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On classes of C3 and D3 modules F is a V -module if and only if every F-cyclic module is an A-C3 module, where A is the class of all
Semisimple-direct-injective modules-direct-injective module which gives a unified viewpoint of C2, C3, SSP properties and simple-direct-injective modules
Modules that are Invariant with Respect to Automorphisms and Idempotent Endomorphisms of Their Hulls and CoversThe paper contains both known and new results on automorphism-invariant modules, automorphism
Semisimple-direct-injective modules-direct-injective module which gives a unified viewpoint of C2, C3, SSP properties and simple-direct-injective modules.
Direct Projective Modules, Direct Injective Modules, and their GeneralizationsThis paper contains new and previously known results on modules that are close to direct projective
Rings over which every module is an I*0 -module© 2017, Allerton Press, Inc. We obtain a description of semi-artinian rings over which every module
Modules close to the automorphism-invariant and coinvariant and small projective modules can be obtained by developing a general theory of modules which are (co
Modules which are invariant under nilpotents of their envelopes and covers© 2020 World Scientific Publishing Co. Pte Ltd. All rights reserved. A module is called nilpotent
Semilocal group algebrasLet k[G] be a semilocal group algebra. It is shown that if k is an algebraically closed field
Modules close to SSP- and SIP-modules is also a C2 module.
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