Rings such that, for each unit u, u − u n belongs to the Jacobson radical

M. Tamer Koşan; Truong Cong Quynh; Tülay Yıldırım; Jan žemlička

doi:10.15672/hujms.542574

Research Article

Year 2020, , 1397 - 1404, 06.08.2020

M. Tamer Koşan Truong Cong Quynh Tülay Yıldırım Jan žemlička

https://doi.org/10.15672/hujms.542574

Cited By: 3

Abstract

References

[1] D.D. Anderson, D. Bennis, B. Fahid and A. Shaiea, On n-trivial extensions of rings, Rocky Mountain. J. Math. 47, 2439–2511, 2017.
[2] A. Badawi, On abelian π-regular rings, Comm. Algebra, 25 (4), 1009–1021, 1997.
[3] G.F. Birkenmeier, H.E. Heatherly, and E.K. Lee, Completely prime ideals and associated radicals, Proc. Biennial Ohio State-Denison Conference 1992, edited by S. K. Jain and S. T. Rizvi, World Scientific, Singapore-New Jersey-London-Hong Kong, 102–129, 1993.
[4] G. Calugareanu, UU rings, Carpathian J. Math. 31 (2), 157–163, 2015.
[5] J. Cui and X. Yin, Rings with 2-UJ property, Comm. Algebra, 48 (4), 1382–1391, 2020.
[6] P. Danchev, Rings with Jacobson units, Toyama Math. J. 38, 61–74, 2016.
[7] P. Danchev and T.Y. Lam, Rings with unipotent units, Publ. Math. Debrecen, 88 (3-4), 449–466, 2016.
[8] P. Danchev and J. Matczuk, n-torsion clean rings, in: Rings, modules and codes, Contemp. Math. 727, Amer. Math. Soc. Providence, RI, 71–82, 2019.
[9] J. Han and W.K. Nicholson, Extension of clean rings, Comm. Algebra, 29 (6), 2589– 2595, 2001.
[10] I. Kaplansky, Rings with a polynomial identity, Bull. Amer. Math. Soc. 54 (6), 575– 580, 1948.
[11] M.T. Koşan, The p.p. property of trivial extensions, J. Algebra Appl. 14 (8), 1550124, 5 pp., 2015.
[12] M.T. Koşan, A. Leroy and J. Matczuk, On UJ-rings, Comm. Algebra, 46 (5), 2297– 2303, 2018.
[13] T.Y. Lam, A First Course in Noncommutative Rings (second Ed.), Springer Verlag, New York, 2001.
[14] J. Levitzki, On the structure of algebraic algebras and related rings, Trans. Amer. Math. Soc. 74, 384–409, 1953.
[15] M. Marianne, Rings of quotients of generalized matrix rings, Comm. Algebra, 15 (10), 1991–2015, 1987.
[16] W.K. Nicholson, Semiregular modules and rings, Canad. J. Math. 28 (5), 1105–1120, 1976.
[17] W.K. Nicholson, Lifting idempotents and exchange rings, Trans. Amer. Math. Soc. 229, 269-278, 1977.
[18] W.K. Nicholson, Strongly clean rings and Fittings lemma, Comm. Algebra, 27, 3583– 3592, 1999.
[19] S. Sahinkaya and T. Yildirim, UJ-endomorphism rings, The Mathematica Journal, 60 (83), 186–198, 2018.

Rings such that, for each unit u, u − u n belongs to the Jacobson radical

Year 2020, , 1397 - 1404, 06.08.2020

M. Tamer Koşan Truong Cong Quynh Tülay Yıldırım Jan žemlička

https://doi.org/10.15672/hujms.542574

Cited By: 3

Abstract

A ring R is said to be n-UJ if u − u n ∈ J(R) for each unit u of R, where n > 1 is a fixed integer. In this paper, the structure of n-UJ rings is studied under various conditions. Moreover, the n-UJ property is studied under some algebraic constructions. Mathematics Subject Classification (2010). 16N20, 16D60, 16U60, 16W10

Keywords

UU-ring, UJ-ring, unit, Jacobson radical, clean ring, (semi)regular ring, reduced ring

References

[1] D.D. Anderson, D. Bennis, B. Fahid and A. Shaiea, On n-trivial extensions of rings, Rocky Mountain. J. Math. 47, 2439–2511, 2017.
[2] A. Badawi, On abelian π-regular rings, Comm. Algebra, 25 (4), 1009–1021, 1997.
[3] G.F. Birkenmeier, H.E. Heatherly, and E.K. Lee, Completely prime ideals and associated radicals, Proc. Biennial Ohio State-Denison Conference 1992, edited by S. K. Jain and S. T. Rizvi, World Scientific, Singapore-New Jersey-London-Hong Kong, 102–129, 1993.
[4] G. Calugareanu, UU rings, Carpathian J. Math. 31 (2), 157–163, 2015.
[5] J. Cui and X. Yin, Rings with 2-UJ property, Comm. Algebra, 48 (4), 1382–1391, 2020.
[6] P. Danchev, Rings with Jacobson units, Toyama Math. J. 38, 61–74, 2016.
[7] P. Danchev and T.Y. Lam, Rings with unipotent units, Publ. Math. Debrecen, 88 (3-4), 449–466, 2016.
[8] P. Danchev and J. Matczuk, n-torsion clean rings, in: Rings, modules and codes, Contemp. Math. 727, Amer. Math. Soc. Providence, RI, 71–82, 2019.
[9] J. Han and W.K. Nicholson, Extension of clean rings, Comm. Algebra, 29 (6), 2589– 2595, 2001.
[10] I. Kaplansky, Rings with a polynomial identity, Bull. Amer. Math. Soc. 54 (6), 575– 580, 1948.
[11] M.T. Koşan, The p.p. property of trivial extensions, J. Algebra Appl. 14 (8), 1550124, 5 pp., 2015.
[12] M.T. Koşan, A. Leroy and J. Matczuk, On UJ-rings, Comm. Algebra, 46 (5), 2297– 2303, 2018.
[13] T.Y. Lam, A First Course in Noncommutative Rings (second Ed.), Springer Verlag, New York, 2001.
[14] J. Levitzki, On the structure of algebraic algebras and related rings, Trans. Amer. Math. Soc. 74, 384–409, 1953.
[15] M. Marianne, Rings of quotients of generalized matrix rings, Comm. Algebra, 15 (10), 1991–2015, 1987.
[16] W.K. Nicholson, Semiregular modules and rings, Canad. J. Math. 28 (5), 1105–1120, 1976.
[17] W.K. Nicholson, Lifting idempotents and exchange rings, Trans. Amer. Math. Soc. 229, 269-278, 1977.
[18] W.K. Nicholson, Strongly clean rings and Fittings lemma, Comm. Algebra, 27, 3583– 3592, 1999.
[19] S. Sahinkaya and T. Yildirim, UJ-endomorphism rings, The Mathematica Journal, 60 (83), 186–198, 2018.

There are 19 citations in total.

Details

Primary Language	English
Subjects	Mathematical Sciences
Journal Section	Mathematics
Authors	M. Tamer Koşan 0000-0002-5071-4568 Truong Cong Quynh 0000-0002-0845-0175 Tülay Yıldırım 0000-0002-7289-5064 Jan žemlička This is me 0000-0003-3319-5193
Publication Date	August 6, 2020
Published in Issue	Year 2020

Cite

APA	Koşan, M. T., Quynh, T. C., Yıldırım, T., žemlička, J. (2020). Rings such that, for each unit u, u − u n belongs to the Jacobson radical. Hacettepe Journal of Mathematics and Statistics, 49(4), 1397-1404. https://doi.org/10.15672/hujms.542574
AMA	Koşan MT, Quynh TC, Yıldırım T, žemlička J. Rings such that, for each unit u, u − u n belongs to the Jacobson radical. Hacettepe Journal of Mathematics and Statistics. August 2020;49(4):1397-1404. doi:10.15672/hujms.542574
Chicago	Koşan, M. Tamer, Truong Cong Quynh, Tülay Yıldırım, and Jan žemlička. “Rings Such That, for Each Unit U, U − U N Belongs to the Jacobson Radical”. Hacettepe Journal of Mathematics and Statistics 49, no. 4 (August 2020): 1397-1404. https://doi.org/10.15672/hujms.542574.
EndNote	Koşan MT, Quynh TC, Yıldırım T, žemlička J (August 1, 2020) Rings such that, for each unit u, u − u n belongs to the Jacobson radical. Hacettepe Journal of Mathematics and Statistics 49 4 1397–1404.
IEEE	M. T. Koşan, T. C. Quynh, T. Yıldırım, and J. žemlička, “Rings such that, for each unit u, u − u n belongs to the Jacobson radical”, Hacettepe Journal of Mathematics and Statistics, vol. 49, no. 4, pp. 1397–1404, 2020, doi: 10.15672/hujms.542574.
ISNAD	Koşan, M. Tamer et al. “Rings Such That, for Each Unit U, U − U N Belongs to the Jacobson Radical”. Hacettepe Journal of Mathematics and Statistics 49/4 (August 2020), 1397-1404. https://doi.org/10.15672/hujms.542574.
JAMA	Koşan MT, Quynh TC, Yıldırım T, žemlička J. Rings such that, for each unit u, u − u n belongs to the Jacobson radical. Hacettepe Journal of Mathematics and Statistics. 2020;49:1397–1404.
MLA	Koşan, M. Tamer et al. “Rings Such That, for Each Unit U, U − U N Belongs to the Jacobson Radical”. Hacettepe Journal of Mathematics and Statistics, vol. 49, no. 4, 2020, pp. 1397-04, doi:10.15672/hujms.542574.
Vancouver	Koşan MT, Quynh TC, Yıldırım T, žemlička J. Rings such that, for each unit u, u − u n belongs to the Jacobson radical. Hacettepe Journal of Mathematics and Statistics. 2020;49(4):1397-404.

Hacettepe Journal of Mathematics and Statistics

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Rings such that, for each unit u, u − u n belongs to the Jacobson radical

Abstract

Keywords

References

Details

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