The Noetherian ring reference article from the English Wikipedia on 24-Apr-2004 (provided by Fixed Reference: snapshots of Wikipedia from wikipedia.org)

Noetherian ring

In abstract algebra, a ring is called Noetherian if it satisfies the ascending chain condition on ideals.

Table of contents

1 Introduction 2 Characterizations of Noetherian rings 3 Uses of Noetherian rings 4 Examples 5 Properties

Introduction

Rings of polynomialss over fields have many special properties; properties that follow from the fact that polynomial rings are not, in some sense, "too large". Emmy Noether first discovered that the key property of polynomial rings is the ascending chain condition on ideals. Noetherian rings are named after her.

For noncommutative rings, we must distinguish between three very similar concepts:

• A ring is left Noetherian if it satisfies the ascending chain condition on left ideals.
• A ring is right Noetherian if it satisfies the ascending chain condition on right ideals.
• A ring is Noetherian if it is both left and right Noetherian.

For commutative rings, all three concepts coincide, but in general they are different. There are rings that are left Noetherian and not right Noetherian, and vice versa.

Characterizations of Noetherian rings

There are other, equivalent, definitions for a ring R to be left Noetherian:

• Every ideal I in R is finitely generated, i.e. there exists elements a₁,...,a_n in I such that I = Ra₁ + ... + Ra_n.
• Any non-empty set of left ideals of R has a maximal element with respect to set inclusion.

Similar results holds for right Noetherian rings.

Uses of Noetherian rings

The Noetherian property is central in ring theory and in areas that make heavy use of rings, such as algebraic geometry. The reason behind this is that the Noetherian property is in some sense the ring-theoretic analogue of finiteness. For example, the Noetherian-ness of polynomial rings over a field allows us to prove that any infinite set of polynomial equations can be replaced with a finite set with the same solutions.

As another application, we mention Krull's Principal Ideal Theorem: Every ideal of height one in a commutative Noetherian ring is a principal ideal. This early result was the first to suggest that Noetherian rings possessed a deep theory of dimension.

Examples

• The integers.
• Any field, including fields of rational numbers, real numbers, and complex numbers.
• The ring of polynomials in finitely-many variables over the integers or a field.

Rings that are not Noetherian tend to be (in some sense) very large. Here are two examples of non-Noetherian rings:

• The ring of polynomials in infinitely-many variables, X₁, X₂, X₃, etc. The sequence of ideals (X₁), (X₁,X₂), (X₁,X₂, X₃), etc. is ascending, and does not terminate.
• The ring of continuous functions from the real numbers to the real numbers. Let I_n be the ideal of all continuous functions f such that f(x) = 0 for all x ≤ n. The sequence of ideals I₀, I₁, I₂, etc., is an ascending chain that does not terminate.

Properties

• Every field is Noetherian. (A field only has two ideals - itself and (0).)
• If R is a Noetherian ring, then R[X] is also Noetherian, by the Hilbert basis theorem.
• If R is a Noetherian and I is a two-sided ideal, then the factor ring R/I is also Noetherian.
• Every finitely-generated algebra over a field is Noetherian. (This follows from the two previous properties.)
• Every left Artinian ring is left Noetherian. This is the Hopkins-Levitzki Theorem.

The ring R is left-Noetherian if and only if every finitely generated left R-module is a Noetherian module.

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