Affine scheme: Difference between revisions

Definition

For a commutative ring ${\displaystyle A}$, the set ${\displaystyle Spec(A)}$ (called the prime spectrum of ${\displaystyle A}$) 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

${\displaystyle V(E)=\{p\in Spec(A)|p\supseteq E\}}$

for any subset ${\displaystyle E\subseteq A}$. This topology of closed sets is called the Zariski topology on ${\displaystyle Spec(A)}$. It is easy to check that ${\displaystyle V(E)=V\left((E)\right)=V({\sqrt {(E)}})}$, where ${\displaystyle (E)}$ is the ideal of ${\displaystyle A}$ generated by ${\displaystyle E}$.

Some Topological Properties

${\displaystyle Spec(A)}$ is quasi-compact and ${\displaystyle T_{0}}$, but is rarely Hausdorff.

The Structural Sheaf

The Category of Affine Schemes

Regarding ${\displaystyle Spec(\cdot )}$ 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