Projectivization

In mathematics, projectivization is a procedure which associates with a non-zero vector space V a projective space , whose elements are one-dimensional subspaces of V. More generally, any subset S of V closed under scalar multiplication defines a subset of formed by the lines contained in S and is called the projectivization of S.

Properties

is a linear map with trivial kernel then f defines an algebraic map of the corresponding projective spaces,
In particular, the general linear group GL(V) acts on the projective space by automorphisms.

Projective completion

A related procedure embeds a vector space V over a field K into the projective space of the same dimension. To every vector v of V, it associates the line spanned by the vector (v, 1) of V K.

Generalization

Main article: Proj construction

In algebraic geometry, there is a procedure that associates a projective variety Proj S with a graded commutative algebra S (under some technical restrictions on S). If S is the algebra of polynomials on a vector space V then Proj S is This Proj construction gives rise to a contravariant functor from the category of graded commutative rings and surjective graded maps to the category of projective schemes.

This article is issued from Wikipedia - version of the 3/31/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.