Direct image functor mathematics , in the field of sheaf theory and especially in algebraic geometry , the direct image functor section of a sheaf to the relative case.Definition Let f : X → Y be a continuous mapping of topological spaces , and Sh denote the category of sheaves of abelian groups on a topological space . The direct image functor F on X to its direct image presheaf, which is defined on open subsets U of Y byturns out to be a sheaf on Y , also called the pushforward sheaf . morphism of sheaves φ: F → G on X gives rise to a morphism of sheaves f ∗ : f ∗ → f ∗ on Y .Example If Y is a point, then the direct image equals the global sections functor .continuous map of topological spaces or a morphism of schemes . Then the exceptional inverse image is a functor! : D → D.Variants A similar definition applies to sheaves on topoi , such as étale sheaves . Instead of the above preimage f −1 the fiber product of U and X over Y is used.Higher direct imagesexact , but usually not right exact. Hence one can consider the right derived functors of the direct image. They are called higher direct images and denoted Rq f ∗ .F on X , Rq f ∗ is the sheaf associated to the presheaf Properties
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