References
- Akalan, E., Vas, L. (2013). Classes of almost clean rings. Algebra Represent. Theor. 16:843–857.
- Amitsur, S. A. (1956). Radicals of polynomial rings. Canad. J. Math. 8:355–361.
- Azarpanah, F., Karamzadeh, O. A. S., Rezai Aliabad, A. (2000). On ideals consisting entirely of zero divisors. Commun. Algebra 28:1061–1073.
- Banerjee, B., Ghosh, S. K., Henriksen, M. (2009). Unions of minimal prime ideals in rings of continuous functions on compact spaces. Algebra Universalis 62:239–246.
- Birkenmeier, G. F. (1976). On the cancellation of quasi-injective modules. Commun. Algebra 4:101–109.
- Birkenmeier, G. F., Kim, J. Y., Park, J. K. (2001). Principally quasi-Baer rings. Commun. Algebra 29:639–660.
- Camillo, V. P., Khurana, D. (2001). A characterization of unit regular rings. Commun. Algebra 29:2293–2295.
- Chin, A. Y. M. (2009). Clean elements in abelian rings. Proc. Indian Acad. Sci. (Math. Sci.) 119:145–148.
- Cohn, P. M. (1958). Rings of zero divisors. Proc. Am. Math. Soc 9:914–919.
- Faith, C., Pillay, P. (1990). Classification of Commutative FPF Rings. Notas de Matemtica [Mathematical Notes]. Vol. 4. Murcia: Universidad de Murcia, Secretariado de Publicaciones e Intercambio Cientfico.
- Gillman, L., Jerison, M. (1976). Rings of Continuous Functions. Graduate Texts in Mathametics, Vol. 43. Berlin/Heidelberg/New York: Springer Verlag.
- Han, J., Nicholson, W. K. (2001). Extensions of clean rings. Commun. Algebra 29:2589–2595.
- Herstein, I. N. (1953). A theorem on rings. Canad. J. Math. 5:238–241.
- Jacobson, N. (1964). Structure of Rings. Rev. ed., American Mathematical Society Colloquium Publications, Vol. 37, Providence, R.I.: American Mathematical Society.
- Karamzadeh, N. S., Karamzadeh, O. A. S. (2010). On Artinian modules over duo rings. Commun. Algebra 38:3521–3531.
- Khurana, D., Lam, T. Y., Nielsen, P. P., Zhou, Y. (2015). Uniquely clean elements in rings. Commun. Algebra 43:1742–1751.
- Knox, M. L., Levy, R., McGovern, W. Wm., Shapiro, J. (2009). Generalizations of complemented rings with applications to rings of functions. J. Algebra Appl. 8:17–40.
- Lawrence, J. (1974). A singular primitive ring. Proc. Am. Math. Soc. 45:59–62.
- Lucas, T. G. (2006). The diameter of a zero divisor graph. J. Algebra 301:174–193.
- McGovern, W. Wm. (2003). Clean semiprime f-rings with bounded inversion. Commun. Algebra 31:3295–3304.
- Nicholson, W. K. (1977). Lifting idempotents and exchange rings. Trans. Am. Math. Soc 229:269–278.
- Nicholson, W. K. (1999). Strongly clean rings and fitting’s lemma. Commun. Algebra 27:3583–3592.
- Osofsky, B. (1967). A non-trivial ring with non-rational injective hull. Canad. Math. Bull. 10:275–282.
- Satyanarayana, M. (1968). Local quotient rings. Proc. Am. Math. Soc 19:3583–3592.
- Yue Chi Ming, R. (1987). On von Neumann regular rings, XI. Bull. Math. de la Soc. Sci. Math. de la R. S. de Roumanie. 31(1):79–85.