V-ring (ring theory)

Last updated February 01, 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 (respectively right) R-module is injective.
The radical of every left (respectively right) R-module is zero.
Every left (respectively right) ideal of R is an intersection of maximal left (respectively right) ideals of R.

A commutative ring is a V-ring if and only if it is Von Neumann regular.^[2]

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References

↑ Faith, Carl (1973). Algebra: Rings, modules, and categories. Springer-Verlag. ISBN 978-0387055510 . Retrieved 24 October 2015.
↑ Michler, G.O.; Villamayor, O.E. (April 1973). "On rings whose simple modules are injective". Journal of Algebra . 25 (1): 185–201. doi: 10.1016/0021-8693(73)90088-4 . hdl: 20.500.12110/paper_00218693_v25_n1_p185_Michler .

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[1] Faith, Carl (1973). Algebra: Rings, modules, and categories. Springer-Verlag. ISBN 978-0387055510 . Retrieved 24 October 2015.

[2] Michler, G.O.; Villamayor, O.E. (April 1973). "On rings whose simple modules are injective". Journal of Algebra . 25 (1): 185–201. doi: 10.1016/0021-8693(73)90088-4 . hdl: 20.500.12110/paper_00218693_v25_n1_p185_Michler .

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