Abstract
One of the generalizations of supplemented modules is the Goldie*-supplemented module, defined by Birkenmeier et al. using $\beta^{\ast}$ relation. In this work, we deal with the concept of the cofinitely Goldie*-supplemented modules as a version of Goldie*-supplemented module. A left $R$-module $M$ is called a cofinitely Goldie*-supplemented module if there is a supplement submodule $S$ of $M$ with $C\beta^{\ast}S$, for each cofinite submodule $C$ of $M$. Evidently, Goldie*-supplemented are cofinitely Goldie*-supplemented. Further, if $M$ is cofinitely Goldie*-supplemented, then $M/C$ is cofinitely Goldie*-supplemented, for any submodule $C$ of $M$. If $A$ and $B$ are cofinitely Goldie*-supplemented with $M=A\oplus B$, then $M$ is cofinitely Goldie*-supplemented. Additionally, we investigate some properties of the cofinitely Goldie*-supplemented module and compare this module with supplemented and Goldie*-supplemented modules.
Keywords
Cofinitely supplemented module Goldie*-supplemented module cofinitely Goldie*-supplemented module
References
- R. Alizade, G. Bilhan, P. F. Smith, \emph{Modules whose Maximal Submodules have Supplements}, Communication in Algebra 29 (6) (2001) 2389--2405.
- P. F. Smith, \emph{Finitely Generated Supplemented Modules are Amply Supplemented}, Arabian Journal for Science and Engineering 25 (2) (2000) 69--79.
- G. Bilhan, \emph{Totally Cofinitely Supplemented Modules}, International Electronic Journal of Algebra 2 (2007) 106--113.
- R. Alizade, E. Büyükaşık, \emph{Cofinitely Weak Supplemented Modules}, Communication in Algebra 31 (11) (2003) 5377--5390.
- Y. Talebi, R. Tribak, A. R. M. Hamzekolaee, \emph{On H-Cofinitely Supplemented Modules}, Bulletin of the Iranian Mathematical Society 39 (2) (2013) 325--346.
- T. Koşan, \emph{$H$-Cofinitely Supplemented Modules}, Vietnam Journal of Mathematics 35 (2) (2007) 215--222.
- F. Ery{\i}lmaz, Ş. Eren, \emph{On Cofinitely Weak Rad-Supplemented Modules}, Communications Faculty of Sciences University of Ankara Series A1 Mathematics and Statistic 66 (1) (2017) 92--97.
- G. F. Birkenmeier, F. T. Mutlu, C. Nebiyev, N. S\"{o}kmez, A. Tercan, \emph{Goldie*-Supplemented Mo\-du\-les}, Glasgow Mathematical Journal 52 (A) (2010) 41--52.
- N. S\"{o}kmez, \emph{Goldie*-Supplemented and Goldie*-Radical Supplemented Modules}, Doctoral Dissertation Ondokuz May{\i}s University (2011) Samsun.
- Y. Talebi, A. R. Moniri Hamzekolaee, A. Tercan, \emph{Goldie-Rad-Supplemented Modules}, Analele Stiintifice ale Universitatii Ovidius Constanta 22 (3) (2014) 205--218.
- F. Takıl Mutlu, \emph{Amply (weakly) Goldie-Rad-Supplemented Modules}, Algebra and Discrete Mathematics 22 (1) (2016) 94--101.
- R. Wisbauer, Foundations of Module and Ring Theory, Gordon and Breach Science Publishers, Reading, 1991.
- J. Clark, C. Lomp, N. Vanaja, R. Wisbauer, Lifting Modules: Supplements and Projectivity in Module Theory, Birkh\"{a}user, Basel, 2006.
- U. Acar, A. Harmanc{\i}, \emph{Principally Supplemented Modules}, Albanian Journal of Mathematics 4 (3) (2010) 79--88.
- T. Y. Lam, Lectures on Modules and Rings, Springer, New York, 1999.
Abstract
References
- R. Alizade, G. Bilhan, P. F. Smith, \emph{Modules whose Maximal Submodules have Supplements}, Communication in Algebra 29 (6) (2001) 2389--2405.
- P. F. Smith, \emph{Finitely Generated Supplemented Modules are Amply Supplemented}, Arabian Journal for Science and Engineering 25 (2) (2000) 69--79.
- G. Bilhan, \emph{Totally Cofinitely Supplemented Modules}, International Electronic Journal of Algebra 2 (2007) 106--113.
- R. Alizade, E. Büyükaşık, \emph{Cofinitely Weak Supplemented Modules}, Communication in Algebra 31 (11) (2003) 5377--5390.
- Y. Talebi, R. Tribak, A. R. M. Hamzekolaee, \emph{On H-Cofinitely Supplemented Modules}, Bulletin of the Iranian Mathematical Society 39 (2) (2013) 325--346.
- T. Koşan, \emph{$H$-Cofinitely Supplemented Modules}, Vietnam Journal of Mathematics 35 (2) (2007) 215--222.
- F. Ery{\i}lmaz, Ş. Eren, \emph{On Cofinitely Weak Rad-Supplemented Modules}, Communications Faculty of Sciences University of Ankara Series A1 Mathematics and Statistic 66 (1) (2017) 92--97.
- G. F. Birkenmeier, F. T. Mutlu, C. Nebiyev, N. S\"{o}kmez, A. Tercan, \emph{Goldie*-Supplemented Mo\-du\-les}, Glasgow Mathematical Journal 52 (A) (2010) 41--52.
- N. S\"{o}kmez, \emph{Goldie*-Supplemented and Goldie*-Radical Supplemented Modules}, Doctoral Dissertation Ondokuz May{\i}s University (2011) Samsun.
- Y. Talebi, A. R. Moniri Hamzekolaee, A. Tercan, \emph{Goldie-Rad-Supplemented Modules}, Analele Stiintifice ale Universitatii Ovidius Constanta 22 (3) (2014) 205--218.
- F. Takıl Mutlu, \emph{Amply (weakly) Goldie-Rad-Supplemented Modules}, Algebra and Discrete Mathematics 22 (1) (2016) 94--101.
- R. Wisbauer, Foundations of Module and Ring Theory, Gordon and Breach Science Publishers, Reading, 1991.
- J. Clark, C. Lomp, N. Vanaja, R. Wisbauer, Lifting Modules: Supplements and Projectivity in Module Theory, Birkh\"{a}user, Basel, 2006.
- U. Acar, A. Harmanc{\i}, \emph{Principally Supplemented Modules}, Albanian Journal of Mathematics 4 (3) (2010) 79--88.
- T. Y. Lam, Lectures on Modules and Rings, Springer, New York, 1999.
Details
| Primary Language | English |
|---|---|
| Subjects | Mathematical Sciences |
| Journal Section | Research Article |
| Authors | |
| Publication Date | June 30, 2023 |
| Submission Date | March 5, 2023 |
| Published in Issue | Year 2023 Issue: 43 |
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