On generalized homoderivations of prime rings

Q3 Mathematics Matematychni Studii Pub Date : 2023-09-22 DOI:10.30970/ms.60.1.12-27
N. Rehman, E. K. Sogutcu, H. M. Alnoghashi
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 $\\forall\\ a,b\\in \\mathscr{A}\\colon\\quad \\xi(ab)=\\xi(a)\\xi(b)+\\xi(a)b+a\\xi(b).$
 An additive map $\\psi\\colon \\mathscr{A}\\to \\mathscr{A}$ is called a generalized homoderivation with associated homoderivation $\\xi$ on $\\mathscr{A}$ if
 $\\forall\\ a,b\\in \\mathscr{A}\\colon\\quad\\psi(ab)=\\psi(a)\\psi(b)+\\psi(a)b+a\\xi(b).$
 This study examines whether a prime ring $\\mathscr{A}$ with a generalized homoderivation $\\psi$ that fulfils specific algebraic identities is commutative. Precisely, we discuss the following identities:
 $\\psi(a)\\psi(b)+ab\\in \\mathscr{Z}(\\mathscr{A}),\\quad\\psi(a)\\psi(b)-ab\\in \\mathscr{Z}(\\mathscr{A}),\\quad\\psi(a)\\psi(b)+ab\\in \\mathscr{Z}(\\mathscr{A}),$
 $\\psi(a)\\psi(b)-ab\\in \\mathscr{Z}(\\mathscr{A}),\\quad\\psi(ab)+ab\\in \\mathscr{Z}(\\mathscr{A}),\\quad\\psi(ab)-ab\\in \\mathscr{Z}(\\mathscr{A}),$
 $\\psi(ab)+ba\\in \\mathscr{Z}(\\mathscr{A}),\\quad\\psi(ab)-ba\\in \\mathscr{Z}(\\mathscr{A})\\quad (\\forall\\ a, b\\in \\mathscr{A}).$
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引用次数: 0

Abstract

Let $\mathscr{A}$ be a ring with its center $\mathscr{Z}(\mathscr{A}).$ An additive mapping $\xi\colon \mathscr{A}\to \mathscr{A}$ is called a homoderivation on $\mathscr{A}$ if $\forall\ a,b\in \mathscr{A}\colon\quad \xi(ab)=\xi(a)\xi(b)+\xi(a)b+a\xi(b).$ An additive map $\psi\colon \mathscr{A}\to \mathscr{A}$ is called a generalized homoderivation with associated homoderivation $\xi$ on $\mathscr{A}$ if $\forall\ a,b\in \mathscr{A}\colon\quad\psi(ab)=\psi(a)\psi(b)+\psi(a)b+a\xi(b).$ This study examines whether a prime ring $\mathscr{A}$ with a generalized homoderivation $\psi$ that fulfils specific algebraic identities is commutative. Precisely, we discuss the following identities: $\psi(a)\psi(b)+ab\in \mathscr{Z}(\mathscr{A}),\quad\psi(a)\psi(b)-ab\in \mathscr{Z}(\mathscr{A}),\quad\psi(a)\psi(b)+ab\in \mathscr{Z}(\mathscr{A}),$ $\psi(a)\psi(b)-ab\in \mathscr{Z}(\mathscr{A}),\quad\psi(ab)+ab\in \mathscr{Z}(\mathscr{A}),\quad\psi(ab)-ab\in \mathscr{Z}(\mathscr{A}),$ $\psi(ab)+ba\in \mathscr{Z}(\mathscr{A}),\quad\psi(ab)-ba\in \mathscr{Z}(\mathscr{A})\quad (\forall\ a, b\in \mathscr{A}).$ Furthermore, examples are given to prove that the restrictions imposed on the hypothesis of the various theorems were not superfluous.
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关于素环的广义同导
设$\mathscr{A}$为一个以中心为中心的环$\mathscr{Z}(\mathscr{A}).$加性映射$\xi\colon \mathscr{A}\to \mathscr{A}$称为$\mathscr{A}$ if&#x0D上的同质导数;$\forall\ a,b\in \mathscr{A}\colon\quad \xi(ab)=\xi(a)\xi(b)+\xi(a)b+a\xi(b).$ 
在$\mathscr{A}$ if&#x0D上,一个可加映射$\psi\colon \mathscr{A}\to \mathscr{A}$被称为具有关联同质导数$\xi$的广义同质导数;$\forall\ a,b\in \mathscr{A}\colon\quad\psi(ab)=\psi(a)\psi(b)+\psi(a)b+a\xi(b).$ 
本文研究了一个满足特定代数恒等式的具有广义同导数$\psi$的素环$\mathscr{A}$是否可交换。确切地说,我们讨论下列恒等式:
$\psi(a)\psi(b)+ab\in \mathscr{Z}(\mathscr{A}),\quad\psi(a)\psi(b)-ab\in \mathscr{Z}(\mathscr{A}),\quad\psi(a)\psi(b)+ab\in \mathscr{Z}(\mathscr{A}),$ 
$\psi(a)\psi(b)-ab\in \mathscr{Z}(\mathscr{A}),\quad\psi(ab)+ab\in \mathscr{Z}(\mathscr{A}),\quad\psi(ab)-ab\in \mathscr{Z}(\mathscr{A}),$ 
$\psi(ab)+ba\in \mathscr{Z}(\mathscr{A}),\quad\psi(ab)-ba\in \mathscr{Z}(\mathscr{A})\quad (\forall\ a, b\in \mathscr{A}).$ 
并举例证明了对各定理的假设所加的限制并不是多余的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Matematychni Studii
Matematychni Studii Mathematics-Mathematics (all)
CiteScore
1.00
自引率
0.00%
发文量
38
期刊介绍: Journal is devoted to research in all fields of mathematics.
期刊最新文献
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