A note on GV-modules with Krull dimension
Glasgow mathematical journal, Tome 32 (1990) no. 3, pp. 389-390

Voir la notice de l'article provenant de la source Cambridge University Press

Extending a result of Boyle and Goodearl in [1] on V-rings it was shown in Yousif [11] that a generalized V-module (GV-module) has Krull dimension if and only if it is noetherian. Our note is based on the observation that every GV-module has a maximal submodule (Lemma 1). Applying a theorem of Shock [6] we immediately obtain that a GV-module has acc on essential submodules if and only if for every essential submodule K ⊂ M the factor module M/K has finitely generated socle. Yousif's result is obtained as a corollary.Let R be an associative ring with unity and R-Mod the category of unital left R-modules. Soc M denotes the socle of an R-module M. If K ⊂ M is an essential submodule we write K⊴M.An R-module M is called co-semisimple or a V-module, if every simple module is M-injective ([2], [7], [9], [10]). According to Hirano [3] M is a generalized V-module or GV-module, if every singular simple R-module is M-injective. This extends the notion of a left GV-ring in Ramamurthi-Rangaswamy [5].It is easy to see that submodules, factor modules and direct sums of co-semisimple modules (GV-modules) are again co-semisimple (GV-modules) (e.g. [10, § 23]).
van, Dinh Huynh; Smith, Patrick F.; Wisbauer, Robert. A note on GV-modules with Krull dimension. Glasgow mathematical journal, Tome 32 (1990) no. 3, pp. 389-390. doi: 10.1017/S0017089500009484
@article{10_1017_S0017089500009484,
     author = {van, Dinh Huynh and Smith, Patrick F. and Wisbauer, Robert},
     title = {A note on {GV-modules} with {Krull} dimension},
     journal = {Glasgow mathematical journal},
     pages = {389--390},
     year = {1990},
     volume = {32},
     number = {3},
     doi = {10.1017/S0017089500009484},
     url = {http://geodesic.mathdoc.fr/articles/10.1017/S0017089500009484/}
}
TY  - JOUR
AU  - van, Dinh Huynh
AU  - Smith, Patrick F.
AU  - Wisbauer, Robert
TI  - A note on GV-modules with Krull dimension
JO  - Glasgow mathematical journal
PY  - 1990
SP  - 389
EP  - 390
VL  - 32
IS  - 3
UR  - http://geodesic.mathdoc.fr/articles/10.1017/S0017089500009484/
DO  - 10.1017/S0017089500009484
ID  - 10_1017_S0017089500009484
ER  - 
%0 Journal Article
%A van, Dinh Huynh
%A Smith, Patrick F.
%A Wisbauer, Robert
%T A note on GV-modules with Krull dimension
%J Glasgow mathematical journal
%D 1990
%P 389-390
%V 32
%N 3
%U http://geodesic.mathdoc.fr/articles/10.1017/S0017089500009484/
%R 10.1017/S0017089500009484
%F 10_1017_S0017089500009484

[1] 1.Boyle, A. K. and Goodearl, K. R., Rings over which certain modulesare injective, Pacific J. Math. 58 (1975), 43–53. Google Scholar | DOI

[2] 2.Fuller, K., Relative projectivity and injectivity classes determined by simple modules, J. London Math. Soc. 5 (1972), 423–431. Google Scholar | DOI

[3] 3.Hirano, Y., Regular modules and V-modules, Hiroshima Math. J. 11 (1981), 125–142. Google Scholar | DOI

[4] 4.Page, S. S. and Yousif, M. F., Relative injectivity and chain conditions, Comm. Algebra, 17 (1989), 899–924. Google Scholar | DOI

[5] 5.Ramamurthi, V. S. and Rangaswamy, K. M., Generalized V-rings, Math. Scand. 31 (1972), 69–77. Google Scholar | DOI

[6] 6.Shock, R. C., Dual generalization of the artinian and noetherian conditions, Pacific J. Math. 54 (1974), 227–235. Google Scholar | DOI

[7] 7.Tominaga, H., On s-unital rings, Math. J. Okayama Univ. 18 (1976), 117–134. Google Scholar

[8] 8.van Huynh, D., Dung, N. V. and Wisbauer, R., Quasi-injective modules with ace or dcc on essential submodules, Arch. Math. (Basel) 53 (1989), 252–255. Google Scholar

[9] 9.Wisbauer, R., Co-semisimple modules and nonassociative V-rings, Comm. Algebra 5 (1977), 1193–1209. Google Scholar | DOI

[10] 10.Wisbauer, R., Grundlagen der Modul- und Ringtheorie, (Verlag R. Fischer, München 1988). Google Scholar

[11] 11.Yousif, M. F., V-modules with Krull dimension, Bull. Austral. Math. Soc. 37 (1988), 237–240. Google Scholar | DOI

Cité par Sources :