Direct image with compact support

In mathematics, in the theory of sheaves the direct image with compact (or proper) support is an image functor for sheaves.

Image functors for sheaves
direct image ${\displaystyle f_{*}}$
inverse image ${\displaystyle f^{*}}$
direct image with compact support ${\displaystyle f_{!}}$
exceptional inverse image ${\displaystyle Rf^{!}}$
${\displaystyle f^{*}\leftrightarrows f_{*}}$
${\displaystyle (R)f_{!}\leftrightarrows (R)f^{!}}$
Base change theorems
v t e

Let f: X → Y be a continuous mapping of topological spaces, and Sh(–) the category of sheaves of abelian groups on a topological space. The direct image with compact (or proper) support

f_!: Sh(X) → Sh(Y)

sends a sheaf F on X to f_!(F) defined by

f_!(F)(U) := {s ∈ F(f ⁻¹(U)) : f_|supp(s):supp(s)→U is proper},

where U is an open subset of Y. The functoriality of this construction follows from the very basic properties of the support and the definition of sheaves.

If f is proper, then f_! equals f_∗. In general, f_!(F) is only a subsheaf of f_∗(F)

• Iversen, Birger (1986), Cohomology of sheaves, Universitext, Berlin, New York: Springer-Verlag, ISBN 978-3-540-16389-3, MR 0842190, esp. section VII.1