V-ring (ring theory): Difference between revisions

Content deleted Content added

Inline

Revision as of 02:04, 3 January 2024

In mathematics, a V-ring is a ring R such that every simple R-module is injective. The following three conditions are equivalent:^[1]

Every simple left (resp. right) R-module is injective
The radical of every left (resp. right) R-module is zero
Every left (resp. right) ideal of R is an intersection of maximal left (resp. right) ideals of R

This algebra-related article is a stub. You can help Wikipedia by expanding it.

@@ Line 3: / Line 3: @@
 #The [[radical of a module|radical]] of every left (resp. right) ''R''-module is zero
 #Every left (resp. right) [[ideal (ring theory)|ideal]] of ''R'' is an intersection of [[maximal ideal|maximal]] left (resp. right) ideals of ''R''
-A [[commutative ring]] is a V-ring [[if and only if]] it is [[Von Neumann regular ring|Von Neumann regular]].<ref>{{cite journal|title=On rings whose simple modules are injective|journal=[[Journal of Algebra]]|volume=25|issue=1|pages=185–201|last1=Michler|first1=G.O.|last2=Villamayor|first2=O.E.|date=April 1973|doi=10.1016/0021-8693(73)90088-4|doi-access=free}}</ref>
+A [[commutative ring]] is a V-ring [[if and only if]] it is [[Von Neumann regular ring|Von Neumann regular]].<ref>{{cite journal|title=On rings whose simple modules are injective|journal=[[Journal of Algebra]]|volume=25|issue=1|pages=185–201|last1=Michler|first1=G.O.|last2=Villamayor|first2=O.E.|date=April 1973|doi=10.1016/0021-8693(73)90088-4|doi-access=free|hdl=20.500.12110/paper_00218693_v25_n1_p185_Michler|hdl-access=free}}</ref>
 ==References==