Advanced search
Publication Cover
Communications in Algebra Volume 47, 2019 - Issue 5
Submit an article Journal homepage
202
Views
2
CrossRef citations to date
0
Altmetric
Original Articles

N-commuting mappings on (semi)-prime rings with applications

Shakir AliDepartment of Mathematics, Faculty of Science, King Abdulaziz University, Jeddah, Saudi Arabia; Correspondence[email protected]
,
Mohammad AshrafDepartment of Mathematics, Faculty of Science, Aligarh Muslim University, Aligarh, India;
,
Mohd Arif RazaDepartment of Mathematics, Faculty of Science & Arts-Rabigh, King Abdulaziz University, Jeddah, Saudi Arabia
&
Abdul Nadim KhanDepartment of Mathematics, Faculty of Science & Arts-Rabigh, King Abdulaziz University, Jeddah, Saudi Arabia
Pages 2262-2270 | Received 16 Oct 2017, Accepted 27 Sep 2018, Published online: 11 Jan 2019

References

  • Ali, S. On n−skew-commuting mappings of prime rings with applications to C*-algebras. preprint.
  • Ali, S., Dar, N. A. (2014). On *-centralizing mappings in rings with involution. Georgian. Math. J. 21(1): 25–28.
  • Ali, A., Yasen, M. (2005). A note automorphisms of prime and semprime rings. J. Math. Kyoto Univ. 45(2): 243–246.
  • Ara, P., Mathieu, M. (1993). An application of local multipliers to centralizing mappings of C*-algebras. Q J. Math. 44(2): 129–138.
  • Ashraf, M., Raza, M. A., Parry, S. (2018). Commutators having idempotent values with automorphisms in semi-prime rings. Math. Rep. 20(70): 51–57.
  • Beidar, K. I., Bresar, M. (2001). Extended Jacobson density theorem for rings with automorphisms and derivations. Isr. J. Math. 122(1): 317–346.
  • Beidar, K. I., Fong, Y., Lee, P. H., Wong, T. L. (1997). On additive maps of prime rings satisfying the Engel condition. Comm. Algebra 25(12): 3889–3902.
  • Beidar, K. I., Martindale, W. S., III, Mikhalev, A. V. (1996). Rings with Generalized Identities, Pure and Applied Mathematics, Vol. 196. New York: Marcel Dekker.
  • Bell, H. E., Lucier, J. (1999). On additive mappings and commutativity in rings. Results Math. 36(1–2): 1–8.
  • Bell, H. E., Martindale, W. S. III. (1987). Centralizing mappings of semiprime rings. Can. Math. Bull. 30(1): 92–101.
  • Brešar, M. (1993). Centralizing mappings and derivations in prime rings. J. Algebra 156: 385–394.
  • Brešar, M. (1993). On skew-commuting mapping of rings. BAZ 47(2): 291–296.
  • Brešar, M., Hvala, B. (1995). On additive maps of prime rings. BAZ. 51(3): 377–381.
  • Brešar, M., Hvala, B. (1999). On additive maps of prime rings II. Publ. Math. Debrecen 54: 39–54.
  • Brešar, M., Cheboter, M. A., Martinadale III, W. S. (2007). Functional Identities. Basel: Birkhauser.
  • Carini, L., De Filippis, V. (2000). Commutators with power Central values on a lie ideals. Pac. J. Math. 193(2): 269–278.
  • Chuang, C. L. (1992). Differential identities with automorphism and anti-automorphism-I. J. Algebra 149(2): 371–404.
  • Chuang, C. L. (1993). Differential identities with automorphism and anti-automorphism-II. J. Algebra 160: 291–335.
  • Dhara, B., Ali, S. (2012). On n-centralizing generalized derivations in semiprime rings with applications to C*-algebras. J. Algebra Appl. 11(6): 1–11.
  • Deng, Q. (1993). On N-Centralizing Mappings of Prime rings. Proc. R. Ir. Acad. 93A(2): 171–176.
  • Deng, Q., Bell, H. E. (1995). On derivations and commutativity in semiprime rings. Commun. Algebra 23(10): 3705–3713.
  • Divinsky, N. (1955). On commuting automorphisms of rings. Trans. Roy. Soc. Can. Sect. III. 49(3): 19–22.
  • Erickson, T. S., Martindale, W. S., III., Osborn, J. M. (1975). Prime nonassociative algebras. Pac. J. Math. 60(1): 49–63.
  • Fošner, A., Vukman, J. (2011). Some results concerning additive mappings and derivations on semiprime rings. Publ. Math. Debrecen 78(3–4): 575–581.
  • Fošner, M. (2015). Result concerning additive mappings in semiprime rings. Math. Slov. 65: 1271–1276.
  • Herstein, I. N. (1965). Topics in Ring Theory. Chicago, London: The University of Chicago Press.
  • Jacobson, N. (1964). Structure of rings. American Mathematical Society Colloquium Publications. Vol. 37. Revised edition. Providence, R.I.: American Mathematical Society.
  • Jacobson, N. (1975). PI-Algebras, Lecture Notes in Mathematics. New York: Springer.
  • Hirano, Y., Kaya, A., Tominaga, H. (1983). On a theorem of Mayne. Math. J. Okayama Univ. 25: 125–132.
  • Kaya, A. (1985). A theorem on semi-centralizing derivations of prime rings. Math. J. Okayama Univ. 27: 11–12.
  • Kaya, A., Koc, C. (1981). Semi-centralizing automorphisms of prime rings. Acta Math. Acad. Sci. Hungar. 38(1–4): 53–55.
  • Kharchenko, V. K. (1975). Generalized identities with automorphisms. Algebra i Logika 14(2): 215–237.
  • Kharchenko, V. K. (1996). Noncommutative Galois theory. Novosibirsk, Nauchnaja, Kuiga.
  • Lanski, C. (1993). An Engel condition with derivation. Proc. Am. Math. Soc. 118(3): 731–734.
  • Liu, C. K. (2014). An Engel condition with automorphisms for left ideals. J. Agebra Appl. 13: 14.
  • Liau, P. K., Liu, C. K. (2013). On automorphisms and commutativity in semi-prime rings. Can. Math. Bull. 56(3): 584–592.
  • Luh, J. (1970). A note on commuting automorphisms of rings. Am. Math. Monthly 77(1): 61–62.
  • Martindale, W. S. III, (1969). Prime rings satisfying a generalized polynomial identity. J. Algebra 12(4): 576–584.
  • Mayne, J. H. (1976). Centralizing automorphisms of prime rings. Canad. Math. Bull. 19(1): 113–115.
  • Mayne, J. H. (1992). Centralizing automorphisms of lie ideals in prime rings. Can. Math. Bull. 35(4): 510–514.
  • Murphy, G. J. (1990). C*-Algebras and Operator Theory. New York: Academic Press INC.
  • Nadeem, M., Aslam, M., Javed, M. A. (2015). On 2-skew commuting mappings of prime rings. Gen. Math. Notes 31: 1–9.
  • Najati, A., Saem, M. M. (2015). Skew-commuting mappings on semiprime and prime rings. Hacettepe J. Math. Stat. 44(4): 887–892.
  • Pinter-Lucke, J. (2007). Commutativity conditions for rings 1950-2005. Expo Math. 25(2): 165–174.
  • Posner, E. C. (1957). Derivation in prime rings. Proc. Am. Math. Soc. 8(6): 1093–1100.
  • Raza, M. A., Rehman, N. (2016). An identity on automorphisms of lie ideals in prime rings. Ann. Univ. Ferrara. Ferrara 62(1): 143–150.
  • Rehman, N., Bano, T. (2015). A note on skew commuting automorphism in prime rings. Kyunpook Math. J. 55(1): 21–28.
  • Rehman, N., De Filippis, V. (2011). On n-commuting and n-skew commuting maps with generalized derivations in prime and semiprime rings. Sib. Math. J. 52(3): 516–523.
  • Rehman, N., Raza, M. A. (2016). On m-commuting mappings with skew derivations in prime rings. St. Petersburg Math. J. 27(4): 641–650.
  • Vukman, J. (1990). Commuting and centralizing mappings in prime rings. Proc. Am. Math. Soc. 109(1): 47–52.
  • Wang, Y. (2006). Power-centralizing automorphisms of lie ideals in prime rings. Commun. Algebra 34(2): 609–615.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.