Jordan Endo-Biderivations on prime rings

Maysaa Zaki Salman; Dunya Mohamed Hameed; Auday Hekmat Mahmood

doi:10.5269/bspm.77652

Maysaa Zaki Salman Department of Mathematics, College of Education, Mustansiriyah University, Baghdad, Iraq
Dunya Mohamed Hameed Department of Mathematics, College of Education, Mustansiriyah University, Baghdad, Iraq
Auday Hekmat Mahmood Department of Mathematics, College of Education, Mustansiriyah University, Baghdad, Iraq

Abstract

For a ring $\mathcal{R}$, set $\mathcal{S}=\mathcal{R}\times\mathcal{R}$. Our goal in this essay is to offer the concepts of Endo-Biderivation, Jordan Endo-Biderivation and Quasi Endo-Biderivation on $\mathcal{S}$: A bi-additive mapping $\xi: \mathcal{S} \rightarrow \mathcal{S}$ is referred to as Endo-Biderivation on $\mathcal{S}$ if $\xi(\alpha\mathfrak{b}, \mathfrak{c}\mathcal{d})= \xi(\alpha, \mathfrak{c}) (\mathfrak{b}, \mathcal{d}) + (\alpha, \mathfrak{c}) \xi(\mathfrak{b}, \mathcal{d})$ fulfilled for any $\alpha, \mathfrak{b}, \mathfrak{c},\mathcal{d}\in \mathcal{R}$. A mapping $\xi$ is referred to as Jordan Endo-Biderivation on $\mathcal{S}$ if $\forall\ \alpha\ , \mathfrak{c} \in \mathcal{R}$, then $\xi(\alpha^2, \mathfrak{c}^2) = \xi(\alpha, \mathfrak{c}) (\alpha, \mathfrak{c}) + ( \alpha, \mathfrak{c})\xi(\alpha , \mathfrak{c})$. It's shown that in this occurrence that $\mathcal{S}$ is prime-ring (P.R) of characteristic $\neq2, \& \ \xi: \mathcal{S} \longrightarrow \mathcal{S}$ is a Jordan Endo-Biderivation, then $\xi$ is Endo-Biderivation.

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