Abstract
We study rings over which every module is an I*0 -module dual to I 0-module. We describe semiregular rings over which every module is at the same time I*0 -module and I 0-module. We give a description of rings over which every module is a direct sum of injective module and SV -module. We investigate relations between weakly Baer modules and I*0 -modules.
This is a preview of subscription content, log in via an institution to check access.
Similar content being viewed by others
References
Abyzov, A. N. “PatOn Some Classes of Semi-Artinian Rings,” Sib. Math. J. 53, No. 5, 763–771 (2012).
Abyzov, A. N. “Generalized SV-Modules,” Sib. Math. J. 50, No. 3, 379–384 (2009).
Abyzov, A. N. “Weakly Regular Ring Over Normal Rings,” Sib. Math. J. 49, No. 4, 575–586 (2008).
Abyzov, A. N. “Generalized SV-Rings of Bounded Index of Nilpotency,” Russian Mathematics (Iz. VUZ) 55, No. 12, 1–10 (2011).
Abyzov, A. N. and Tuganbaev, A. A. “Rings Over Which All Modules are I 0-Modules. II,” J. Math. Sci. (N. Y.) 162, No. 5, 587–593 (2009).
Abyzov, A. N. and Tuganbaev, A. A. “Submodules and Direct Summands,” J.Math. Sci. (N. Y.) 164, No. 1, 1–20 (2010).
Tuganbaev, A. A. “ModuleswithManyDirectSummands,” J.Math. Sci. (N. Y.) 152, No. 2, 298–303 (2008).
Tuganbaev, A. A. “Rings Over Which All Modules are I 0-Modules,” J. Math. Sci. (N. Y.) 156, No. 2, 336–341 (2009).
Tuganbaev, A. A. “RingsWithout Infinite Sets of Noncentral Orthogonal Idempotents,” J.Math. Sci. (N. Y.) 162, No. 5, 730–739 (2009).
Tuganbaev, A. A. Rings Theory. Arithmetical Modules and Rings (MTsNMO, Moscow, 2009).
Jain, S. K., Srivastava, A. K., Tuganbaev, A. A. Cyclic Modules and the Structure of Rings (Oxford University Press, Oxford, 2012).
Dung, N. V., Huynh, D. V., Smith P. F., Wisbauer R. Extending Modules (Longman Scientific & Technical, Harlow, 1994).
Huynh, D. V., Rizvi, S. T. “On Some Classes of Artinian Rings,” J. Algebra 223, 133–153 (2000).
Oshiro, K. and Wisbauer, R. “Modules with Every Subgenerated Module Lifting,” Osaka J.Math. 32, 513–519 (1995).
Vanaja, N. “All Finitely Generated M-Subgenerated Modules are Extending,” Comm. Algebra 24, 543–572 (1996).
Wisbauerm, R. Foundations of Module and Ring Rheory (Gordon and Breach, Philadelphia, 1991).
Faith, C. “RingsWhoseModules HaveMaximal Submodules,” Publ.Mat. 39, No. 1, 201–214 (1995).
Krylov, P. A., Tuganbaev, A. A. “Modules Over Formal Matrix Rings,” J. Math. Sci. (N. Y.) 171, No. 2, 248–295 (2010).
Dinh, H. Q., Huynh, D. V. “Some Results on Self-Injective Rings and Σ-CS Rings,” Commun. Algebra 31, No. 12, 6063–6077 (2003).
Baccella, G. “Semi-Artinian V-Rings and Semi-Artinian von Neumann Regular Rings,” J. Algebra 173, 587–612 (1995).
Rizvi, S. T., Roman, C. S. “Baer and Quasi-Baer Modules,” Commun. Algebra 32, No. 1, 103–123 (2004).
Tutuncu, D. K., Tribak, R. “On Dual BaerModule,” Glasg. Math. J. 52, No. 2, 261–269 (2010).
Khuri, S. M. “Endomorphism Rings of Nonsingular Modules,” Ann. Sci. Math. Quebec 4, No. 2, 145–152 (1980).
Author information
Authors and Affiliations
Corresponding author
Additional information
Original Russian Text © A.N. Abyzov, 2014, published in Izvestiya Vysshikh Uchebnykh Zavedenii. Matematika, 2014, No. 8, pp. 3–17.
About this article
Cite this article
Abyzov, A.N. I*0-Modules. Russ Math. 58, 1–14 (2014). https://doi.org/10.3103/S1066369X14080015
Received:
Published:
Issue Date:
DOI: https://doi.org/10.3103/S1066369X14080015