$\mathscr{T}$-Commuting  Generalized Derivations on  Ideals  and Semi-Prime Ideal-II

N. U. Rehman; H. M. Alnoghashi

doi:10.30970/ms.57.1.98-110

N. U. Rehman Aligarh Muslim University https://orcid.org/0000-0003-3955-7941
H. M. Alnoghashi Aligarh Muslim University

DOI: https://doi.org/10.30970/ms.57.1.98-110

Keywords: Semi-prime ideal; generalized derivations; commutativity.

Abstract

The study's primary purpose is to investigate the $\mathscr{A}/\mathscr{T}$ structure of a quotient ring, where $\mathscr{A}$ is an arbitrary ring and $\mathscr{T}$ is a semi-prime ideal of $\mathscr{A}$. In more details, we look at the differential identities in a semi-prime ideal of an arbitrary ring using $\mathscr{T}$-commuting generalized derivation. The article proves a number of statements. A characteristic representative of these assertions is, for example, the following Theorem 3: Let $\mathscr{A}$ be a ring with $\mathscr{T}$ a semi-prime ideal and $\mathscr{I}$ an ideal of $\mathscr{A}.$ If $(\lambda, \psi)$ is a non-zero generalized derivation of $\mathscr{A}$ and the derivation satisfies any one of the conditions:\
1)\ $\lambda([a, b])\pm[a, \psi(b)]\in \mathscr{T}$,\ 2) $\lambda(a\circ b)\pm a\circ \psi(b)\in \mathscr{T}$,
$\forall$ $a, b\in \mathscr{I},$ then $\psi$ is $\mathscr{T}$-commuting on $\mathscr{I}.$

Furthermore, examples are provided to demonstrate that the constraints placed on the hypothesis of the various theorems were not unnecessary.

Author Biographies

N. U. Rehman, Aligarh Muslim University

Aligarh Muslim University

H. M. Alnoghashi, Aligarh Muslim University

Aligarh Muslim University

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