Picard group

In mathematics, the Picard group of a ringed space <math>X<math> is the group of isomorphism classes of invertible sheaves on <math>X<math>, with the group operation being tensor product. This construction is a global version of the construction of the divisor class group, or ideal class group, and is much used in algebraic geometry, and the theory of complex manifolds.

Alternatively, the Picard group can be defined as the sheaf cohomology group

<math>H^1 (X, \mathcal{O}_X^{*})<math>.

For integral schemes the Picard group can be shown to be be isomorphic to the class group of Cartier divisors. For complex manifolds the exponential sheaf sequence gives basic information on the Picard group.

Examples

The Picard group of the spectrum of a Dedekind domain is its ideal class group.

The invertible sheaves on projective space

<math>\mathbb{P}^n_k<math>,

for <math>k<math> a field, are the twisting sheaves

<math>\mathcal{O}(m)<math>,

so the Picard group of <math>\mathbb{P}^n_k<math> is isomorphic to <math>\mathbb{Z}<math>. The Picard group of the affine line with two origins over <math>k<math> is also isomorphic to <math>\mathbb{Z}<math>.

Picard scheme

The construction of a scheme structure on (representable functor version of) the Picard group, the Picard scheme, is an important step in algebraic geometry, in particular in the duality theory of abelian varieties. It was carried out by Alexander Grothendieck at the beginning of the 1960s. See also David Mumford's book Lectures on Curves on an Algebraic Surface. The Picard variety is dual to the Albanese variety of classical algebraic geometry.

In the cases of most importance to classical algebraic geometry, for a complete variety V that is non-singgular, the connected component of the Picard scheme is an abelian variety written

Pic⁰(V)

and the quotient

Pic(V)/Pic⁰(V)

is a finitely-generated abelian group NS(V), the Néron-Severi group of V. The fact that the rank is finite is Francesco Severi's theorem of the base. Geometrically NS(V) describes the algebraic equivalence classes of divisors on V; that is, using a stronger, non-linear equivalence relation in place of linear equivalence of divisors, the classification becomes amenable to discrete invariance. Algebraic equivalence is closely related to numerical equivalence, an essentially topological classification by intersection numbers.

References

Hartshorne, Robin (1977). Algebraic Geometry. Springer-Verlag. ISBN 0–387–90244–9.