On Fine Rings and Their Relationship with Clean, Nil-Clean and Polynomial Ring Extensions
DOI:
https://doi.org/10.59992/IJSR.2026.v5n6p27الكلمات المفتاحية:
Fine، Clean، Nil-Clean and Polynomial Ringالملخص
The structural characteristics of fine rings and their connections to polynomial rings, clean rings, and nil-clean rings are examined in this study. One important class that is closely connected to simple rings is fine rings, which are defined via decompositions involving units and nilpotent elements. We examine whether the fine property is preserved under polynomial extensions and show that, in general, polynomial rings fail to retain this property. Furthermore, we analyze the connections between fine, clean, and nil-clean rings, highlighting that while every fine is structurally rigid and linked to simplicity, clean and nil-clean rings exhibit more flexible behavior, especially in the presence of nilpotent elements. In particular, we study rings of the form Fq[x]/(xn), establishing conditions under which they are clean or nil-clean, and explaining why they are not fine. The results provide a clearer structural comparison between these classes and suggest directions for further research in decomposition theory and ring extensions.
المراجع
1. Ashrafi, N., & Nasibi, E. (2011). r -Clean rings. arXiv preprint arXiv:1104.2167.
2. Atiyah, M. F., & Macdonald, I. G. (2018). Introduction to commutative algebra. CRC press.
3. Azumaya, G. (1946). New foundation of the theory of simple rings. Proceedings of the Japan Academy, 22(8-11), 325-332.
4. Cǎlugǎreanu, G., & Lam, T. Y. (2016). Fine rings: A new class of simple rings. Journal of Algebra and Its Applications, 15(09), 1650173.
5. Diesl, A. J. (2013). Nil clean rings. Journal of algebra, 383, 197-211.
6. Evyatar, A., & Zaks, A. (1970). Rings of polynomials. Proceedings of the American Mathematical Society, 25(3), 559-562.
7. Durbin, J. R. (2008). Modern algebra: An introduction. John Wiley & Sons.
8. Han, J., & Nicholson, W. K. (2001). Extensions of clean rings. Communications in Algebra, 29(6), 2589-2595.
9. Immormino, N. A., & McGovern, W. W. (2014). Examples of clean commutative group rings. Journal of Algebra, 405, 168-178.
10. Bosch, S. (2018). Rings and Polynomials. In Algebra: From the Viewpoint of Galois Theory (pp. 23-81). Cham: Springer International Publishing.
11. Nicholson, W. K., & Zhou, Y. (2005). Clean general rings. Journal of Algebra, 291(1), 297-311.
12. Patterson, E. M. (1972). A First Course in Rings and Ideals. By David M. Burton. Pp. viii, 309.£ 4· 90 1970.(Addison-Wesley.). The Mathematical Gazette, 56(396), 170-171.
13. Adamson, I. T. (2007). Introduction to field theory. Courier Corporation.
14. Stancu, A. (2015). On some constructions of nil-clean, clean and exchange rings. Journal of Algebra and Its Applications, 14(07), 1550101.
15. Venkatachalam, V., & Chelliah, S. (2023). Amalgamated rings with semi nil-clean properties. Gulf Journal of Mathematics, 14(1), 173-181.