English

(Strongly) $M-\pazocal{A}-$Injective(Flat) Modules

Rings and Algebras 2016-08-11 v1

Abstract

Let MM be a left RR-module and \pazocalA={A}A\pazocalA\pazocal{A}=\{A\}_{A\in\pazocal{A}} be a family of some submodules of MM. It is introduced the classes of (strongly) M\pazocalAinjectiveM-\pazocal{A}-\mathrm{injective} and (strongly) M\pazocalAflatM-\pazocal{A}-\mathrm{flat} modules which are denoted by (S)M\pazocalAI(S) M-\pazocal{A}I and (S)M\pazocalAF(S) M-\pazocal{A}F, respectively. It is obtained some characterizations of these classes and the relationships between these classes. Moreover it is investigated (S)M\pazocalAI(S) M-\pazocal{A}I and (S)M\pazocalAF(S) M-\pazocal{A}F precovers and preenvelopes of modules. It is also studied \pazocalA\pazocal{A}-coherent, F\pazocalAF\pazocal{A} and P\pazocalAP\pazocal{A} modules. Finally more generally we give the characterization of S\pazocalAI(F)S-\pazocal{A}I(F) modules where \pazocalA={A}A\pazocalA\pazocal{A}=\{A\}_{A\in\pazocal{A}} is a family of some left RR-modules.

Keywords

Cite

@article{arxiv.1301.7050,
  title  = {(Strongly) $M-\pazocal{A}-$Injective(Flat) Modules},
  author = {Tahire Özen},
  journal= {arXiv preprint arXiv:1301.7050},
  year   = {2016}
}
R2 v1 2026-06-21T23:17:26.688Z