jaj•a•person's notes

Dedekind domain
Results

Ring theory MOC

Dedekind domain

A Dedekind domain is an integral domain such that ring

is Noetherian;
is integrally closed;
has Krull dimension , i.e. every nontrivial prime ideal is maximal, and there exists a nontrivial prime ideal.

Results

A Dedekind domain admits UFI, moreover it is a UFD iff it is a PID.
Fractional ideals of a Dedekind domain form an abelian group
Ring of integers of a number field form a Dedekind domain and lattice.
Ideals of a Dedekind domain need at most two generators
A Dedekind domain with finitely many prime ideals is a UFD
A Dedekind domain is a UFD iff its ideal class group is trivial

develop | en | sembr

Graph View

Backlinks

A Dedekind domain admits UFI
A Dedekind domain is a CDR
A Dedekind domain is a UFD iff its ideal class group is trivial
A Dedekind domain with finitely many prime ideals is a UFD
Ideal class group
Ideals of a Dedekind domain need at most two generators
Integrally closed domain
Prime ideals are invertible in a Dedekind domain
Product ideal
Ring of integers of a number field

Created with Quartz v4.5.2 © 2026