Hostname: page-component-78c5997874-mlc7c Total loading time: 0 Render date: 2024-11-17T18:15:05.315Z Has data issue: false hasContentIssue false
  • English
  • Français

On rings with quasi-injective cyclic modules

Published online by Cambridge University Press:  20 January 2009

J. Ahsan
J. Ahsan
Affiliation:
Department of Mathematics, University of Islamabad, Islamabad, Pakistan
Rights & Permissions [Opens in a new window]

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

A ring R is called a qc-ring if each cyclic R-module is quasi-injective. For various properties of these rings we refer to Ahsan (1) and Koehler (15). In this paper we shall obtain some additional results related to qc-rings. The scheme of the paper is as follows. Section 2 contains various preliminary definitions and results. In Section 3, we shall prove that every commutative hypercyclic ring is a qc-ring. In this section, we shall also show that a qc-ring which satisfies the ascending chain condition on its annihilators has nilpotent Jacobson-radical. Finally, in Section 4, we shall study rings all of whose proper factor rings are qc. Such rings will be called “ restricted qc ”.

Type
Research Article
Information
Proceedings of the Edinburgh Mathematical Society , Volume 19 , Issue 2 , September 1974 , pp. 139 - 145
Copyright
Copyright © Edinburgh Mathematical Society 1974

References

REFERENCES

(1) Ahsan, J., Rings all of whose cyclic modules are quasi-injective, Proc. London Math. Soc. (3) 27 (1973), 425439.CrossRefGoogle Scholar
(2) Asano, K., Uber Hauptideal Ringe mit Kettensatz, Osaka J. Math. 1 (1949), 5261.Google Scholar
(3) Bass, H., Finitistic dimension and a homomological generalization of semi-primary rings, Trans. Amer. Math. Soc. 95 (1960), 466488.CrossRefGoogle Scholar
(4) BjÖrk, J.-E., Conditions which imply that subrings of semi-primary rings are semi-primary, J. Algebra, 19 (1971), 384395.CrossRefGoogle Scholar
(5) Byrd, K. A., Some characterizations of uniserial rings, Math. Ann. 186 (1970), 163170.CrossRefGoogle Scholar
(6) Caldwell, W. H., Hypercyclic Rings, Pacific J. Math. 24 (1968), 2944.CrossRefGoogle Scholar
(7) Cohen, I. S., Commutative rings with restricted minimum Condition, Duke Math. J. 17 (1950), 2742.CrossRefGoogle Scholar
(8) Faith, C., Lectures on infective modules and quotient rings (Springer-Verlag, New York, 1967).CrossRefGoogle Scholar
(9) Faith, C., On Köthe rings, Math. Ann. 164 (1964), 207212.CrossRefGoogle Scholar
(10) Faith, C. and Walker, E. A., Direct sum representations of injective modules, J. Algebra 5 (1967), 203221.CrossRefGoogle Scholar
(11) Fuller, K. R., Generalized uniserial rings and their Kupisch series, Math. Z. 106 (1968), 248260.CrossRefGoogle Scholar
(12) Fuller, K. R., On direct representations of quasi-injectives and quasi-projectives, Arch. Math. 20 (1969), 495502.CrossRefGoogle Scholar
(13) Jain, S. K., Singh, S. and Mohamed, S. H., Rings in which every right ideal is quasi-injective, Pacific J. Math. 31 (1969), 7379.CrossRefGoogle Scholar
(14) Johnson, R. E. and Wong, E. T., Quasi-injective modules and irreducible rings, J. London Math. Soc. 36 (1961), 260268.CrossRefGoogle Scholar
(15) Koehler, Anne B., Rings with quasi-injective cyclic modules, Quart. J. Math Oxford (2) 25 (1974), 5155.CrossRefGoogle Scholar
(16) Levy, L. S., Commutative rings whose homomorphic images are self-injective, Pacific J. Math. 18 (1966), 149153.CrossRefGoogle Scholar
(17) Mohamed, S., Rings whose homomorphic images are q-rings, Pacific J. Math. 35 (1970), 725735.CrossRefGoogle Scholar
(18) Mohammed, S., Semi-local q-rings, Indian J. Pure Appl. Math. 1 (19691970), 419424.Google Scholar
(19) Pollinghar, A. and Zaks, A., Some remarks on quasi-Frobenious Rings, J. Algebra 10 (1968), 231239.CrossRefGoogle Scholar
(20) Shock, R. C., The rings of endomorphisms of a finite dimensional module, Israel J. Math. 11 (1972), 309314.CrossRefGoogle Scholar
(21) Zaks, A., Injective dimensions of semi-primary rings, J. Algebra 13 (1969), 7386.CrossRefGoogle Scholar