Semisimple-direct-injective modules

CONG QUYNH, TRUONG; Kosan, Tamer; Abyzov, Adel; Tapkin, Dan

doi:10.15672/hujms.730907

Semisimple-direct-injective modules

Adel Abyzov, (Department of Algebra and Mathematical Logic, Kazan (Volga Region) Federal University, 18 Kremlyovskaya str., Kazan, 420008 Russia)

Muhammet Tamer KOŞAN, (Gazi Üniversitesi, Fen Fakültesi, Matematik Bölümü, Ankara, Türkiye)

Troung CONG QUYNH, (Department of Mathematics, The University of Danang - University of Science and Education, DaNang city, Vietnam)

Daniel TAPKİN (Department of Algebra and Mathematical Logic, Kazan (Volga Region) Federal University, 18 Kremlyovskaya str., Kazan, 420008 Russia)

Hacettepe Journal of Mathematics and Statistics

0 0

Yıl: 2021 Cilt: 50 Sayı: 2 Sayfa Aralığı: 516 - 525 Metin Dili: İngilizce DOI: 10.15672/hujms.730907 İndeks Tarihi: 29-07-2022

Semisimple-direct-injective modules

Öz:

The notion of simple-direct-injective modules which are a generalization of injective modules unifies$C2$ and $C3$-modules. In the present paper,we introduce the notion of the semisimple-direct-injective module which gives a unified viewpoint of $C2$, $C3$, SSP properties and simple-direct-injective modules.It is proved that a ring $R$ is Artinian serial with the Jacobson radical square zero if and only if every semisimple-direct-injective right $R$-module has the SSP and, for any family of simple injective right $R$-modules ${S_i}_{mathcal{I}}$, $oplus_{mathcal{I}}S_i$ is injective. We also show that$R$ is a right Noetherian right V-ring if and only if every right $R$-module has a semisimple-direct-injective envelope if and only if every right $R$-module has a semisimple-direct-injective cover.

Anahtar Kelime: V-ring Artinian serial ring $C3$-module SSP simple-direct-injective module $C2$-module

Belge Türü: Makale Makale Türü: Araştırma Makalesi Erişim Türü: Erişime Açık

[1] I. Amin, Y. Ibrahim and M .F. Yousif, $C3$-modules, Algebra Colloq. 22 (4), 655–670, 2015.
[2] I. Amin, M.F. Yousif and N. Zeyada, Soc-injective rings and modules, Commun. Algebra, 33, 4229–4250, 2005.
[3] F.W. Anderson and K. R. Fuller, Rings and Categories of Modules, Springer-Verlag, New York, 1974.
[4] K.I. Beidar and W. F. Ke, On essential extensions of direct sums of injective modules, Archiv. Math. 78, 120–123, 2002.
[5] V. Camillo, Y. Ibrahim, M. Yousif and Y. Zhou, Simple-direct-injective modules, J. Algebra 420, 39–53, 2014.
[6] N.V. Dung, D.V. Huynh, P.F. Smith and R. Wisbauer, Extending modules, Pitman Research Notes in Math. 313, Longman, Harlow, New York, 1994.
[7] E.E. Enochs, Injective and flat covers, envelopes and resolvents, Israel J. Math. 39, 189–209, 1981.
[8] J.W. Fisher, Von Neumann regular rings versus V-rings, in: Lect. Notes Pure Appl. Math. 7, 101–119, Dekker, New York, 1974.
[9] K.R. Goodearl, Von Neumann Regular Rings, Krieger Publishing Company, Malabar, Florida, 1991.
[10] J. Hausen, Modules with the summand intersection property, Commun. Alg. 17, 135– 148, 1989.
[11] Y. Ibrahim, M.T. Koşan, M. Yousif and T.C. Quynh, Simple-direct-projective modules, Commun. Algebra, 44 (12), 5163–5178, 2014.
[12] Y. Ibrahim, T.C. Quynh and M. Yousif, Simple-direct-modules, Commun. Algebra, 45 (8), 3643–3652, 2017.
[13] S.H. Mohammed and B.J. Müller, Continous and Discrete Modules, London Math. Soc. LN 147, Cambridge Univ. Press., 1990.
[14] W.K. Nicholson and M.F. Yousif, Quasi-Frobenius Rings, Cambridge Univ. Press., 2003.
[15] T.C. Quynh and M.T. Koşan, On annihilators and quasi-Frobenius rings, submitted.
[16] S. Sahinkaya and J. Trlifaj, Generalized injectivity and approximations, Commun. Algebra, 44 (9), 4047–4055, 2014.
[17] G.V. Wilson, Modules with the Direct Summand Intersection Property, Comm. Alg. 14, 21–38, 1986.
[18] R. Wisbauer, Foundations of Module and Ring Theory, Gordon and Breach, Reading, 1991.

APA	Abyzov A, Kosan T, CONG QUYNH T, Tapkin D (2021). Semisimple-direct-injective modules. , 516 - 525. 10.15672/hujms.730907
Chicago	Abyzov Adel,Kosan Tamer,CONG QUYNH TRUONG,Tapkin Dan Semisimple-direct-injective modules. (2021): 516 - 525. 10.15672/hujms.730907
MLA	Abyzov Adel,Kosan Tamer,CONG QUYNH TRUONG,Tapkin Dan Semisimple-direct-injective modules. , 2021, ss.516 - 525. 10.15672/hujms.730907
AMA	Abyzov A,Kosan T,CONG QUYNH T,Tapkin D Semisimple-direct-injective modules. . 2021; 516 - 525. 10.15672/hujms.730907
Vancouver	Abyzov A,Kosan T,CONG QUYNH T,Tapkin D Semisimple-direct-injective modules. . 2021; 516 - 525. 10.15672/hujms.730907
IEEE	Abyzov A,Kosan T,CONG QUYNH T,Tapkin D "Semisimple-direct-injective modules." , ss.516 - 525, 2021. 10.15672/hujms.730907
ISNAD	Abyzov, Adel vd. "Semisimple-direct-injective modules". (2021), 516-525. https://doi.org/10.15672/hujms.730907

APA	Abyzov A, Kosan T, CONG QUYNH T, Tapkin D (2021). Semisimple-direct-injective modules. Hacettepe Journal of Mathematics and Statistics, 50(2), 516 - 525. 10.15672/hujms.730907
Chicago	Abyzov Adel,Kosan Tamer,CONG QUYNH TRUONG,Tapkin Dan Semisimple-direct-injective modules. Hacettepe Journal of Mathematics and Statistics 50, no.2 (2021): 516 - 525. 10.15672/hujms.730907
MLA	Abyzov Adel,Kosan Tamer,CONG QUYNH TRUONG,Tapkin Dan Semisimple-direct-injective modules. Hacettepe Journal of Mathematics and Statistics, vol.50, no.2, 2021, ss.516 - 525. 10.15672/hujms.730907
AMA	Abyzov A,Kosan T,CONG QUYNH T,Tapkin D Semisimple-direct-injective modules. Hacettepe Journal of Mathematics and Statistics. 2021; 50(2): 516 - 525. 10.15672/hujms.730907
Vancouver	Abyzov A,Kosan T,CONG QUYNH T,Tapkin D Semisimple-direct-injective modules. Hacettepe Journal of Mathematics and Statistics. 2021; 50(2): 516 - 525. 10.15672/hujms.730907
IEEE	Abyzov A,Kosan T,CONG QUYNH T,Tapkin D "Semisimple-direct-injective modules." Hacettepe Journal of Mathematics and Statistics, 50, ss.516 - 525, 2021. 10.15672/hujms.730907
ISNAD	Abyzov, Adel vd. "Semisimple-direct-injective modules". Hacettepe Journal of Mathematics and Statistics 50/2 (2021), 516-525. https://doi.org/10.15672/hujms.730907