathematics, more specifically sheaf theory, a branch of topology and algebraic geometry, the exceptional inverse image functor is the fourth and most sophisticated in a series of image functors for sheaves. It is needed to express Verdier duality in its most general form.

Definition

[edit]

Let f: XY be a continuous map of topological spaces or a morphism of schemes. Then the exceptional inverse image is a functor

Rf!: D(Y) → D(X)

where D(–) denotes the derived category of sheaves of abelian groups or modules over a fixed ring.

It is defined to be the right adjoint of the total derived functor Rf! of the direct image with compact support. Its existence follows from certain properties of Rf! and general theorems about existence of adjoint functors, as does the unicity.

The notation Rf! is an abuse of notation insofar as there is in general no functor f! whose derived functor would be Rf!.

Examples and properties

[edit]
f!(F) := f G,
where G is the subsheaf of F of which the sections on some open subset U of Y are the sections sF(U) whose support is contained in X. The functor f! is left exact, and the above Rf!, whose existence is guaranteed by abstract nonsense, is indeed the derived functor of this f!. Moreover f! is right adjoint to f!, too.

Duality of the exceptional inverse image functor

[edit]

Let be a smooth manifold of dimension and let be the unique map which maps everything to one point. For a ring , one finds that is the shifted -orientation sheaf.

On the other hand, let be a smooth -variety of dimension . If denotes the structure morphism then is the shifted canonical sheaf on .

Moreover, let be a smooth -variety of dimension and a prime invertible in . Then where denotes the Tate twist.

Recalling the definition of the compactly supported cohomology as lower-shriek pushforward and noting that below the last means the constant sheaf on and the rest mean that on , , and

the above computation furnishes the -adic Poincaré duality

from the repeated application of the adjunction condition.

References

[edit]
  • Iversen, Birger (1986), Cohomology of sheaves, Universitext, Berlin, New York: Springer-Verlag, ISBN 978-3-540-16389-3, MR 0842190 treats the topological setting
  • Artin, Michael (1972). Alexandre Grothendieck; Jean-Louis Verdier (eds.). Séminaire de Géométrie Algébrique du Bois Marie - 1963-64 - Théorie des topos et cohomologie étale des schémas - (SGA 4) - vol. 3. Lecture notes in mathematics (in French). Vol. 305. Berlin; New York: Springer-Verlag. pp. vi+640. doi:10.1007/BFb0070714. ISBN 978-3-540-06118-2. treats the case of étale sheaves on schemes. See Exposé XVIII, section 3.
  • Gallauer, Martin, An Introduction to Six Functor Formalisms (PDF), pp.10-11 gives the duality statements.