A Study on Generalized Derivation Acting on Jordan Ideal in Prime Rings

V. K. Yadav

doi:https://doi.org/10.14445/22315373/IJMTT-V71I8P104

International Journal of Mathematics Trends and Technology

Research Article | Open Access | Download PDF

Volume 71 | Issue 8 | Year 2025 | Article Id. IJMTT-V71I8P104 | DOI : https://doi.org/10.14445/22315373/IJMTT-V71I8P104

A Study on Generalized Derivation Acting on Jordan Ideal in Prime Rings

V. K. Yadav

Received	Revised	Accepted	Published
12 Jun 2025	19 Jul 2025	05 Aug 2025	18 Aug 2025

Citation :

V. K. Yadav, "A Study on Generalized Derivation Acting on Jordan Ideal in Prime Rings," International Journal of Mathematics Trends and Technology (IJMTT), vol. 71, no. 8, pp. 21-23, 2025. Crossref, https://doi.org/10.14445/22315373/IJMTT-V71I8P104

Abstract

Let R be a 2-torsion-free prime ring and J be a non-zero Jordan ideal of R. Suppose that F: R → R is a generalized derivation associated with a non-zero derivation d. If F (xy) − d(x)d(y) ∈ Z(R), for all x, y ∈ J, then R is commutative.

Keywords

Prime ring, Generalized derivation, Jordan ideal.

References

[1] Ram Awtar, “Lie and Jordan Structure in Prime Rings with Derivations,” Proceedings of the American Mathematical Society, vol. 41, pp. 67-74, 1973.
[CrossRef] [Google Scholar] [Publisher Link]
[2] Mohammad Ashraf, Asma Ali, and Shakir Ali, “Some Commutativity Theorems for Rings with Generalized Derivations,” Southeast Asian Bulletin of Mathematics, vol. 31, pp. 415-421, 2007.
[Google Scholar]
[3] Matej Bresar, “On the Distance of the Composition of Two Derivations to the Generalized Derivations,” Glasgow Mathematical Journal, vol. 33, no. 1, pp. 89-93, 1991.
[CrossRef] [Google Scholar] [Publisher Link]
[4] Tsiu-Kwen Lee, “Semiprime Rings with Hypercentral Derivation,” Canadian Mathematical Bulletin, vol. 38, no. 4, pp. 445-449, 1995.
[CrossRef] [Google Scholar] [Publisher Link]
[5] Joseph H. Mayne, “Centralizing Automorphisms of Lie Ideals in Prime Rings,” Canadian Mathematical Bulletin, vol. 35, no. 4, pp. 510-514, 1992.
[CrossRef] [Google Scholar] [Publisher Link]
[6] A. Mamouni, L. Oukhtite, and M. Samman, “Commutativity Theorems for ∗-Prime Rings with Differential Identites on Jordan Ideal,” ISRN Algebra, vol. 2012, no. 1, pp. 1-11, 2012.
[CrossRef] [Google Scholar] [Publisher Link]
[7] L. Oukhtite, and A. mamouni, “Commutativity Theorems for Prime Rings with Generalized Derivations on Jordan Ideals,” Journal of Taibah University for Science, vol. 9, no. 3, pp. 314-319, 2015.
[CrossRef] [Google Scholar] [Publisher Link]
[8] L. Oukhtite, and A. mamouni, “Derivations Satisfying Certain Algebraic Identities on Jordan Ideals,” Arabian Journal of Mathematics, vol. 1, pp. 341-346, 2012.
[CrossRef] [Google Scholar] [Publisher Link]
[9] Lahcen Oukhtite, and Abdellah Mamouni, “Generalized Derivations Centralizing on Jordan Ideals of Rings with Involution,” Turkish Journal of Mathematics, vol. 38, no. 2, pp. 233-239, 2014.
[CrossRef] [Google Scholar] [Publisher Link]
[10] Lahcen Oukhtite, Abdellah Mamouni, and Charef Beddani, “Derivations on Jordan Ideals in Prime Rings,” Journal of Taibah University for Science, vol. 8, no. 4, pp. 364-369, 2014.
[CrossRef] [Google Scholar] [Publisher Link]
[11] Edward C. Posner, “Derivations in Prime Rings,” Proceedings of American Mathimatical Society, vol. 8, no. 6, pp. 1093-1100, 1957.
[CrossRef] [Google Scholar] [Publisher Link]
[12] S.M.A. Zaidi, Mohammad Ashraf, and Shakir Ali, “On Jordan Ideals and Left (θ, θ) - Derivations in Prime Rings,” International Journal of Mathematics and Mathematical Sciences, vol. 2004, no. 37, pp. 1957-1964, 2004.
[CrossRef] [Google Scholar] [Publisher Link]