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In the branch of abstract algebra called ring theory, the Akizuki–Hopkins–Levitzki theorem connects the descending chain condition and ascending chain condition in modules over semiprimary rings. A ring R (with 1) is called semiprimary if R/J(R) is semisimple and J(R) is a nilpotent ideal, where J(R) denotes the Jacobson radical. The theorem states that if R is a semiprimary ring and M is an R module, the three module conditions Noetherian, Artinian and "has a composition series" are equivalent. Without the semiprimary condition, the only true implication is that if M has a composition series, then M is both Noetherian and Artinian.

The theorem takes its current form from a paper by Charles Hopkins and a paper by Jacob Levitzki, both in 1939. For this reason it is often cited as the Hopkins–Levitzki theorem. However Yasuo Akizuki is sometimes included since he proved the result for commutative rings a few years earlier Template:Harv.

Since it is known that right Artinian rings are semiprimary, a direct corollary of the theorem is: a right Artinian ring is also right Noetherian. The analogous statement for left Artinian rings holds as well. This is not true in general for Artinian modules, because there are examples of Artinian modules which are not Noetherian.

Another direct corollary is that if R is right Artinian, then R is left Artinian if and only if it is left Noetherian.

Sketch of proof

Here is the proof of the following: Let R be a semiprimary ring and M left R-module. If M is either Artinian or Noetherian, then M has composition series.^[1] (The converse of this is always true.)

Let J be the radical of R. Set ${\displaystyle F_i=J^{i-1}M/J^{i}M}$. The R module ${\displaystyle F_i}$ may then be viewed as an ${\displaystyle R/J}$-module because J is contained in the annihilator of ${\displaystyle F_i}$. Each ${\displaystyle F_i}$ is a semisimple ${\displaystyle R/J}$-module, because ${\displaystyle R/J}$ is a semisimple ring. Furthermore since J is nilpotent, only finitely many of the ${\displaystyle F_i}$ are nonzero. If M is Artinian (or Noetherian), then ${\displaystyle F_i}$ has a finite composition series. Stacking the composition series from the ${\displaystyle F_i}$ end to end, we obtain a composition series for M.

In Grothendieck categories

There are a number of generalizations and extensions of the theorem. One concerns Grothendieck categories: If G is a Grothendieck category with an artinian generator, then every artinian object in G is noetherian.^[2]

See also

• Artinian module
• Noetherian module
• Composition series

References

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• Charles Hopkins (1939) Rings with minimal condition for left ideals, Ann. of Math. (2) 40, pages 712–730.
• T. Y. Lam (2001) A first course in noncommutative rings, Springer-Verlag. page 55 ISBN 0-387-95183-0
• Jakob Levitzki (1939) On rings which satisfy the minimum condition for the right-hand ideals, Compositio Math. 7, pages 214–222.