In this paper, we introduced two concepts. A module M is said to be purely quasi-injective (resp.... more In this paper, we introduced two concepts. A module M is said to be purely quasi-injective (resp. quasi-cotorsion) if it is fully invariant in its pure-injective envelope (resp. if it is flat and fully invariant in its cotorsion envelope). Endomorphism rings of both of the above types of modules are proved to be regular and self injective modulo their Jacobson radicals. If M is a purely quasi-injective (resp. quasi-cotorsion) module, then so is any finite direct sum of copies of M. Each of the above concepts is stronger than the well-known concept of quasi-pure-injectivity, but not equivalent. This solves, negatively, a problem of Mao and Ding's of whether every flat quasipure- injective module is fully invariant in its cotorsion envelope. Certain types of rings are characterized in terms of purely quasi-injective modules. For example, a ring R is regular iff every purely quasi-injective R-module is quasi-injective, and is pure-semisimple iff every R-module is purely quasiinject...
In this paper, we introduced two concepts. A module M is said to be purely quasi-injective (resp.... more In this paper, we introduced two concepts. A module M is said to be purely quasi-injective (resp. quasi-cotorsion) if it is fully invariant in its pure-injective envelope (resp. if it is flat and fully invariant in its cotorsion envelope). Endomorphism rings of both of the above types of modules are proved to be regular and self injective modulo their Jacobson radicals. If M is a purely quasi-injective (resp. quasi-cotorsion) module, then so is any finite direct sum of copies of M. Each of the above concepts is stronger than the well-known concept of quasi-pure-injectivity, but not equivalent. This solves, negatively, a problem of Mao and Ding's of whether every flat quasipure- injective module is fully invariant in its cotorsion envelope. Certain types of rings are characterized in terms of purely quasi-injective modules. For example, a ring R is regular iff every purely quasi-injective R-module is quasi-injective, and is pure-semisimple iff every R-module is purely quasiinject...
Uploads
Papers by Farhan Hamid