Add to ORKGWe charanterize reflexive modules over QF-3\u27 rings using a linear compactness condition relative to the Lambek torsion theory, and we also give a necessary and sufficient condition for a legt QF-3\u27 maximal quotient ring to be right QF-3\u27
Let R be a left and right noetherian ring and M a finitely generated left R-module with Extr(M, R)=0...
AbstractIt is proved that a ring R is right perfect if and only if it is Σ-cotorsion as a right modu...
Let R be a ring with identity. A right R-module M is called divisible in the sense of Levy[5], if Md...
Let R be a ring with identity, and let Mod-R be the category of right R-modules. Let M be a right R-...
For a bimodule RMDelta where R and Delta are rings with unity, alglat RMDelta is the ring of all Del...
We define ̃F in R-tors by r ̃F σ iff the class of r-codivisible modules coincides with the class of ...
AbstractIn this paper we relate the completion introduced in [Bueso et al. (1994)] with the double d...
Throughout this paper we assume that R is a right perfect ring with identity and let Mod-R be the ca...
Let S be an arbitrary associative ring and S W be a left S-module. Denote by R the ring End S W and ...
M be a right R-module. We denote by E(M) the injective hull of M. M is called QF-3’ module, if E(M) ...
RM is a left iϊNmodule, then M can be considered as a right ^-module, where ^ = Horn (RM, RM) is th...
AbstractWe study the dualities induced by a ring R such that every finitely generated submodule of E...
An R module M is herein called torsion if each element has nonzero annihilator, and faithful if the ...
Let R be a ring which is associative and its radical be N. A ring R is called semilocal if R/N is se...
AbstractThe class of A-reflexive modules is investigated, where A is a bimodule over rings S and R. ...
Let R be a left and right noetherian ring and M a finitely generated left R-module with Extr(M, R)=0...
AbstractIt is proved that a ring R is right perfect if and only if it is Σ-cotorsion as a right modu...
Let R be a ring with identity. A right R-module M is called divisible in the sense of Levy[5], if Md...
Let R be a ring with identity, and let Mod-R be the category of right R-modules. Let M be a right R-...
For a bimodule RMDelta where R and Delta are rings with unity, alglat RMDelta is the ring of all Del...
We define ̃F in R-tors by r ̃F σ iff the class of r-codivisible modules coincides with the class of ...
AbstractIn this paper we relate the completion introduced in [Bueso et al. (1994)] with the double d...
Throughout this paper we assume that R is a right perfect ring with identity and let Mod-R be the ca...
Let S be an arbitrary associative ring and S W be a left S-module. Denote by R the ring End S W and ...
M be a right R-module. We denote by E(M) the injective hull of M. M is called QF-3’ module, if E(M) ...
RM is a left iϊNmodule, then M can be considered as a right ^-module, where ^ = Horn (RM, RM) is th...
AbstractWe study the dualities induced by a ring R such that every finitely generated submodule of E...
An R module M is herein called torsion if each element has nonzero annihilator, and faithful if the ...
Let R be a ring which is associative and its radical be N. A ring R is called semilocal if R/N is se...
AbstractThe class of A-reflexive modules is investigated, where A is a bimodule over rings S and R. ...
Let R be a left and right noetherian ring and M a finitely generated left R-module with Extr(M, R)=0...
AbstractIt is proved that a ring R is right perfect if and only if it is Σ-cotorsion as a right modu...
Let R be a ring with identity. A right R-module M is called divisible in the sense of Levy[5], if Md...