such that the following property holds.
then there exists a unique sheaf homomorphism
such that
holds.
Furthermore, such is unique.
The proof of Lemma 1.28 is divided in steps.
The first step is to know the uniqueness of such sheafification. It is most easily done by using universality arguments. ([1] has a short explanation on this topic.)
Then we divide the sheafification process in two steps.
Then we define
Then is a presheaf that satisfies the locality axiom of a sheaf. There is also a presheaf homomorphism from to . Furthermore, is universal among such.
Then we define
Then we may see that is a sheaf and that there exists a homomorphism from to . Furthermore, is universal among such.
Proofs of the above two lemma are routine work and are left to the reader.
Finish of the proof of Lemma 1.28: We put
ARRAY(0x92743dc)