Loewy ring

In mathematics, a Loewy ring or semi-Artinian ring is a ring in which every non-zero module has a non-zero socle, or equivalently if the Loewy length of every module is defined. The concepts are named after Alfred Loewy.

Loewy length

The Loewy length and Loewy series were introduced by Emil Artin, Cecil J. Nesbitt, and Robert M. Thrall (1944)

If M is a module, then define the Loewy series M_α for ordinals α by M₀ = 0, M_α+1/M_α = socle M/M_α, M_α = ∪_λ<α M_λ if α is a limit ordinal. The Loewy length of M is defined to be the smallest α with M = M_α, if it exists.

Semiartinian modules

$_{R}M$ is a semiartinian module if, for all $M\rightarrow N$ epimorphism, where $N\neq 0$ , the socle of $N$ is essential in $N$ .

Note that if $_{R}M$ is an artinian module then $_{R}M$ is a semiartinian module. Clearly 0 is semiartinian.

Let $0\rightarrow M'\rightarrow M\rightarrow M''\rightarrow 0$ be exact then $M'$ and $M''$ are semiartinian if and only if $M$ is semiartinian.

Let us consider $\{M_{i}\}_{i\in I}$ family of $R$ -modules, then $\oplus _{i\in I}M_{i}$ is semiartinian if and only if $M_{j}$ is semiartinian for all $j\in I$ .

Semiartinian rings

$R$ is called left semiartinian if $_{R}R$ is semiartinian, that is, $R$ is left semiartinian if for any left ideal $I$ , $R/I$ contains a simple submodule.

Note that $R$ left semiartinian does not imply $R$ left artinian.

References

Assem, Ibrahim; Simson, Daniel; Skowroński, Andrzej (2006), Elements of the representation theory of associative algebras. Vol. 1: Techniques of representation theory, London Mathematical Society Student Texts, 65, Cambridge: Cambridge University Press, ISBN 0-521-58631-3, Zbl 1092.16001
Artin, Emil; Nesbitt, Cecil J.; Thrall, Robert M. (1944), Rings with Minimum Condition, University of Michigan Publications in Mathematics, 1, Ann Arbor, MI: University of Michigan Press, MR 0010543, Zbl 0060.07701
Nastasescu, Constantin; Popescu, Nicolae (1968), "Anneaux semi-artiniens", Bulletin de la Société Mathématique de France, 96: 357–368, ISSN 0037-9484, MR 0238887, Zbl 0227.16014
Nastasescu, Constantin; Popescu, Nicolae (1966), "Sur la structure des objets de certaines catégories abéliennes", COMPTES RENDUS HEBDOMADAIRES DES SEANCES DE L ACADEMIE DES SCIENCES SERIE A, GAUTHIER-VILLARS/EDITIONS ELSEVIER 23 RUE LINOIS, 75015 PARIS, FRANCE, 262: A1295–A1297

This article is issued from Wikipedia - version of the 10/28/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.