Dedekind domain: Difference between revisions

Revision as of 21:05, 20 January 2008

This article defines a property of integral domains, viz., a property that, given any integral domain, is either true or false for that.
View other properties of integral domains | View all properties of commutative unital rings
VIEW RELATED: Commutative unital ring property implications | Commutative unital ring property non-implications |Commutative unital ring metaproperty satisfactions | Commutative unital ring metaproperty dissatisfactions | Commutative unital ring property satisfactions | Commutative unital ring property dissatisfactions

Definition

Symbol-free definition

An integral domain is termed a Dedekind domain if it satisfies the following equivalent conditions:

It is a Noetherian normal domain of Krull dimension 1
Every nonzero ideal is invertible in the field of fractions and can be expressed uniquely as a product of prime ideals

Relation with other properties

Stronger properties

Weaker properties

Conjunction with other properties

Any unique factorization domain which is also a Dedekind domain, is also a principal ideal domain.

Metaproperties

Module theory

Any finitely generated module $M$ over a Dedekind domain $R$ can be expressed as a direct sum as follows:

$M\cong R/I_{1}\oplus R/I_{2}\oplus \ldots \oplus R/I_{n}$

where $I_{1}\subset I_{2}\subset \ldots \subset I_{n}$ is an ascending chain of ideals, which could reach $R$ .

@@ Line 30: / Line 30: @@
 ==Metaproperties==
+==Module theory==
+Any [[finitely generated module]] <math>M</math> over a Dedekind domain <math>R</math> can be expressed as a direct sum as follows:
+<math>M \cong R/I_1 \oplus R/I_2 \oplus \ldots \oplus R/I_n</math>
+where <math>I_1 \subset I_2 \subset \ldots \subset I_n</math> is an ascending chain of ideals, which could reach <math>R</math>.