Modules which are invariant under nilpotents of their envelopes and covers

In this paper, we firstly provide several new characterizations of quasi-Frobenius rings by using some generalized injectivity of rings with certain chain conditions. For example, [Formula: see text] a ring [Formula: see text] is quasi-Frobenius if and only if [Formula: see text] is right [Formula: see text], right minfull with ACC on right annihilators; [Formula: see text] a ring [Formula: see text] is quasi-Frobenius if and only if [Formula: see text] is two-sided min-CS with ACC on right annihilators in which [Formula: see text]; [Formula: see text] a ring [Formula: see text] is quasi-Frobenius if and only if [Formula: see text] is right Johns left [Formula: see text]; [Formula: see text] a ring [Formula: see text] is quasi-Frobenius if and only if [Formula: see text] is quasi-dual two-sided [Formula: see text] with ACC on right annihilators. Moreover, it is shown that a ring [Formula: see text] is quasi-Frobenius if and only if [Formula: see text] is a left [Formula: see text]-injective left IN-ring with right RMC and [Formula: see text]. Also, we prove that if [Formula: see text] is a right duo, right QF-[Formula: see text] left quasi-duo ring satisfying ACC on right annihilators, then [Formula: see text] is quasi-Frobenius. In this paper, several known results on quasi-Frobenius rings are reproved as corollaries.

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On the automorphism-invariance of finitely generated ideals and formal matrix rings

Thuyet,

Quynh

2023

Filomat

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In this paper, we study rings having the property that every finitely generated right ideal is automorphism-invariant. Such rings are called right f a-rings. It is shown that a right f a-ring with finite Goldie dimension is a direct sum of a semisimple artinian ring and a basic semiperfect ring. Assume that R is a right f a-ring with finite Goldie dimension such that every minimal right ideal is a right annihilator, its right socle is essential in RR, R is also indecomposable (as a ring), not simple, and R has no trivial idempotents. Then R is QF. In this case, QF-rings are the same as q?, f q?, a?, f a-rings. We also obtain that a right module (X,Y, f, g) over a formal matrix ring (R M N S) with canonical isomorphisms f? and g? is automorphism-invariant if and only if X is an automorphism-invariant right R-module and Y is an automorphism-invariant right S-module.

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Modules which are invariant under nilpotents of their envelopes and covers

Cited by 4 publications

References 28 publications

On Nilpotent-invariant One-sided Ideals

On Nilpotent-invariant One-sided Ideals

New characterizations of quasi-Frobenius rings

On the automorphism-invariance of finitely generated ideals and formal matrix rings

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