Abstract
References
- [1] D. K. Basnet and J. Bhattacharyya, Nil clean index of rings, Int. Electron. J.
- Algebra, 15 (2014), 145–156.
- [2] S. Breaz, G. C˘alug˘areanu, P. Danchev and T. Micu, Nil-clean matrix rings,
- Linear Algebra Appl., 439(10) (2013), 3115–3119.
- [3] S. Breaz, P. Danchev and Y. Zhou, Rings in which every element is either a
- sum or a difference of a nilpotent and an idempotent, J. Algebra Appl., 15(8) (2016), 1650148, 11 pp.
- [4] S. Breaz and G. C. Modoi, Nil-clean companion matrices, Linear Algebra Appl., 489 (2016), 50–60.
- [5] H. Chen, On uniquely clean rings, Comm. Algebra, 39(1) (2011), 189–198
- [6] P. V. Danchev, Weakly UU rings, Tsukuba J. Math., 40(1) (2016), 101–118.
- [7] P. V. Danchev and W. Wm. McGovern, Commutative weakly nil clean unital rings, J. Algebra, 425 (2015), 410-422.
- [8] A. J. Diesl, Nil clean rings, J. Algebra, 383 (2013), 197–211.
- [9] T. Y. Lam, A First Course in Noncommutative Rings, Second Edition, Grad.
- Texts in Math., 131, Springer-Verlag, New York, 2001.
- [10] T. K. Lee and Y. Zhou, Clean index of rings, Comm. Algebra, 40(3) (2012), 807–822.
- [11] T. K. Lee and Y. Zhou, Rings of clean index 4 and applications, Comm. Algebra,
- 41(1) (2013), 238–259.
- [12] J. Ster, Nil clean involutions, arXiv preprint, (2015).
Abstract
We introduce and study the weakly nil-clean index associated to a
ring. We also give some simple properties of this index and show that rings with
the weakly nil-clean index 1 are precisely those rings that are abelian weakly
nil-clean, thus showing that they coincide with uniquely weakly nil-clean rings.
Next, we define certain types of nilpotent elements and weakly nil-clean decompositions
by obtaining some results when the weakly nil-clean index is at
most 2 and, moreover, we somewhat characterize rings with weakly nil-clean
index 2. After that, we compute the weakly nil-clean index for T2(Zp), T3(Zp)
and M2(Z3), respectively, as well as we establish a result on the weakly nilclean
index of Mn(R) whenever R is a ring. Our results considerably extend
and correct the corresponding ones from [Int. Electron. J. Algebra 15(2014),
145–156]
References
- [1] D. K. Basnet and J. Bhattacharyya, Nil clean index of rings, Int. Electron. J.
- Algebra, 15 (2014), 145–156.
- [2] S. Breaz, G. C˘alug˘areanu, P. Danchev and T. Micu, Nil-clean matrix rings,
- Linear Algebra Appl., 439(10) (2013), 3115–3119.
- [3] S. Breaz, P. Danchev and Y. Zhou, Rings in which every element is either a
- sum or a difference of a nilpotent and an idempotent, J. Algebra Appl., 15(8) (2016), 1650148, 11 pp.
- [4] S. Breaz and G. C. Modoi, Nil-clean companion matrices, Linear Algebra Appl., 489 (2016), 50–60.
- [5] H. Chen, On uniquely clean rings, Comm. Algebra, 39(1) (2011), 189–198
- [6] P. V. Danchev, Weakly UU rings, Tsukuba J. Math., 40(1) (2016), 101–118.
- [7] P. V. Danchev and W. Wm. McGovern, Commutative weakly nil clean unital rings, J. Algebra, 425 (2015), 410-422.
- [8] A. J. Diesl, Nil clean rings, J. Algebra, 383 (2013), 197–211.
- [9] T. Y. Lam, A First Course in Noncommutative Rings, Second Edition, Grad.
- Texts in Math., 131, Springer-Verlag, New York, 2001.
- [10] T. K. Lee and Y. Zhou, Clean index of rings, Comm. Algebra, 40(3) (2012), 807–822.
- [11] T. K. Lee and Y. Zhou, Rings of clean index 4 and applications, Comm. Algebra,
- 41(1) (2013), 238–259.
- [12] J. Ster, Nil clean involutions, arXiv preprint, (2015).
Details
| Subjects | Mathematical Sciences |
|---|---|
| Journal Section | Articles |
| Authors | |
| Publication Date | January 17, 2017 |
| Published in Issue | Year 2017 Volume: 21 Issue: 21 |