On symmetric generalized bi-semiderivations of prime rings

Faiza Shujat

doi:10.5269/bspm.63283

Autores/as

Faiza Shujat Taibah University Madinah

DOI:

https://doi.org/10.5269/bspm.63283

Resumen

In the present note we anaugrate the idea of symmetric generalized bi-semiderivation on rings and prove some classical commutativity results for generalized bi-semiderivation. Moreover, our main objective is to extend the main theorem in \cite{VJ} for biderivation to the case of symmetric generalized bi-semiderivation on prime ring.

Biografía del autor/a

Faiza Shujat, Taibah University Madinah

Department of Mathematics

Referencias

F. Shujat, Symmetric generalized biderivations of prime rings, Bol. Soc. Paran. Mat. 39(4)(2021), 65-72 (preprint).
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I. N. Herstein, A note on derivations II, Canad. Math. Bull. 22 (1979), 509-511.
J. Bergen, Derivations in Prime Rings, Canad. Math. Bull. 26 (1983), 267-270.
J. C. Chang, On semiderivations of prime rings, Chinese J. Math., 12, (1984), 255-262.
J. Vukman, Two results concerning symmetric biderivations on prime rings, Aequationes Math. 40 (1990), 181–189.
H. Yazrali and D. Yilmaz, On symmetric bi-semiderivation on prime rings Preprint (2020).
N. Rehman and A. Z. Ansari, On lie ideals with symmetric bi-additive maps in rings, Palestine J. Math. 2 (2013), 14-21.

On symmetric generalized bi-semiderivations of prime rings

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