The spectrum of a ring is the set of proper prime ideals,
 | (1) |
The classical example is the spectrum of polynomial rings. For instance,
![Spec(C[x])={<x-a>:a in C} union {<0>},](https://mathworld.wolfram.com/images/equations/RingSpectrum/NumberedEquation2.svg) | (2) |
and
![Spec(C[x,y])={<x-a,y-b>,(a,b) in C^2} union {<f(x,y)>:f is irreducible} union {<0>}.](https://mathworld.wolfram.com/images/equations/RingSpectrum/NumberedEquation3.svg) | (3) |
The points are, in classical algebraic geometry, algebraic varieties. Note that 
are maximal ideals, hence also prime.
The spectrum of a ring has a topology called the Zariski topology. The closed sets are of the form
 | (4) |
For example,
 | (5) |
Every prime ideal is closed except for 
, whose closure is 
.
