Cofinitely Semisimple (ss-) Lifting Modules
Öz
An $P-$module $N$ is named cofinitely semisimple lifting or briefly cofinitely $ss-$lifting if for each cofinite submodule $S$ of $N$, $N$ has a decomposition $N=U'\oplus V$ such that $U'\subseteq S$ and $S\cap V\subseteq Soc_{s}(V)$. In this study, equivalent conditions to this definition are given. In addition, the basic features of this concept defined in this article are examined.
Anahtar Kelimeler
Cofinitely ss-lifting module, Semisimple module, ss-supplemented module
Kaynakça
- Eryılmaz, F. (2021). SS-lifting modules and rings. Miskolc Mathematical Notes, 22(2), 655-662. doi:10.18514/mmn.2021.3245
- Kasch, F. (1982). Modules and Rings. London, UK: Academic Press Inc.
- Kaynar, E., Turkmen, E., & Çalışıcı, H. (2020). SS-supplemented modules. Communications Faculty of Sciences, University of Ankara, Series A1, Mathematics and Statistics, 69(1), 473 485. doi:10.31801/cfsuasmas.585727
- Keskin, D. (2000). On lifting modules. Communications in Algebra, 28(7),3427-3440. doi:10.1080/00927870008827034
- Mohamed, S. H., & Müller, B. J. (1990). Continuous and Discrete Modules. Cambridge, England: Cambridge University Press.
- Türkmen, B. N., & Türkmen, E. (2020). supplemented modules and rings. Analele ştiinţifice ale Universităţii "Ovidius" Constanţa. Seria Matematică, 28(3), 193-216. doi:10.2478/auom-2020-0041
- Türkmen, B. N., & Kılıç, B. (2022). On cofinitely ss-supplemented modules. Algebra and Discrete Mathematics, 34(1), 141-151. doi:10.12958/adm1668
- Tribak, R. (2008). On cofinitely lifting and cofinitely weak lifting modules. Communications in Algebra, 36(12), 4448-4460. doi:10.1080/00927870802179552
- Sözen, E. Ö. (2022). A study on Ss-semilocal modules in view of singularity. Malaya Journal of Matematik, 10(1), 90-97. doi:10.26637/mjm1001/008
- Özcan, A. Ç., Harmancı, A., & Smith, P. F. (2006). Duo modules. Glasgow Mathematical Journal, 48(3), 533-545. doi:10.1017/S0017089506003260