Affine scheme

From Citizendium
Revision as of 17:04, 12 December 2007 by imported>Giovanni Antonio DiMatteo (→‎The Structural Sheaf)
Jump to navigation Jump to search

Definition

For a commutative ring , the set (called the prime spectrum of ) denotes the set of prime ideals of $A$. This set is endowed with a topology of closed sets, where closed subsets are defined to be of the form

for any subset . This topology of closed sets is called the Zariski topology on . It is easy to check that , where is the ideal of generated by .

Some Topological Properties

is quasi-compact and , but is rarely Hausdorff.

The Structural Sheaf

has a natural sheaf of rings, denoted , called the structural sheaf of X. The important properties of this sheaf are that

  1. The stalk is isomorphic to the local ring , where is the prime ideal corresponding to .
  2. For all , , where is the localization of by the multiplicative set . In particular, .

Explicitly, the structural sheaf may be constructed as follows. To each open set , associate the set of functions Failed to parse (syntax error): {\displaystyle O_X(U):=\{s:U\to \amalg_{p\in U\} A_p|s(p)\in A_p, \text{ and }s\text{ is locally constant}\}} ; that is, is locally constant if for every , there is an open neighborhood contained in and elements such that for all , (in particular, is required to not be an element of any ). This description is phrased in a common way of thinking of sheaves, and in fact captures their local nature. One construction of the sheafification functor makes use of such a perspective.

The Category of Affine Schemes

Regarding as a contravariant functor between the category of commutative rings and the category of affine schemes, one can show that it is in fact an anti-equivalence of categories.


Curves