On π - Morphic Modules

A. Harmanci; H. Kose; Y. Kurtulmaz

On &#960 - Morphic Modules

Year 2013, Volume: 42 Issue: 4, 411 - 418, 01.04.2013

Abstract

Let R be an arbitrary ring with identity and M be a right R-modulewith S = End(MR ). Let f∈ S. f is called π-morphic if M/fn (M ) ∼= r M (f n ) for some positive integer n. A module M is called π-morphicif every f∈ S is π-morphic. It is proved that M is π-morphic andimage-projective if and only if S is right π-morphic and M generates itskernel. S is unit-π-regular if and only if M is π-morphic and π-Rickartif and only if M is π-morphic and dual π-Rickart. M is π-morphic andimage-injective if and only if S is left π-morphic and M cogenerates itscokernel.

Keywords

Endomorphism rings; π-morphic rings; π-morphic modules; unit π-regularrings.

References

Anderson, F.W. and Fuller, K.R. Rings and Categories of Modules, Springer-Verlag, New York, 1992.
Erlich, G. Units and one sided units in regular rings, Trans. A.M.S. 216, 203–211, 1976. Lee, G., Rizvi, S.T. and Roman, C.S. Rickart Modules, Comm. Algebra 38(11), 4005–4027, 20
Nicholson, W.K. Strongly clean rings and Fitting’s lemma, Comm. Alg. 27(8), 3583–3592, 19
Nicholson, W.K. and Campos, E.S. Morphic Modules, Comm. Alg. 33, 2629–2647, 2005. Nicholson, W.K. and Yousif, M.F. Quasi-Frobenius Rings, Cambridge Univ.Press, 158, 200
Ungor, B., Halıcıo˘ glu, S. and Harmancı, A. A Generalization of Rickart Modules, see arXiv: 1202343.
Ungor, B., Kurtulmaz, Y., Halıcıo˘ glu, S. and Harmancı, A. Dual π- Rickart Modules, Revista Colombiana de Matematicas 46, 167–180, 2012.
Ware, R. Endomorphism rings of projective modules, Trans. Amer. Math. Soc. 155, 233– 256, 1971.
Zhu, Z. A Note on Principally-Injective Modules, Soochow Journal of Mathematics 33(4), 885–889, 2007.

On &#960 - Morphic Modules

Year 2013, Volume: 42 Issue: 4, 411 - 418, 01.04.2013

A. Harmanci H. Kose Y. Kurtulmaz

Abstract

-

Keywords

-

References

Anderson, F.W. and Fuller, K.R. Rings and Categories of Modules, Springer-Verlag, New York, 1992.
Erlich, G. Units and one sided units in regular rings, Trans. A.M.S. 216, 203–211, 1976. Lee, G., Rizvi, S.T. and Roman, C.S. Rickart Modules, Comm. Algebra 38(11), 4005–4027, 20
Nicholson, W.K. Strongly clean rings and Fitting’s lemma, Comm. Alg. 27(8), 3583–3592, 19
Nicholson, W.K. and Campos, E.S. Morphic Modules, Comm. Alg. 33, 2629–2647, 2005. Nicholson, W.K. and Yousif, M.F. Quasi-Frobenius Rings, Cambridge Univ.Press, 158, 200
Ungor, B., Halıcıo˘ glu, S. and Harmancı, A. A Generalization of Rickart Modules, see arXiv: 1202343.
Ungor, B., Kurtulmaz, Y., Halıcıo˘ glu, S. and Harmancı, A. Dual π- Rickart Modules, Revista Colombiana de Matematicas 46, 167–180, 2012.
Ware, R. Endomorphism rings of projective modules, Trans. Amer. Math. Soc. 155, 233– 256, 1971.
Zhu, Z. A Note on Principally-Injective Modules, Soochow Journal of Mathematics 33(4), 885–889, 2007.

There are 8 citations in total.

Details

Primary Language	Turkish
Journal Section	Mathematics
Authors	A. Harmanci This is me H. Kose This is me Y. Kurtulmaz This is me
Publication Date	April 1, 2013
Published in Issue	Year 2013 Volume: 42 Issue: 4

Cite

APA	Harmanci, A., Kose, H., & Kurtulmaz, Y. (2013). On π - Morphic Modules. Hacettepe Journal of Mathematics and Statistics, 42(4), 411-418.
AMA	Harmanci A, Kose H, Kurtulmaz Y. On π - Morphic Modules. Hacettepe Journal of Mathematics and Statistics. April 2013;42(4):411-418.
Chicago	Harmanci, A., H. Kose, and Y. Kurtulmaz. “On π - Morphic Modules”. Hacettepe Journal of Mathematics and Statistics 42, no. 4 (April 2013): 411-18.
EndNote	Harmanci A, Kose H, Kurtulmaz Y (April 1, 2013) On π - Morphic Modules. Hacettepe Journal of Mathematics and Statistics 42 4 411–418.
IEEE	A. Harmanci, H. Kose, and Y. Kurtulmaz, “On π - Morphic Modules”, Hacettepe Journal of Mathematics and Statistics, vol. 42, no. 4, pp. 411–418, 2013.
ISNAD	Harmanci, A. et al. “On π - Morphic Modules”. Hacettepe Journal of Mathematics and Statistics 42/4 (April 2013), 411-418.
JAMA	Harmanci A, Kose H, Kurtulmaz Y. On π - Morphic Modules. Hacettepe Journal of Mathematics and Statistics. 2013;42:411–418.
MLA	Harmanci, A. et al. “On π - Morphic Modules”. Hacettepe Journal of Mathematics and Statistics, vol. 42, no. 4, 2013, pp. 411-8.
Vancouver	Harmanci A, Kose H, Kurtulmaz Y. On π - Morphic Modules. Hacettepe Journal of Mathematics and Statistics. 2013;42(4):411-8.