Add to ORKGWe study the structure of rings over which every right module is an essential extension of a semisimple module by an injective one. A ring R is called a right max-ring if every nonzero right R-module has a maximal submodule. We describe normal regular semiartinian rings whose endomorphism ring of the minimal injective cogenerator is a max-ring. © 2012. Allerton Press, Inc
A poor module is one that is injective relative only to semisimple modules and a module is maximally...
Abstract. Let R be a ring. A right R-module M is called quasi-principally (or semi-) injective if it...
AbstractA module RM is semiprime if for each 0 ≠ m ϵ M there exists ƒ ϵ HomR(M, R) with (mƒ)m ≠ 0. I...
We study the structure of rings over which every right module is an essential extension of a semisim...
We study the structure of rings over which every right module is an essential extension of a semisim...
We study the structure of rings over which every right module is an essential extension of a semisim...
A ring R is a right max ring if every right module M = 0 has at least one maximal submodule. It suf...
A ring R is right max if every nonzero right R-module has a maximal submodule. In [F1] the author st...
A ring R is right max if every nonzero right R-module has a maximal submodule. In [F1] the author st...
A ring R is right max if every nonzero right R-module has a maximal submodule. In [F1] the author st...
The weakly regularity of all right R-modules with R an arbitrary ring does not imply the same proper...
The weakly regularity of all right R-modules with R an arbitrary ring does not imply the same proper...
The weakly regularity of all right R-modules with R an arbitrary ring does not imply the same proper...
The weakly regularity of all right R-modules with R an arbitrary ring does not imply the same proper...
A poor module is one that is injective relative only to semisimple modules and a module is maximally...
A poor module is one that is injective relative only to semisimple modules and a module is maximally...
Abstract. Let R be a ring. A right R-module M is called quasi-principally (or semi-) injective if it...
AbstractA module RM is semiprime if for each 0 ≠ m ϵ M there exists ƒ ϵ HomR(M, R) with (mƒ)m ≠ 0. I...
We study the structure of rings over which every right module is an essential extension of a semisim...
We study the structure of rings over which every right module is an essential extension of a semisim...
We study the structure of rings over which every right module is an essential extension of a semisim...
A ring R is a right max ring if every right module M = 0 has at least one maximal submodule. It suf...
A ring R is right max if every nonzero right R-module has a maximal submodule. In [F1] the author st...
A ring R is right max if every nonzero right R-module has a maximal submodule. In [F1] the author st...
A ring R is right max if every nonzero right R-module has a maximal submodule. In [F1] the author st...
The weakly regularity of all right R-modules with R an arbitrary ring does not imply the same proper...
The weakly regularity of all right R-modules with R an arbitrary ring does not imply the same proper...
The weakly regularity of all right R-modules with R an arbitrary ring does not imply the same proper...
The weakly regularity of all right R-modules with R an arbitrary ring does not imply the same proper...
A poor module is one that is injective relative only to semisimple modules and a module is maximally...
A poor module is one that is injective relative only to semisimple modules and a module is maximally...
Abstract. Let R be a ring. A right R-module M is called quasi-principally (or semi-) injective if it...
AbstractA module RM is semiprime if for each 0 ≠ m ϵ M there exists ƒ ϵ HomR(M, R) with (mƒ)m ≠ 0. I...