Noetherian module: Difference between revisions

Latest revision as of 12:00, 26 September 2024

Fix a ring R and let M be a module. The following conditions are equivalent:

The module M satisfies an ascending chain condition on the set of its submodules: that is, there is no infinite strictly ascending chain of submodules $M_{0}\subsetneq M_{1}\subsetneq M_{2}\subsetneq \ldots$ .
Every submodule of M is finitely generated.
Every nonempty set of submodules of M has a maximal element when considered as a partially ordered set with respect to inclusion.

When the above conditions are satisfied, M is said to be Noetherian.

A zero module is Noetherian, since its only submodule is itself.
A Noetherian ring (satisfying ACC for ideals) is a Noetherian module over itself, since the submodules are precisely the ideals.
A free module of finite rank over a Noetherian ring is a Noetherian module.
- A finite-dimensional vector space over a field is a Northerian module.

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	==References==		==References==
	* {{cite book \| author=Serge Lang \| authorlink=Serge Lang \| title=Algebra \| edition=3rd ed \| publisher=[[Addison-Wesley]] \| year=1993 \| isbn=0-201-55540-9 }}		* {{cite book \| author=Serge Lang \| authorlink=Serge Lang \| title=Algebra \| edition=3rd ed \| publisher=[[Addison-Wesley]] \| year=1993 \| isbn=0-201-55540-9 }}[[Category:Suggestion Bot Tag]]