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Rings characterized by cyclic modules

Published online by Cambridge University Press:  18 May 2009

Dinh van Huynh  and
Phan Dan
Dinh van Huynh
Affiliation:
Institute of Mathematics, P.O. Box 631 Bo Hô, Hanoi, Vietnam
Phan Dan
Affiliation:
Institute of Mathematics, P.O. Box 631 Bo Hô, Hanoi, Vietnam
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A ring R is called right PCI if every proper cyclic right R-module is injective, i.e. if C is a cyclic right R-module then CRRR or CR is injective. By [2] and [3], if R is a non-artinian right PCI ring then R is a right hereditary right noetherian simple domain. Such a domain is called a right PCI domain. The existence of right PCI domains is guaranteed by an example given in [2]. As generalizations of right PCI rings, several classes of rings have been introduced and investigated, for example right CDPI rings, right CPOI rings (see [8], [6]). In Section 2 we define right PCS, right CPOS and right CPS rings and study the relationship between all these rings.

Type
Research Article
Information
Glasgow Mathematical Journal , Volume 31 , Issue 2 , May 1989 , pp. 251 - 256
Copyright
Copyright © Glasgow Mathematical Journal Trust 1989

References

1.Chatters, A. W., A characterisation of right Noetherian rings, Quart. J. Math. Oxford Ser. (2) 33 (1982), 6569.CrossRefGoogle Scholar
2.Cozzens, J. H. and Faith, C., Simple Noetherian rings (Cambridge University Press, 1975).CrossRefGoogle Scholar
3.Damiano, R. F., A right PCI ring is right Noetherian, Proc. Amer. Math. Soc. 77 (1979), 1114.CrossRefGoogle Scholar
4.Huynh, Dinh van, Dung, Nguyen V. and Smith, Patrick F., On rings characterized by their right ideals or cyclic modules, Proc. Edinburgh Math. Soc., to appear.Google Scholar
5.Faith, C., Algebra II: Ring theory (Springer, 1976).CrossRefGoogle Scholar
6.Goel, S. C., Jain, S. K. and Singh, S., Rings whose cyclic modules are injective or projective, Proc. Amer. Math. Soc. 53 (1975), 1618.CrossRefGoogle Scholar
7.Michler, G. O. and Villiamayor, O. E., On rings whose simple modules are injective, J. Algebra 25 (1973), 185201.CrossRefGoogle Scholar
8.Smith, P. F., Rings characterized by their cyclic modules, Canad. J. Math. 31 (1979), 93111.CrossRefGoogle Scholar