Noetherian module

This article defines a property of a module over a commutative unital ring

A commutative unital ring which satisfies this property as a module over itself, is termed a/an: Noetherian ring

Definition

Symbol-free definition

A module over a commutative unital ring is termed Noetherian if every submodule of it is finitely generated.

Facts

• A ring is Noetherian as a module over itself if and only if it is a Noetherian ring. This is because ideals of a ring are precisely its submodules.
• Every finitely generated module over a Noetherian ring is a Noetherian module.