Rings for which every cyclic module is dual automorphism-invariant

Abstract: Rings all of whose right ideals are automorphism-invariant are called right [Formula: see text]-rings. In the present paper, we study rings having the property that every right cyclic module is dual automorphism-invariant. Such rings are called right [Formula: see text]-rings. We obtain some of the relationships [Formula: see text]-rings and [Formula: see text]-rings. We also prove that; (i) A semiperfect ring [Formula: see text] is a right [Formula: see text]-ring if and only if any right ideal in [Formula: s… Show more

“…Singh and Srivastava [13], introduced a new class of modules namely dual automorphism invariant modules, which is the dual notion of automorphism invariant modules introduced by Lee and Zhou [9]. Further study of such modules was carried out by various authors in various articles [1,8,11].…”

A Note on Automorphism Liftable Modules

“…Singh and Srivastava [13], introduced a new class of modules namely dual automorphism invariant modules, which is the dual notion of automorphism invariant modules introduced by Lee and Zhou [9]. Further study of such modules was carried out by various authors in various articles [1,8,11].…”

A Note on Automorphism Liftable Modules

The dual Schröder-Bernstein problem for modules

Modules which are invariant under nilpotents of their envelopes and covers