References
- Alvarado-García, A., Rincón Mejía, H. A., Ríos-Montes, J. (2010). On big lattices of classes of R-modules defined by closure properties. In: Van Huynh, D., López-Permouth, S. R. eds. Advances in Ring Theory. Trends in Mathematics. Basel: Birkhäuser, pp. 19–36.
- Amini, A., Amini, B. (2012). On Strongly Superfluous Submodules. Commun. Algebra 40(8):2906–2919.
- Dauns, J., Zhou, Y. (2006). Classes of Modules. Chapman and Hall/CRC Taylor and Francis Group, Boca Ratón: London, New York.
- Füller, K. (1974). Density and Equivalence. J. Algebra 29(3):528–550.
- Golan, J. S. (1987). Linear Topologies on a Ring: An Overview. England: Longman Scientific & Technical.
- Grätzer, G. (2009). Lattice Theory: First Concepts and Distributive Lattices. Mineola, New York: Dover Publications.
- Kashu, A. I. (1969). Closed classes of left A-modules and closed sets of left ideals of ring A. Mat. Z. 5(3):381–390.
- Leonard, W. W. (1966). Small modules. Proc. Am. Math. Soc. 17:527–531.
- Raggi, F., Rincón, H., Signoret, C. (1999). On some classes of R-modules and congruences in R-tors. Commun. Algebra 27(2):889–901.
- Raggi, F., Ríos, J., Wisbauer, R. (2001). The lattice structure of hereditary pretorsion classes. Commun. Algebra 29(1):131–140.
- Raggi, F., Signoret, C. (1996). Serre subcategories of R-Mod. Commun. Algebra 24(9):2877–2886.
- Raggi, F., Signoret, C. (1998). Serre subcategories and linear filters. Kyungpook Math. J. 38(2):411–419.
- Simmons, H. (2014). An Introduction to Idioms. Notes from School of Mathematics. England: University of Manchester. http://www.cs.man.ac.uk/hsimmons.
- Smith, P. F. (1990). Modules with many direct summands. Osaka J. Math. 27:253–264.
- Stenström, B. (1975). Rings of Quotients. New York: Springer-Verlag.
- Viola-Prioli, A., Viola-Prioli, J., Wisbauer, R. (1994). Module categories with linearly ordered closed subcategories. Commun. Algebra 22(9):3613–3627.
- Viola-Prioli, A., Viola-Prioli, J., Wisbauer, R. (1995). A description of closed subcategories of σ[M]. Commun. Algebra 23(11):4173–4188.
- Walker, C., Walker, E. (1972). Quotient Categories and Rings of Quotients. Rocky Mountain J. Math. 2(4):513–555.