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A Simple Ring over which Proper Cyclics are Continuous is a PCI-Ring

Published online by Cambridge University Press:  20 November 2018

S. Barthwal ,
S. Jhingan  and
P. Kanwar
S. Barthwal
Affiliation:
Mathematics Department Ohio University Athens, Ohio 45701 U.S.A., e-mail: sbarthwa@ace.cs.ohiou.edu
S. Jhingan
Affiliation:
Mathematics Department Ohio University Athens, Ohio 45701 U.S.A., e-mail: sjhingan@ace.cs.ohiou.edu
P. Kanwar
Affiliation:
Mathematics Department Ohio University Athens, Ohio 45701 U.S.A., e-mail: pkanwar@ace.cs.ohiou.edu
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Abstract

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It is shown that simple rings over which proper cyclic right modules are continuous coincide with simple right PCI-rings, introduced by Faith.

Keywords

16D5016D70Simple ringsPCI-ringsPCQI-ringscontinuous modulesquasi-continuous modules
Type
Research Article
Information
Canadian Mathematical Bulletin , Volume 41 , Issue 3 , 01 September 1998 , pp. 261 - 266
Copyright
Copyright © Canadian Mathematical Society 1998

References

1. Chatters, A. W. and Hajarnavis, C. R., Rings with Chain Conditions. Pitman, London, 1980.Google Scholar
2. Cozzens, J. H., Homological properties of the ring of differential polynomials. Bull. Amer. Math. Soc. (N.S.) 76 (1970), 7579.Google Scholar
3. Damiano, R. F., A right PCI-ring is right noetherian. Proc. Amer. Math. Soc. 77 (1979), 1114.Google Scholar
4. Faith, C., When are proper cyclics injective?. Pacific Math, J.. 45 (1973), 97112.Google Scholar
5. Faith, C., Algebra I: Rings, Modules and Categories. Springer-Verlag, Berlin, New York, 1981.Google Scholar
6. Faith, C., Algebra II: Ring Theory. Springer-Verlag, Berlin, New York, 1976.Google Scholar
7. Goel, V. K. and Jain, S. K., π-injective modules and rings whose cyclics are π;-injective. Comm. Algebra 6 (1978), 5973.Google Scholar
8. Goodearl, K. R., Singular torsion and the splitting properties. Mem. Amer.Math. Soc. 124 (1972).Google Scholar
9. Huynh, D. V., Jain, S. K. and López-Permouth, S. R., When is simple ring noetherian?. J. Algebra 184 (1996), 786794.Google Scholar
10. Jain, S. K. and Müller, Bruno, Semiperfect rings whose proper cyclic modules are continuous. Arch.Math. 37 (1981), 140143.Google Scholar
11. McConnell, J. C. and Robson, J. C., Noncommutative Noetherian Rings. Wiley-Interscience, New York, 1987.Google Scholar
12. Osofsky, B. and Smith, P. F., Cyclic modules whose quotients have all complement submodules direct summands. J.Algebra 139 (1991), 342354.Google Scholar
13. Wisbauer, R., Foundations of module and ring theory. Gordon and Beach, Philadelphia, Paris, 1991.Google Scholar