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Serre twist sheaf


In algebraic geometry, Proj is a construction analogous to the spectrum-of-a-ring construction of affine schemes, which produces objects with the typical properties of projective spaces and projective varieties. It is a fundamental tool in scheme theory.

In this article, all rings will be assumed to be commutative and with identity.

Let be a graded ring, where

is the direct sum decomposition associated with the gradation.

Define the set Proj S to be the set of all homogeneous prime ideals that do not contain the irrelevant ideal

For brevity we will sometimes write X for Proj S.

We may define a topology, called the Zariski topology, on Proj S by defining the closed sets to be those of the form

where a is a homogeneous ideal of S. As in the case of affine schemes it is quickly verified that the V(a) form the closed sets of a topology on X.

Indeed, if are a family of ideals, then we have and if the indexing set I is finite, then .


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