Duality properties of injective modules
José L. Gómez Pardo (1989)
Extracta Mathematicae
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Displaying similar documents to “Finitely self-cogenerated quasi-injective modules and their endomorphism rings.”
Duality properties of injective modules
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Robert Wisbauer (1985)
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Jan Trlifaj (1992)
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Kalathoor Varadarajan (1992)
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Let be a class or R-modules containing 0 and closed under isomorphic images. With any such we associate three classes Γ, F and Δ. The study of some of the closure properties of these classes allows us to obtain characterization of Artinian modules dualizing results of Chatters. The theory of Dual Glodie dimension as developed by the author in some of his earlier work plays a crucial role in the present paper.
A characterization of discrete linearly compact rings by means of a duality
A. Orsatti, V. Roselli (1981)
Rendiconti del Seminario Matematico della Università di Padova
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Relative injectivity and CS-modules.
Kamal, Mahmoud Ahmed (1994)
International Journal of Mathematics and Mathematical Sciences
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Rings whose modules are finitely generated over their endomorphism rings
Nguyen Viet Dung, José Luis García (2009)
Colloquium Mathematicae
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A module M is called finendo (cofinendo) if M is finitely generated (respectively, finitely cogenerated) over its endomorphism ring. It is proved that if R is any hereditary ring, then the following conditions are equivalent: (a) Every right R-module is finendo; (b) Every left R-module is cofinendo; (c) R is left pure semisimple and every finitely generated indecomposable left R-module is cofinendo; (d) R is left pure semisimple and every finitely generated indecomposable left R-module...