Noetherian rings A
Noetherian ring, named after
Emmy Noether, is a ring in which every
ideal is
finitely generated; that is, all elements of any ideal can be written as a
linear combinations of a finite set of elements, with coefficients in the ring. Many commonly considered commutative rings are Noetherian, in particular, every
field, the ring of the
integer, and every
polynomial ring in one or several indeterminates over them. The fact that polynomial rings over a field are Noetherian is called
Hilbert's basis theorem. Moreover, many ring constructions preserve the Noetherian property. In particular, if a commutative ring is Noetherian, the same is true for every polynomial ring over it, and for every
quotient ring,
localization, or
completion of the ring. The importance of the Noetherian property lies in its ubiquity and also in the fact that many important theorems of commutative algebra require that the involved rings are Noetherian, This is the case, in particular of
Lasker–Noether theorem, the
Krull intersection theorem, and
Nakayama's lemma. Furthermore, if a ring is Noetherian, then it satisfies the
descending chain condition on
prime ideals, which implies that every Noetherian
local ring has a finite
Krull dimension.
Primary decomposition An ideal
Q of a ring is said to be
primary if
Q is
proper and whenever
xy ∈
Q, either
x ∈
Q or
yn ∈
Q for some positive integer
n. In
Z, the primary ideals are precisely the ideals of the form (
pe) where
p is prime and
e is a positive integer. Thus, a primary decomposition of (
n) corresponds to representing (
n) as the intersection of finitely many primary ideals. The
Lasker–Noether theorem, given here, may be seen as a certain generalization of the fundamental theorem of arithmetic: {{math theorem|name=Lasker-Noether Theorem : I=\bigcap_{i=1}^t Q_i with
Qi primary for all
i and Rad(
Qi) ≠ Rad(
Qj) for
i ≠
j. Furthermore, if: : I=\bigcap_{i=1}^k P_i is decomposition of
I with Rad(
Pi) ≠ Rad(
Pj) for
i ≠
j, and both decompositions of
I are
irredundant (meaning that no proper subset of either {
Q1, ...,
Qt} or {
P1, ...,
Pk} yields an intersection equal to
I),
t =
k and (after possibly renumbering the
Qi) Rad(
Qi) = Rad(
Pi) for all
i.}} For any primary decomposition of
I, the set of all radicals, that is, the set {Rad(
Q1), ..., Rad(
Qt)} remains the same by the Lasker–Noether theorem. In fact, it turns out that (for a Noetherian ring) the set is precisely the
assassinator of the module
R/
I; that is, the set of all
annihilators of
R/
I (viewed as a module over
R) that are prime.
Localization The
localization is a formal way to introduce the "denominators" to a given ring or a module. That is, it introduces a new ring/module out of an existing one so that it consists of
fractions :\frac{m}{s}. where the
denominators
s range in a given subset
S of
R. The archetypal example is the construction of the ring
Q of rational numbers from the ring
Z of integers.
Completion A
completion is any of several related
functors on
rings and
modules that result in complete
topological rings and modules. Completion is similar to
localization, and together they are among the most basic tools in analysing
commutative rings. Complete commutative rings have simpler structure than the general ones and
Hensel's lemma applies to them.
Zariski topology on prime ideals The
Zariski topology defines a
topology on the
spectrum of a ring (the set of prime ideals). In this formulation, the Zariski-closed sets are taken to be the sets :V(I) = \{P \in \operatorname{Spec}\,(A) \mid I \subseteq P\} where
A is a fixed commutative ring and
I is an ideal. This is defined in analogy with the classical Zariski topology, where closed sets in affine space are those defined by polynomial equations . To see the connection with the classical picture, note that for any set
S of polynomials (over an algebraically closed field), it follows from
Hilbert's Nullstellensatz that the points of
V(
S) (in the old sense) are exactly the tuples (
a1, ...,
an) such that the ideal (
x1 -
a1, ...,
xn -
an) contains
S; moreover, these are maximal ideals and by the "weak" Nullstellensatz, an ideal of any affine coordinate ring is maximal if and only if it is of this form. Thus,
V(
S) is "the same as" the maximal ideals containing
S. Grothendieck's innovation in defining Spec was to replace maximal ideals with all prime ideals; in this formulation it is natural to simply generalize this observation to the definition of a closed set in the spectrum of a ring. ==Connections with algebraic geometry==