Sheaf spanned by global sections

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In mathematics, a sheaf spanned by global sections is a sheaf F on a locally ringed space X, with structure sheaf OX that is of a rather simple type. Assume F is a sheaf of abelian groups. Then it is asserted that if A is the abelian group of global sections, i.e.

A = Γ(F,X)

then for any open set U of X, ρ(A) spans F(U) as an OU-module. Here

ρ = ρX,U

is the restriction map. In words, all sections of F are locally generated by the global sections.

An example of such a sheaf is that associated in algebraic geometry to an R-module M, R being any commutative ring, on the spectrum of a ring Spec(R).

See also: Cartan's theorem A.