References
- Arapovic, M. (1983). On the embedding of a commutative ring into a 0-dimensional ring. Glasnik Mat. 18:53–59.
- Arnold, J. T. (1973). Krull dimension in power series rings. Trans. Am. Math. Soc. 177:299–304.
- Arnold, J. T. (1973). Power series rings over Prüfer domains. Pacific J. Math. 44(1):1–11.
- Benhissi, A. (2003). Les anneaux des séries formelles. Queen’s Papers in Pure and Applied Mathematics, Vol. 124. Kingston, ON: Queen’s University.
- Condo, J. T., Coykendall, J., Dobbs, D. E. (1996). Formal power series rings over zero-dimensional SFT-rings. Commun. Algebra 24:2687–2698.
- Eakin, P., Sathaye, A. (1976). R-endomorphisms of R[[X]] are essentially continuous. Pacific J. Math. 66:83–87.
- Fields, D. (1969). Zero divisors and nilpotent elements in power series rings. Proc. Am. Math. Soc. 27:427–433.
- Gilmer, R. (2001). A new criterion for embeddability in a zero-dimensional commutative ring. In: Anderson, D. D., Papick, I. J., eds. Ideal Theoretic Methos in Commutative Algebra. Lecture Notes in Pure and Applied Mathematics, Vol. 220. New York: Marcel Decker, pp. 223–229.
- Gilmer, R., Grams, A., Parker, T. (1975). Zero divisors in power series rings. Zero divisors in power series rings 278/279:145–164.
- Gilmer, R., Heinzer, W. J. (1992). Products of commutative rings and zero dimensionality. Trans. Am. Math. Soc. 331:663–680.
- Hizem, S. (2011). Formal power series over strongly Hopfian rings. Commun. Algebra 39(1):279–291.
- Hizem, S., Benhissi, A. (2011). Nonnil-Noetherian rings and the SFT-property. Rocky Mount. J. Math. 4(5):1483–1500.
- Hmaimou, A., Kaidi, A., Sanchez Campus, A. (2007). Generalized fitting modules and rings. J. Algebra 308:199–214.
- O’Malley, M. (1970). R-automorphisms of R[[X]]. Proc. Lond. Math. Soc. 20:60–78.
- Roitman, M. (2015). Arnold’s theorem on the strongly finite type (SFT) property and the dimension of power series rings. Commun. Algebra 43(1):337–344.