References
- Albu, T., Iosif, M., Tercan, A. (2016). The conditions (Ci) in modular lattices and applications. J. Algebra Appl. 40: 1650001, 19 pp.
- Anderson, F. W., Fuller, K. R. (1992). Rings and Categories of Modules. New York: Springer-Verlag.
- Birkenmeier, G. F., Müller, B. J., Rizvi, S. T. (2002). Modules in which every fully invariant submodules essential in a direct summand. Commun. Algebra 30(3):1395–1415.
- Birkenmeier, G. F., Tercan, A., Yücel, C. C. (2014). The extending condition relative to sets of submodules. Commun. Algebra 42:764–778.
- Brickell, F., Clark, R. S. (1970). Differentiable Manifolds. London: Van Nostrand Reinhold.
- Crivei, S., Şahinkaya, S. (2014). Modules whose closed submodules with essential socle are direct summands. Taiwanese J. Math. 18:989–1002.
- Dauns, J., Zhou, Y. (2005). Type submodules and direct sum decompositions of modules. Rocky Mount. J. Math. 35(1):83–104.
- Dung, N. V., Huynh, D. V., Smith, P. F., Wisbauer, R. (1994). Extending Modules. Harlow: Longman.
- Goodearl, K. R. (1976). Ring Theory: Nonsingular Rings and Modules. New York: Dekker.
- Kaplansky, I. (1969). Infinite Abelian Groups. Ann Arbor: University of Michigan Press.
- Mohammed, S., Müller, B. J. (1990). Continuous and Discrete Modules. Cambridge: Cambridge Univ. Press.
- Smith, P. F. (1990). CS-Modules and Weak CS-Modules, Noncommutative Ring Theory. Springer Lecture Notes in Math., Vol. 1448. Berlin: Springer-Verlag, pp. 99–115.
- Smith, P. F., Tercan, A. (1993). Generalizations of CS-modules. Commun. Algebra 21(6):1809–1847.
- Smith, P. F., Tercan, A. (2004). Direct summands of modules which satisfy (C11). Algebra Colloq. 11(2):231–237.
- Tercan, A. (1995). On CLS-modules. Rocky Mount. J. Math. 25(4):1557–1564.
- Tercan, A., Yücel, C. C. (2016). Module Theory, Extending Modules and Generalizations. Basel: Birkhäuser.