Structure of (σ, ρ)-n-Derivations on Rings

Authors

Abu Zaid Ansari Department of Mathematics, Faculty of Science, Islamic University of Madinah, Madinah, KSA https://orcid.org/0000-0001-6139-7521 (unauthenticated)
Faiza Shujat Department of Mathematics, Faculty of Science, Taibah University, Madinah, KSA
Ahlam Fallatah Department of Mathematics, Faculty of Science, Taibah University, Madinah, KSA

DOI:

https://doi.org/10.37256/cm.5420245144

Keywords:

prime ring, (σ, ρ)-derivation, Jordan n-derivation, ∗-n-centralizers

Abstract

The goal of this research is to describe the structure of Jordan (σ, ρ)-n-derivations on a prime ring. By (σ, ρ)- n-derivations, we mean n-additive maps ℑ : Rⁿ→R satisfying the following property in each n-slot:

ℑ(pq, ϖ1, ··· , ϖn−1) = ℑ(p, ϖ1, ··· , ϖn−1)σ(q) +ρ(p)ℑ(q, ϖ1, ··· , ϖn−1),

for every p, q, ϖ1, ··· , ϖ_n−1∈ R. We find the conditions under which every Jordan (σ, ρ)-n-derivation becomes a (σ, ρ)-n-derivation. Moreover, the concept of ∗-n-centralizers on ∗-ring has given. The ∗-ring is also used for examining some outcomes, where left and right ∗-n-centralizers are significant

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Published

2024-11-29

Issue

Contemporary Mathematics, Volume 5 Issue 4 (2024), 4132-6581

Section

Research Article

License

This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

Structure of (σ, ρ)-n-Derivations on Rings. Contemp. Math. [Internet]. 2024 Nov. 29 [cited 2025 Dec. 24];5(4):5666-78. Available from: https://ojs353.mebyme.cn/index.php/CM/article/view/5144

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