The concept of a Projective space plays a central role in algebraic geometry. This article aims to define the notion in terms of abstract algebraic geometry and to describe some basic uses of projective spaces.
Let k be an algebraically closed field, and V be a finite-dimensional vector space over k. The symmetric algebra of the dual vector space V* is called the polynomial ring on V and denoted by k[''V'']. It is a naturally graded algebra by the degree of polynomials.
The projective Nullstellensatz states that, for any homogeneous ideal I that does not contain all polynomials of a certain degree (referred to as an irrelevant ideal), the common zero locus of all polynomials in I (or Nullstelle) is non-trivial (i.e. the common zero locus contains more than the single element), and, more precisely, the ideal of polynomials that vanish on that locus coincides with the radical of the ideal I.
This last assertion is best summarized by the formula : for any relevant ideal I,
lI(lV(I))=\sqrtI.
In particular, maximal homogeneous relevant ideals of k[''V''] are one-to-one with lines through the origin of V.
Let V be a finite-dimensional vector space over a field k. The scheme over k defined by Proj(k[''V'']) is called projectivization of V. The projective n-space on k is the projectivization of the vector space
| n+1 | |
| A | |
| k |
The definition of the sheaf is done on the base of open sets of principal open sets D(P), where P varies over the set of homogeneous polynomials, by setting the sections
\Gamma(D(P),lOP(V))
to be the ring
(k[V]P)0
The situation is most clear at a non-vanishing linear form φ. The restriction of the structure sheaf to the open set D(φ) is then canonically identified [1] with the affine scheme spec(k[ker φ]). Since the D(φ) form an open cover of X the projective schemes can be thought of as being obtained by the gluing via projectivization of isomorphic affine schemes.
It can be noted that the ring of global sections of this scheme is a field, which implies that the scheme is not affine. Any two open sets intersect non-trivially: ie the scheme is irreducible. When the field k is algebraically closed,
P(V)
The Proj functor in fact gives more than a mere scheme: a sheaf in graded modules over the structure sheaf is defined in the process. The homogeneous components of this graded sheaf are denoted
lO(i)
lO(1)
Since the ring of polynomials is a unique factorization domain, any prime ideal of height 1 is principal, which shows that any Weil divisor is linearly equivalent to some power of a hyperplane divisor. This consideration proves that the Picard group of a projective space is free of rank 1. That is
| n | |
| Pic P | |
| k= |
Z
| n | |
| P | |
| k, |
l{O}(m), m\inZ,
| n | |
| P | |
| k |
Z
The space of local sections on an open set
U\subseteqP(V)
lO(k)
\Gamma(P,lO(m))
The Birkhoff-Grothendieck theorem states that on the projective line, any vector bundle splits in a unique way as a direct sum of the line bundles.
The tautological bundle, which appears for instance as the exceptional divisor of the blowing up of a smooth point is the sheaf
| n | |
| lK(P | |
| k), |
lO(-(n+1))
The negativity of the canonical line bundle makes projective spaces prime examples of Fano varieties, equivalently, their anticanonical line bundle is ample (in fact very ample). Their index (cf. Fano varieties) is given by
Ind(Pn)=n+1
Ind(X)=\dimX+1.
As affine spaces can be embedded in projective spaces, all affine varieties can be embedded in projective spaces too.
Any choice of a finite system of nonsimultaneously vanishing global sections of a globally generated line bundle defines a morphism to a projective space. A line bundle whose base can be embedded in a projective space by such a morphism is called very ample.
The group of symmetries of the projective space
| n | |
| P | |
| k |
PGLn+1(k)
j:X\toPn
A morphism to a projective space
j:X\toPn
j*lO(1)
j*(\Gamma(Pn,lO(1)))\subset\Gamma(X,j*lO(1)).
If the range of the morphism
j*(\Gamma(Pn,lO(1)))
The Veronese embeddings are embeddings
Pn\toPN
See the answer on MathOverflow for an application of the Veronese embedding to the calculation of cohomology groups of smooth projective hypersurfaces (smooth divisors).
As Fano varieties, the projective spaces are ruled varieties. The intersection theory of curves in the projective plane yields the Bézout theorem.