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Recently Rim and Teply [11] found a necessary condition for the existence of $σ$ -torsionfree covers with respect to a given hereditary torsion theory for the category $R$ -mod. This condition uses the class of $σ$ -exact modules; i.e. the $σ$ -torsionfree modules for which every its $σ$ -torsionfree homomorphic image is $σ$ -injective. In this note we shall show that the existence of $σ$ -torsionfree covers implies the existence of $σ$ -exact covers, and we shall investigate some sufficient conditions for the converse....

Relative injectivity and CS-modules.

Kamal, Mahmoud Ahmed (1994)

International Journal of Mathematics and Mathematical Sciences

Relative natural classes and relative injectivity.

Crivei, Septimiu (2005)

International Journal of Mathematics and Mathematical Sciences

Relative purity over Noetherian rings

Ladislav Bican (2007)

Mathematica Slovaca

Relatively exact modules

Ladislav Bican (2003)

Commentationes Mathematicae Universitatis Carolinae

Rim and Teply [10] investigated relatively exact modules in connection with the existence of torsionfree covers. In this note we shall study some properties of the lattice $ℰ_{τ} (M)$ of submodules of a torsionfree module $M$ consisting of all submodules $N$ of $M$ such that $M / N$ is torsionfree and such that every torsionfree homomorphic image of the relative injective hull of $M / N$ is relatively injective. The results obtained are applied to the study of relatively exact covers of torsionfree modules. As an application...

Remarks on injectivity

Roger Yue Chi Ming (1987)

Archivum Mathematicum

Remarks on strongly regular rings

Yue Chi Ming, Roger (1987)

Portugaliae mathematica

Right Utumi p.p.-rings

Ulrich Albrecht (2010)

Rendiconti del Seminario Matematico della Università di Padova

Rings admitting torsion injective covers

Ahsan, J., Enochs, E. (1981)

Portugaliae mathematica

Rings which have projective coflat module

Radhey S. Singh, Renu Shrivastava (1992)

Czechoslovak Mathematical Journal

Rings whose class of projective modules is socle fine.

A. Idelhadj, E. A. Kaidi, D. Martín Barquero, C. Martín González (2004)

Publicacions Matemàtiques

Rings with zero intersection property on annihilators: Zip rings.

Carl Faith (1989)

Publicacions Matemàtiques

Zelmanowitz [12] introduced the concept of ring, which we call right zip rings, with the defining properties below, which are equivalent:(ZIP 1) If the right anihilator X⊥ of a subset X of R is zero, then X1⊥ = 0 for a finite subset X1 ⊆ X.(ZIP 2) If L is a left ideal and if L⊥ = 0, then L1⊥ = 0 for a finitely generated left ideal L1 ⊆ L.In [12], Zelmanowitz noted that any ring R satisfying the d.c.c. on anihilator right ideals (= dcc ⊥) is a right zip ring, and hence, so is any subring of R. He...

Roots of Nakayama and Auslander-Reiten translations

Helmut Lenzing, Andrzej Skowroński (2000)

Colloquium Mathematicae

We discuss the roots of the Nakayama and Auslander-Reiten translations in the derived category of coherent sheaves over a weighted projective line. As an application we derive some new results on the structure of selfinjective algebras of canonical type.

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