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|Title:||On weak injectivity of direct sums of modules||Authors:||Brodskiil, G. M.
Thuyet, Van Le
|Keywords:||Rings (Algebra);Modules (Algebra);Unit groups (Ring theory)||Issue Date:||1998||Source:||13||Abstract:||Generalizing a notion defined by Jain and L6pez-permouth, we call a module Q e olMl weakly injective (resp. weakly tight) inolMlif, for every finitely generated submodule Nofthe M-injectlehu[ f,Niscontainedinasubmodule y otQ suchthatr - p (resp. Nisfinitely O-cogenerated). For some classes M of weakly injectives in o [M], we study the inJtances in which direct sums of modules fromM are weakly injective in ofMl. ln particular, we getnecessary and sufficient conditions for f -weak injectivity or !-weak tightness of the injective hull of a simple module. As a consequence, we get chancteizations for q.f.d. rings by mians of weakly injective modules given by Al-Huzali, Jain, and L6pez-permouth.||URI:||http://hdl.handle.net/20.500.11889/3999|
|Appears in Collections:||Fulltext Publications|
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