[[1] M. Alkan, On τ-lifting and τ-semiperfect modules, Turkish J. Math. 33 (2009), 117–130.]Search in Google Scholar
[[2] I. Al-Khazzi and P. F. Smith, Modules with chain condition on superfeluous submodules, Comm. Algebra, 19(8) (1991), 2331–2351.10.1080/00927879108824262]Search in Google Scholar
[[3] G. F. Birkenmeier, F. Takil Mutlu, C. Nebiyev, N. Sokmez and A. Tercan, Goldie*-supplemented modules, Glasg. Math. J. 52 A (2010), 41–52.10.1017/S0017089510000212]Search in Google Scholar
[[4] J. Clark, C. Lomp, N. Vanaja and R. Wisbauer, Lifting Modules. Supplements and Projectivity in Module Theory, Front. Math., Birkhäuser, Basel, (2006).]Search in Google Scholar
[[5] A. Harmanci, D. Keskin and P. F. Smith, On ⊕-supplemented modules, Acta Math. Hungar. 83 (1999), 161–169.10.1023/A:1006627906283]Search in Google Scholar
[[6] D. Keskin, On lifting modules, Comm. Algebra 28(7) (2000), 3427–3440.10.1080/00927870008827034]Search in Google Scholar
[[7] D. Keskin, Characterizations of right perfect rings by ⊕-supplemented modules, Cont. Math. 259 (2000), 313–318.10.1090/conm/259/04103]Search in Google Scholar
[[8] D. Keskin, M. J. Nematollahi and Y. Talebi, On H-supplemented modules, Algebra Colloq. 18(Spec 1) (2011), 915–924.10.1142/S1005386711000794]Search in Google Scholar
[[9] M. T. Koşan and D. Keskin, H-supplemented duo modules, J. Algebra Appl. 6(6) (2007), 965–971.10.1142/S0219498807002582]Search in Google Scholar
[[10] S. H. Mohamed and B. J. Müller, Continuous and Discrete Modules, London Math. Soc. LNS 147 Cambridge Univ. Press, Cambridge, (1990).10.1017/CBO9780511600692]Search in Google Scholar
[[11] R. Y. Sharp, Steps in Commutative Algebra, London Math. Soc. 19, (1990).]Search in Google Scholar
[[12] Y. Wang and N. Ding, Generalized supplemented modules, Taiwanese J. Math. 10(6) (2006), 1589–1601.10.11650/twjm/1500404577]Search in Google Scholar
[[13] R. B. Warfield Jr., Decomposability of finitely presented modules, Proc. Amer. Math. Soc. 25 (1970), 167–172.10.1090/S0002-9939-1970-0254030-4]Search in Google Scholar
[[14] R. Wisbauer, Foundations of Module and Ring Theory, Gordon and breach, Philadelphia (1991).]Search in Google Scholar