Loewy ring

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

The Loewy length and Loewy series were introduced by Template:Harvs.

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), and 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.

${\displaystyle {}_{R}M}$ is a semiartinian module if, for all epimorphisms ${\displaystyle M\to N}$, where ${\displaystyle N\ne 0}$, the socle of ${\displaystyle N}$ is essential in ${\displaystyle N.}$

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

If ${\displaystyle 0\to M^{\prime }\to M\to M^{″}\to 0}$ is exact then ${\displaystyle M^{\prime }}$ and ${\displaystyle M^{″}}$ are semiartinian if and only if ${\displaystyle M}$ is semiartinian.

If ${\displaystyle \{M_i{\}}_{i\in I}}$ is a family of ${\displaystyle R}$-modules, then ${\displaystyle {\oplus }_{i\in I}{M}_i}$ is semiartinian if and only if ${\displaystyle M_j}$ is semiartinian for all ${\displaystyle j\in I.}$

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

Note that ${\displaystyle R}$ left semiartinian does not imply that ${\displaystyle R}$ is left artinian.

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