References
- Anderson, D. D., Anderson, D. F., Markanda, R. (1985). The rings R(X) and R〈X〉. J. Algebra 95(1):96–115.
- Anderson, D. D., Winders, M. (2009). Idealization of a module. J. Commut. Algebra 1(1):3–56.
- Bazzoni, S., Sarah, G. (2006). Prüfer Rings, Multiplicative Ideal Theory in Commutative Algebra. Springer.
- Bazzoni, S., Glaz, S. (2007). Gaussian properties of total rings of quotients. J. Algebra 310(1):180–193.
- Boynton, J. G. (2008). Pullbacks of Prüfer rings. J. Algebra 320(6):2559–2566.
- Boynton, J. G. (2011). Prüfer conditions and the total quotient ring. Commun. Algebra 39(5):1624–1630.
- Boynton, J. G. (2012). Sather-Wagstaff, Sean Regular pullbacks. Progress in Commutative Algebra. Berlin: Walter de Gruyter.
- Fontana, M., Huckaba, J. A., Papick, I. J. (1997). Prüfer Domains. New York: Marcel Dekker.
- Gilmer, R. (1984). Commutative Semigroup Rings. Chicago Lectures in Mathematics. University of Chicago Press, Chicago, IL.
- Glaz, S., Schwarz, R. (2011). Prüfer conditions in commutative rings. Arab. J. Sci. Eng. 36(6):967–983.
- Klingler, L., Lucas, T., Sharma, M. (2015). Maximally Prüfer rings. Commun. Algebra 43(1):120–129.
- Knebusch, M., Zhang, D. (2002). Manis Valuations and Prüfer Extensions I. A New Chapter in Commutative Algebra. Lecture Notes in Mathematics, 1791. Berlin: Springer.
- Larsen, M., McCarthy, P. (1971). Multiplicative Theory of Ideals. New York: Academic Press.
- Lucas, T. G. (1993). Strong Prüfer rings and the ring of finite fractions. J. Pure Appl. Algebra 84(1):59–71.
- McQuillan, D. L. (1985). Rings of integer-valued polynomials determined by finite sets. Proc. Royal Irish Acad. 85A:177–184.