Symmetric generalized biderivations on prime rings

Faiza Shujat

doi:10.5269/bspm.40481

Faiza Shujat Taibah University

Résumé

The purpose of the present paper is to prove some results concerning symmetric generalized biderivations on prime and semiprime rings which partially extend some results of Vukman \cite {V}. Infact we prove that: let $R$ be a prime ring of characteristic not two and $I$ be a nonzro ideal of $R$. If $\Delta$ is a symmetric generalized biderivation on $R$ with associated biderivation $D$ such that $[\Delta(x,x), \Delta(y,y)]=0$ for all $x,y \in I$, then one of the following conditions hold\\

\begin{enumerate}

\item $R$ is commutative.

\item $\Delta$ acts as a left bimultiplier on $R$.

\end{enumerate}

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Biographie de l'auteur

Faiza Shujat, Taibah University

Assistant Professor

Department of Mathematics

Références

Ali A, Shujat, F. and Khan, S., On commuting traces of generalized biderivations of prime rings, Italian J. pure app. math. (34), 123-132, (2015).

Ali, A., Filippis V. D. and Shujat, F., Results concerning symmetric generalized biderivations of prime and semiprime rings Mathmatiki Vesnik 66 (4), 410-417, (2014).

N. Argac, On prime and semiprime rings with derivations, Algebra Colloq. 13 (3), 371-380, (2006).

Beidar, KI, Martindale, WS and Mikhalev, AV, Rings with generalized identities, Marcel Dekker INC (1996).

Maksa, G., A remark on symmetric biadditive functions having non-negative diagonalization, Glasnik. Mat. 15 (35), 279-282, (1980).

Shujat, F., Ansari, A. and Khan, S., Strong commutativity preserving biderivations on prime rings, Intern. J. Comp. Math., (2017).

J. Vukman, Symmetric biderivations on prime and semiprime rings, Aequationes Math. 38, 245-254, (1989).